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Chemistry: The Study of Change
Chapter 1
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
ask a question
make observations and collect data
design an experiment
analyze data
draw a conclusion do research
Introduction to Chemistry
and the
Scientific Method
Chemistry: A Science for the 21st Century
•Sanitation systems
• Surgery with anesthesia
• Vaccines and antibiotics
•Fossil fuels
• Solar energy
• Nuclear energy
1.1
Health and Medicine
Energy and the environment
Chemistry: A Science for the 21st Century
•Polymers, ceramics, liquid crystals
• Room-temperature superconductors?
• Molecular computing?
•Genetically modified crops
• “Natural” pesticides
• Specialized fertilizers
1.1
Materials Technology
Food Technology
1.2
The Study of Chemistry
Macroscopic Microscopic
Chemists study the microscopic properties of matter, which in turn produce matter’s observable macroscopic properties – thus, we often switch back and forth between microscopic and macroscopic views of matter in this course.
The scientific method is a systematic approach to research. Although it is systematic, it is not a rigid series of steps that must be done in a particular order.
ask a question
make observations and collect data
design an experiment
analyze data
draw a conclusion
do research
form a hypothesis
researcher’s hidden bias
A theory is a unifying principle that explains a body of facts and/or those laws that are based on them.
1.3
Atomic Theory
A hypothesis is a tentative explanation for a set of observations that can be tested.
tested modified
A law is a concise statement of a relationship between phenomena that is always the same under the same conditions.
Force = mass x acceleration
Classification of Matter
Substances
Matter is anything that has mass and occupies space.
Matter that has a uniform and unchanging composition is called a (pure) substance.
examples of pure substances include table salt, pure water, oxygen, gold, etc.
States of Matter
Matter normally occupies one of three phases, or states. These are:
P Solid
P Liquid
P Gas
* Plasma is a 4th state of matter in which the particles are at extremely high temperatures (over 1,000,000 °C).
As we shall see in more detail later, the phase (or state) of a substance is determined by the average kinetic energy of the particles that make up the substance, (i.e., temperature) and the strength of the attractive forces holding the substance’s particles together.
weak
moderate
strong
States of Matter
gas
liquid
solid
Solids Solids have a definite shape and volume.
The particles of a solid cannot exchange positions.
Solids are incompressible.
States of Matter
Liquids have definite volumes
Liquids do not have a fixed shape
Like solids, liquids are also incompressible
Liquids
States of Matter
Gases take on the shape and volume of their container
Unlike solids and liquids, gases are highly compressible
Gases
States of Matter
Technically, the word “gas” refers to a substance that is in the gas phase at room temperature.
The word “vapor” refers to the gaseous state of a substance that is normally a solid or liquid at room temperature.
States of Matter
1. mixtures• homogeneous (solution)• heterogeneous
2. (pure) substances
• compounds• elements
Matter can be classified based on its characteristics into the following categories and subcategories:
Classification of Matter
A pure substance is a form of matter that has a definite composition and distinct properties.
examples: gold, salt, iron, pure water, sugar
A mixture is a combination of two or more substances in which each substance retains its own distinct identity.
examples: salt water, oil & vinegar dressing, granite, air
Classification of Matter
see page 13Classification Summary
Heterogeneous mixture : the composition is not uniform throughout. You can visibly see the different components.
Mixtures can be heterogeneous or homogeneous.
examples: cement, iron filings in sand, granite, milk, oil and water, etc.
Classification of Matter
Mixtures
Homogenous mixture (also called a solution): The composition of the mixture is the same throughout.
Classification of Matter
Solutions are made up of two components:
(1) the solute which is dissolved in (2) the solvent.
If the solvent is water, the solution is called an aqueous solution which is symbolized: (aq).
We often think of a solution as being a solid dissolved in a liquid. However…
In a solution, both the solvent and solute can be in any phase – solid, liquid or gas.
air (O2 dissolved in nitrogen)gasgas
alloys (brass, bronze, etc.)solidsolid
gasoline (a mix of liquids)liquidliquid
salt dissolved in watersolidliquid
examplesolutesolvent
Classification of Matter
In the case of liquids, we use a special term:
If two liquids completely dissolve in each other, they are said to be miscible. If they do not, they are immiscible.
Classification of Matter
If a substance dissolves in another substance, we say the first substance is soluble in the second. If they do not dissolve, they are said to be insoluble.
example: carbon dioxide is soluble in air gold is insoluble in water
example: alcohol and water are misciblegasoline and water are immiscible
A mixture can be separated into its pure components by simple physical methods.
Filtration is a means of separating a solids from liquids. For example, we can filter out the sand from a mix of sand and water.
Classification of Matter
Magnetic substances can be separated using a magnet.
Fractional crystallization is a means of separating two solids by adding a solvent that will dissolve one of the solids but not the other; the mixture is then filtered to separate out the insoluble solid. Finally, the solvent is evaporated off to recover the remaining solid.
For example, we can separate salt from sand by adding hot water to dissolve the salt, then filter off the sand. The water is then evaporated off, leaving the salt behind.
Separation of a Mixture
Distillation is a means of separating two liquids based on differences in their boiling points.
Separation of a Mixture
This method is only effective for substances that are liquids at room temperature with significant differences in their boiling points.
distillation apparatus
The substance with the lowest boiling point “boils off” and is then cooled and condensed back into a liquid. The liquid is collected in a receiver flask.
Chromotography is the separation of a mixture based on solubility in a “mobile” solvent coupled with an adherence to a “stationary phase” medium, such as paper or silica gel, etc.
column chromotography is a common means of separating components from a mixture
Thin Layer Chromotography can be used to separate the components of chlorophyll from a crushed plant leaf.
Separation of a Mixture
Other means of separation:
Other techniques of separating a mixture include sublimation, extraction, and leaching, etc.
If you had a jar containing both nails and marbles, the only way to separate them would be by hand
Separation of a Mixture
speak to the hand…
You are given a test tube which contains a mixture of water, methanol, aspirin, acetanilide and aluminum oxide. (Acetanilide, aluminum oxide and aspirin are all white, powdery solids at room temperature and are thus visibly indistinguishable from each other. Water and methanol are both colorless liquids at room temperature and are also visibly indistinguishable from each other.) Assume your only source of heat is a Bunsen burner which can produce a maximum temperature of 600C. Using the following information, devise a method to separate this mixture. Be specific and complete in your answer.
dissolves only in hot (50C) water or warm (25°C) methanol
304C114Cacetanilide
does not dissolve in either methanol or water at any temperature
2980 C 2072Caluminum oxide
dissolves in methanol or water (if above 10C)
decomposes at 140C
135 C aspirin
dissolves in cold or hot water65C – 97 C methanol
dissolves in cold or hot methanol100 C 0 C water
what it dissolves/does not dissolve inboiling pointmelting pointsubstance
Example:
Mixtures are composed of two or more substances physically combined.
Recall that a (pure) substance is matter that has a uniform, unchanging composition
Pure substances may be elements or compounds
Pure Substances: Elements and Compounds
see page 13Classification Summary
An element is a substance that cannot be separated into simpler substances by chemical means.
• 32 elements have been synthesized by scientists.
• 114 elements have been identified
• 82 elements occur naturally on Earth
Classification of Matter
examples include carbon, sulfur, copper, iron, and mercury
carbon sulfur
copper iron
mercury
examples: technetium, americium, and seaborgium
Elements
Some symbols are based on the Latin name
eg, iron is Fe (for ferrum) and sodium is Na (for natrium)
Symbols for Elements
Elements are identified by a one or two-letter symbol. The first letter, which is ALWAYS capitalized, is typically the first letter in the name of the element.
eg, C = carbon, H = hydrogen
The second letter (which is only used if other elements have the same first letter) is NEVER capitalized.
eg, Cl = chlorine, He = helium.
http://www.privatehand.com/flash/elements.html
Symbols for Elements
A compound is a substance composed of atoms of two or more different elements chemically bonded in fixed proportions.
Water (H2O)
Sucrose (C12H22O11)
Classification of Matter
table salt (NaCl)
Compounds
sugar
As such, they can be chemically decomposed into their component elements.
The properties of a compound are different from the properties of its component elements
Classification of Matter
For example, table salt is composed of sodium and chlorine. Sodium is a soft, silver colored metal that reacts violently with water, and chlorine is a pale-green poisonous gas – yet when chemically combined, they form table salt, a white crystalline solid you put on your eggs in the morning!
=+
Compounds can only be separated into their pure components (elements) by chemical means.
Water can be separated into its elements, hydrogen and oxygen, by passing an electric current through it, a process called electrolysis.
For example:
Iron is separated from iron ore (Fe2O3) by heating the ore in a blast furnace and reacting it with carbon monoxide and elemental carbon (in the form of “coke”).
Compounds
H2
N2
There are TWO kinds of compounds, depending on the nature of the chemical bond holding the atoms together.
Molecules form when two or more neutral atoms form bonds between them by sharing electrons
Note that some elements exist as molecules. For example,the following elements occur in nature as molecular diatomic elements:
H2, N2, O2, F2, Cl2, Br2 and I2
They are molecules, but they are NOT compounds, because they have only one kind of element present.
Cl2
O2
Compounds
Ionic compounds are composed of ions, which are atoms that have a (+) or (-) charge.
+
++
++
+
+ +─
──
─
─
─
─
── +
+ ions are called cations and form when an atom loses electrons
ions are called anions and form when an atom gains electrons
Ionic compounds form when cations and anions form electrostatic attractions between them (opposite charges attract)
Compounds
PURE SUBSTANCE
MATTER
can it be separated by physical means?
heterogeneous mixture
is the mixture uniform throughout?
can the substance be chemically decomposed into
simpler substances?
solution
MIXTURE
compound element
YESYES
YES NONOYES
NO
Classification Summary
Properties of Matter
Physical & Chemical Properties
Physical Properties are measurable properties
Chemical Properties describe how a substance reacts with other substances
• flammability $bonds with oxygen
• reacts with water $decomposes when heated
• mass $ density
• boiling point $ solubility in water
An extensive property of a material depends upon how much matter is being considered. Extensive properties are additive.
• mass
• length
• volume
Extensive and Intensive Properties
Physical properties can be classified as being either extensive or intensive properties.
An intensive property of a material is independent of the amount of matter is being considered, and is not additive.
• density • melting point
• temperature •color
Extensive and Intensive Properties
Note that ALL chemical properties are intensive properties.
A physical change does not alter the composition or identity of a substance.
A chemical change (reaction) alters the identity or composition of the substance(s) involved.
ice meltingsugar dissolving
in water
hydrogen burns in air to form water
Physical & Chemical Changes
Physical & Chemical Changes
Evidence of a chemical reaction include:
1. Heat and light (both) produced
2. Gas produced (bubbles)
3. Solid precipitate forms
4. Color changes occur
Measurement
The SI System of Measurement
Scientists around the world use a unified system of measurement (Le Systeme Internationale d’Unites, or SI for short).
There are seven fundamental “quantities” that can be measured:
Length
Mass
Time
Temperature
Electric Current
Chemical quantity
Luminous intensity
International System of Units (SI)
page 16
Each base quantity is given a unit with a specific name and symbol
see page 17
The SI units are based on metrics. Each power of ten change is given a special prefix used with the base unit.
International System of Units (SI)
You must know these prefixes
Measurements with SI Units
Length (SI unit = meter) The meter is often divided into cm and mm. (10 mm = 1 cm ).
Your little finger is about 1 cm in width. A dime is about 1 mm thick.
English/Metric equivalencies
1 inch = 2.54 cm1 meter = 39.37 inches
Volume (SI unit = m3) Volume is the amount of space occupied by something.
A more common unit is the dm3 =1 liter. A smaller unit that we will use frequently is the cm3.
Measurements with SI Units
1 cm3 = 1 ml 1000 ml = 1 liter
English/Metric equivalencies1 liter = 1.057 quarts1 ml ~ 15 drops
liquids—use a graduated cylinder. To read the scale correctly, read the volume at the lowest part of the meniscus - the curve of the liquid’s surface in a container.
Measuring Volume
meniscus
Measurements with SI Units
Your eye should be level with the meniscus when reading the volume
regular solids: volume = length x width x height
Measurements with SI Units
Measuring Volume continued
irregular solids: volume is found by displacement.
4
6
2
Begin with a known volume of water.
4
6
2
Add the solid.
volume of solid = volume displaced :
6.0 – 4.0 = 2.0 cm3
The amount of water displaced is the volume of the solid.
Measurements with SI Units
Mass (SI unit = kilogram): the amount of matter. The mass of a given object is constant.
A kilogram is about 2.2 pounds -- this is too large a unit for most chemistry labs, so we will use grams instead.
Note that mass and weight are two different things…
Weight is a measure of the force due to gravity acting on a mass. The weight of an object changes, depending on the gravitational force acting on it.
http://www.exploratorium.edu/ronh/weight/
For example, on the moon you would weigh only 1/6th what you do on Earth, because the force of gravity on the moon is only 1/6th that of Earth.
Measurements with SI Units
The Importance of UnitsOn 9/23/99, the Mars Climate Orbiter entered Mar’s atmosphere 100 km (62 miles) lower than planned and was destroyed by heat because the engineers that designed the rocket calculated the force provided by the engines in pounds, but NASA engineers thought the force was given in the units of Newtons (N) when they determined when to fire the rockets…
1 lb = 1 N
1 lb = 4.45 N
“This is going to be the cautionary tale that will be embedded into introduction to the metric system in elementary school, high school, and college science courses till the end of time.”
Measurements with SI Units
Measuring Mass
We still use the term “weighing” even though we are finding the mass of an object, not its weight…
Triple beam balance
Electronic balance
English/Metric equivalencies
1 kg = 2.203 lbs 1 paperclip 1 gram
1 lb = 453.6 grams
There are three common temperature scales
Fahrenheit (oF) – English system, based on the freezing point of salt water.
Centigrade (oC) – metric system, based on the freezing and boiling points of pure water
Kelvin (K) – SI unit, also called the “Absolute” scale; 0 K (Absolute Zero) is defined as the temperature at which all motion stops (kinetic energy = 0).
Temperature (SI unit = kelvin) is a measure of the average kinetic energy (energy due to motion) of the atoms and molecules that make up a substance.
Measurements with SI Units
K = oC + 273.15
273 K = 0 oC 373 K = 100 oC
oC = (oF – 32)9
5
32 oF = 0 oC 212 oF = 100 oC
Temperature
Conversions:
oF = (oC) + 329
5
Temperature
Examples
A thermometer reads 12o F. What would this be in oC ?
The conversion formula from oF to oC is: oC = 5/9(oF – 32)
Inserting the values gives: : oC = 5/9(12oF – 32)
oC = 5/9(-20) = -11.1oC
A thermometer reads 315.3 K. What would this be in oF ?
The conversion formula from oC to oF is: oF = 9/5(oC) +32.
Inserting the values gives: : oC = 9/5(42.15 oC) + 32
oC = (75.9) + 32 = 107.9 oF
First convert K to oC: 315.3 K – 273.15 = 42.15oC
page 21
Measurements with SI Units
Time (SI unit = second). This is the only non-metric SI unit. We still use 1 day = 24 hours, 1 hour = 60 minutes, 1 minute = 60 seconds
Chemical Quantity ( SI unit = mole). Since atoms are so tiny, it takes a LOT of them to make even one gram. In fact, you would have to put 602,200,000,000,000,000,000,000 atoms of carbon (that’s 6.022 X 1023) on a balance to get just 12 grams of carbon!
We do use metric fractions of time, however, such as milliseconds (1/1000th of a second), etc.
That huge number (6.022 X 1023) is given a special name; it is called “Avogadro’s Number,” symbolized NA, after the Italian physicist, Lorenzo Romano Amedeo Avogadro who lived between 1776-1856.
Just like 1 dozen = 12 things, we define:
Measurements with SI Units
The Mole continued
1 mole = 6.022 X 1023 things
Avogadro
1 mole of oranges would cover the surface of the earth to a depth of 9 miles!
If you stacked 1 mole of notebook paper, it would take you 5,800 years, traveling at the speed of light (186,000,000
miles per second) to reach the top of the stack!
If you were given 1 mole of dollar bills when the universe began 13 billion years ago, and you immediately began spending money at the rate of one million dollars per second,
you would still have about 190 billion trillion dollars left !
but 1 mole of Hydrogen atoms would only mass about 1 gram!
JUST HOW BIG IS AVOGADRO’S NUMBER??
The number of atoms in 12 g of carbon:
602,200,000,000,000,000,000,000
6.022 x 1023
The mass of a single carbon atom in grams:
0.0000000000000000000000199
1.99 x 10-23
N x 10nN is a number between 1 and 10
n is a positive or negative integer
Working with Numbers: Scientific Notation
Measurements with SI Units
Derived UnitsAlthough we need only seven fundamental SI units, we can combine different units to obtain new units, called derived units.
For example, speed is distance per unit time, so we must combine the unit for distance (m) and time (sec) to get the SI unit for speed:
speed = meters per second (m/s)
We will be working with many different derived units in this course. It is important to pay attention to the individual units that make up derived units!!
d = mV
density = mass
volume
Derived Units
SI derived unit for density is kg/m3 . This is not a convenient unit in chemistry, so we usually use the units g/cm3 or g/mL
Density is the mass per unit volume of a substance. It is calculated using the equation:
Every substance has a unique density. For example:
substance density
gasoline 0.70 g/cm3
water 1.00 g/cm3
aluminum 2.70 g/cm3
lead 11.35 g/cm3
You need to know the density of water.
Any object that is more dense than water will sink in water; if it is less dense, it will float in water
page 18
page 18
given unit x = desired unitdesired unit
given unit
Dimensional Analysis:
A problem solving technique
In algebra, we learn that:
u x u = u2
uu = 1 (the u’s cancel!) and
If we let “u” = units, then every measured quantity is a number x a unit. We can solve problems by setting them up so that the unit we do NOT want gets cancelled out by dividing u/u in the problem. Thus, if a/u is a conversion (say 100 cm/1 m) then we can convert cm to meters etc. using this conversion factor so that the cm cancel…
auu x = a
(2u)3 = 8 u3and…
The Mathematics of Units
Dimensional Analysis Method of Solving Problems
1. Determine which unit conversion factor(s) are needed
2. Carry units through calculation
3. If all units cancel except for the desired unit(s), then the problem was solved correctly.
given quantity x conversion factor = desired quantity
given unit x = desired unitdesired unit
given unit
Dimensional Analysis Method of Solving Problems
Example: How many μm are in 0.0063 inches?
conversion factors needed:
0.0063 in = ? 1 inch = 2.54 cm
106 μm = 1 m 1 m = 100 cm
0.0063 inch2.54 cm1 inch
x x1 m
102 cmx
106 μm1 m
= 160 μm
Begin with what units you have “in hand,” then make a list of all the conversions you will need.
Example: The speed of sound in air is about 343 m/s. What is this speed in miles per hour? (1 mile = 1609 meters)
1 mi = 1609 m
1 min = 60 s 1 hour = 60 min
343ms
x1 mi
1609 m
60 s
1 minx
60 min
1 hourx = 767
mihour
meters to miles
seconds to hours
conversion units
Dimensional Analysis Method of Solving Problems
page 29
page 30
Uncertainty, Precision & Accuracy in Measurements
Measurements with SI Units
Uncertainty, Precision and Accuracy in Measurements
When you measure length using a meterstick, you often have to estimate to the nearest fraction of a line.
The uncertainty in a measured value is partly due to how well you can estimate such fractional units.
http://www.mhhe.com/physsci/chemistry/chang7/esp/folder_structure/ch/m2/s2/chm2s2_2.htm
The uncertainty also depends on how accurate the measuring device, itself, is.
Accuracy – how close a measurement is to the true or accepted value
To determine if a measured value is accurate, you would have to know what the true or accepted value for that measurement is – this is rarely known!
Precision – how close a set of measurements are to each other; the scatter of repeated measurements about an average.
We may not be able to say if a measured value is accurate, but we can make careful measurements and use good equipment to obtain good precision, or reproducibility.
Precision and Accuracy
accurate&
precise
precisebut
not accurate
not accurate&
not precise
A target analogy is often used to compare accuracy and precision.
Precision and Accuracy
example: which is more accurate: 0.0002 g or 2.0 g?
answer: you cannot tell, since you don’t know what the accepted value is for the mass of whatever object this is that you are weighing!
example: which is more precise: 0.0002 g or 2.0 g?
answer: surprisingly, the most precise value is 2.0 g, not the 0.0002 g. The number of places behind the decimal is not what determines precision! If that were so, I could increase my precision by simply converting to a different metric prefix for the same measurement:
Which is more precise: 2 cm or 0.00002 km? They are, in fact, identical!
Precision and Accuracy
Precision and Accuracy
Precision is a measure of the uncertainty in a measured value. Any measured value is composed of those digits of which you are certain, plus the first estimated digit.
1 2 3 41
The length of the object is at least 1.7 cm, and we might estimate the last digit to be half a unit, and say it is 1.75 cm long. Others might say 1.74 or possibly 1.76 – the last digit is an estimate, and so is uncertain.
We always assume an uncertainty of ±1 in the last digit.
The percent error in a measured value is defined as:
The smaller the percent error, the greater the precision – the smaller the % error, the more likely two measurements will be close together using that particular measuring instrument.
Thus: 2.0 ± 0.1 has a % error of (0.1/2.0) x 100 = ±5%
but 0.0002 has a % error of (0.0001/0.0002) x 100 = ± 50%
Precision and Accuracy
% error = ± uncertaintymeasured value
x 100
Percent DifferenceWhen determining the accuracy of an experimentally determined value, it must be compared with the “accepted value.” One common method of reporting accuracy is called the percent difference ( %) – this gives how far off your value is, as a percent, from the accepted value:
Percent difference:
experimental value – accepted value
accepted valuex 100% =
example: In an experiment, a student determines the density of copper to be 8.74 g/cm3. If the accepted value is 8.96 g/cm3, determine the student’s error as a percent difference.
experimental value – accepted value
accepted valuex 100% =
= − 2.46 %x 1008.74 – 8.96
8.96% =
The (-) sign indicates the experimental value is 2.46% smaller than the accepted value; a (+) % means the experimental value is larger than the accepted value.
Precision and Accuracy
We will be doing math operations involving measurements with uncertainties, so we need a method of tracking how the uncertainty will affect calculated values – in other words, how many places behind the decimal do we really get to keep the answer?
The method requires us to keep track of significant digits.
Significant digits (or significant figures) are all of the known digits, plus the first estimated or uncertain digit in a measured value.
Significant Figures: Rules
• Any digit that is not zero is significant
1.234 kg 4 significant figures
• Zeros between nonzero digits are significant
606 m 3 significant figures
• Zeros to the left of the first nonzero digit are not significant
0.08 L 1 significant figure
• If a number is greater than 1, then all zeros to the right of the decimal point are significant
2.0 mg 2 significant figures
• If a number is less than 1, then only the zeros that are at the end and in the middle of the number are significant
0.00420 g 3 significant figures
How many significant figures are in each of the following measurements?
24 mL 2 significant figures
3001 g 4 significant figures
0.0320 m3 3 significant figures
6.4 x 104 molecules 2 significant figures
560 kg You cannot tell!!
Significant Figures: Rules
Significant Figures: Rules
Suppose you wanted to estimate the number of jellybeans in a jar, and your best guess is around 400.
Now – is the uncertainty in your estimate ±1 jellybean, or is it ±10 jellybeans, or maybe even ±100 jellybeans (if you weren’t very good at estimating jellybeans…)
We need a way to write 400 and indicate in some way whether that was 400 ±1 vs 400±10 vs 400±100. The plain number “400” is ambiguous as to where the uncertain digit is.
Use scientific notation to remove the ambiguity:
400 ± 1 = 4.00 x 102 = 3 sig figs
400 ± 10 = 4.0 x 102 = 2 sig figs
400 ± 100 = 4 x 102 = 1 sig fig
Rounding NumbersGiven the number 6.82 and asked to round to 2 sig digits we would write 6.8. We write 6.8 because 6.82 is closer to 6.8 than it is to 6.9
Given the number 6.88 and asked to round to 2 sig digits, we would write 6.9. We write 6.9 because 6.88 is closer to 6.9 than it is to 6.8
You were taught this long ago.
You were also probably taught that, given the number 6.85, and asked to round this to 2 sig digits, you would write 6.9.
My question is, WHY did you round UP? 6.85 is JUST as close to 6.8 as it is to 6.9! Since it is in the middle, it could be rounded either way! And we should round it “either way.”
Rounding Numbers
Since the rounding is “arbitrarily” up, this can introduce some round-off errors in chain calculations involving this number – the final value will be too large if you always round up when the next digit is exactly 5.
Because rounding is “arbitrary” when the next digit is exactly 5, we introduce the following “odd-even rounding rule:
e.g. : 4.65 ≈ 4.6 but 4.75 ≈ 4.8
Note however, that 4.651 is closer to 4.7 than 4.6, so we round it to 4.7: only invoke the “odd-even rule” when the next digit is exactly 5.
When the next digit is exactly 5, round up or down to make the number an even number.
Math Operations with Significant Digits
We need a set of rules to determine how the uncertainty or error will “propagate” or move through a series of calculations and affect the precision of our final answer.
There is one rule for addition and subtraction, and one rule for multiplication and division. Do not mix them and match them and confuse them!
Addition or Subtraction
The answer cannot have more digits to the right of the decimal point than any of the original numbers.
89.3321.1+
90.432 round off to 90.4
one digit after decimal point
3.70-2.91330.7867
two digits after decimal point
round off to 0.79
Significant Figures
Addition or Subtraction
Significant Figures
We often encounter two numbers that must be added that are in scientific notation. We cannot add them and determine the number of places “behind the decimal” unless they have the same power of 10 – we may have to convert!
Example: What is the sum of 2.4 x 102 + 3.77 x 103 ?
3.77 x 103
0.24 x 103Always convert the smaller power of 10 to the larger power of 10
4.01 x 103
The answer is good to 2 behind the decimal when written as x103 -- that is, the uncertain digit is in the “tens” place (± 10)
10n
10n
+
+Decreasing the power of 10 means you must move the decimal to the RIGHT by one place for each power of 10 decrease.
10n
+Increasing the power of 10 means you must move the decimal to the LEFT one place for each power of 10 increase
Moving the decimal determines both the magnitude and the +/- value of 10n
To determine the power of 10, visualize a see-saw when you move the decimal point:
n
n
n
n
n
n
Significant Figures
Significant Figures
Example: What is the answer to the following, to the correct number of significant digits?
- 1.2 x 10-4- 0.012 x 10-2 0
3.0268 x 10-2
3.0148 x 10-2 = 3.015 x 10-2
Significant Figures
Multiplication or Division
The number of significant figures in the result is set by the original number that has the smallest number of significant figures
4.51 x 3.6666 = 16.536366 = 16.5
3 sig figs round to3 sig figs
6.8 ÷ 112.04 = 0.0606926
2 sig figsround to2 sig figs
= 0.061
page 25
Significant Figures
1.8
Exact NumbersNumbers from definitions or numbers of objects are considered to have an infinite number of significant figures
Because 3 is an exact number the answer is not rounded to 7, but rather reported to be 6.67 cm (three sig figures).
Find the average of three measured lengths: 6.64, 6.68 and 6.70 cm.
6.64 + 6.68 + 6.703
= 6.67333 = 6.67 = 7
These values each have 3 significant figures
Example:
Atoms, Molecules and Ions
Chapter 2
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Early Ideas
Our understanding of the structure of matter has undergone profound changes in the past century.
Nonetheless, what we know today did not arrive on a sudden inspiration. We can trace a fairly steady plodding towards our current understanding, starting as far back as 400 BCE…
Early Ideas
The properties of matter could be explained by the shape and size of its atoms.
Democritus (c.a. 400 BCE)
All matter was composed of tiny, indivisible particles called atoms (atomos = indivisible)
Each kind of matter had its own unique kind of atom – ie., there were water atoms, air atoms, fire atoms, bread atoms, etc.
Fire atoms water atomsrolls & flows“ouch!
”
As a result, Democritus’ ideas were not very well receieved. It would be some 1200 years before the idea of atoms was revisited!
Early Ideas
Most importantly, Democritus believed atoms existed in a vacuum – that is, there was “nothing” in the spaces between atoms…
Aristotle, among others, refused to believe in the existence of “nothingness” that still occupied space…
Vacuum??
Early Ideas
Aristotle
Aristotle was the court philosopher to Alexander the Great. Because of this, Aristotle’s ideas were given a lot of weight .
Aristotle believed that all matter was composed of four elements:
earth, air, fire and water.
Heating WATER exchanged “hot” for “cold” which created “AIR” (which we see as steam…)
WATER (cold, wet) AIR (hot, wet)
These elements could be “inter-converted” into each other by exchanging the “properties” of hot, cold, dry and wet.
EARTHAIR
WATER
FIREhot dry
wet cold
example
Early Ideas
Early Ideas
This idea that one kind of element could be converted into another eventually led to the belief in Alchemy – that one could turn lead into gold by performing the right chemical reaction!
The “scientific method” of inquiry was developed during the 17th and 18th centuries. The invention of the balance and other instruments soon led to a new understanding about the nature of matter.
Early Ideas
The French chemist, Antoine-Laurent Lavoisier (1743-1794), presented two important ideas which would later help lead to a new, more developed atomic theory of matter…
1. The Law of Conservation of Matter: matter is not created or destroyed in chemical reactions. Any atomic theory would have to explain why matter is not gained or lost in reactions.
2. Lavoisier defined element as any substance that could not be chemically broken down into a simpler substance.
Lavoisier
Lavoisier was a meticulous experimenter. He also helped develop the metric system of measurement. He is often called the “Father of Modern Chemistry,” in recognition of his pioneering works.
Lavoiser experimenting with respiration
Joseph Proust, another 18th century French scientist, proposed the Law of Definite Proportion, which states that the mass ratios of elements present in different samples of the same compound do not vary.
Early Ideas
For example, the percent by mass of the elements present in sugar are always found to be:
53.3% oxygen, 40.0% carbon and 6.7% hydrogen.
John Dalton (1766-1824)
Dalton started out as an apothecary's assistant (today, we would call him a pharmacist). He was also interested in both meteorology and the study of gases.
Dalton developed a new atomic theory of the nature of matter based on several postulates. His theory differed significantly from the early ideas of Democritus, but they both agreed that the simplest form of matter was the atom.
Dalton’s Atomic Theory (1808)
1. Elements are composed of extremely small particles called atoms.
2. All atoms of a given element are identical, having the same size, mass and chemical properties. The atoms of a given element are different from the atoms of all other elements.
3. Compounds are composed of atoms of more than one element. In any compound, the ratio of the numbers of atoms of any two of the elements present is either an integer or a simple fraction.
4. A chemical reaction involves only the separation, combination, or rearrangement of atoms; it does not result in their creation or destruction.
16 X 8 Y+ 8 X2Y
Dalton’s Atomic Theory
Law of Conservation of Matter and Definite Proportion Explained…
+ =
Law of Multiple Proportions
If Dalton’s ideas about atoms were correct, then he proposed that the mass of a compound containing different numbers of a given element (atom) would vary by the mass of that one whole atom – that is:
If two elements can combine to form more than one compound, then the masses of one element that combine with a fixed mass of the other element are in ratios of small, whole numbers.
16
12= 1.33
= 2.67
2.67 / 1.33 = 2
Dalton’s Atomic Theory
Consider the mass ratio of oxygen to carbon in the two compounds: CO and CO2
32
12
Note that the mass of oxygen that combines with 12 g of carbon in carbon dioxide is 2 x greater than the mass of oxygen that combines with 12 g of carbon in carbon monoxide.
In the late 19th and early 20th centuries, three important experiments that shed light on the nature of matter were conducted:
1. J.J. Thomson’s investigation of cathode rays that led to the discovery of the electron.
2. Robert Millikan’s “Oil drop experiment” that determined the charge and mass of the electron.
3. Ernest Rutherford’s “Gold foil experiment” that finally gave us the current “nuclear” model of the atom.
Modern Ideas
Cathode rays, discovered by William Crookes, are formed when a current is passed through an evacuated glass tube. Cathode rays are invisible, but a phosphor coating makes them visible.
J.J. Thomson
The Electron is Discovered
Sir Joseph John Thomson 1856-1940
J.J. Thomson helped show that cathode rays are made up of negatively charged particles (based on their deflection by magnetic and electric fields).
N S
Thomson showed that all cathode rays are identical, and are produced regardless of the type of metals used for the cathode and anode in the cathode ray tube.
Thomson was unable to determine either the actual electric charge or the mass of these cathode ray particles. He was, however, able to determine the ratio of the electric charge to the mass of the particles.
J.J. Thomson
To do this, he passed cathode rays simultaneously through electric and magnetic fields in such a way that the forces acting on the cathode ray particles (now called electrons) due to the fields cancelled out. The ratio of the electric field strength to the square of the magnetic field strength at this point was proportional to the charge to mass ratio of the electron.
J.J. Thomson
_
+
Magnetic field only
Electric field only
Both
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The value he obtained, −1.76 x 108 C/g*, was always the same, regardless of the source of the cathode rays.
This value was nearly 2000 times larger than the charge to mass ratio of a hydrogen ion (H+)!
This indicated that either the charge of the electron was very large, or that the mass of the electron was very, very small – much smaller than the mass of a hydrogen atom, which was the lightest atom known.
J.J. Thomson
*the SI unit of electric charge is the Coulomb (C)
Thomson proposed that these electrons were not just very small particles, but were actually a sub-atomic particle present in all atoms.
We thus credit Thomson with the “discovery” of the electron because of his work in determining their physical characteristics, and his rather bold hypothesis that they were present in all atoms (which was later shown to be true).
J.J. Thomson
Since the atom is neutrally charged, if it has (-) charged electrons, there must also be a (+) part to the atom to cancel the negative electrons.
This showed that Dalton’s idea that atoms were indivisible is NOT correct – instead, the atom is composed of TWO oppositely charged parts.
Thomson thought the atom was a diffuse (+) charged object, with electrons stuck in it, like raisins in pudding (the plum pudding model).
The Plum Pudding Model
Thomson’s Plum Pudding Model of the Atom
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Millikan’s Oil Drop Experiment
Robert Millikan (1911) designed an experiment to determine the actual charge of an electron.
He suspended charged oil drops in an electric field. The drops had become charged by picking up free electrons after passing through ionized air.
FELEC = E x q
FGRAVITY = m x g
when the downward force of gravity on the drop was balanced by the upward force of the electric field, then:
Millikan’s Oil Drop Experiment
E x q = m x g or q = mg/E
Knowing the mass (m) of the oil drop, and the strength of the electric field (E), he was able to find the charge (q) on the oil drop.
To find the charge of the electron, he found the smallest difference between the charges on any two oil drops.
eg: Suppose you find three oil drops have the following charges: 12.4, 7.6, 10.8. The differences between the charges are:
12.4 – 10.8 = 1.6 10.8 – 7.6 = 3.2
12.4 – 7.6 = 4.8 4.8 – 3.2 = 1.6
You would conclude the charge of the electron was 1.6 charge units.
Millikan’s Oil Drop Experiment
Millikan’s Oil Drop Experiment
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Using this technique, Millikan was able to determine the charge of an electron to be:
e = C1.602 x 10C19 C
Using Thomson’s charge to mass ratio and the charge for the electron, Millikan determined the mass of the electron to be 9.11 x 10-31 kilogram.
For his work, Millikan received the 1923 Nobel Prize in Physics.
(Uranium compound)
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It was found that there are three distinct types of radiation: (+) alpha particles, (-) beta particles, and
neutral gamma rays.
Radioactivity was discovered in 1895
Rutherford’s Gold Foil
Experiment
Rutherford designed an experiment using these newly discovered alpha-particles to test if Thomson’s plum pudding model was correct.
He fired (+) alpha particles at the gold foil. If the Thomson model was correct, most of the alpha particles would pass through the foil with little deflection.
(1908 Nobel Prize in Chemistry)
R(+) -particle
Rutherford’s Experiment
Expected Results of Rutherford’s Experiment
θ
The force of repulsion is directly proportional to the product of the charges of the alpha particle and nucleus and inversely proportional to the square of the distance between the center of the two charges. F = kQ1Q2/R2
A large, diffuse positive charge is not able to repel a (+) alpha particle very strongly, because the alpha particle cannot make a close approach, so the angle of deflection,θ, would be fairly small.
However, some particles were deflected significantly, and perhaps one in 2000 were actually deflected nearly 180 degrees!
Rutherford’s Gold Foil
Experiment
When Rutherford performed the experiment, nearly all the alpha particles passed through the foil without deflection, as expected…
Rutherford’s Experiment
Rutherford was stunned. This would be like firing a machine gun at an apple, and having most of the bullets pass through -- but every once in a while one of the bullets would bounce off the apple and come back and hit you! Why would this happen???
something small and massive must be in there that deflects only those bullets that directly hit it…
?!?
?
DUCK, ERNIE!
Only a positive charge with a very, very small radius would allow the alpha particle to approach close enough to experience a significant repulsion.
Rutherford’s Experiment
R
Strong repulsion!
nucleus
-particle
By carefully measuring the angles of deflection, θ, Rutherford was able to determine the approximate size of this positive core to the atom.
θ
Next, by measuring the kinetic energy of the alpha particle before and after the collision, Rutherford was able to apply conservation of momentum and determine the mass of the atom’s positive core.
Putting it all together, he was able to conclude that all the positive charge -- and about 99.9% of the mass -- of an atom was concentrated in a very tiny area in the middle of the atom, which he called the nucleus.
Rutherford’s Experiment
Only the very few (+) α-particles that passed very near this incredibly tiny (+) nucleus were strongly deflected; most α-particles never came near the nucleus and so were not deflected significantly.
Rutherford’s Experiment
*note carefully that the (+) α-particles never actually collide with the (+) nucleus – the repulsive force between the like charges is too great for that to occur!
atomic radius ~ 100 pm = 1 x 10-10 m
nuclear radius ~ 5 x 10-3 pm = 5 x 10-15 m
Rutherford’s Modelof the Atom
“If the atom is the Houston Astrodome, then the nucleus is a marble on the 50-yard line.”
The estimated size of this nucleus was such a tiny fraction of the total volume of the atom, that at first Rutherford doubted his own conclusion.
As another size comparison, if the nucleus were the size of a basketball, placed at PHS, the atom would be over 20 km in diameter, reaching Martin to the North, and just missing the US 131 Business Loop exit to the South!
The basketball-sized nucleus would also mass about 70,000,000,000 tons! This is equivalent to about 100,000 cruise ship ocean liners!
• Rutherford fired (+) charged alpha particles at thin sheets of gold foil and measured the angles at which the alpha particles were deflected.
• Rutherford was testing the validity of Thomson’s plum pudding model. If this model were correct, the (+) alpha particles would not be deflected by the diffuse (+) charge of Thomson’s atom.
• When Rutherford performed the experiment, he found that the majority of alpha particles did, in fact, pass without significant deflection. However, a small number were significantly deflected, and a very few were strongly deflected nearly 180 degrees.
• By measuring the angles of deflection, Rutherford was able to calculate the size and mass of the (+) center that could produce the observed deflections. He found that all the (+) charge and about 99.9% of the atom’s mass was concentrated in a tiny region (about 1/100,000 the volume of the atom).
• Only those alpha particles that passed very close to the nucleus experienced a strong enough repulsion to produced significant deflections – most particles never came near the nucleus, and so were not deflected.
• AP Extras: • The repulsive force depends on 1/R 2 between the (+) alpha particle and the (+) charge of the
nucleus. • He also relied on conservation of momentum to help him determine the mass of the nucleus
which was repelling the alpha particles.
Chadwick’s Experiment (1932)(1935 Noble Prize in Physics)
•H atoms have 1 p; He atoms have 2 p
•ratio of mass He/mass H should be 2/1 = 2
•measured ratio of mass He/mass H = 4 ???
+ 9Be 1n + 12C + energy
neutron (n) is neutral (charge = 0)
n mass ~ p mass = 1.67 x 10-24 g
James Chadwick discovered that when 9Be was bombarded with alpha particles, a neutral particle was emitted, which was named the neutron.
Now the mass ratios can be explained if He has 2 neutrons and 2 protons, and H has one proton with no neutrons
Discovery of the Neutron
??
mass n mass p 1,840 x mass e-
Atomic number (Z) = number of protons in nucleus
Mass number (A) = number of protons + number of neutrons
also called the nucleon number = atomic number (Z) + number of neutrons
Isotopes are atoms of the same element (X) with different numbers of neutrons in their nuclei
XAZ
Mass Number Element Symbol
Atomic number, Mass number and Isotopes
Atomic Number
H11 H (D)
21 H (T)
31
protium deuterium tritium
U23592
Uranium-235C14
6Carbon-14
examples
nuclide
6 protons, 8 (14 - 6) neutrons, 6 electrons
26 protons, 33 (59 - 26) neutrons, 26 electrons
How many protons, neutrons, and electrons are in C146 ?
How many protons, neutrons, and electrons are in Fe5926 ?
Atomic number, Mass number and Isotopes
Examples:
see page 50
We now understand that the number of protons in the nucleus of the atom is what “defines” the element and gives each element its unique properties.
The Periodic Table of the Elements
The Periodic Table of the Elements
Transition metals
period
gro
up
Properties of Metals
• malleable and ductile
• lustrous
• good conductors
• lose e- to form cations
• brittle
• dull
• poor conductors
• gain e- to form anions
Elements
Properties of Non-metals
Properties of Metalloids• properties are intermediate between those of metals and nonmetals• semi-conductors
1A = alkali metals 5A = pnictides
2A = alkaline earths 6A = chalcogens
3A = boron family 7A = halogens
4A = carbon family 8A = noble gases
The chemical properties of elements within a Family or Group are similar
Names of Families or Groups
Elements
Elements
Natural abundance of elements in the Earth’s crust
Natural abundance of elements in the
human body
Molecules
and Ions
H2
N2
Molecules & Ions
Note that some elements exist as molecules. For example,the following elements occur in nature as molecular diatomic elements:
H2, N2, O2, F2, Cl2, Br2 and I2
They are molecules, but they are NOT compounds, because they have only one kind of element present.
A molecule is an aggregate of two or more neutral atoms in a definite arrangement held together by chemical forces
F2
O2
A polyatomic molecule contains more than two atoms
O3, H2O, NH3, C3H6O
An allotrope is one of two or more distinct molecular forms of an element, each having unique properties. For example, O2 and O3 are allotropes of oxygen; diamond, graphite and buckminster fullerene (C60) are all different allotropes of carbon.
Molecules & Ions
+
++
+
+ +
+
+ +C
CC
C
C
C
C
C
CC
Ionic compounds are composed of ions, which are atoms that have a (+) or (-) charge.
Classification of Matter
Ionic compounds form when cations and anions form electrostatic attractions between them
(opposite charges attract)
+ ions are called cations and form whenan atom loses electrons
-ions are called anions and form whenan atom gains electrons
A monatomic ion contains only one atom
Examples: Na+, Cl-, Ca2+, O2-, Al3+, N3-
Examples: ClO3-, NO2
- , CN- , SO42-
Molecules and Ions
A polyatomic ion contains more than one atom
note that the convention is to indicate the magnitude of the charge first, and then the sign: e.g., Ca2+, not Ca+2
13 protons, so there are 13 – 3 =10 electrons
34 protons, so there are 34 + 2 = 36 electrons
How many electrons are in ?Al2713
3+
How many electrons are in ?Se7834
2-
Molecules and Ions
Examples
Charges of common monatomic ions
Note that some atoms, especially transition metals, have multiple charge states
Note also that metals typically form (+) charged ions, nonmetals form (-) charged ions.
see page 54
Also note the relation between the magnitude of the charge and the group number (1A, 5A, etc) for most elements.
The charge of representative metals (group 1A, 2A and 3A) is equal to the group number
The charge of representative nonmetals (group 4A-7A) is equal to: (the group number – 8)
Chemical Nomenclatur
eDetermining the names and formulas of chemical
compoundsIUPAC = International Union of Pure and Applied Chemists. This is the group that determines the official rules of nomenclature for all chemical elements and compounds
Chemical Formulas
A chemical formula is a combination of element symbols and numbers that represents the composition of the compound.
Subscripts following an element’s symbol indicate how many of that particular atom are present. If no subscripts are given, it is assumed that only one of that atom is present in the compound.
NH3 C3H6S P4O10
1 N + 3 H atoms 3 C + 6 H + 1 S atoms 4 P + 10 O atoms
A molecular formula shows the exact number of atoms of each element in the smallest unit of a substance
Chemical Formulas
An empirical formula shows the simplest whole-number ratio of the atoms in a substance
H2OH2O
molecular empirical
C6H12O6
CH2O
N2H4 NH2
Chemical Formulas
C2H8O2
CH2O
note that different molecular compounds may have the same empirical formula
For ionic compounds the formula is always the same as the empirical formula.
The sum of the charges of the cation(s) and anion(s) in each formula unit must equal zero. Thus, the ratio of cations to anions can always be reduced to simple, whole number ratios. The ionic compound NaCl
Ionic Formulas
Na+500Cl-500 = NaCl
Naming Binary Molecular
Compounds
Naming Molecular Compounds
We will only consider naming binary molecules.
Binary molecular compounds typically form between two non-metals, or a non-metal and a metalloid.
1st element + root of 2nd element + “-ide”
Naming Molecules:
e.g. : HCl = hydrogen chloride
If there is more than one of a given element, we use prefixes to indicate the number of each kind of atom present.
Naming Molecular Compounds
The prefix mono is only used for atoms that can form more than one compound with the second element. For this class, oxygen is the main element that does this.
See page 62
HI hydrogen iodide
NF3 nitrogen trifluoride
SO2 sulfur dioxide
N2Cl4 dinitrogen tetrachloride
NO2 nitrogen dioxide
N2O dinitrogen monoxide (laughing gas)
Examples of naming molecules
Naming Molecular Compounds
If the second element begins with a vowel, the terminal vowel of the prefix is allowed to be dropped.
For example
N2O4 could be called dinitrogen tetroxide, rather than dinitrogen tetraoxide.
CO would be called carbon monoxide, not carbon monooxide
Note, however, that the official IUPAC rule states that the vowel is only dropped for “compelling linguistic reasons.”
Naming Molecular Compounds
Naming Compounds containing Hydrogen
Compounds containing hydrogen can be named using the Greek prefixes, but most have common names that are accepted by IUPAC. The most common examples are:
B2H6
CH4
SiH4
NH3
PH3
H2O
H2S
diboron hexahydride diborane
carbon tetrahydride
silicon tetrahydride
nitrogen trihydride
phosphorus trihydride
dihydrogen monoxide
dihydrogen sulfide
methane
silane
ammonia
phosphine
water
hydrogen sulfide
Naming Molecular Compounds
Determining the formula of molecules from the name
The subscripts tell you the number of each type of element present, so naming molecules from the formula is straightforward.
e.g. sulfur hexafluoride = SF6
dichlorine heptoxide = Cl2O7
Naming Molecular Compounds
The order in which the atoms are listed in molecules is based on something called electronegativity. For now, we can predict the order using the chart on the next slide…
B
BrGe
C N
P
As
Sb
O
S
Se
Te
F
ClSi
I
HOrder of Elements in Writing Molecular Formulas
Chemical Formulas
Organic chemistry is the branch of chemistry that deals with carbon compounds
Carbon is unique among all the elements in its ability to catenate, or form long or branching chains of carbon atoms.
C C C H
We usually write these chains as “condensed formulas” that assumes carbons are bonded to each other as follows:
= CH3CH2CH3
note that we could also write this as: C3H8
H
HH
H
H
H
H
Organic molecules that contain only carbon and hydrogen are called hydrocarbons.
The first 10 simple hydrocarbons
Hydrocarbon compounds are named based on the number of carbon atoms in the “backbone” or chain of carbon atoms.
Naming Ionic Compounds
Naming Ionic CompoundsIonic Compounds
Ionic compounds are typically composed of a metal cation and a non-metal anion
$ name of cation = simply the name of the element
$ name of anion = root of element’s name + - “ide”
Naming Ionic Compounds
BaCl2 barium chloride
K2O potassium oxide
Binary ionic compounds are named:
name of metal ion + root of non-metal + “-ide”
e.g.
Na2S
Mg3N2
Al2O3
sodium sulfide
magnesium nitride
aluminum oxide
Determining the formula of ionic compounds from the name is a little more involved – unlike molecular compounds, the name does not give us the subscripts. These must be determined based on the charges of each ion.
Remember that the total number of (+) and (-) charges in any ionic compound must sum to zero.
Formula of Ionic Compounds
Formula of Ionic Compounds
Al2O3
2 x +3 = +6 3 x -2 = -6
Al3+ O2-
CaBr2
1 x +2 = +2 2 x -1 = -2
Ca2+ Br-
MgS
1 x +2 = +2 1 x -2 = -2
Mg2+ S2-
aluminum oxide
calcium bromide
magnesium sulfide
Formula of Ionic Compounds
Note that if you take the magnitude of the charge of the cation, and make it the subscript on the anion, and take the magnitude of the anion’s charge and make it the subscript of the cation, the compound will always end up with a net neutral charge. Now, if possible, reduce the subscripts to a simpler ratio, and you have the correct formula for the compound!
Al O+3 -2
Al3+ O2-
Al2O3
32
see page 58
Multivalent ions:
The Non-Representative Atoms
Cu
W
MnCo
Pb
Fe
Most elements form only ions with one charge. However, most of the transition metals, as well as Pb and Sn, have more than one possible charge state. We say they are multi-valent.
e.g. : copper can exist in either a +1 or +2 charge state: Cu+ or Cu2+
The formula or name of the compound must indicate which charge state the metal cation is in.
Transition and other multi-valent metal ions
Transition and other multi-valent metal ions
Cu+ cuprous Fe2+ ferrous
Cu2+ cupric Fe3+ ferric
Cr2+ chromous Hg22+ mercurous
Cr3+ chromic Hg2+ mercuric
Older method gives a common name for each valence state
e.g. CuCl = cuprous chloride Hg2I2 = mercurous iodideFe2O3 = ferric oxide PbO = plumbous oxide
Transition and other multi-valent metal ions
To determine which charge state the cation is in, you must look at the anion, and calculate the charge of the cation…
Fe2O3
Subscript on O is the charge of the iron! Thus, Fe is +3 and this compound is ferric oxide.
CuS S is always -2, and there is only one Cu to cancel this out, so copper must be +2. Thus, this is cupric sulfide.
Stock System:We indicate charge on metal with Roman numerals
FeCl2 2 Cl- = -2 so Fe is 2+ iron(II) chloride
FeCl3 3 Cl- = -3 so Fe is 3+ iron(III) chloride
Cr2S3 3 S-2 = -6 so Cr is 3+ chromium(III) sulfide
Transition and other multi-valent metal ions
Polyatomic
IonsSO
42-
C2O4
2-
C2H3O22-
NH4+
Naming Polyatomic Ions
There are certain groups of neutral atoms that bond together, and then gain or lose one or more electrons from the group to form what is called a polyatomic ion. Most polyatomic ions are negatively charged anions.
Examples:
OH- = hydroxide ion CN- = cyanide ion
NO3- = nitrate ion NH4
+ = ammonium ion
SO42- = sulfate ion SO3
2- = sulfite ion
See page 60
Naming Polyatomic Ions
Naming ionic compounds containing polyatomic ions is straightforward:
Name the cation + name the (polyatomic) anion
Examples:
NaOH = sodium hydroxide
K2SO4 = potassium sulfate
Fe(CN)2 = iron (II) cyanide
(NH4)2CO3 = ammonium carbonate
page 61
page 62
see page 64
Compound Summary
There are a different set of rules for naming acids. Some of the rules are based on a much older system of nomenclature, and so the rules are not as simple as they are for molecular and normal ionic compounds.
NAMING ACIDS AND BASES
An acid can be defined as a substance that yields hydrogen ions (H+) when dissolved in water. These H+ ions then bond to H2O molecules to form H3O+, called the hydronium ion.
Many molecular gases, when dissolved in water, become acids:
•HCl (g) = hydrogen chloride•HCl (aq) = HCl dissolved in water which forms (H3O+,Cl-) = hydrochloric acid
Acids
All acids have hydrogen as the first listed element in the chemical formula.
For nomenclature purposes, there are two major types of acids:
Oxoacids (also called oxyacids) = acids that contain oxygen. eg: H2SO4, HC2H3O2
Non-oxo acids = acids that do not contain oxygen. eg: HCl (aq), H2S (aq)
Acids
Acids
Rules for naming non-oxoacids
acid = “hydro-” + root of anion + “-ic acid”
see page 65
*note that we add an extra syllable for acids with sulfur and phosphorus: it’s not hydrosulfic acid, but hydrosulfuric acid. Similarly, acids with phosphorus will end in phosphoric, not phosphic acid.
*
An oxoacid is an acid that contains hydrogen, oxygen, and another element –
That is, oxoacids are the protonated form of those polyatomic ions that have oxygen in their formulas.
HClO3chloric acid
HNO2 nitrous acid
H2SO4 sulfuric acid
Acids
examples:
If the name of the polyatomic anion ends in “ate,” drop the -ate and add “ic acid.”
eg: SO42- = sulfate anion H2SO4 = sulfuric acid
C2H3O2- = acetate anion HC2H3O2 = acetic acid
When naming oxoacids, NO “hydro” prefix is used. Instead, the acid name is the root of the name of the oxoanion + either “-ic” acid or “-ous” acid, as follows:
If the name of the polyatomic anion ends in “ite,” drop the -ite and add “ous acid.”eg: SO3
2- = sulfite anion H2SO3 = sulfurous acid
NO2- = nitrite anion HNO2 = nitrous acid
AcidsNaming Oxoacids and Oxoanions
see page 66
Acids
ic goes with ate because….”IC…I ATE it!
ite goes with ous like……tonsil-ITE-OUS, senior-ITE-OUS
As a mnemonic aid, I always use the following:
A base can be defined as a substance that yields hydroxide ions (OH-) when dissolved in water.
NaOH sodium hydroxide
KOH potassium hydroxide
Ba(OH)2 barium hydroxide
Bases
Hydrates are compounds that have a specific number of water molecules attached to them.
BaCl2•2H2O
LiCl•H2O
MgSO4•7H2O
Sr(NO3)2 •4H2O
barium chloride dihydrate
lithium chloride monohydrate
magnesium sulfate heptahydrate
strontium nitrate tetrahydrate
CuSO4•5H2Ocupric sulfate pentahydrate
CuSO4
anhydrouscupric sulfate
Hydrates
Anhydrous: without water; this term describes hydrated compounds after “drying.”
Hygroscopic: readily absorbs moisture directly from the air.
Deliquescent: absorbs moisture from the air so readily, that these compounds can take on enough water to actually start to dissolve.
Water of hydration: the water absorbed and incorporated into hygroscopic compounds
Hydrates
Other terms associated with hydrates
see page 68
Mass Relationships in Chemical Reactions
Chapter 3
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
By definition: 1 atom 12C “weighs” 12 amu
On this scale 1H = 1.008 amu and 16O = 16.00 amu
Atomic mass is the mass of an atom in atomic mass units (amu). This is a relative scale based on the mass of a 12C atom.
Micro Worldatoms & molecules
Macro Worldgrams
Relative Masses of the Elements
How do we find the relative masses of the other elements?
Imagine we have 66.00 grams of CO2. The compound is decomposed and yields 18.00 grams of C and 48 grams of O. Since there are two oxygen atoms for every 1 carbon atom, we can say that
4 81 8
2 2 41 8
g O xygeng C arbon
gram s O xygeng C arbon
so
g Og C
2 41 8
1 3 3 3 .
This means that the relative mass of each oxygen atom is 1.333 x the mass of a carbon atom (12.00 amu) , or…
mass of oxygen = 1.333 x 12.00 amu = 16.00 amu
Relative Masses of the Elements
7.42% 6Li (6.015 amu)
92.58% 7Li (7.016 amu)
The Average atomic mass of lithium would be:
Average Atomic Mass
The average atomic mass of an element is the weighted average mass of that element, reflecting the relative abundances of its isotopes.
example: consider lithium (Li), which has two isotopes with the following relative percent abundances:
7.42100
6.015 92.58100
7.016 6.941
amu amu amu
6.941
H
Li Be
Na
K
Mg
Ca Sc Ti
1
3 4
1.0079
9.012
11 12
22.99 24.305
19 20 21 22
39.098 40.08 44.956 47.90
IA
IIA
IIIB IVB
The masses reported at the bottom of the “box” for each element in the Periodic Table is the average atomic mass for that element, (in amu).
Average Atomic Mass
see page 79
Average Atomic Mass
The mole (mol) is the SI unit for the amount of a substance that contains as many “things” as there are atoms in exactly 12.00 grams of 12C.
1 mol = NA = 6.022 x 1023 “things”
The Mole & Avogadro’s Number
This number, called Avogadro’s number (NA), has been experimentally determined to be approximately 6.0221367 X 1023 things.
We can have 1 mole of atoms, or molecules, or even dump trucks. The mole refers only to a number, like the term “dozen” means 12.
• If you stacked 1 mole of notebook paper, it would take you 5,800 years, traveling at the speed of light (186,000,000 miles per second) to reach the top of the stack!
• If you were given 1 mole of dollar bills when the universe began 13 billion years ago, and you immediately began spending money at the rate of one million dollars per second, you would still have about 190 billion trillion dollars left !
• 1 mole of oranges would cover the surface of the earth to a depth of 9 miles!
• but 1 mole of Hydrogen atoms would only mass about 1 gram!
JUST HOW BIG IS AVOGADRO’S NUMBER??
The Mole & Avogadro’s Number
Molar mass is the mass, in grams, of exactly 1 mole of any object (atoms, molecules, etc.)
Note that because of the way we defined the mole :
1 mole 12C atoms = 6.022 x 1023 atoms = 12.00 g
1 12C atom = 12.00 amu
For example: 1 mole 12C atoms = 12.00 g 12C
1 mole lithium atoms = 6.941 g of Li
atomic mass (amu) = molar mass (grams)
The Mole & Molar Mass
Thus, for any element
One Mole of:
C = 12.01 g S = 32.06 g
Cu = 63.55 g Fe = 55.85 g
Hg = 200.6 g
The Mole & Molar Mass
NA = Avogadro’s number
M = molar mass in g/mol
The Mole & Molar Mass
Solving Mole ProblemsWe can now add the definitions of the mole, Avogadro’s number, and molar mass to our repertoire of conversion factors we can use in dimensional analysis problems.
Thus, given the mass, we can use the molar mass to convert this to moles, and then use Avogadro’s number to convert moles to particles, and vice versa…
x 6.022 x 1023 atoms K1 mol K
1 mol K39.10 g K
x0.551 g K
How many atoms are in 0.551 g of potassium (K) ?
1 mol K = 39.10 g K
1 mol K = 6.022 x 1023 atoms K
= 8.49 x 1021 atoms K
Solving Mole Problems
conversion factors
Solving Mole Problemssee page 81
Solving Mole Problemssee page 82
Solving Mole Problemssee page 82
Molecular mass (or molecular weight) is the sum ofthe atomic masses of the atoms in a molecule.
SO2
1S 32.07 amu
2O + 2 x 16.00 amu SO2 64.07 amu
molecular mass (amu) = molar mass (grams)
1 molecule SO2 = 64.07 amu
1 mole SO2 = 64.07 g SO2
Molecular Mass
As was the case for atoms, for any molecule
Example: consider SO2
SO2 64.07 amu
Molecular Mass
see page 83
Formula mass is the sum of the atomic masses (in amu) in a formula unit of an ionic compound.
1Na 22.99 amu
1Cl + 35.45 amu
NaCl 58.44 amu
formula mass (amu) = molar mass (grams)
1 formula unit NaCl = 58.44 amu
1 mole NaCl = 58.44 g NaCl
NaCl
Formula Mass
For any ionic compound
What is the formula mass of Ca3(PO4)2 ?
1 formula unit of Ca3(PO4)2
3 Ca 3 x 40.08
2 P 2 x 30.97
8 O + 8 x 16.00310.18 amu
Formula Mass
Since the formula mass, in grams (per mole), is numerically equal to the molar mass, in amu, we find that the formula mass of Ca3(PO4)2 = 310.18 grams per mole of Ca3(PO4)2.
Example: How many H atoms are in 72.5 g of C3H8O ?
1 mol C3H8O = (3 x 12) + (8 x 1) + 16 = 60 g C3H8O
1 mol H = 6.022 x 1023 atoms H
= 5.82 x 1024 atoms H
1 mol C3H8O molecules = 8 mol H atoms
72.5 g C3H8O1 mol C3H8O
60 g C3H8Ox
8 mol H atoms
1 mol C3H8Ox
6.022 x 1023 H atoms
1 mol H atomsx
Molecular/Formula Masses
Using Molecular/Formula Masses in Dimensional Analysis Problems
We can now add molecular & formula masses to our list of conversion factors. They are used similarly to the way we used the molar mass of the elements as conversion factors.
con
vers
ion
fa
cto
rs
Solving Mole Problemssee page 84
Solving Mole Problemssee page 85
The Mass Spectrometer
Atomic and molecular masses of unknown compounds are determined using a mass spectrometer.
A gaseous sample of the unknown is bombarded with electrons in an electron beam. This knocks electrons loose from the unknown to produce cations. These cations are then accelerated through perpendicular electric and magnetic fields. The charge:mass ratio (e/m) of the unknown ions determines the degree to which the particles are deflected.
The greater the charge:mass ratio, the smaller the angle through which the beam is deflected.
The Mass Spectrometer
We know the angle that a given e/m produces, so we can identify the unknown ion when it registers on a special screen.
high e/m low e/m
Mass Spectrometer
Percent composition of an element in a compound is the percent, by mass, of that element in the compound.It can be calculated as follows:
where n is the number of moles of the element in 1 mole of the compound
n x molar mass of elementmolar mass of compound
x 100%
Percent composition
Knowing the percent composition, one can determine the purity of a substance, (are there contaminants present in the sample?) and you can even determine the empirical formula of an unknown compound.
C2H6O
%C =2 x (12.01 g)
46.07 gx 100% = 52.14%
%H =6 x (1.008 g)
46.07 gx 100% = 13.13%
%O =1 x (16.00 g)
46.07 gx 100% = 34.73%
check: 52.14% + 13.13% + 34.73% = 100.0%
Percent composition
Example: What is the percent composition of ethanol, which has the formula, C2H6O ?
First, we find the molecular mass of ethanol. This is found to be: 2(12.01) + 6(1.008) + 1(16.00) = 46.07 grams/mole.
% Composition:
We can also determine the % by mass of groups of atoms present in a compound in the same manner.
Example: what is the percent water in epsom salts, which has the formula: MgSO4 • 7 H2O ?
% H2O =
24.31 + 32.07 + 4(16.00) + 7(18.02)
7(18.02)
mass of water
mass of compoundx 100
=
this is the molar mass of water
=246.52 g cmpd
126.14 g H2O x 100 = 51.17% H2O
Percent composition
Example: How many grams of CaCl2 • 2 H2O must be weighed out to obtain 12.20 grams of CaCl2?There are two ways of solving this problem:
Method 1:
First determine the % CaCl2 in CaCl2 • 2 H2O:
ii. 75.49% of (X grams) of CaCl2•2 H2O = 12.20 g of CaCl2
0.7549(X) = 12.20 or X = 12.20/0.7549 = 16.16 grams
i. % CaCl2 =110.98 g CaCl2
147.02 g CaCl2 • 2 H2O
x 100 = 75.49%
Then we note that the 12.20 g of CaCl2 desired must be 75.49% of the mass of the hydrate used:
Percent composition
Example: How many grams of CaCl2 • 2 H2O must be weighed out to obtain 12.20 grams of CaCl2?There are two ways of solving this problem:
Method 2:
Use dimensional analysis and molar masses:
12.20 g CaCl2 x110.98 g CaCl2
1 mole CaCl2 x1 mole CaCl2
1 mole CaCl2• 2 H2O
147.02 g CaCl2 • 2 H2O
x1 mole CaCl2• 2 H2O
= 16.16 g
note that, math-wise, both methods involve the exact same calculations (i.e., the ratio of the molar mass of the hydrate to the molar mass of the anhydrous form had to be determined). The only difference was the “logic” you followed which led you to that calculation!
Percent composition
Percent Composition and Empirical Formulas
Knowing the percent composition of a compound, one can determine the empirical formula. It is essentially the same process as finding the percent composition – only you work backwards to find the molar mass of the compound…
1. First, you convert the % composition into grams. This is easily done – suppose you had 100 grams of the substance. Then, the mass, in grams, of each component element is numerically the same as its percent composition.
example: a sample of an iron ore is found to contain 69.94% Fe and 30.06% O. In 100 grams of the ore, there would be 69.94 grams of Fe and 30.06 grams of oxygen.
Percent Composition and Empirical Formulas
2. Next, knowing the mass of each element (in your 100 gram sample), determine the number of moles of that element in your sample, by dividing the mass by the molar mass of the element.
The number of moles of Fe and O in our sample of the iron ore would be:
69.94 grams Fe x = 1.252 mol Fe
30.06 grams O x = 1.879 mol O
55.847 g 1 mol Fe
16.00 g 1 mol O
Percent Composition and Empirical Formulas
3. To find the simplest mole ratio of the elements, divide each by the smallest number:
in our iron ore sample, we would have:
= 1.501 mol O per mole of Fe1.879 mol O1.252 mol Fe
4. If this ratio is a whole number, then you are done – if the ratio is NOT a whole number, it must be converted to a whole number ratio (we cannot have fractions of an atom!)
Fe1.00O1.50 = Fe O = Fe2O332
22
Percent Composition and Empirical Formulas
The process is summarized in Figure 3.5 on page 89 in your textbook.
Percent Composition and Empirical Formulas
Example: Determine the empirical formula of a compound that has the following percent composition by mass: K = 24.75%, Mn = 34.77%, and O = 40.51%
nMn = 34.77 g Mn x = 0.6329 mol Mn1 mol Mn
54.94 g Mn
nO = 40.51 g O x = 2.532 mol O1 mol O
16.00 g O
nK = 24.75 g K x = 0.6330 mol K1 mol K
39.10 g K
K : ~~ 1.00.63300.6329
Mn : 0.63290.6329
= 1.0
O : ~~ 4.02.532
0.6329
nK = 0.6330, nMn = 0.6329, nO = 2.532
Percent Composition and Empirical Formulas
divide each element by the smallest mole value
The empirical formula for the compound is: KMnO4
Combust 10.0 g compound
Collect 24.078 g CO2 and 11.088 g H2O
Experimental determination of a molecular formula
Determination of Molecular Formulas
sample
..
.. 2
22
1mole CO 1mol C 12 011g C24 078 g CO
44 01g 1mol CO 1mol C6
e571g C
...
. 2
22
1mole H O 2 mol H 1 008 g H11 088 g H O
18 016 g 1mol H O 1m1 2
ole H41g H
( .. ) grams of O = 10.00 g - 6 257 11 1241 88 g O
C4H9Oempirical formula =
mass of each element
moles of each element
mole ratios of the elements
empirical formula
..
. 1mole C
6 571g C12 0
0 5471m11g
ole C
..
.1mole H
1 241g H1 0
1 231m08 g
ole H
..
.1mole O
2 188 g O16 0
0 1368 m0 g
ole O
..
.
0 5471mole C
0 1368 mol O4 0 C
.
..
1 231mole H
0 1368 mol O9 0 H
.
..
0 1368 mol O
0 1368 mol O1 0 O
Determination of Molecular Formulas
Determination of Molecular Formulas
The molecular weight of the compound was determined experimentally to be 146.2 g/mol.
To determine the true molecular formula, divide the molecular weight by the formula weight. This ratio gives the number each subscript must be multiplied by to give the molecular formula.
.. /
. /
146 2 g mol
73 g mol2 0
1
Formula weight of C4H9O = 73.1 g/mol
Molecular weight of compound = 146.2 g/mol
thus, the true molecular formula is (C4H9O)2 = C8H18O2
Working with Chemical Equations
For example, there are several ways of representing the reaction of H2 with O2 to form H2O
A process in which one or more substances is changed into one or more new substances is a chemical reaction
A chemical equation uses chemical symbols to show what happens during a chemical reaction
Chemical Equations
How to “Read” Chemical Equations
2 Mg + O2 2 MgO
2 atoms Mg + 1 molecule O2 makes 2 formula units MgO
2 moles Mg + 1 mole O2 makes 2 moles MgO
48.6 grams Mg + 32.0 grams O2 makes 80.6 g MgO
IT DOES NOT IMPLY THAT2 grams Mg + 1 gram O2 makes 2 g MgO
reactants form products
this is based on the molar masses of the species and the coefficients in the reaction…
Balancing Chemical Equations
1. Write the correct formula(s) for the reactants on the left side and the correct formula(s) for the product(s) on the right side of the equation.
example: Ethane (C2H6) reacts with oxygen to form carbon dioxide and water
2. Change the numbers in front of the formulas (coefficients) to make the number of atoms of each element the same on both sides of the equation. Do not change the subscripts.
2 C2H6 IS NOT = C4H12
C2H6 + O2 CO2 + H2O
3. Start by balancing those elements that appear in only one reactant and one product.
C2H6 + O2 CO2 + H2O start with C or H but not O
2 carbonon left
1 carbonon right
multiply CO2 by 2
C2H6 + O2 2CO2 + H2O
6 hydrogenon left
2 hydrogenon right multiply H2O by 3
C2H6 + O2 2CO2 + 3H2O
Balancing Equations
next balance H
next we will balance O
4. Balance those elements that appear in two or more reactants or products.
2 oxygenon left
4 oxygen(2x2)
C2H6 + O2 2CO2 + 3H2O
+ 3 oxygen(3x1)
multiply O2 by 72
= 7 oxygenon right
C2H6 + O2 2CO2 + 3H2O72
to remove fractionmultiply both sides by 2
2C2H6 + 7O2 4CO2 + 6H2O
Balancing Equations
5. Check to make sure that you have the same number of each type of atom on both sides of the equation.
2C2H6 + 7O2 4CO2 + 6H2O
Reactants Products
4 C12 H14 O
4 C12 H14 O
4 C (2 x 2) 4 C
12 H (2 x 6) 12 H (6 x 2)
14 O (7 x 2) 14 O (4 x 2 + 6)
Balancing Equations
example: balance the following equations:
Fe + S → Fe2S3
K + H2O → KOH + H2
Al + S8 → Al2S3
Pb(NO3)2 + KI → KNO3 + PbI2
32
2 2 2
16 3 8
2 2
Stoichiometry
One of the most important applications of balanced equations is in determining the amount of one reactant required to react completely with another, or in determining the theoretical amount of product that should be formed in a given reaction.
These problems all follow the same set of “logic” steps – indeed, almost any problem involving balanced equations will always follow these same steps!
Stoichiometry is the quantitative study of reactants and products in a chemical reaction.
1. Write balanced chemical equation
2. Convert quantities of known substances into moles
3. Use coefficients in balanced equation to determine the mole:mole ratio between substances A and B, and from this determine the number of moles of the sought quantity
4. Convert moles of sought quantity into desired units
Stoichiometry Flow Chart
Stoichiometry
Example: Methanol burns in air according to the equation:
2CH3OH + 3O2 2CO2 + 4H2O
If 209 g of methanol are used up in the combustion, what mass of water is produced?
grams CH3OH moles CH3OH grams H2O
209 g CH3OH1 mol CH3OH32.0 g CH3OH
x4 mol H2O
2 mol CH3OHx
18.0 g H2O1 mol H2O
x
= 235 g H2O
moles H2O
moles CH3OH
The sequence of steps we follow in solving the problem are:
Stoichiometry
The molarity of a solution is the concentration of that solution, expressed as the moles of solute present in 1 liter of a solution
M = molarity =moles of solute
liters of solution
Solution Stoichiometry
It is often easier to work with solutions, rather than solids. This means we also need a means of quantitatively working with reactions in solution.
read as, for example: 2M NaCl = 2 “molar” solution of NaCl
see pages 142-150 in Chapter 4
volume of KI solution moles KI grams KIM KI MW KI
500. mL
= 232 g KI
166 g KI1 mol KI
x2.80 mol KI1 L soln
x1 L
1000 mLx
Solution Stoichiometry
example: what mass of KI is needed to prepare 500 mL of a 2.80 M solution of KI?
Solution plan: convert volume to moles using molarity, then moles to mass using molar mass:
known mass of solute
dissolve solute
dilute to mark
Dilution is the procedure for preparing a less concentrated solution from a more concentrated solution.
Dilution
Add Solvent
Moles of solute(concentrated) (c)
Moles of soluteafter dilution (d)=
McVc MdVd=
Solution Stoichiometry
example: How would you prepare 60.0 mL of 0.200 M HNO3 from a stock solution of 4.00 M HNO3?
McVc = MdVd
Mc = 4.00 M Md = 0.200 M
Vd = 0.0600 LVc = ? L
Vc =MdVd
Mc
=0.200 M x 0.0600 L
4.00 M= 0.003 L = 3 mL
Thus, add 3 ml of acid to 57ml of water to form 60 ml of solution (dilute the 3 ml of acid to a total volume of 60 ml)
Solution Stoichiometry
As with all stoichiometry problems, convert the starting unit to moles. Note that we now have THREE methods of converting to moles:
Solving Solution Stoichiometry Problems
1. Use Avogadro’s number to convert particles to moles
2. Use the molar mass of the substance to convert grams to moles
# particles x NA = moles
grams x molemolar mass
= moles
volume x = molesmolesL sol’n
3. And now our third method is to use the molarity of the solution to convert volume* to moles.
*the volumes must be in LITERS when converting to moles using the molarity of the solution.
Solution Stoichiometry
Note also that we can convert moles to volume by multiplying moles x 1/M
example: How many ml of 0.35 M Na3PO4 are needed to react completely with 28.0 ml of a 0.42 M solution of Ba(NO3)2, according to the balanced equation shown below:
3 Ba(NO3)2 + 2 Na3PO4 → Ba3(PO4)2 + 6 NaNO3
0.0280 L x0.42 mol Ba(NO3)2
Literx
2 mol Na3PO4
3 mol Ba(NO3)2
x1 L
0.35 mol Na3PO4
x 1000 mL
I L= 22.4 ml
Solution plan: convert to moles, use mol : mol ratio from the balanced equation, convert moles to liters using molarity, then convert to mL.
Gravimetric Analysis
Gravimetric analysis is an analytical technique based on the measurement of the mass (usually of an ionic substance.)
The substance of interest is typically reacted in solution and comes out as a precipitate. The precipitate is then filtered off, dried and weighed.
Knowing the mass and chemical formula of the precipitate that formed, we can calculate the mass of a particular chemical component of the original sample.
Gravimetric Analysis1. Dissolve unknown substance in water
2. React unknown with known substance to form a precipitate
3. Filter and dry precipitate
4. Weigh precipitate
5. Use chemical formula and mass of precipitate to determine amount of unknown ion
example: A 0.5662 gram sample of an unknown ionic compound containing chloride ions is dissolved in water and treated with an excess of AgNO3. If 1.0882 grams of AgCl precipitated , what is the percent chlorine in the original sample?
First determine the mass of Cl‾ ions in the AgCl ppt:
1.0882 g AgCl x 1 mol AgCl
143.4 g AgCl
1 mol Cl‾ ions1 mol AgCl
x x35.45 g Cl
1 mol Cl
= 0.2690 g
Now determine the % Cl in the original sample:
0.2690 g Cl% Cl =
0.5662 g unknownx 100 = 47.51 %
Limiting Reagents
The limiting reagent is the reactant that gets used up completely -- that is, the one not present in excess.
It is very rare that you mix reactants together in the exact stoichiometric ratio needed for each to react completely with the other.
Usually, you have a little “extra” of one of the reactants compared to the other one, that is, one reagent is present in excess.
The maximum amount of product that can be formed is thus limited by the amount of the limiting reagent present.
Limiting Reagents
When the reaction is completed, there will be no limiting reagent left over.
But there will be some of the reagents in excess left over.
The reagents present in quantities greater than the minimum amount necessary are called the reagents in excess.
Limiting Reagents
2NO + 2O2 2NO2
NO is the limiting reagent
O2 is the excess reagent
Consider the reaction between NO and O2 to form NO2. If we start with the mix shown at the top right, and end with the mix shown at the bottom right, we see that oxygen was present in excess (some is left over) which means that NO was the limiting reagent.
example: In one process, 124 g of Al are reacted with 601 g of Fe2O3 according to the rxn: 2Al + Fe2O3 Al2O3 + 2Fe
Calculate the mass of Al2O3 formed.
g Al mol Al mol Fe2O3 needed g Fe2O3 needed
OR
g Fe2O3 mol Fe2O3 mol Al needed g Al needed
124 g Al1 mol Al
27.0 g Alx
1 mol Fe2O3
2 mol Alx
160. g Fe2O3
1 mol Fe2O3
x = 367 g Fe2O3
Start with 124 g Al need 367 g Fe2O3
Have more Fe2O3 (601 g) so Al is limiting reagent
Limiting Reagents
Use limiting reagent (Al) to calculate amount of product thatcan be formed.
g Al mol Al mol Al2O3 g Al2O3
124 g Al1 mol Al
27.0 g Alx
1 mol Al2O3
2 mol Alx
102. g Al2O3
1 mol Al2O3
x = 234 g Al2O3
2Al + Fe2O3 Al2O3 + 2Fe
3.9
Now…Limiting Reagents
Theoretical Yield is the amount of product that would result if all the limiting reagent reacted.
Actual Yield is the amount of product actually obtained from a reaction.
% Yield = Actual Yield
Theoretical Yieldx 100
Reaction Yields
Reactions in Aqueous Solution
Chapter 4
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
AP Inorganic Chemistry
Symbols used in Equations
(s) solid
(l) liquid
(g) gas
(aq) aqueous = (dissolved in H2O)
solid precipitate
given off as a gas
yields
equilibrium
heated
20º C specified rxn temperature
MnO2 MnO2 is a catalyst in the rxn
arrows are only used for products!
examples
NaCl (s) + AgNO3 (aq) AgCl ( ) + NaNO3 (aq)
Na2CO3 (s) Na2O (s) + CO2 (g)
2 KClO3 (s) 2 KCl (s) + 3 O2 ( )MnO2
HCl (g) + H2O (l) H3O+ (aq) + Cl¯ (aq)
We often write H2O over the yields arrows when we show that something is being dissolved in water.
HCl (g) H3O+ (aq) + Cl¯ (aq)H2O
or
General Properties of Aqueous Solutions
A solution is a homogenous mixture of 2 or more substances
The solute is the substance(s) present in the smaller amount.
The solvent is the substance present in the larger amount
Solutions
During the solution process, the solute is first surrounded by the solvent molecules, and the attractions between the solvent and the solute help to pull the solvent particles apart.
The isolated solute particles are in turn surrounded by a “sphere” of solvent particles in a process called solvation – in the case of aqueous solutions, the term hydration is used.
General Properties of Aqueous Solutions
Hydration (or solvation) : the process in which a solute particle, such as an ion or a neutral molecule, is surrounded by water molecules arranged in a specific manner.
Hydration “spheres”
Solutions
An electrolyte is a substance that, when dissolved in water, results in a solution that can conduct electricity.
A nonelectrolyte is a substance that, when dissolved, results in a solution that does not conduct electricity.
nonelectrolyte weak electrolyte strong electrolyte
Solutions
Strong Electrolyte – 100% dissociation
NaCl (s) Na+ (aq) + Cl- (aq)H2O
Weak Electrolyte – not completely dissociated
To conduct electricity, a solution must contain charged particles, that is, cations (+) and anions (-)
Solutions
(all three species are present at equilibrium)
CH3COOH CH3COO- (aq) + H3O+ (aq)H2O
Nonelectrolytes do not produce charged particles in solution
C6H12O6 (s) C6H12O6 (aq)H2O
Solutions
does not dissociate into ions when in solution
Classification of Reactions
PbI2
Classes of Reactions
There are literally millions of known chemical reactions. It would be impossible to learn or memorize them all. Instead, we will learn five fundamental “classes” of reactions.
1. Double displacement
2. Single displacement
3. Decomposition
4. Synthesis
5. Combustion
Also called “metathesis” reaction. All double displacement reactions follow a pattern in which two elements “trade partners.”
AX + BY BX + AY
1. Double Displacement
Double displacement reactions are typically one of two types:
1. precipitation reactions
2. neutralization reactions
Classes of Reactions
(which is just H2O!)
AgNO3 (aq) + NaCl (aq) AgCl (s) + NaNO3 (aq) eg:
Precipitation reactions involve the exchange of cations between two ionic compounds that results in the formation of an insoluble precipitate*:
*we will learn to determine which substances are soluble and which are not later on in this chapter…
Neutralization reactions involve an acid and a metal hydroxide; the acid’s H+ ion is exchanged with the hydroxide’s metal cation to produce an ionic “salt” and water.
HCl + KOH KCl + HOHeg:
Classes of Reactions
2. Single displacement:
A + BC B + AC
Classes of Reactions
2 Mg + TiCl4 2MgCl2 + Ti
Cl2 + 2KBr 2KCl + Br2
Hydrogen Displacement
Metal Displacement
Halogen Displacement
Sr + 2H2O Sr(OH)2 + H2
Single displacement is a reaction in which one element displaces another in a compound. The general pattern is:
Single displacement reactions are typically one of three types:
eg: 2 Al + 3 Br2 2 AlBr3
3. Synthesis:
A + B AB
Classes of Reactions
H2O + SO3 H2SO4
A synthesis reaction is one in which two substances react and combine to form one substance. The general pattern of the reaction is:
The reactants can be elements, compounds, or one of each.
eg: 2 KClO3 2 KCl + 3 O2
4. Decomposition:
AB A + B
Decomposition is the opposite of synthesis: one substance decomposes (often by heating it) into two or more new substances. The general pattern is:
Δ
2 NaHCO3 Na2O + 2 CO2 + H2OΔ
Classes of Reactions
Classes of Reactions
5. Combustion:
eg: 2 Mg + O2 2 MgO
Technically, any reaction involving oxygen is a combustion reaction.
A + O2 AOx
Note that this reaction can also be classified as a synthesis reaction.
eg: CH4 + 2 O2 CO2 + 2 H2O
CnHm + O2 CO2 + H2O
Combustion reactions that involve hydrocarbon compounds (which may or may not contain O or N) reacting with oxygen gas will form CO2 and H2O.
The general reaction is:
C2H6O + 3 O2 2 CO2 + 3 H2O
Incomplete combustion forms CO (carbon monoxide).
Classes of Reactions
Classify the following reactions:
1. 2 Na + 2 H2O 2 NaOH + H2
2. Ba(NO3)2 + Na2CrO4 BaCrO4 + 2NaNO3
3. C4H10 + 13 O2 8 CO2 + 10 H2O
4. Ca(OH)2 + H2S (aq) CaS + H2O
5. 4 Cu + O2 2 Cu2O
6. K2CO3 K2O + CO2
7. NaHCO3 + HCl (aq) NaCl + H2O + CO2
SD
DD (P)
C
DD (N)
S
D
DD/D
Classes of Reactions
We are now going to look at each class of reaction in more detail.
We will begin with the sub-categories of the double displacement reaction
Precipitation Reactions
Solubility is the maximum amount of solute that will dissolve in a given quantity of solvent at a specific temperature.
Precipitation Reactions
If a substance dissolves in a solvent, it is said to be soluble; if it does not, it is insoluble. Substances that are insoluble have a stronger attraction towards each other than they do towards the solvent (or sometimes, the solvent molecules have a stronger attraction towards themselves than towards the solute particles).
Precipitate – insoluble solid that separates from solution
One of the most common types of double displacement reaction is the precipitation reaction.
PbI2
Precipitation Reactions
Pb(NO3)2 (aq) + 2KI (aq) PbI2 (s) + 2KNO3 (aq)
precipitate of PbI2
When aqueous solutions of Pb(NO3)2 and KI are mixed, a bright yellow precipitate of PbI2 forms.
Pb2+ and I- form strong attractions
How do you know which substances are soluble and which form precipitates in aqueous solutions?
There is a Table of general Solubility Rules on page 123 in your textbook.
AP Chemistry students are required to memorize this list. (You need to know it for the AP Test!)
Non-AP students are NOT required to memorize this list; it will be provided to you on tests and quizzes.
Solubility Rules
Precipitation Reactions
and acetates (C2H3O2-)
see page 123
Precipitation Reactions
While most double displacement reactions involve the formation of a precipitate, some double displacement reactions involve “dissolving” an insoluble compound by forming a soluble salt. These types of reactions most often involve the reaction of an insoluble ionic compound with an acid:
AgCl (s) + HC2H3O2 (aq) AgC2H3O2 (aq) + HCl (aq)
PbS (s) + 2 HNO3 (aq) Pb(NO3)2 (aq) + H2S (g)
Precipitation Reactions
Molecular and net ionic equations
Precipitation Reactions
The complete balanced equation, showing the formulas for each reactant and species is called the “molecular equation.”
molecular equation
Pb(NO3)2 (aq) + 2NaI (aq) PbI2 (s) + 2NaNO3 (aq)
We can also show how each species in the reaction will dissociate or ionize when dissolved in water. Insoluble compounds do not dissociate, but soluble compounds will. We call this the “ionic equation.”
ionic equation
Pb2+ + 2NO3
- + 2Na+ + 2I- PbI2 (s) + 2Na+ + 2NO3-
Molecular and net ionic equations
Those species which appear unchanged on both sides of the yields sign did not “participate” in the reaction. They are said to be spectator ions.
The net ionic equation shows only those species which actually participated in the reaction – all the spectator ions are cancelled out and not shown.
net ionic equation
Pb2+ + 2NO3− + 2Na+ + 2I− PbI2 (s) + 2Na+ + 2NO3
−
In the above reaction, Na+ and NO3- are the spectator ions –
they do not participate in the net reaction.
Pb2+ (aq) + 2I− (aq) PbI2 (s)be sure to include the phases, etc. in net ionic equations!
Writing Net Ionic Equations
1. Write the balanced molecular equation.
2. Write the ionic equation showing the strong electrolytes completely dissociated into cations and anions.
3. Cancel the spectator ions on both sides of the ionic equation
4. Check that charges and number of atoms are balanced in the net ionic equation
Net Ionic Equations
AgNO3 (aq) + NaCl (aq) AgCl (s) + NaNO3 (aq)
Ag+ + NO3− + Na+ + Cl− AgCl (s) + Na+ + NO3
−
Ag+ (aq) + Cl− (aq) AgCl (s)
example: Write the net ionic equation for the reaction of silver nitrate with sodium chloride.
Net Ionic Equations
molecular
ionic
net ionic
CuS (s) + 2 HC2H3O2 (aq) Cu(C2H3O2)2 (aq) + H2S (g)
CuS (s) + 2 H+ (aq) Cu2+ (aq) + H2S (g)
CuS (s) + 2 H+ + 2 C2H3O2− Cu2+ + 2 C2H3O2
− + H2S (g)
example: Write the net ionic equation for the reaction of CuS with acetic acid
molecular
ionic
net ionic
Note that if both reactants and products exist as solvated ions in solution, then NO REACTION has occurred – you began with a mix of hydrated ions, and you ended with the same mix of hydrated ions…
KNO3 (aq) + NaCl (aq) KCl (aq) + NaNO3 (aq)
K+ + NO3− + Na+ + Cl− K+ + Cl− + Na+ + NO3
−
They are ALL spectator ions! We write:
KNO3 (aq) + NaCl (aq) N.R.
Net Ionic Equations
example
Acid-Base Reactions H
H HO +
H3O+ = hydronium ion
Arrhenius and Brnsted-Lowry Definitions
There are several “definitions” of acids or bases, from a chemical standpoint.
The two most important definitions are those given by Svante Arrhenius in the late 19th century, and by J.N. Brnsted and Thomas Lowry, who independently developed similar chemical descriptions of acids and bases in the 20th century.
A very common type of double displacement reaction involves the neutralization of an acid with a base.
Acid-Base Reactions
An Arrhenius acid is a substance that ionizes to produce H+ ions in water
An Arrhenius base is a substance that dissociates to produce OH- ions in water
Acids and Bases
H2O NaOH (s) Na+ (aq) + OH¯ (aq)
H2O
i.e., Arrhenius bases are metal hydroxides that are soluble in water.
HCl (g) H+ (aq) + Cl¯ (aq)H2O
An H+ ion is essentially a bare proton – this is an extremely reactive species!
H+ ions will instantly bond to a water molecule to form the polyatomic cation, H3O+, called the “hydronium ion.”
Acids and Bases
So, actually, an Arrhenius acid is a substance that produces H3O+ ions in water.
A Brønsted-Lowry acid is a proton (H+) donorA Brønsted-Lowry base is a proton (H+) acceptor
Acids and Bases
Brønsted-Lowry made use of the fact that H+ ions are essentially just a proton in their definition of acids and bases:
B-L acid and base is a somewhat more “general” definition, since it does not require the presence of water as a solvent. However, one can certainly have an aqueous B-L acid or base!
acidbase
In the forward direction, water acts as the proton donor and NH3 the acceptor…
acid base
Consider the reaction between NH3 and H2O:
… in the reverse direction, NH4+ is the proton donor and OH-
is the acceptor.
Acids and Bases
Identify each of the following species as a Brønsted acid, base, or both. (a) HI, (b) OH- (c) HPO4
2-
HI (g) + H2O H3O+ (aq) + I− (aq) acid
OH− (aq) + H+ (aq) H2O base
HPO42− + H2O H3O+ (aq) + PO4
3−(aq)
HPO42− + H3O+ H2PO4
−(aq) + H2O
acid
base
Acids and Bases
note that HPO42- can act as both an acid or a base! Such
substances are said to be amphoteric.
Monoprotic acids
HCl H+ + Cl−
Acids and Bases
Diprotic acids
H2SO4 H+ + HSO4−
HSO4− H+ + SO4
2−
Triprotic acids
H3PO4 H+ + H2PO4−
H2PO4− H+ + HPO4
2−
HPO42− H+ + PO4
3−
HCN H+ + CN−
Acids with only one ionizable H+ are said to be monoprotic acids
Acids with 3 ionizable H+ are said to be triprotic acids.
Acids with 2 ionizable H+ are said to be diprotic acids
Neutralization Reaction
acid + base salt + water
HCl (aq) + NaOH (aq) NaCl (aq) + H2O
H+ + Cl− + Na+ + OH− Na+ + Cl− + H2O
A neutralization reaction is a special type of double displacement reaction in which an acid reacts with a hydroxide ion (base) to produce an ionic “salt” and water.
Acids and Bases
note that the net ionic equation for all neutralization reactions will be H+ + OH¯ H2O !
H+ + OH− H2Onet ionic =
Neutralization Reaction Examples:
2 HC2H3O2 + Ca(OH)2 2 H2O + Ca(C2H3O2)2
HCN (aq) + KOH H2O + KCN
H2SO4 + 2 NaOH 2 H2O + Na2SO4
Acids and Bases
HCl (aq) + NH3 NH4Cl (aq)
NH4+ + H2O NH3 + H3O+ sol’n is still acidic!
Not all reactions involving acids and bases are neutralization reactions. For example, ammonia (NH3), a Brnsted-Lowry base, can react with acids to form aqueous ammonium salts.
Although this IS an acid base reaction, technically it is NOT a neutralization reaction: The aqueous NH4Cl formed can react with the water present in the solution to produce H3O+ :
Acids and Bases
examples:
Na2CO3 + 2 HCl (aq) 2 NaCl (aq) + H2O + CO2 (g)
K2SO3 + 2 HBr (aq) 2 KBr (aq) + H2O + SO2 (g)
PbS + 2 HI (aq) PbI2 (s) + H2S (g)
Acids produce gases when they react with certain salts containing carbonate, bicarbonate, sulfite and sulfide ions.
Note that the reaction with PbS and HI is a simple double displacement reaction. The others involve both double displacement AND decomposition!
Other Reactions with Acids
Basic and Acidic Oxides
Basic oxides are metal oxides. The name “basic oxide” come from the fact that metal oxides react with water in a synthesis reaction to form hydroxides:
eg: H2O + Na2O 2 NaOH
Acidic oxides are non-metal oxides. The name “acidic oxide” comes from the fact that non-metal oxides react with water in a synthesis reaction to form oxoacids.
eg: H2O + SO3 H2SO4
H2O + SO3 H2SO4
The reaction of water with SO3 is how acid rain forms. Sulfur trioxide is a common pollutant from burning coal. The SO3 reacts with water droplets in the air to form sulfuric acid.
Basic and Acidic Oxides
Basic oxides can react with acidic oxides in a type of acid-base reaction:
Na2O + SO3 Na2SO4
base acid salt
Al2O3 + 6 HCl 2 AlCl3 + 3 H2O
Al2O3 + 2 KOH 2 KAlO2 + H2O
Some oxides are somewhat acidic and somewhat basic. They are said to be amphoteric oxides. Aluminum oxide is a good example:
basic oxides amphoteric oxides acidic oxides
Amphoteric oxides are oxides of metals at the far right end on the periodic table
Basic and Acidic Oxides
The reaction occurs because the metal oxide first reacts with water to form hydroxides, which in turn reacts with the acid in a neutralization reaction:
CaO (s) + 2 HC2H3O2 (aq) Ca(C2H3O2)2 (aq) + H2O (l )net:
2 HC2H3O2 (aq) + CaO (s) Ca(C2H3O2)2 (aq) + H2O (l )
Aqueous acids react with basic oxides.
Not surprisingly, since metal oxides are basic, they react with acids in a double displacement reaction that is essentially a neutralization reaction:
i. CaO + H2O Ca(OH)2
ii. Ca(OH)2 + 2 HC2H3O2 Ca(C2H3O2) + 2 H2O
Basic and Acidic Oxides
2 NaOH (aq) + N2O5 (g) 2 NaNO3 (aq) + H2O (l )
Aqueous bases react with acidic oxides.
Similarly, since non-metal oxides are acidic, they react with bases in a double displacement reaction that is essentially a neutralization reaction:
The reaction occurs because the non-metal oxide first reacts with water to form an oxoacid, which in turn reacts with the hydroxide ion in a neutralization reaction:
i. N2O5 + H2O 2 HNO3
ii. 2 HNO3 + 2 NaOH 2 NaNO3 + 2 H2O
Basic and Acidic Oxides
N2O5 (g) + 2 NaOH (aq) 2 NaNO3 (aq) + H2O (l )net:
Acid-Base Titrations
In a titration, a solution of accurately known concentration is gradually added to another solution of unknown concentration until the chemical reaction between the two solutions is complete.
Equivalence point – the point at which the reaction is complete
Indicator – substance that changes color (this is called the end point). Indicators must be carefully chosen so that the end point occurs at the equivalence point in the titration.
Slowly add baseto unknown acid
UNTILthe indicator
changes color
Titrations
example: A 24.00 ml sample of an unknown acid is titrated to a phenolphthalein end point, which required 31.46 ml of a 0.104 M solution of NaOH. What is the molar concentration of the unknown acid?
ii. MAVA = moles acid = moles base = MBVB
i. At the end point (equivalence point) the moles of acid = moles of added base:
MBVB 0.102 M x 31.46 ml
VA 24.00 mliii. MA = = = 0.134 M
What volume of a 1.420 M NaOH solution is required to titrate 25.00 mL of a 4.50 M H2SO4 solution to the eq. point?
Write the chemical equation:
volume acid moles acid moles base volume base
H2SO4 + 2NaOH 2H2O + Na2SO4
4.50 mol H2SO4
1000 mL solnx
2 mol NaOH
1 mol H2SO4
x1000 ml soln
1.420 mol NaOHx25.00 mL = 158 mL
M
acid
mol
ratio
M
base
MAVA = moles acid* (H+) = moles base (OH-) = MBVB
Note that H2SO4 is diprotic, so moles H+ = 2 x moles H2SO4
Oxidation–Reduction Reactions
In precipitation reactions, there is a transfer of ions between two compounds.
In acid-base reactions, there is a transfer of protons between acids and bases.
In the next grouping of reactions, called redox reactions, there is a transfer of electrons between reacting species.
The term redox is a shortened form of oxidation-reduction.
Redox Reactions
Oxidation is a process in which one atom loses or donates electrons to another.
Reduction is a process in which one atom gains or accepts electrons from another.
In any redox reaction, one species is ALWAYS oxidized and one is ALWAYS reduced. You cannot have oxidation without reduction also occurring.
Mnemonic Aid: to help remember these two definitions, use this aid:
LEO = Loss of Electrons is Oxidation;GER = Gain of Electrons is Reduction
LEO says GER
Redox Reactions
In fact, nearly every class of reaction we have already looked at, with the exception of double displacement reactions, is a form of a redox reaction.
Redox reactions are a very important class of reactions. Everything from burning fossil fuels to the action of household bleach on stains is a redox reaction. In addition, most metals and nonmetals are obtained from their ores by redox chemistry.
Redox Reactions
Redox reactions often involve ions, but despite the fact that we speak of electrons being transferred, redox reactions do not always involve ions.
Redox Reactions
In all cases, however, this loss or gain of electrons describes the difference in the electron density around a bonded atom in a compound, compared to the electron density in that atom’s elemental, un-bonded state.
The oxidation number of an atom is simply the “charge” the atom would have in a molecule (or an ionic compound) if electrons were completely transferred.
Note carefully that this is usually only a “pretend” complete electron transfer, and has meaning only as a book-keeping tool in accounting for shifts in the electron density around bonded atoms!
We assign an oxidation number to an atom to indicate the relative electron density in its current state, compared to that in its elemental state.
Redox Reactions
For ionic compounds, cations are assigned positive oxidation numbers because they really have lost electrons compared to the electrons present in their elemental state.
Similarly, anions really have gained electrons, compared to their elemental state, and are assigned negative oxidation numbers.
Redox Reactions
For non-ionic compounds, however, a negative oxidation number simply means the atom has a greater electron density in its bonded state than the atom has in its elemental, un-bonded state.
A positive oxidation number means the atom has less electron density around it in its bonded state than when in its elemental, un-bonded state.
Redox Reactions
Rules for Assigning Oxidation Numbers1. The oxidation state of any neutral element in its naturally
occurring state is zero.
2. The oxidation number of any cation or anion composed of just one atom is that ion’s actual charge.
Na, Be, K, Cl2, H2, O2, P4 = 0
Li+ = +1; Fe3+= +3; O2- = -2
3. The oxidation number of oxygen is usually –2. In H2O2
and O22- it is –1.
4. The oxidation number of hydrogen is +1 except when it is bonded to metals in binary compounds. In these cases, its oxidation number is –1.
8. The sum of the oxidation numbers of all the atoms in a molecule or ion is equal to the charge on the molecule or ion.
6. Oxidation numbers do not have to be integers. Oxidation number of oxygen in the superoxide ion, O2
-, is -½.
Rules for Assigning Oxidation Numbers continued
7. When you begin, assign the most electronegative element present the charge it would have if it were an anion. If oxygen is present, it has the higher priority and will always be –2.
5. The oxidation number of F is always -1.
Example: Consider the compound PCl3:
Cl is the more electronegative element, so assign each Cl an oxidation # equal to its charge as an anion (= –1).
PCl3 is a neutral molecule, so the sum of the oxidation numbers for P and Cl must add to 0.Let x = oxidation # of P: x + 3(–1) = 0 x = +3
PCl3: P = +3, Cl = -1
Redox Reactions
Since oxygen is present, but not as a peroxide ion, the oxygen is assigned an oxidation # of –2. The H is not bonded to a metal, so it must have an oxidation # of +1. Let x = oxidation number of Cl, and note that the sum of the oxidation #’s must equal zero since HClO4 has a net charge of zero:
0 = +1 + x + 4(–2) solving for x gives x = +7 = Cl.
HClO4: H = +1, Cl = +7, O = -2
Redox Reactions
example: Consider HClO4.
Note carefully that Cl is NOT a +7 cation in HClO4 !! The +7 oxidation state simply tells us the electron density around Cl in HClO4 is significantly lower than the electron density around Cl in its elemental state.
Example: Consider Cr2O72–
-2 = 2x + 7(–2) or x = +6
Oxidation number for oxygen is: O = -2
The sum of the charges in the compound = the charge of the polyatomic ion = -2
Let x = oxidation number of Cr. Solving for x gives:
Thus: O = -2 and Cr = +6
Redox Reactions
Common oxidation numbers of elements in their compounds
If an element’s oxidation number has increased in a reaction, this means the element has lost electrons and has been oxidized.
If an element’s oxidation number has decreased, this means it has gained electrons in the reaction and has been reduced.
Oxidizing and Reducing Agents
Example: 2Mg + O2 2MgO
2Mg 2Mg2+ Mg has been oxidized
O2 2O2- O has been reduced
0
0
Redox Reactions
The element that was oxidized “donated” its electrons to the element that was reduced (gained electrons). Thus, the species that contains the element being oxidized is said to be the reducing agent.
The element that was reduced “stole” electrons from the element that was oxidized (lost electrons). Thus, the species that contains the element being reduced is said to be the oxidizing agent.
Oxidizing and Reducing Agents
The more readily an element is oxidized, the better it is as a reducing agent. Conversely, the more readily an element is reduced, the better it is as an oxidizing agent.
Redox Reactions
1. Zn (s) + CuSO4 (aq) ZnSO4 (aq) + Cu (s)
Zn is oxidized
Cu2+ is reduced
Zn is the reducing agent
CuSO4 is the oxidizing agent
2. 2 K (s) + 2 H2O (aq) 2 KOH (aq) + H2 (g)
H+ Ho H+ is reduced H2O is the oxidizing agent
Example: Identify the oxidizing agents and reducing agents in the following reactions:
K is oxidized K is the reducing agent
Oxidizing and Reducing Agents
Zn Zn2+
Cu2+ Cu
K K+
Cl2 + 2OH− ClO− + Cl− + H2O
One element is simultaneously oxidized and reduced.
0 +1 -1
Disproportionation Reaction
Redox Reactions
One chlorine atom is being oxidized to a +1 oxidation number, and at the same time, the other Cl atom is being reduced to a -1 oxidation number.
Note that the O and H are neither oxidized nor reduced in this reaction.
Redox and Reaction Classification
Almost every reaction that is not a double displacement reaction is a redox reaction.
Synthesis: Fe + S FeS 0 0 2+ 2−
Decomposition: 2 H2O 2 H2 + O2
1+ 2− 0 0
Combustion: CH4 + 2 O2 CO2 + 2 H2O 4− 1+ 0 4+ 2− 1+ 2−
Single Displacement: Mg + NiCl2 MgCl2 + Ni
0 2+ 1− 2+ 1− 0
Predicting the products of redox reactions can be a little tricky.
We will focus primarily on single displacement reactions
In single displacement reactions, an element displaces another element in a compound. This means that one element must be oxidized, and the other reduced, in order to accomplish this.
Zn (s) + CuCl2 (aq) ZnCl2 (aq) + Cu (s)
2 Ag (s) + CuCl2 (aq) 2 AgCl (s) + Cu (s)
Some elements are better oxidizing agents than others, and so not every element is able to oxidize another. We may be able to write an equation, but the reaction may not actually occur if we try it:
This reaction does occur; the Cu2+ ion can oxidize Zn
This reaction does NOT occur; the Cu2+ ion cannot oxidize Ag
So…How can you tell if a given reaction will occur?
To determine if a single displacement reaction can occur, we need to know the relative strengths of elements as oxidizing agents. This table of values is called an activity series.
The table at right lists common metals in order of decreasing strength as reducing agents – or increasing strength as oxidizing agents.
Activity Series of Metals
strong reducing agents
poor reducing agents
Ni + 2 HCl NiCl2 + H2
Hydrogen Displacement Reaction
all metals above Cu will react with acids
Ca + 2H2O Ca(OH)2 + H2
Au + HCl N.R.
reactive metals above Mg can react with cold water
metals below Cu do not react even with acids
The Activity Series for Metals
Single Displacement Rxns
Metal Displacement Reaction
no reaction occurs if you try to displace a metal with a metal that lies above it in the table
Mg + CdS Cd + MgS
Cu + NiCl2 N.R.
a metal can displace any metal that lies below it in the table
Single Displacement Rxns
The Activity Series for Metals
Halogens, unlike metals, are poor reducing agents. However, they make good oxidizing agents.
strongest oxidizing agent
weakest oxidizing agent
F2
Cl2
Br2
I2
A halogen can displace any halogen below it in the activity series
Halogen Displacement Reaction
Cl2 + 2KBr 2KCl + Br2
I2 + 2KBr 2KI + Br2
Activity Series of Halogens
Predicting Products of Reactions
1. Precipitation reactions always involve reacting two ionic compounds (exchange cations).
2. Neutralization reactions always involve reacting an acid with a metal hydroxide (exchange H+ and metal cation)
In order to predict the products of a reaction, keep in mind the following points:
3. Synthesis reactions – put all the elements together – does the formula look like a compound you recognize? Try changing the subscripts by multiplying or dividing them by an integer – now does the formula look familiar?
Remember the synthesis reactions of acidic and basic oxides with water, and with each other!
4. Decomposition reactions – typically, there will be only one compound as the only reactant. Break it down into two compounds or two elements, etc.
5. Combustion reactions – look for hydrocarbons reacting with elemental O2 to form CO2 + H2O
6. Single displacement reactions – almost always involve a metal replacing another metal in a compound, or a metal replacing H in water or acids. Also, halogens can displace other halogens.
Predicting Products of Reactions continued
Be sure to use the activity series to determine if the rxn will occur at all.
Also remember that alkali and alkaline earth metals displace H from water to form hydroxides, not oxides!
example: predict if a product will form. If so, complete and balance the reaction.
1. Na + Fe(NO3)3
2. Ni + CdBr2
3. Pb + H2O
4. Ba + H2O
5. KCl + F2
2 NaNO3 + Fe
N.R.
N.R.
Ba(OH)2 + H22
2 KF + Cl22
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
The Behavior Of Gases
Chapter 5
5.1
The Kinetic Molecular Theory of
Gases
Kinetic Molecular Theory of Gases
1. A gas is composed of molecules that are widely separated from each other. The volume occupied by the molecules is but a tiny fraction of the total volume of the gas, to the extent that the gas molecules can be considered to be point masses; that is, they possess mass but have negligible volume.
2. Gas molecules are in constant motion in random directions, and they frequently collide with one another.
Kinetic Molecular Theory of Gases continued
5. The average kinetic energy of the molecules is proportional to the temperature of the gas in kelvins. Any two gases at the same temperature will have the same average kinetic energy.
4. There are neither attractive nor repulsive forces between gas molecules.
3. Collisions among molecules are perfectly elastic, that is, there is no net gain or loss of kinetic energy during these collisions.
The average kinetic energy (KE) of a particle depends on its mass, m, and its average velocity, u:
This means the higher the temperature, the faster a particle moves. At a given temperature, low mass particles move faster than higher mass particles.
KE = ½ mu2
Kinetic Molecular Theory of Gases
* a bar over a variable just means, “the average value.”
The kinetic molecular theory of gases can be used to explain several properties and behaviors of gases:
1. gases can be compressed
2. gases have low densities
3. gases are fluids
4. gases can undergo diffusion and effusion
Kinetic Molecular Theory of Gases
Properties of Gases
There is a lot of empty space between the particles in the gas state. This means that gases are very compressible. A liter of gas can be compressed down to about 1 milliliter.
Compressibility
We use the units of grams per LITER instead of g/mL for the density of gases.
Because the particles of a gas are so spread out, the density of gases is usually about 1000 x less than solids and liquids.
Low Density
Fluidity
Since there are no attractive forces between gas particles, they can “slide” past one another freely.
Properties of Gases
Effusion and Diffusion
Diffusion is the spontaneous mixing of particles due to their random motion. Gas particles move randomly and have no attractive forces between themselves that would limit their ability to mix.
Effusion is the process whereby particles under pressure escape through small openings. Gas particles are very tiny, and can pass through small holes at a rate that depends on their velocities.
Properties of Gases
When discussing gases, we must be aware of how the temperature, the volume, the number of particles, and the pressure of the gas all affect each other.
The way each of these affects the other is the subject of a set of gas laws, which were investigated in countless experiments over several centuries.
But first, we need to get a better understanding of this new unit, pressure.
Properties of Gases
Pressure
Pressure is defined as the force pushing on one square meter of a surface: P = Force/Area.
Normal atmospheric pressure is caused by the weight of a column of air pressing down on an object. Sea level 1 atm
4 miles 0.5 atm
10 miles 0.2 atm
Properties of Gases
We measure pressure with a barometer.
The air pushes down on a bowl of mercury, which in turn pushes the mercury up a column.
The height of the column depends on the air pressure – higher pressures can support a taller column of mercury.
mercury
Pressure
Evangelista Torricelli invented the barometer in 1643.
vacuum
weight of mercury column
Units of Pressure
SI Unit = pascal (Pa) = N/m2
1 atmosphere = 101.325 kPa
1 atmosphere = 760 mm Hg
1 torr = 1 mm Hg
The conditions 0 oC and 1 atm of pressure is called standard temperature and pressure (STP).
Manometers Used to Measure Gas Pressures
Open to the atmosphere
Pressure in a container is caused by the force with which particles strike the walls of a container. The pressure increases with increased frequency of collisions, since more particles striking the wall means more force.
Pressure also increases if the speed of the particles increases – faster speed = greater force of impact on the walls of the container.
Pressure
The Gas Laws
The Gas LawsBoyle’s law
At constant temperature, the pressure of a gas in a confined space will increase when the volume decreases -- and the pressure will decrease when the volume increases.
volume increasesvolume decreases
pressure decreasespressure increases
P PP
We say that pressure and volume are inversely proportional to each other.
P , where k = a constantk
V
Boyle’s law
P V
Pressure goes up, volume goes down
P V
Pressure goes down, volume goes up
Graphically, P vs V produces a curved line as shown below:
Boyle’s law
Explanation
At constant temperature, the average kinetic energy of gas particles (and therefore the average speed) is constant.
If the volume increases, the distance the particles must travel between collisions with the wall increases, which means the number of collisions/sec decreases (it takes longer for particles to reach the walls of the container). This means the pressure decreases.
If you decrease the volume, then the number of collisions/second increases and the pressure goes up.
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Boyle’s law
The Gas Laws
Charles’ Law
At a fixed pressure, the volume of a gas will increase if the temperature increases, and the volume will decrease if the temperature decreases.
P
Ptemp increasestemp decreases
volume increasesvolume decreases
P
V kT , where k = a constant
We say that temperature and volume are directly proportional to each other.
Charles’ Law
V T
Volume goes up, temperature goes up
V T
Volume goes down, temperature goes down
Charles’ Law
A graph of Volume vs Temperature would look like the graph below.
The Kelvin scale was developed based on this graph. When the volume of a gas is reduced to zero, the temperature was found to be -273.15 oC, which was defined as Absolute Zero on the Kelvin scale.
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Explanation:
As the temperature increases the particles increase in kinetic energy, moving faster and faster. They then hit the walls of the container with a greater force, causing the walls to expand.
As the temperature decreases the particles decrease in kinetic energy and hit the walls of the container with less force. The external air pressure causes the walls of the container to contract.
Charles’ Law
At constant volume, the pressure of a gas will increase with increasing temperature and decrease with decreasing temperature.
Gay-Lussac & Charles’ Law
Gay-Lussac & Charles’ Law
temp increasestemp decreases
pressure increasespressure decreases
P
P
P
P kT , where k = a constant
We say that temperature and pressure are directly proportional to each other.
Gay-Lussac & Charles’ Law
P T
Pressure goes up, temperature goes up
P T
Pressure goes down, temperature goes down
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Gay-Lussac & Charles’ Law
Explanation:
As temperature increases, the average kinetic energy increases and therefore the speed increases. The particles travel the same distance in a shorter period of time, which increases the number of collisions/sec, and the pressure goes up.
As temperature decreases the average kinetic energy decreases therefore speed decreases. Particles travel the same distance in longer periods of time resulting in fewer collisions/sec and a decrease in pressure.
Avogadro’s Law
Avogadro’s LawAt a fixed pressure and temperature, the volume of a gas is directly proportional to the number of gas particles (i.e., the number of moles) present.
A B
Gas “A” has twice as many particles as gas “B” so gas “A” has twice the volume of gas “B,” when both gases are at the same temperature and pressure.
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Avogadro’s Law
Explanation:
If the temperature and pressure of two gases are the same, then the particles in both gases are moving at the same speed, and colliding with the container walls with the same frequency.
If one container’s volume is greater than the other container, then there must be more particles to increase the frequency of collisions in order to maintain an equal pressure with the smaller volume container.
Charles’ law: V T(at constant n and P)
Avogadro’s law: V n(at constant P and T)
Boyle’s law: V (at constant n and T)1P
V nT
Por V = R x
R is the gas constantPV = nRT
The Ideal Gas Equation
nT
Pwhere R = constant of proportionality
This equation is usually rearranged to:
T in kelvins!
Solving Gas Law Problems
To see how changing one variable affects the others, we look at the ratio of the ideal gas equations “before” and “after” the changes:
We then cancel out those variables (if any) being held constant, enter the values for the other variables, and solve for the desired variable’s value.
The temperature MUST be in Kelvins when using the gas law equations!
Note:
P2V2 nRT2
=P1V1 nRT1
P1V1 nRT1
P2V2 nRT2
i. =
Example: A sample of chlorine gas occupies a volume of 946 mL at a pressure of 726 mm Hg. What is the pressure of the gas (in mm Hg) if the volume is reduced at a constant temperature to 154 mL?
We note that the temperature is held constant, and presumably, no gas enters or escapes, so n is also constant. And, of course, R is also constant.
P1V1
P2V2
= 1
P1V1
V2
= P2 =726 mm Hg x 946 ml
154 ml= 4460 mm Hg
ii.
iii.
Gas Law Problems
Example: Argon is an inert gas used in lightbulbs to retard the vaporization of the filament. A certain lightbulb containing argon at 1.20 atm and 18 oC is heated to 85 oC at constant volume. What is the final pressure of argon in the lightbulb (in atm)?
P1V1 nRT1 n, V and R are constant
P1 T1
P2 T2
=
P1 = 1.20 atm
T1 =
P2 = ?
T2 =
P2 = P1 x T2
T1
= 1.20 atm x 358 K291 K
= 1.48 atm
P2V2 nRT2
Gas Law Problems
=
291 K 358 K18 oC 85 oC
P2V2 T2
Example: A sample of carbon monoxide gas occupies 3.20 L at 125 oC and 740 torr. At what temperature, in oC, will the gas occupy a volume of 1.54 L if the pressure is increased to 800 torr?
P1V1 nRT1
P2V2 nRT2
i.We assume that no gas enters or escapes, so n is constant. And, of course, R is also constant. All other variables are changing
P1V1 T1ii. =
P1V1
T1P2V2iii. =T2
Solve for T2. Watch your algebra!
= x 800 torr x 1.54 L
740 torr x 3.20 L
125oC398.15 K
iv. T2 = 207.1 K = − 66.0 oC
Gas Law Problems
=
see pages 185-186
PV = nRT
R = PV
nT=
(1 atm)(22.414L)
(1 mol)(273.15 K)
R = 0.082057 L • atm / (mol • K)
Experiments show that at 1.0 atm of pressure and a temperature of 0oC (STP):
We use this information to determine the value for R, the ideal gas constant:
1 mole of an ideal gas occupies 22.414 L
The Ideal Gas Equation
Pressure units Gas Constant
atmosphere 0.08206 L·atm/mol·K
kilopascals 8.314 L·kPa/mol·K
torr (mm Hg) 62.36 L·torr/mol·K
Note that the value for R depends on the units used for pressure, as follows:
Rather than memorize three different R-values, simply always convert the pressure to atmospheres first, then use 0.08206 L·atm/mol·K for all problems.
Example: What is the volume (in liters) occupied by 49.8 g of HCl (g) at STP?
iii. PV = nRT
iv. V = nRTP
i. at STP, T = 0 0C = 273.15 K, and P = 1.00 atm
ii. n = 49.8 g x 1 mol HCl36.45 g HCl
= 1.37 mol
1.00 atm
1.37 mol x 0.08206 x 273.15 KL•atmmol•K
= 30.6 L
The Ideal Gas Equation
=
Density of Gases at various T and P
i. d = mV
ii. but V = nRT/P from the ideal gas equation…
iii. d = m
nRT/P
m x P
nRT
m
nx P
RT== =
But m/n = mass/mole which is the molecular weight (MW) of the gas. We can write:
d = xP
RTMW
The Ideal Gas Equation
Molar Mass (MW) of a Gaseous Substance
dRTP
MW = d is the density of the gas in g/L
Finding the Molecular Weight of an Unknown Gas
We can easily determine the density of an unknown gas experimentally.
More importantly, knowing the density, we can rearrange the equation we just developed to solve for the molecular weight of the unknown gas
Example: A 2.10-L vessel contains 4.65 g of a gas at 1.00 atm and 27.0 oC. What is the molar mass of the gas?
dRT
Pi. MW =
ii. d = mV
4.65 g2.10 L
= = 2.21 gL
iii. MW =2.21
gL
1 atm
x 0.08206 x 300.15 KL•atmmol•K
MW = 54.4 g/mol
Molar Mass of Unknown Gas
Gas Stoichiometry
PV = nRT
We can make use of Avogadro’s Law in solving gas stoichiometry problems – we can measure volume ratios to determine mole ratios, if all the gases have the same temperature and pressure.
Avogadro’s Law
Example: Ammonia burns in oxygen to form nitric oxide (NO) and water vapor. How many liters of O2 are required to completely react with 2.4 liters of ammonia at the same temperature and pressure?
rxn: 4NH3 + 5O2 4NO + 6H2O
Recall: at constant T and P, n V
4 volumes NH3 5 volumes O2
2.4 L NH3 x 5 L O2
4 L NH3
= 3.0 L O2 required
Mole ratios: 4 mole NH3 5 mole O2
Avogadro’s Law
We can also solve gas stoichiometry problems in a way very similar to the stoichiometry problems we have been doing – that is, convert to moles, use the mole:mole ratio from the balanced equation, etc.
The ideal gas equation is simply yet another way of finding moles! Or converting moles to pressure, or moles to volumes, or…
n =PV
RT
Gas Stoichiometry
Example: What volume of N2 gas at STP conditions is required to react completely with 24.00 liters of H2 at 0.974 atm and 24.5 oC?
i. As always, convert to moles first, then use the mole:mole ratio, then convert to the desired unit.
ii. nH2 = =
PV
RT
0.974 atm x 24.00 L
0.08206 x 297.65 KL atmmol K
= 0.957 mol H2
3 mol H2
1 mol N2iii. From bal eqn: 0.957 mol H2 x = 0.3190 mol N2
Rxn: N2 + 3 H2 2 NH3
iv. V = = P
nRT 0.3190 mol x 0.08206 x 273.15KL atmmol K
1.00 atm
= 7.15 L
Gas Stoichiometry
Example: What is the volume of CO2 produced at 37 oC and 1.00 atm when 5.60 g of glucose are used up in the reaction:
C6H12O6 (s) + 6O2 (g) 6CO2 (g) + 6H2O (l)
g C6H12O6 mol C6H12O6 mol CO2 V CO2
i. 5.60 g C6H12O6
1 mol C6H12O6
180 g C6H12O6
x6 mol CO2
1 mol C6H12O6
x = 0.187 mol CO2
ii. V = nRT
P
0.187 mol x 0.08206 x 310.15 KL•atm
mol•K
1.00 atm= = 4.76 L
Dalton’s Law of Partial Pressures
P1 Ptotal = P1 + P2P2
The total pressure of a gas in a container is equal to the sum of the “partial pressures” of each component gas in the container.
+
V and T are constant
Collecting a Gas over WaterA common method of collecting a gas is to collect it “over water” using a pneumatic trough.
The gas collected will be “contaminated,” however, by a small amount of water vapor since the gas was collected over water. We use the Law of Partial Pressures to find the pressure of the “dry” gas.
The volume of the water displaced is equal to the volume of the gas collected, and the temperature of the water is equal to the temperature of the gas.
2KClO3 (s) 2KCl (s) + 3O2 (g)
After collecting the gas, the bottle is raised or lowered until the level of water in the collection bottle is even with the water in the pneumatic trough.
At this point, the atmospheric pressure equals the total pressure of the gas + water vapor in the collection bottle.
We now can find the pressure of the “dry” gas collected:
Pgas + Pwater = Ptotal = Patm
Collecting a Gas over Water continued
gas + H2Oatm =
Collecting a Gas over Water continued
Example: A sample of KClO3 was decomposed in the lab to produce 182 ml of oxygen gas: 2 KClO3 2 KCl + 3 O2. The oxygen was collected over water. Atmospheric pressure in the room at the time was 731.0 torr. The temperature of the water (= temp of the gas) was 20.0oC. According to the table on page 196, the vapor pressure of water at this temperature is 17.54 torr. How many moles of oxygen were collected?
i. n =
ii. Pgas = Patm – Pwater = 731.0 – 17.54 = 713.46 torr
PVRT
iii. Pgas = 713.46 torr x 1 atm
760 torr= 0.9388 atm
0.9388 atm x 0.182 L
0.08206 x 293.15 KL atmmol K
iv. n = = 7.10 x 10-3 moles
see page 196
Mole Fraction
The mole fraction (X) of a mixture is the ratio of the number of moles of one component to the total number of moles of particles in the mixture:
nA
nA + nB + …mole fraction (XA ) =
Consider a mixture of two gases, A and B. Then
i. PT = (nA + nB) x RT
V
ii. PT = (nA + nB) x RT
Vx
(nA + nB)
nA=
nART
V
multiply by XA gives:
= PA
PA = XAPT
Example: A sample of natural gas contains 8.24 moles of CH4, 0.421 moles of C2H6, and 0.116 moles of C3H8. If the total pressure of the gases is 1.37 atm, what is the partial pressure of propane (C3H8)?
Pi = Xi PT
Xpropane = 0.116
8.24 + 0.421 + 0.116= 0.0132
Ppropane = 0.0132 x 1.37 atm = 0.0181 atm
Mole Fraction
i.
ii.
iii.
Example: Recall the sample problem in which KClO3 was decomposed in the lab to produce 182 ml of oxygen gas. The oxygen was collected over water. Atmospheric pressure in the room at the time was 731.0 torr. The temperature of the water (= temp of the gas) was 20.0oC. According to the table on page 196, the vapor pressure of water at this temperature is 17.54 torr. What was the mole fraction of oxygen in the collection bottle?
i. Pgas = Patm – Pwater = 731.0 – 17.54 = 713.46 torr
ii. Pgas = PT Xgas
= 0.9760iii. Xgas =PT
Pgas 713.46 torr
731.0 torr=
Mole Fraction
urms = 3RTMW
More Gas Mathematics
Distribution of Molecular SpeedsJames Maxwell (1831-1879) analyzed the proportion of gas particles in a sample moving at a given speed and obtained a graph similar to the one below, called a Maxwell Distribution Curve.
The peak of each graph gives the most probable velocity of the particles – that is, the speed of the largest number of particles.
Speed Distribution for Nitrogen at Different
Temperatures
Note that the most probable speed increases with increasing temperature, and as the temperature increases, the peaks shift and flatten out.
It can be shown that the total kinetic energy of one mole of gas is equal to ( )RT3
2
urms = 3RTMW
Root Mean Square Speed
Since the average KE of one molecule is ½ mu2, we can say that the total KE of a gas sample is given by:
iii. = ½ MW u23RT2
i. KEtotal = 32 RT = NA (½ mu2) ; m = mass of one molecule
ii. but NAm = # moleculesmole
x grams molecule
= gramsmole
= MW
iv. = u2, OR3RT
MW
The distribution of speeds of three different gasesat the same temperature
Root Mean Square Speed continued
urms = 3RTMW
Note that the speed is inversely proportional to the molar mass of the molecule.
Gas Diffusion and Effusion
Gas diffusion is the gradual mixing of molecules of one gas with molecules of another by virtue of their kinetic properties.
urms = 3RTMW
Recall that the velocity of a gas is inversely proportional to it’s molar mass:
The rate at which a gas diffuses depends on its velocity. Particles moving at a higher rate of speed will diffuse faster than slow moving particles.
urms A = 3RT
MWAurms B =
3RT
MWBrateA
rateB
=
1
MWA1
MWB
If we compare the rate at which two gases diffuse at the same temperature, we obtain the relation:
rateA
rateB
= MWB
MWAThis reduces to
Graham’s Law of Diffusion
NH3
17 g/molHCl
36 g/mol
NH4Cl
Example: Compare the rate at which NH3 and HCl diffuse at the same temperature.
rateHCl
rateNH3
= MWNH3
MWHCl 36 g/mol=
17 g/mol = 0.687
put another way, NH3 diffuses 1/0.687, that is, NH3 diffuses 1.46 times faster than HCl.
so HCl diffuses 0.687 times as fast as NH3…
Graham’s Law of Diffusion
Gas effusion is the is the process by which gas under pressure escapes from one compartment of a container to another by passing through a small opening.
rA
r2
MWB
MWA=
As with diffusion, the rate of effusion is inversely proportional to the molar mass of the gas.
Example: Nickel forms a gaseous compound of the formula Ni(CO)x. What is the value of x, that is, what is the actual formula of the Ni compound, given that under the same conditions, methane (CH4) effuses 3.26 times faster than the compound?
MWB = 3.262 x 16.04 = 170.5
Let A = CH4 and B = Ni(CO)x
rateA
rateB=
MWB
MWA 16.04 g/mol=
MWB3.26
1=i.
ii.
iii. 170.5 = Ni + x(CO) = 58.70 + x(28.01)
iv. x = 170.5 – 58.7028.01
= 3.99 ~ 4 formula is Ni(CO)4
Non-Ideal Behavior
Deviations from Ideal Behavior
Ideal gases have no attractive or repulsive forces acting between molecules, and ideal gas molecules have essentially zero volume.
Real world gases do have attractive and repulsive forces and their molecules do occupy some space (albeit only a small space).
Effects of Intermolecular Attractions
When intermolecular attractions come into play, the particles begin to “stick” together. This effectively reduces the total number of particles colliding with the container walls, which lowers the pressure.
In addition, the attractive forces reduces the speed of the particles impacting the walls, which reduces the force at impact, which again lowers the pressure.
THUS, the measured pressure of a REAL gas will always be slightly LESS than the ideal pressure that gas should have.
A corrective factor must be made in the gas equation for the pressure of a real world gas:
Ptrue = Pmeasured + an2
V2
a is a constant that depends on the individual molecule. The likelihood of forming attractions increases with increasing particle density (moles/liter = n/V) which explains the second term.
Effects of Particle Volume
Since a gas molecule does, in fact, occupy some volume, the total volume available for any one molecule will be LESS than the total volume of the gas container.
measured volume true volume
At sufficiently high concentrations, and for sufficiently small volumes, this can have an impact on the observed behavior of the gas.
For real gases, the TRUE volume the gas occupies is always slightly LESS than the container’s volume.
A corrective term must be subtracted from the measured volume of an ideal gas:
Vtrue = Vmeasured – nb
n = # moles of the gas and b = a constant that is different for each molecule (essentially, it gives the volume per molecule)
Van der Waals equationnonideal gas
P + (V – nb) = nRTan2
V 2( )
Van der Waals Equation
The Dutch physicist J.D. Van der Waals was the first to take into account the effects of these attractive forces and volume corrections. The “corrected” form of the ideal gas equation is thus:
correctedpressure
correctedvolume
At sufficiently high temperatures (T ≥ 0 oC), the particles have enough kinetic energy to overcome the weak attractions that exist between gas phase molecules, to the point that these attractions can be ignored.
What good is the Ideal Gas Equation?
At sufficiently low pressures (< 5 atm) the particle density is low enough that the particles are rarely close enough for attractive forces to form, and so this effect can also be ignored.
Thus, gases at temperatures at or above 0 oC and with pressures below 5 atm do, in fact, behave as ideal gases, that is, the corrective terms are negligible (insignificant).
Most gases that we work with under ordinary lab conditions do fall within these limitations, so most gases behave ideally!
What good is the Ideal Gas Equation?
Chapter 6
Thermochemistry
Energy is the capacity to do work.
To do work is to apply a force (F) to an object and cause the object to move through some distance (d):
W = Fd
Energy Changes in Reactions
units for work (energy): Nm = Joule (J)
Other units for (thermal) energy:
calorie (c) = (heat) energy required to raise the temperature of 1.00 gram of water by 1ºC.
Food Calorie (C) –capital “C” is not the same as a little “c” calorie. There are 1000 calories in a food Calorie (that is, a food Calorie is a kilocalorie.)
1 calorie = 4.184 joules
Energy
o Radiant energy comes from the sun and is earth’s primary energy source
o Thermal energy is the energy associated with the random motion of atoms and molecules ( a form of kinetic energy)
o Chemical energy is the energy stored within the bonds of chemical substances
o Nuclear energy is the energy stored within the collection of neutrons and protons in the atom
o Potential energy is the energy available by virtue of an object’s position
Energy is always conserved in any process. It is possible, however, to convert energy from one form to another.
Energy
Thermochemistry is the study of heat change in chemical reactions.
Heat is the transfer of thermal energy between two bodies that are at different temperatures.
Temperature is a measure of the average kinetic energy of the particles that make up a substance. Note, however, that higher temperature does NOT always mean greater thermal energy.
example: A 90ºC cup of coffee is at a higher temperature, but a bathtub full of 40ºC water has more thermal energy, since there are more particles in the bathtub of water!
Some Definitions
Thermodynamics“Thermodynamics is a funny subject. The first time
you go through the subject, you don’t understand it at all. The second time you go through it, you think you understand it, except for one or two small points. The third time you go through it, you know you don’t understand it, but by that time, you are so used to the subject that it doesn’t bother you anymore.”
-Arnold Sommerfield (1868-1951) Well known German physicist and textbook author; response as to why he had never written a book on thermodynamics.
In order to observe and study energy changes and conversions, we must first define two terms: system and surroundings.
Thermodynamics
The surroundings is everything else in the universe outside the system.
Thermodynamics is the scientific study of the interconversion of heat and other kinds of energy.
The system is the specific part of the universe that is of interest in the study.
open
mass & energy
What can be exchanged with surroundings?
closed
energy only
isolated
nothing
There are three types of systems, based on whether mass, energy, both or neither can be exchanged with the surroundings.
Three systems:
Thermodynamics
1. The First Law of Thermodynamics deals with conservation of heat energy
2. The Second Law of Thermodynamics is a complex law dealing with ways that energy can be distributed within a system and its surroundings.
There are 3 fundamental Laws of Thermodynamics. We will study and use the first two laws in this chapter:
Laws of Thermodynamics
First Law of Thermodynamics – (heat) energy can be converted from one form to another, but cannot be created or destroyed. This is just the law of conservation of energy, applied to heat energy conversions
ΔEsystem + ΔEsurroundings = 0
ΔEsystem = –ΔEsurroundings
Thus, any energy lost by the system, must be transferred to the surroundings, and vice versa.
Mathematically:
or
Laws of Thermodynamics
The Second Law of Thermodynamics deals with energy transformations and the distribution of energy within a system. There are many ways the Law can be stated, depending on what aspect of these energy distributions you want to emphasize.
For our current purposes, the most important form of the second law states that heat energy always flows from the object at a higher temperature, to the object at the lower temperature.
* In college, a friend who was a physics major had to use a text titled, “An Introduction to the Second Law” – which was about 1,000 pages in length!
Laws of Thermodynamics
A fast moving particle can collide with a slow moving particle. During the collision, the fast moving particle transfers kinetic energy to the slower moving particle.
As a result, the slower particle speeds up (and its temperature increases) and by conservation of energy, the faster particle must slow down ( so its temperature decreases).
The Second Law of Thermodynamics
The reason why heat must flow from hot objects to cooler objects relies on the definition of temperature:
The internal energy of a system (E) is the total of the kinetic plus potential energies of the particles making up that system. There are two ways that this internal energy can change:
1. Heat energy can be transferred to the system from the surroundings, or heat can be transferred from the system to the surroundings
2. Work can be done on the system by the surroundings, or work can be done by the system on the surroundings.
Laws of Thermodynamics
ΔEsystem = q + w
q = heat energy absorbed or given off w = work done on or by the system.
Laws of Thermodynamics
Mathematically, if
Then the change in the internal energy (ΔE) of a system is the sum of the heat energy changes plus the work done on or by the system:
We assign (+/-) signs to q and w depending on whether energy is leaving the system or entering the system.
Sign Conventions in Thermochemistry
We assign positive values to q and w when they represent a transfer of energy into the system from the surroundings, increasing the internal energy of the system.
We assign negative values to q and w when they represent a transfer of energy out of the system to the surroundings, decreasing the internal energy of the system.
Energy is transferred INTO the system
Energy is transferred OUT OF the system
Summary of Sign Conventions in Thermochemistry
Esystem = q + w
where q = heat energy absorbed or given off, and w = work done on or by the system.
(energy leaves the system)
(energy enters the system)
(energy enters the system)
(energy leaves the system)
Example: A beaker containing water is brought to a boil by absorbing 44.0 kJ of heat energy, while at the same time, the increased pressure of the water vapor as it expands does 11.5 kJ of work on the air above the beaker. What is ΔE of the system?
i. We define our system as the water in the beaker. All else becomes the surroundings.
ii. The water absorbs heat energy, so q is (+) 44 kJ.
iii. The expanding water vapor does work on the surroundings, so we assign w = – 11.5 kJ
iv. Thus, ΔE = q + w = (+44 kJ) + (–11.5 kJ) = +32.5 kJ
It is important to recognize that there are literally an infinite number of combinations of heat and work that can lead to the same value for E for the system.
State Functions
State functions are properties with a unique value, which is determined only by the current state of the system, regardless of how that condition was achieved.
For example: We could bring about a change of 100 J in the system by allowing it to absorb 125 J of heat energy, and then do 25 J of work on the surroundings – or by absorbing 50 J of heat energy and having 50 J of work be done on it by the surroundings, or…
We say that E of the system is a state function.
At the summit, the potential energy of hiker 1 = hiker 2, even though they took different paths to get there.
E = Efinal - Einitial
Example: Potential energy is a state function. It does not matter what path is taken when you determine the change in gravitational potential energy -- all that matters is the change in altitude, h:
P = Pfinal − Pinitial
V = Vfinal − Vinitial
T = Tfinal − Tinitial
Other examples of state functions include pressure, volume and temperature.
State Functions
Heat and work, on the other hand, are not state functions. These two functions can only describe how the system is changing, rather than a current state or condition.
State Functions
We cannot say a system “has” work or “has heat” – only that the system is doing work, or exchanging heat.
For example, if your car stalls and you need to push it off the street, the path you follow in pushing the car will determine the amount of work you do on the car (W = Fd). The longer the distance you push the car, the more work you have to do.
more work using this path!
note that the net change in the car’s position is the same, so we can conclude that displacement is a state function – but the net work done in moving the car is different for each path -- thus, work is not a state function.
w = Fd
w =Fd
Even though the different quantities of work and heat applied or produced do depend on how the internal energy change occurs, the change in the internal energy itself, (the sum of q + w ), does not.
To measure the internal energy changes of the system, we must be able to measure heat changes and the work done on or by the system.
State Functions
Work and heat are not state functions, but their sum, q + w = E, is a state function.
Measuring heat and work done on a system
We measure the heat exchanged between the system and the surroundings by measuring temperature changes in the system.
Measuring heat
An exothermic process is any process that gives off heat – i.e., thermal energy is transferred to the surroundings from the system. The temperature of the surroundings increases
CH4 (g) + 2 O2 (g) CO2 (g) + 2H2O (g) + energy
H2O (g) H2O (l) + energy
eg: burning methane in a Bunsen burner, and condensing steam are both exothermic processes.
An endothermic process is any process that absorbs heat – i.e., thermal energy is transferred to the system from the surroundings. The temperature of the surroundings decreases
energy + 2HgO (s) 2Hg (l) + O2 (g)
energy + H2O (s) H2O (l)
eg: decomposing HgO by heating and melting ice are both endothermic processes.
Measuring heat
We can depict the energy changes in a reaction using a reaction coordinate diagram.
E released
En
erg
y
reactants products
E absorbedE
ner
gy
reactants products
An Exothermic Rxn An Endothermic Rxn
Energy Changes in Reactions
CH4 + 2 O2
CO2 + 2 H2O 2 HgO
2 Hg + O2
Measuring P-V Work
Recall: work = force applied through a distance, or: W = Fd. This is called mechanical work.
One type of mechanical work is the expansion and compression of a gas. We call this “P-V work” because it depends on pressure and volume changes. We can derive a mathematical expression for this type of work as follows:
iii. and P x V = x d3 = F x d = WorkFd2
i. Pressure = forcearea
Fd2
=
ii. Volume = d3
We will only consider cases in which a gas expands or is compressed under constant pressure conditions (if the pressure is variable, you have to use differential calculus to solve the problem...)
Under constant pressure conditions, the pressure of the gas is in equilibrium with, and must be equal to the external pressure (usually, this is atmospheric pressure).
Because it is easier to measure, you are typically given the “external” pressure acting on the system in work problems. But remember, the external pressure = pressure of the system
P-V Work
In order to do work, however, regardless of the pressure, the volume of the gas must change…
If the system does work on the surroundings, then energy is leaving the system, and the internal energy of the system will be reduced. We say that (+) work is being done on the surroundings so negative work is done on the system.
w = –PV
If the gas expands, its change in volume, V, will be positive. An expanding gas exerts a force on the surroundings and therefore must do work against the external pressure; that is, work is done ON the surroundings.
P-V Work
A gas expanding (+V) AGAINST the external pressure, P, of the surroundings
*we often say that work done BY the system is (-) work.
since V >0 we write:
+ΔV
Gas is compressed (−ΔV) as the surroundings does work against the pressure of the gas.
If the gas is compressed, its change in volume, V, will be negative. And if the gas is compressed, the surroundings must have done work on the system.
If the surroundings does work on the system, then energy is entering the system and the internal energy must increase. This means we assign the work done on the system as it is compressed to be positive work.
P-V Work
w = –PVSince V < 0, we write:
– ΔV
Thus, the formula for the P-V work done as a gas expands or is compressed that reflects the +/- sign convention is:
P-V Work
w = –PV
P = pressure exerted on the system V = change in volume of the system
Calculations with w = -PVThe units for work are the Nm or joule. We need a way to convert pressure x volume to joules.
It can be shown (see appendix 2) dimensionally, that if we measure volume in liters and pressure in kilopascals, the product unit (L-kPa) is equivalent to the unit: Nm = joule.
Recall that there are 101.325 kPa in 1.00 atm. If a L-kPa = J, then the atm kPa pressure conversion is also a conversion to obtain work in joules:
PV = L-atm x 101.325 JL-atm
= Joules
=
w = –PV
initial final
example: An 18-L sample of a gas is compressed to 12-L under a constant atmospheric pressure of 1.087 atm. What is the work done on the system?
i. W = –PV = –1.087 atm x (12L – 18L) = + 6.522 L-atm
+ 661 J of work was done ON the gas.
ii. + 6.522 L-atm x 101.325 JL-atm
P-V Work
=
Example: A sample of nitrogen gas expands in volume from 1.6 L to 5.4 L at constant temperature. What is the work done on the system, in joules, if the gas expands (a) against a vacuum and (b) against a constant pressure of 3.7 atm?
w = –P V
(a) V = 5.4 L – 1.6 L = 3.8 L ; P = 0 atm
w = – (0 atm x 3.8 L) = 0 L•atm = 0 joules
(b) V = 5.4 L – 1.6 L = 3.8 L ; P = 3.7 atm
w = – (3.7 atm x 3.8 L) = –14.06 L•atm
w = -14.06 L•atm x 101.3 J1L•atm
= –1424 J = work done on the system (gas)
*we could also say that +1424 J of work was done on the surroundings.
Although there are many ways in which work can be done on or by the system (the mechanical work done in stirring a mixture, for example), PV work is perhaps the most common type, especially in an open container. If we focus on just the PV work ad the heat energy changes, we obtain a more useful equation with which we can measure the change in the internal energy of a system (E) during any process:
Esystem = q + w
Heat of Reaction
Esystem = q + (–PV)
Since KE is part of the internal energy, if E < 0, then KE <0 as well, which means that the temperature drops!
Chemistry in Action: Making SnowE = q + (−PΔV)
q = 0 and E = −PV
E < 0
T < 0 = SNOW!
The compressed air + water vapor expands so fast, that no heat is exchanged with the surroundings:
Since the compressed air + water vapor expands (ΔV >0), it does work on the surroundings, lowering the internal energy of the system.
Heat of Reaction
Most reactions are carried out under constant pressure conditions (the beaker or test tube is open to the atmosphere, etc.) However, reactions can also be carried out under constant volume conditions (within a sealed container).
It is relatively easy to measure heat energy changes during a reaction. Solving the eqn for q we obtain, what we shall see, is a much more useful form:
q = ΔE + PΔV
ΔE = q + (−PΔV)
If a chemical reaction is run at a constant volume, then V = 0 and no P-V work is done. This means that:
0
qv = E
Under constant volume conditions, the net change in the internal energy of a system (ΔE) is equal to the heat energy (q) absorbed or given off by the system.
the “v” subscript is used to remind us that this is under constant volume conditions.
q = E + PV
Heat of Reaction
Under constant pressure conditions, we write:
the “p” subscript reminds us that this is at constant pressure
qp = E + PV
Heat of Reaction
This new thermodynamic function is called the enthalpy (H) of the system:
H = E + PV
Since the majority of reactions are carried out under constant pressure conditions (for example, in an open beaker), we use this equation to define a new function whose change gives the heat of reaction, qp .
Enthalpy
For any process under constant pressure conditions, the change in the enthalpy (H) gives the heat energy absorbed or given off in the reaction:
*Note that under constant pressure conditions, the change in enthalpy, H, depends only on the change in internal energy, E and/or the change in volume, V. These are both state functions, which means that H is also a state function!
H = E + PV
Comparing E and H
From the equation: H = E + PV, we can make the following statement:
If V is zero (no work done; no expansion or compression, etc.) or if V is at least very small, then:
H ≈ E
Thus, by measuring the enthalpy (heat energy) changes, which is relatively easy to do, we are able to determine the changes in the internal energy of the system (which would otherwise be very difficult, if not impossible, to do)!
Enthalpy of Reaction
Hrxn = H (products) – H (reactants)
We define the enthalpy of reaction, Hrxn, as the difference between the enthalpies of the products and reactants:
Hrxn can be (+) or (-), depending on the process.
If Hrxn is (+) the process is endothermic If Hrxn is (-) the process is exothermic.
Thermochemical equations are equations that show enthalpy changes as well as mass relationships.
Note that since heat energy is absorbed, the reaction is endothermic ΔH > 0.
example: 6.01 kJ are absorbed for every 1 mole of ice that melts at 00C and 1 atm.
H2O (s) H2O (l) H = + 6.01 kJ/mol
thermochemical equation:
Enthalpy of Reaction
CH4 (g) + 2O2 (g) CO2 (g) + 2H2O (l)
Hrxn = –890.4 kJ/mol
Thermochemical Equations
example: 890.4 kJ are released for every 1 mole of methane that is combusted at 25°C and 1 atm.
thermochemical equation:
Since heat energy is given off in the reaction, the reaction is exothermic and ΔH < 0.
In general, we often call the ΔH of a reaction the “heat of reaction .” Specific types of reactions are given their own specific names.
• ΔH for vaporizing a liquid is called the “heat of vaporization”
• ΔH for a combustion reaction is called the “heat of combustion.”
• ΔH for a neutralization reaction is called the “heat of neutralization,” etc.
Thermochemical Equations
CH4 (g) + 2O2 (g) CO2 (g) + 2H2O (l)
H = -890.4 kJ/mol
Writing Thermochemical Equations
• The physical states of all reactants and products must be specified in thermochemical equations.
H2O (s) H2O (l) H = 6.01 kJ/mol
H = 58.04 kJ/mol
Thermochemical Equations
• If you multiply both sides of the equation by a factor n, then H must change by that same factor, n:
H2O (s) H2O (l) H = 6.01
= 12.0 kJ/mol
2 2 x 2
N2O4 (g) 2 NO2 (g) H = +58.04 kJ/mol
–2 NO2 (g) N2O4 (g)
• If you reverse the reaction, the sign of H also reverses
Note the units for ΔH are kJ/mol. The “per mole” refers to the coefficients (moles) of a particular species present in the equation as written. :
2 C4H10 (g) + 13 O2 (g) 8 CO2 (g) + 5 H2O (l)
H = −5757 kJ/mol
Hence, in the thermochemical equation:
The –5757 kJ/mol means that 5757 kJ of heat energy are released for every 2 moles of C4H10, or for every 13 mole of O2 that reacts, and for every 8 moles of CO2 or for every 5 moles of H2O that form.
Thermochemical Equations
Thermochemical Equations
Often, thermochemical equations are written with fractional coefficients so that the species of interest in the reaction is unimolar
32Al2O3 (s) Al (s) + O2 (g) H rxn = 1676 kJ/mol
2 Al2O3 (s) 2 Al (s) + 3 O2 (g) H rxn = 3352 kJ/mol
Note that the magnitude of ΔH changes whenever the coefficients in the balanced equation changes.
Again, the “per mole” in kJ/mol refers to the molar ratios of the equation as written.
We see that the amount of heat energy absorbed or released is fixed for a given reaction – that is, Hrxn is stoichiometrically equivalent to the specific number of moles of reactants and products for that particular thermochemical equation.
Think of it this way:
Think of “heat” as being a “compound,” and the magnitude of the heat energy as the “coefficient” for that “compound.” Then treat the ΔH value as you would any other species in the reaction when solving stoichiometry problems.
Thermochemical Equations
Moles of Reactant
Moles of Product
Joules of Heat Energy
H / molmol:mol ratio
As always, convert the starting material to moles, then use the mole:mole ratios from the balanced equation. Now, however, one of the conversion factors is kJ of heat energy per mole(s) of reactant or product:
Thermochemical Equations
Example: How much heat is given off when 266 g of white phosphorus (P4) burns in air, given that:
P4 (s) + 5O2 (g) P4O10 (s) H = -3013 kJ/mol
266 g P4
1 mol P4
123.9 g P4x
-3013 kJ1 mol P4
x = – 6470 kJ
We see that -3013 kJ of heat energy are given off for every mole of P4 that reacts; thus we need to determine the number of moles of P4, and then use the ratio: -3013 kJ released per mole of P4 to determine how much heat is released:
Thermochemical Equations
Example: Al2O3 undergoes thermal decomposition as follows:
Al2O3 (s) Al (s) + O2 (g) H rxn = 1676 kJ/mol
How many grams of O2 will be formed if 1000 kJ of heat is absorbed by excess Al2O3?
32
= 28.65 g of O21000 kJ x
+1676 kJ3/2 mole O2 32.00 g
mol O2
x
*note that we can solve this problem using the fractional coefficient 3/2. You do not have to convert all the coefficients to integer values.
Thermochemical Equations
example: Ammonia is formed by reacting nitrogen and hydrogen at elevated temperature and pressures:
N2 (g) + 3 H2 (g) 2 NH3 (g) ΔHrxn = -92.6 kJ/mol
What is the enthalpy change when 2.00L of H2 gas at 600K and 4.00 atm are reacted with excess nitrogen gas?
i. nH = PV/RT = (4.00 atm x 2.00 L) / (0.08206 x 600 K)2
ii. moles H2 = 0.1625 moles
iii. ΔH = 0.1625 mole H2 x
alternately, we could say that +5.02 kJ of heat energy is released
–92.6 kJ3 mol H2
= – 5.02 kJ
Thermochemical Equations
Measuring E of reactions with gases
We start with the equation for H, and solve for E:
H = E + PV E = H – PV
but PV = (PV) = (nRT) from ideal gas equation
and (nRT) = n (RT) at a fixed temperature
E = H – nRT
where n = moles product gases – moles reactant gases
AP Only
note that nRT has units of L-atm when R = 0.08206 L-atm/mol K. Thus, we must multiply this by 101.3 to convert to Joules. Note, too, that 0.08206 x 101.3 = 8.314 kPa-L/mol K. If we use 8.314 for R, then nRT equals joules directly.
if n = 0 then E = H
If there is no net change in the number of moles of gas, then the system neither expands nor is it compressed. Thus, V = 0 and no work is done.
If the reaction results in a net decrease in the number of moles of a gas, then the system is compressed and work is done on the system by the surroundings.
If the reaction results in a net increase in the number of moles of a gas, then some of the internal energy goes into doing work on the surroundings as the system expands.
Measuring E of reactions with gases
2Na (s) + 2H2O (l) 2NaOH (aq) + H2 (g) H = -367.5 kJ/mol
i. E = H - nRT -- we must find n and H:
v. E = (-238.9 kJ) - [ (0.650)(8.314 kPa-L/mol K) x 298 K ]
note that H ≈ E
AP Only
= 1610 J ~ 1.61 kJ
Example: Find E for the reaction if 1.30 mol of Na react with excess water at 298 K, given that:
ii. 1.30 mol Na x1 mol H2
2 mol Na= 0.650 mol H2 produced
iii. n = mol product gas – mol reactant gas = (0.650 – 0) = 0.650 mol
= - 238.9 kJ
vi. E = - 238.9 kJ – 1.61 kJ = - 240.5 kJ
iv. H =-367.5 kJ
1 mol H2
x 0.650 mol H2
Calorimetry
measurement of heat energy changes
Heat Capacity and Specific Heat Capacity
There are three things that determine the amount of heat energy that is lost or gained by an object:
1. The temperature change of the object
2. What the object is made of (its composition).
3. The quantity (mass) of matter present
The heat capacity (HC) of a substance is the amount of heat (q) required to raise the temperature of a substance by one degree Celsius.
Heat Capacity and Specific Heat Capacity
units for HC = J/oCHC = q
t
The heat capacity varies depending on what the sample is made up of (metal vs wood, for example), and the mass of sample used. Thus, it would be helpful if we had a term that takes into account the nature and mass of the substance being heated (or cooled).
The specific heat capacity (c) – usually shortened to just “specific heat” -- is the amount of heat energy (q) required to raise the temperature of one gram of the substance by one degree Celsius.
c =q
m x tunits for c = J/goC
q = heat energy (joules) m = mass (grams) t = temp change (ºC)
Heat Capacity and Specific Heat Capacity
Note that specific heat is an intensive property. Every substance has a unique specific heat value.
Heat Capacity and Specific Heat Capacity
Note that the specific heat of metals tends to be quite small – typically less than 1 J/goC. Adding a small amount of heat energy will cause a relatively large increase in temperature – that is, the metal gets HOT quickly.
Metals are good conductors of heat.
On the other hand, metals cool off quickly as well: a small loss of heat energy = large change in temperature.
The specific heat of water, on the other hand, is by comparison very large -- 4.184 J/goC. This means that water can absorb a lot of heat energy, yet its temperature will not increase very much. It can also lose a lot of heat energy, without cooling down. Water is an insulator.
Note that the energy unit we call the calorie is actually another unit for the specific heat of water: 1 calorie = heat energy/goC
1 calorie = 4.184 J
Lake Effect Weather and Specific Heat
Because of water’s high specific heat, large bodies of water like Lake Michigan can absorb heat all summer without having any significant increase in temperature.
In the summer, the hot air comes over Lake Michigan. Since the lake is cooler than the air, heat energy is transferred from the air to the water. This cools the air, but barely warms the water at all. The cool air now blows onshore. The hot sand then radiates away heat to the cooler air. Thus it is always cooler near the beach in the summer.
heat
heat
cooler air
cools land
hot land
Lake Effect Weather and Specific Heat
heat
heat
In the winter, the water has lost a lot of heat energy, but has not cooled down that much – water stays warmer than the air above it. When a cold air mass comes over the water, heat energy is transferred from the water to the air, warming the air.
Warm air can hold more moisture than cold air. The warm, moist air now moves over the land. The land is colder than the air and so the air transfers heat to the land. The cooler air cannot hold its moisture, and so we get lake effect snow storms! warm,
moist air
cold air
cold land
Solving Specific Heat Problems
To determine the amount of heat energy absorbed or given off by a substance, start with the definition of specific heat, and solve for q:
where t = tfinal - tinitial
Example: How much heat is given off when an 869 g iron bar cools from 94oC to 5oC?
specific heat of Fe = 0.444 J/g • 0C
t = tfinal – tinitial = 5oC – 94oC = -89oC
q = c mt = 869 g x 0.444 J/g •oC x (–89oC) = -34,000 J
q = cmt
Calorimeters
Calorimeters are devices used to determine heat energy changes for a given process or reaction.
There are two types:
1. Constant-volume calorimeter (also called a bomb calorimeter) used to measure heat energy changes when a substance undergoes combustion.
2. Constant-pressure calorimeter (often nothing more than two nested styrofoam coffee cups!). This type is used for measuring heat changes for reactions in solution.
The constant-volume (bomb) calorimeter
Bomb calorimeters are used to find heats of combustion.
The bomb calorimeter uses an electric current to “burn” a substance of known mass under about 30 atm of O2 gas. The heat given off during the combustion is transferred to a water jacket. The heat absorbed by the water is measured using a thermometer.
Bomb calorimeters have precisely known heat capacities, so that very precise enthalpy changes can be measured.
A bomb calorimeter holds a known, fixed amount of water. As a result, the heat capacity of a bomb calorimeter typically includes both the “bomb” and the water in the jacket as part of the “calorimeter.”
HCcal = HCbombbomb + HCwater
The Bomb Calorimeter
The Constant-Volume Bomb Calorimeter
qsys = qcal + qrxn
assuming no heat enters or leaves the bomb calorimeter, we can say that qsys = 0 !
- qrxn = +(qwater + qbomb)
qwater = cmt
- qrxn = + qcal
▪ dimensionally, HC = J/oC so qbomb = HCbomb x t
− qrxn = qcal = [ HCcal Δt ] = + (cmΔtwater + HCΔtbomb )
qcal = heat absorbed by the bomb + heat absorbed by the water jacket…
▪ finally, note that Δt of the bomb = Δt of the water, so:
heat given off in the reaction = heat absorbed by the calorimeter
The Bomb Calorimeter
Example: A 1.922 g sample of methanol (CH3OH) is combusted in a bomb calorimeter which has a heat capacity of 10.4 kJ/ºC. The temperature of the water rose by 4.20 ºC. What is the molar heat of combustion of methanol?
i. −qrxn = + qcal
ii. −qrxn = HC x Δt = 10,400 J/ºC x (+4.20 ºC) = 43,680 J
iii. qrxn = −43.68 kJ for a 1.922 g sample of methanol.
iv. q per mole = −43.68 kJ1.922 g
x 32.04 gmol CH3OH
= −728 kJ/mol
convert HC to joules/ºC !
see sample problem 6.6 on page 242
Constant Pressure CalorimetryReactions under constant pressure conditions are much easier to work with. We can use a simple “coffee-cup” calorimeter to measure energy changes for many non-combustion reactions.
In this type of calorimeter, the heat energy given off by a substance or a reaction is absorbed by the water in the calorimeter. We measure the temperature changes of the water to determine the heat given off. We can usually assume no heat is exchanged with the surroundings.
- qmetal = + (qwater + qcal)
No heat enters or leaves!
qsys = qwater + qcal + qmetal
qsys = 0
and qcal = HCcal x tcal
Constant Pressure Calorimetry
hot metal
water
Determining the specific heat of a metal
where qwater = [ cmt ]H2O
c (metal) = -qmetal
mtmetal
finally:
i. q lost by the lead pellet = q gained by the water
Example: Determining sp heat of a metal (see 6.7 pg 243)
A lead pellet (m = 26.47 g) was heated to 89.98oC and then placed in a coffee-cup calorimeter containing 100.00 g of water at a temperature of 22.50oC. The final temperature of the water was 23.17oC. What is the specific heat of Pb? Assume HC of the calorimeter was 0 J
ii. - cmtmetal = +cmtwater
iii. cmetal =cmtwater
-mtmetal
= 4.184 J/goC x 100.00 g x (23.17 – 22.50oC)-26.47g x (23.17 – 89.98oC)
= 280.3 J/1768.5 goC = 0.158 ~ 0.16 J/goC
qwater
watch your signs!!
= 0.67oC = 2 sig fig
+
Example: To determine the specific heat of titanium, a student placed a 32.872 gram sample of Ti in a beaker of boiling water for several minutes, and then transferred the metal to a calorimeter. The calorimeter contained 98.86 ml of water at an initial temperature of 20.10 oC . The final temperature of the system was 23.04 oC. The heat capacity of the calorimeter was determined to be 18.9 J/oC . What was the reported value for the specific heat of Ti?
i. First we note that to for the metal was 100.0oC = boiling pt of water
ii. Next we note that the mass of water = 98.86 grams since the density of water is 1.00 g/ml
iii. Since we are given HC for the calorimeter, we use the “expanded” form: –qmetal = + (qwater + qcal)
Solution:
i. = - qmetal = qwater + qcal
ii. -cmtmetal = +cmtwater + HCtcal
iii. -c(32.872 g)(23.04 – 100.00oC) =
+4.184 J/goC x 98.86 g x (23.04 – 20.10oC) + 18.9 J/oC (23.04 – 20.10oC)
iv. -c(-2529.8 goC)= 1216.07 + 55.57J
v. c =-(-2529.8 goC)
1216.07 + 55.57 J= 0.503 J/goC
Give a possible source of experimental error to explain why the student’s value for the specific heat of Ti might be less than the accepted value?
What would explain why the student’s value for the sp heat of Ti might be greater than the accepted value?
If sp heat is too small, then the water absorbed LESS heat energy than was lost by the hot metal. Thus, some heat energy was lost to the surroundings when the metal was transferred to the calorimeter.
c =+qwater + HCtcal
mtmetal
This is the opposite case – some excess heat energy from the surroundings was transferred to the water.
If the accepted value for the specific heat of Ti is 0.550 J/goC, determine the Δ% between the student’s value and the accepted value.
% = experimental - acceptedaccepted
% = 0.503 -0.550 J/goC
0.550 J/goC= -8.5%
since the percent difference was negative, the sp heat value is too small and heat energy was lost to the surroundings during the experiment.
Measuring Hrxn in aqueous solutions
We can also use a coffee-cup calorimeter to measure Hrxn for reactions that take place in aqueous solutions.
Example: 100.0 ml of 0.500M NaOH was placed in a coffee-cup calorimeter. To this, 100.0 ml of 0.500 M HCl was added. The temperature of the solution rose from 22.50oC to a final temperature of 25.86oC. Find Hrxn per mole of acid that reacts.
i. we assume that sp heat of the aqueous sol’n = 4.184 J/goC
ii. we assume that the density of the sol’n is ≈ 1.00 g/ml so that the mass of the sol’n ≈ 100 + 100 = 200 g
iii. we assume V ≈ 0 for the sol’n so that H ≈ qrxn
Solution:
i. –qrxn = + qsol’n + q cal
0assume a perfect insulator
ii. –qrxn = cmtsoln
iii. – qrxn = 4.184 J/goC x 200.0g x (25.86 – 22.50oC)
iv. – qrxn = 2812 J ≈ 2.81 kJ
vii. moles of HCl = MAVA = 0.500M x 0.100L = 0.0500 mol
vii. Hrxn = qrxn = -2.81 kJ/0.0500 mol = -56.2 kJ/mol of HCl
v. thus + qrxn = 2.81kJ
Standard Enthalpy of Formation
(Hfo)
Hess’s Lawand
Hess’s Law of Heat Summation
Hess’s Law of Heat Summation states that, the enthalpy change for an overall process or reaction is the sum of the enthalpy changes of its individual steps.
You can determine Hrxn for any reaction that can be written as the sum of two or more other reactions for which thermodynamic data is known.
Hrxn = H1 + H2 + H3 + …
Recall that enthalpy is a state function, It doesn’t matter how you get there, it only matters where you start and end!
This means that, for any reaction that can be written as a sum of 2 or more steps, we can find Hrxn if we know the H values for each step; or we can find H for any given step, if we know the enthalpy changes for the other step(s) and the overall Hrxn.
Since nearly every reaction can be written as the sum of two or more reactions, we can calculate the enthalpy change for nearly any reaction we might want to look at!
Hess’s Law of Heat Summation
Consider the formation of carbon monoxide from its elements:
C (graphite) + ½ O2 (g) CO (g)
Although we can write this reaction on paper, in the real world, you cannot synthesize CO in this way. But we can still determine Hrxn by combining the enthalpies of reactions that do occur in such a way that the net reaction is the desired reaction given above:
C (graphite) + O2 (g) CO2 (g)
CO (g) + ½ O2 (g) CO2 (g)
Hrxn = −393.5 kJ/mol
Hrxn = −283.0 kJ/mol
1. The following two reactions will occur and go to completion:
I will have to give you the reaction steps – you cannot do this on your own – yet!
Hess’s Law
C (graphite) + ½ O2 (g) CO (g)
C (graphite) + O2 (g) CO2 (g)
CO2 (g) ½ O2 (g) + CO (g)
Hrxn = −393.5 kJ/mol
Hrxn = +283.0 kJ/mol
2. If we reverse the second reaction and add it to the first reaction, we obtain the desired reaction for the formation of CO. Remember when you reverse a reaction, you must reverse the sign of its enthalpy change!
½
H rxn = −110.5 kJ/mol
Note that identical substances on opposite sides of the “ “ will cancel out, just like identical numbers or variables cancel when they appear on opposite sides of the “=“ sign in math problems.
Example: CO and NO are toxic gases found in car exhaust. One way of reducing these emissions is to convert them to less toxic gases. Determine the H for the reaction:
CO(g) + NO (g) CO2 (g) + ½ N2 (g) H = ??
Given the following thermodynamic data:
rxn A: CO (g) + ½ O2 (g) CO2 (g) HA = -283.0 kJ/mol
rxn B: N2 (g) + O2 (g) 2 NO (g) HB = + 180.6 kJ/mol
1. We will need to use rxn A as written. Rxn B must be reversed to obtain N2 as the desired product.
2. Next, note that we only want ½ N2 as a product, so we must multiply rxn B by ½ as well.
Hess’s Law
rxn B: ½ [2 NO (g) N2 (g) + O2 (g) ] HB = ½ (−180.6 kJ/mol)
net Hrxn :
ΔHA = − 283.0 kJ/mol
+ ΔHB = ½ (−180.6) kJ/mol
Hrxn = −373.3 kJ/mol
Hess’s Law
rxn A: CO (g) + ½ O2 (g) CO2 (g) HA = −283.0 kJ/ml
net rxn CO(g) + NO (g) CO2 (g) + ½ N2 (g)
reverse the sign of ΔH when you reverse the reaction direction
Chemistry in Action: Bombardier Beetle Defense
C6H4(OH)2 (aq) + H2O2 (aq) C6H4O2 (aq) + 2H2O (l)
1. C6H4(OH)2 (aq) C6H4O2 (aq) + H2 (g); Hº = 177 kJ/mol
3. H2O2 (aq) H2O (l) + ½O2 (g); Hº = -94.6 kJ/mol
2. H2 (g) + ½ O2 (g) H2O (l); Hº = -286 kJ/mol
Hºrxn = ΔH1 + ΔH2 + ΔH3
= 177 kJ + (– 286 kJ) + (– 9.4 kJ)= −204 kJ/mol
The bombardier beetle ejects a hot chemical spray of quinone (C6H4O2). Given the following thermodynamic data, determine Hºrxn for the reaction that produces quinone shown below:
C6H4(OH)2 (aq) + H2O2 (aq) C6H4O2 (aq) + 2H2O (l)
Standard Enthalpies of Formation
Recall that Hrxn = H (products) – H (reactants)
Unfortunately, there is no way to measure the absolute enthalpy, H, of a substance. We can only measure enthalpies relative to an arbitrary reference point.
It is like measuring the height of a mountain – we always arbitrarily measure it relative to sea level.
The reference point for measuring enthalpy changes is called the standard enthalpy of formation (Hº
f ).
The standard enthalpy of formation of any element in its most stable form is zero.
Hfo (O2) = 0
but…Hfo (O3) = 142 kJ/mol
Hfo (C, graphite) = 0
Hfo (C, diamond) = 1.90 kJ/mol
Standard Enthalpies of Formation
The standard enthalpy of formation (Hfo) for a
compound is the heat change that results when one mole of that compound is formed from its elements at a pressure of 1 atm.
There is a table of standard enthalpies of formation for many inorganic compounds on page 247 in your textbook. A more extensive list in given in Appendix 3 at the back of the text.
see page 247 in the textbook
The standard enthalpy of reaction (Hºrxn
) is the enthalpy of a reaction in which reactants and products are in their standard states at 1 atm.
aA + bB cC + dD
Hºrxn dHº (D)fcHº (C)f= [ + ] - bHº (B)faHº (A)f[ + ]
Hºrxn nHº (products)f= mHº (reactants)f -
Standard Enthalpy of Reaction (Hºrxn )
In order to use this equation, we must know Hºf values for each species. If not already known, these must be calculated first.
Example: Benzene (C6H6) burns in air to produce carbon dioxide and liquid water. How much heat is released per mole of benzene combusted (i.e., determine Hºrxn) ? The standard enthalpy of formation of benzene is 49.04 kJ/mol. See also table 6.4.
2C6H6 (l) + 15O2 (g) 12CO2 (g) + 6H2O (l)
Hºrxn nHº (products)f= mHº (reactants)f-
Hºrxn 6Hº
f (H2O)12Hºf (CO2)= [ + ] - 2Hº
f (C6H6)[ + 15Hºf (O2)]
Hºrxn = [ 12(–393.5) + 6(–187.6) ] – [ 2(49.04) ] = -5946 kJ
this is for 2 mol C6H6 Hºrxn / mol = = - 2973 kJ/mol C6H6
-5946 kJ2 mol C6H6
0
Example: It is found, experimentally, that the production of NH3 from its component elements releases 92.6 kJ, according to the equation below. Calculate Hfº of NH3.
N2 (g) + 3 H 2 (g) 2 NH3 (g)
Horxn = 2 Hfº(NH3, g) – [Hfº(N2, g) + 3 Hfº(H2 , g)]
But Hfº(N2, g) = 0 and Hfº(H2, g) = 0
Hrxnº = -92.6 kJ
Hºrxn = -92.6 kJ = 2 Hfº(NH3, g) – (0 + 0)
Hfº(NH3, g) = -92.6 kJ / 2 = -46.3 kJ/mol NH3
To produce a table that listed the heats of formation for every compound known would be impossible. Luckily, we can use Hess’s Law to determine Hºf for virtually any compound from even a limited list of enthalpy of formation values.
Equipped with a means of finding Hºf values for virtually any compound, we can also then calculate Hºrxn values for virtually any reaction – even reactions that are not possible to perform!
Hess’s Law of Heat Summation Revisited
Example: Calculate Hºf of CS2 (l) given that:
C(graphite) + O2 (g) CO2 (g) Hºrxn = −393.5 kJ/mol
S(rhombic) + O2 (g) SO2 (g) Hºrxn = −296.1 kJ/mol
CS2(l) + 3O2 (g) CO2 (g) + 2SO2 (g) Hºrxn = −1072 kJ/mol
1. Write the enthalpy of formation reaction for CS2
C(graphite) + 2S(rhombic) CS2 (l)
2. Add the given rxns so that the result is the desired rxn.
+
C(graphite) + 2S(rhombic) CS2 (l)
Hºf = Hºrxn = −393.5 + 2(−296.1) + 1072 = + 86.3 kJ
ΔHºf = ?
ΔHºf = ?
rxn
rxnC(graphite) + O2 (g) CO2 (g) Hº = −393.5 kJ/mol
2S(rhombic) + 2O2 (g) 2SO2 (g) Hº = −296.1x 2 kJ/mol
CO2(g) + 2SO2 (g) CS2 (l) + 3O2 (g) Hº = +1072 kJ/molrxn
The enthalpy of solution (Hsoln) is the heat generated or absorbed when a certain amount of solute dissolves in a certain amount of solvent.
Hsoln = Hsoln − Hcomponents
Which substance(s) could be used for melting ice?
Which substance(s) could be used for a cold pack?
Hrxn = Hproducts − Hreactants
Dissolving ionic solutes
There are two enthalpy steps involved in dissolving a solid ionic solute in water:
1. all the ions in the solute must be separated. The energy for this step is called the lattice energy, U. This is always an endothermic step.
2. the solute must be hydrated by the solvent water molecules. The energy for this step is called the enthalpy of hydration, ΔHhyd. This is always an exothermic step.
The enthalpy of solution is the sum of these two steps
The Solution Process for
NaCl
Hsoln = U + ΔHhyd = +788 – 784 = +4 kJ/mol
Quantum Theory & the Electronic Structure of Atoms
Chapter 7
Electromagnetic Waves & Energy
Recall that around the turn of the century (20th century that is), scientists were beginning to explore the nature of the atom.
In a flurry of discoveries over a relatively brief time, our understanding of matter changed from Dalton’s “tiny billiard ball-atoms” to Thompson’s plum-pudding model, and finally in 1919, Rutherford showed that the atom was composed of a very tiny, dense, positively charged “nucleus” around which a swarm of negatively charged “electrons” were located.
The initial assumption was that these electrons followed circular orbits, not unlike the planets in orbit around the sun.
Electromagnetic Waves & Energy
The electrostatic forces between the (+) charged nucleus and the (–)charged electrons -- rather than gravity – was what kept the electrons in orbit.
Unfortunately, there was a major problem with this “planetary” model.
Electromagnetic Waves & Energy
According to the laws of physics, a charged particle in orbital motion should radiate away energy. And by conservation of energy, this loss of energy would result in a decrease in the kinetic energy – and hence, the speed of the electron.
As the electron slowed down, it would be pulled ever closer to the nucleus.
A quick calculation showed that the time it would take for an electron to radiate away sufficient energy to spiral into and collide with the nucleus was less than one microsecond.
Electromagnetic Waves & Energy
Ouc
h!Clearly, this does not happen in the real world…
Strangely enough, the solution to this conundrum came out of other scientist’s investigation into the nature of light...We were on the verge of a fundamental overhaul of all our macroscopic assumptions about matter and light.
Electromagnetic Waves & Energy
“We were about to discover that matter is not as “solid” and “particle-like” as we would like to think; and that light is not as “insubstantial” and “wave-like” as we thought.
“On the atomic scale of things, the difference between matter and electromagnetic waves begins to blur rather alarmingly...”
Electromagnetic Waves & Energy
-Michael Munowitz Principles of Chemistry
Wave-Particle Duality
Light and matter -- on a sub-atomic scale – exhibits both wave-like and particle-like behaviors, which we call a wave-particle duality.
To better understand this duality, we need to review just what it is that makes something a wave or a particle. We will start with waves.
Because of this duality, we have come to refer to light as a “wave-packet” – a little bundle of energy that generally behaves as a wave, but can interact with matter on a sub-atomic scale as if it were a particle.
Wave-like Properties
1. Waves are vibrations that transfer energy. These vibrations can be in the form of the troughs and crests of ocean waves, or high-low pressure changes in the air which we call sound waves, or even oscillating electric and magnetic fields. Waves are thus a series of of maximas and minimas.
Properties of Waves
2. Waves travel through a medium by displacing the medium: the medium either vibrates parallel with the passing waves, called longitudinal waves, or the medium vibrates perpendicular to the direction of the passing waves, which is called a transverse wave.
A Transverse Wave
A direction of wave
propagation
Properties of Waves
3. Wavelength, (lambda) is the distance over which the wave pattern repeats (the distance between two crests, for example).
4. Amplitude (A). The distance between the “rest” position of a wave and the point of maximum displacement .
5. How often the wave pattern repeats is called the frequency of the wave, and is given the symbol, v (nu). The units for frequency are waves per second, or simply sec-1, which is called a hertz (Hz).
v = 4 waves/sec = 4 Hz v = 2 waves/sec = 2 Hz
Properties of Waves
note that higher frequency means shorter wavelengths!
6. How fast the wave moves forward (or propagates) is the speed of the wave. Speed (u) has units of distance/time. Looking at the units for frequency and wavelength, we find that the speed of a wave is given by:
Properties of Waves
u = meterswave x
wavesec
=meters
secunits:
= u
= uNote that the wavelength
and the frequency of a wave are inversely proportional to each other.
Example: Ultrasound waves are high frequency sound waves with a wavelength of about 1.2 cm. If the speed of sound in air is 340 m/s, what is the frequency of these sound waves?
= u
340 m/s0.012 m
= = 2.83 x 104 Hz
Example: What is the wavelength of a radio wave with a frequency of 102 MHz? (u = 3 x 108 m/s.)
= u = 3 x 108 m/s
1.02 x 108 Hz= 2.94 m
Properties of Waves
Properties of Waves
7. The energy of a light wave, as we shall see later, is directly proportional to its frequency.
8. The intensity of a wave is the power output (energy delivered per second) of the wave per square meter of the medium through which the wave is moving.
destructive interference occurs when the two waves meet out of phase and their amplitudes subtract to yield a wave with an amplitude of A – B at the point of interference. The energy of the wave at that point is (A – B)2
constructive interference occurs when the two waves meet in phase and their amplitudes add to yield a wave with an amplitude of A+B at the point of interference. The energy of the wave at that point is (A+B)2.
When two particles collide, they bounce off each other; when two waves collide, they undergo interference.
Wave Interactions
before
during
after
Destructive Interference
Constructive Interference
Note that it is possible for two waves to interfere destructively to the point that the net amplitude at the point of interference is zero (said to be complete destructive interference).
Properties of Waves
On the other hand, if the amplitudes undergo complete constructive interference, then the wave amplitude (and energy) has a maximum at the point of interference, which is called an anti-node.
If the amplitude is zero, then the energy of the wave is also zero at that point. Such a point is called a node.
Properties of Waves
Standing Waves
If a wave is limited to a particular path length, such as when a guitar string is plucked, the waves undergo constructive and destructive interference to produce what is called a standing wave – it appears as if the wave is stationary:
A standing wave must be some integer multiple of 2
nodes
10. Waves come in trains – for a wave, the transfer of energy is not a “one shot” affair, as it is with a particle; rather, waves “pump” energy in a cumulative fashion, over time. (For example, You can start a fire using the sun’s rays and a magnifying glass to focus them, but it takes a few minutes for the tinder to absorb enough heat energy to reach its combustion temperature.)
Properties of Waves
11. Waves can undergo diffraction – that is, they bend when they encounter a barrier.
A diffraction pattern is built up when the diffracted waves interfere with each other.
If light is a wave, then how does it travel through the vacuum of space -- there is no medium to vibrate!
In 1873, James Clerk Maxwell proposed that light is a type of wave which he called electromagnetic radiation (or EM radiation) for short.
Light As Electromagnetic Waves:
As we shall see, EM radiation is emitted by oscillating charged particles (mainly electrons, but certain high energy EM radiation is produced by the vibration of protons.)
Moving charged particles also produce a magnetic field. Thus, EM radiation has both an electric and a magnetic component.
Maxwell showed that electromagnetic waves are traveling magnetic and electric fields that oscillate at right angles to each other. Since these fields vibrate perpendicular to both each other and the direction of wave propagation, EM waves are transverse waves.
Electromagnetic Waves
EM radiation is thus its own medium – and only EM radiation can travel through a vacuum.
What we call “visible light” is only a tiny fraction of a much broader range of waves called the electromagnetic spectrum, which includes not only visible light waves, but radio waves, microwaves, infrared, ultraviolet, x-rays, and gamma rays.
The regions of the spectrum are defined somewhat loosely, and depend on the wavelength and/or frequency of the wave.
Every type of electromagnetic wave travels at the same speed in a vacuum, namely, the “speed of light,” to which we give the symbol, c. The speed of light is 2.997924 x 108 m/s (which is rounded to 3.00 x 108 m/s for our purposes).
Electromagnetic Waves
The Electromagnetic Spectrum
see page 271
Particle-Like
Properties
Light also exhibits several distinctly particle-like behaviors.
One of the most obvious is the fact that light casts distinct shadows, and the image of a window cast onto the floor as sunlight passes through it has well-defined edges, meaning light does not appear to diffract as it encounters large barriers, nor as it passes through large openings.
Particle-Like Behaviors
One of the most intriguing, and clearly particle-like behaviors of light is something called the photoelectric effect.
The Photoelectric Effect
This is the process by which light, striking a metal, causes the metal to emit an electron (the emitted e– is called a photoelectron and the process is called photoemission).
However, there are some strict limitations on just when such photoemission can occur.
If light was, in fact, a wave, then even low energy light waves should be able to slowly pump an electron up to a high enough energy state that the electron is ionized, or removed from the atom, just as light focused by a magnifying lens can slowly increase the kinetic energy of the tinder to cause it to burst into flame. However, this is not what happens...
Instead, if the frequency of light waves used is too low (and hence, the wavelength is too long) no photoemission occurs at all, regardless of the intensity of the light or how long the light shines on the metal.
The Photoelectric Effect
On the other hand, if light of the correct minimum frequency is used, then photoemission occurs instantly, even if low intensity light is used.
Furthermore, if light had the correct frequency to cause photoemission, then it was found that increasing the intensity of the light merely increased the number of electrons emitted, but did not increase the kinetic energy of the emitted electrons.
The photoelectric effect was explained by Albert Einstein. He recognized that light was apparently transferring momentum to the electrons, which is clearly a particle-like behavior, but the amount of momentum somehow depended on frequency, which is a wave-like property…
Einstein’s explanation relied heavily on work done by Max Planck…
The Photoelectric Effect
Max Planck
About 1900, Planck was studying the radiation of heat energy from high temperature objects, called “black-body radiation.”
He discovered that heat did not radiate in a continuous fashion as “classical” physics predicted. Instead, Planck found that:
Quantized Energy Changes
The energies of the vibrating molecules that make up the heated substance were quantized, meaning, the energy could only change by small, discrete amounts of energy. These allowed energy states were called quantum states.
Quantized Energy Changes
continuous changes quantized changes
1 quantum
“Classical” physics said that an object’s energy should change as it absorbs or emits heat energy in a smooth, continuous fashion, like a ball rolling up or down a hill. Instead, Planck showed that these energy changes were more like a stair-step, that is, they were quantized.
The molecules of the heated object, in turn, could only emit energy in discrete units of light energy called quanta (now called photons ). They do so by “jumping” from one quantum state to another. The minimum energy change between these quantum states was found to be proportional to the frequency of the emitted photon:
Thus, a quantum = minimum energy that an atom can absorb or emit.
Quantized Energy Changes
E = h
where ν = frequency (Hz) andh = Planck’s constant = 6.626x 10-34 Js
Einstein argued that light acted as a particle (i.e., a photon) with an energy that depended on its frequency, according to Planck’s idea: E = h. Einstein called the energy required to remove an electron from the metal its work function, Φ, (phi).
The Photoelectric Effect Explained
Albert Einstein received his only Nobel prize in Physics for explaining the photoelectric effect. Einstein applied Planck’s idea that energy is quantized, but said this quantization was also true for electromagnetic energy, not just molecular energies.
*your text calls Φ the “binding energy.”
To produce photoemission, a single photon strikes the electron. If the photon’s energy is less than Φ, then the electron cannot be “kicked loose” from the surface of the metal (the photon has insufficient momentum).
If that one photon’s energy is equal to Φ, then the electron would absorb that energy and photoemission occurs.
If the photon’s energy was greater than Φ, then the “excess” energy imparted to that one electron would simply increase its kinetic energy – a single photon would not be able to knock two electrons loose.
The Photoelectric Effect Explained
If the intensity of the light used is increased, then the number of photons striking the metal is increased, but the energy of each photon is still hv, so each photoelectron would have the same kinetic energy.
The Photoelectric Effect Explained
Putting it all together, Einstein said the kinetic energy of an emitted photon was equal to the photon’s energy minus the work function required to emit the electron:
KE = hv – Φ
Kinetic Energy of a Photoelectron:
The unit for energy is the joule. The energy for a typical photon of visible light is only about 10-17 J.
The Photoelectric Effect Explained
This is such a small number that scientists often use a unit called the electron volt (eV) instead of the joule for these small energy changes.
The electron volt is the energy an electron gains being accelerated across a 1-Volt potential. It’s relation to the joule is given by:
1 eV = 1.602 X 10-19 J
Example: When cesium metal is illuminated with light of wavelength 300 nm, the photoelectrons emitted have a maximum kinetic energy of 2.23 eV. What is the work function for Cs?
i. KE = hv - Φ
ii. Φ = hv - KE
iii. KE = 2.23 eV x 1.602 x 10-19 J
1 eV= 3.57 x 10-19 J
iv. v =c
=
3.0 X 108 m/s
3.00 x 10-7 meter= 1.00 x 1015 Hz
v. Φ = (6.626 x10-34 Js x 1.00 x 1015 Hz) – 3.57 x 10-19 J
= 3.06 x 10-19 J or 1.91 eV
Emission Spectra and
Bohr’s Model of the Hydrogen Atom
Line Emission Spectra
It was found that when a substance in the gas phase was energized (by heating or passing a current through it) the substance gave off a unique spectrum of EM radiation.
But rather than being a continuous spread of energies or wavelengths, these spectra were composed of individual wavelengths, or lines, when dispersed by a prism and cast upon a screen.
Line emission spectrum for Hydrogen
Emitted light
Line Absorption Spectra
It was also found that when all wavelengths of light (given off by a so-called “black body radiator” such as an incandescent lightbulb, or the sun) were passed through a gas, certain wavelengths were absorbed, and the rest passed through.
emits all
gas
prismblack-body radiator
black lines = those that were absorbed
Each element produces a unique emission or absorption spectrum. In fact, He was first discovered by examining the absorption spectrum of light coming from the sun!
Furthermore, the line emission and line absorption spectra for a given element were “negative copies” of each other.
emission spectrum
absorption spectrum
Line Spectra
Niels Bohr
In 1913, Niels Bohr, a Danish physicist, proposed an explanation for these line spectra, and in so doing, presented a new model for the atom.
The Bohr model of the atom worked well in explaining and predicting the spectrum of hydrogen and other one-electron atoms, such as He+, but his model could not explain the behavior of multi-electron atoms.
Still, his model served as an important foundation for our current understanding of the atom.
The Bohr Model of the Atom
1. Atoms consist of a positively charged nucleus around which the electrons orbit like planets orbiting the sun.
2. The potential energy of the electron depends on the radius of the orbit in which an electron is found. The greater the radius, the greater the potential energy of the electron.
3. There are only certain allowed energy states that an electron can have (and hence, only certain allowed orbits). This is due to Planck’s restriction that energy can only change in small discrete (or quantum) steps.
*This same “quantum restriction” also prevents electrons from spiraling into the nucleus, as classical physics would require an orbiting electron to do !
1. The atom has only certain allowable energy levels or “shells.” Each shell has a fixed radius.
2. The energy of the shell depends on its distance from the nucleus – larger shells have higher energy.
The Bohr Model of the Atom
The lowest energy shell is called the “ground state.” Higher energy shells are said to be “excited states.”
1 2 3 4 5 6 increasing energy
first shell is the ground state (n = 1)
(Shells are designated with the letter “n”)
The Bohr Model of the Atom
Energy vs Shell Size in the Bohr Model
n = 1
n = 2
n = 3n = 4n = 5n = 6
Note that, although the energy of the shell depends on the radius, it does not increase in direct proportion to the increased shell size. Rather, the energy states get closer and closer together as the shell size increases.
5 234 16
shell number
En
erg
y
4. An electron moves to a lower energy shell by giving off energy in the form of light.
The Bohr Model of the Atom
3. An electron moves to a higher energy shell by absorbing energy.
An electron can move from one shell to another, but it cannot occupy the space between shells.
energy
energy
6. This means that the energy absorbed or given off must be exactly equal to the difference in energy
(ΔE) between the initial and final shells.
The Bohr Model of the Atom
-ΔE
+ΔE
Photon absorbed
given offE E
This means that the electron can absorb or emit only those photons which have the correct energy (i.e., specific wavelength and frequency) which exactly corresponds to the energy difference between two shells.
This explains the line emission and absorption spectrum of an atom!
http://www.mhhe.com/physsci/chemistry/animations/chang_7e_esp/pem1s3_1.swf
The Bohr Model
The energy of a photon depends on its frequency: E = h. The frequency, in turn, determines the wavelength: λ = c/ .
Now, recall:
In the case of an absorption spectrum, only those photons of light with an energy exactly equal to an allowed transition from one shell to a higher energy shell are absorbed by the atom’s electrons. The other photons are not absorbed and pass through.
As a result, most of the photons pass through the gas sample, but those that are absorbed are now “missing” and leave a black band in the spectrum.
This produces the observed emission line.
The Bohr Model
12
3
E3-2
ΔE3-2
The Bohr Model
In the absorption spectrum, only certain wavelengths have the correct energy to be absorbed.
ΔE3-1 ΔE3-1
In the case of an emission spectrum, the applied voltage excites all the electrons in an atom to the highest possible shell.
The electrons then relax to lower shells. Any drop in shells is a drop in energy, so the electrons can drop in multiple steps by moving from shell to shell to shell until they arrive at the ground state, or they can drop to the ground state in one step.
Each transition releases a photon with an energy exactly equal to the ΔE between shells. This produces the observed emission line.
The Bohr Model
Excited electrons relax to lower shells and give off photons with an energy equal to E between the shells. This creates the emission line spectrum.
The Bohr Model
E3-4E1-3
E1-4
4
3
2
1
Bohr’s model was able to predict the energy and wavelengths of the emission lines for hydrogen.
These emission lines were named by their discoverers. Each grouping of lines fell in a different region of the EM spectrum
visible region
nf = 2
nf = 1
nf = 3
nf = 4
The Balmer series, in which e- relax from excited states to the second shell (nf = 2) is the only group with lines in the visible region.
The Bohr Model
Mathematical Description of Bohr’s Model
n (principal quantum number) = 1,2,3,…
RH (Rydberg constant) = 2.18 x 10-18J
The energy of an electron in a specific shell, n is given by:
En = −RH Z2
n2
Z = nuclear charge (atomic number)
Note the (−) sign in the equation. We define the reference as being a “free electron” no longer attached to the atom ( n = ∞), An electron with n < ∞ is at a lower potential state, and hence E is negative.
This equation only holds for a one-electron atom.
For this reason, the Z term often seems to be “left out” (as it is in your text), since the only neutral atom with one electron is hydrogen, for which Z = 1. Bohr’s equation for the energy of an electron in hydrogen is then:
So the Z term is there – it just happens to be “1.”
However, this equation also holds for He+ or Li2+ ions, (Z= 2 and Z=3, respectively) since these, too, are one-electron atoms, and you must include the Z2 term for the energy of the electron in these ions!
En = −RH Z2
n2= −RH
12
n2= −RH
1
n2
The energy of a photon absorbed or emitted during an allowed electron transition between two shells, nfinal and ninitial is given by:
ΔE = Ef – Ei
1n2
f
Mathematical Description of Bohr’s Model
= −Z2RH −1n2
i
−Z2RH = 1n2
i
+ Z2RH1n2
f
Z2RH−
1
n2
i
−1
n2
f
ΔE = h = +Z2RH
–(–) = +
1
n2
Ephoton = (2)2 x 2.18 x 10-18 J x (1/25 - 1/9)
= 6.63 x 10-34 (J•s) x 3.00 x 108 (m/s)/ (+6.20 x 10-19J)
= 3.208 x 10-7 m or ~ 321 nm
Example: Calculate the wavelength (in nm) of a photon emitted by a He+ atom when its electron drops from the n = 5 state to the n = 3 state.
Ephoton = h x c /
= h x c / Ephoton
i f
ΔE = Z2RH( )1
n2Ephoton =
note that ΔE is negative since e- is relaxing to a lower energy shell…
but always use a +ΔE when determining the wavelength using this equation…
Ephoton = ΔE = −6.20 x 10-19 J
See page 278
We have seen that photons of electromagnetic radiation can posses both distinctly wave-like properties and particle-like properties.
In 1924, the French physicist Louis deBroglie made the rather daring proposal (as part of his doctoral thesis) that matter could also exhibit this wave-particle duality.
Louis deBroglie
If one made this rather large leap of faith assumption, then a lot of the paradoxes and problems with the nature of the electrons in atoms began to make some sense…
The Wave Nature of an Electron
We saw that waves can undergo destructive and constructive interference in such as way as to produce standing waves. In standing waves, an integral number of half-waves can “fit” in a given length, L, such that: L = ½ n λ , where n = 1,2,3,…
n = 1 n = 2 n = 3
What would happen if this standing wave were to form a circle, such that L = circumference of the circle?
The Wave Nature of an Electron
For such a circular standing wave to persist, a whole number of wavelengths would have to fit into the circumference, such that:
circumference = 2πr = nλ, where n = 1,2,3,4, etc.
That is, there are only certain “allowed” circumferences for a given wavelength – or put another way, there are only certain allowed wavelengths for a given circumference.
Not allowed
Allowed
Furthermore, the circumference can only change in quantized steps of nλ. This is exactly what Bohr’s model required!
In this simplified version of de Broglie’s theory of the atom, the waves are shown only in circular paths around the nucleus. In an actual atom, the standing waves make up spherical and ellipsoidal shells rather than flat, circular ones.
Standing Waves
1. There are only certain allowed orbital radii for the electron to occupy (limited by the requirements that the circumference be an integer multiple of the wavelength of the electron’s matter-wave.)
2. The energy of the electron is quantized, (which follows from the fact that the circumference can only change in integer multiples of λ, and E = hc/λ. )
3. Being a standing wave, the electron is actually not moving – it is in a stationary state – and since it is not moving, it will not radiate energy and thus will not spiral into the nucleus, as would happen otherwise according to the laws of classical physics.
The Wave Nature of an Electron
Properties of electron matter-waves
= hmv
DeBroglie was able to derive an expression for the wavelength of such an electron “matter-wave”:
The Wave Nature of an Electron
In physics, the quantity mv is called momentum and is usually given the symbol, p. Hence, deBroglie’s expression is often given as:
= hp
The wavelength of an electron matter-wave is thus inversely proportional to its momentum; the constant of proportionality is simply Planck’s constant, h.
So why haven’t we ever seen evidence of this wave-like characteristic of macroscopic matter?
Well...consider, for example, the matter-wave of a 0.17 kg baseball after it has been thrown at 30 m/s (~70 mph)...
From deBroglie’s matter-wave equation, we have:
This is an exceedingly small wavelength! For comparison, this is 1/10,000,000,000,000,000,000 th (that’s 19 zeroes!) the radius of a proton. Thus, the wavelength for ordinary, macroscopic objects is so small that we cannot even measure it, more or less notice it!
34-34h 6.626 10 J sec
1 .3×10 mm v 0.17 kg 30 m / s
Louis deBroglie
On the other hand, consider the wavelength of an electron’s matter-wave :
Example: The mass of an electron is 9.11 × 10– 31 kg. A typical value for the velocity of an electron about the nucleus of an atom is 1.0 × 106 m/s. What would be the wavelength of the electron?
h
m v
J
kg m sm
6 6 2 6 1 0
9 11 1 0 1 0 1 07 3 1 0
3 4
3 1 61 0. sec
. . /.
This wavelength is about the same as the diameter of a an atom of oxygen, i.e., the wavelength of the electron is about the same size as an atom itself – still a small number, but at least it is measurable!
Louis deBroglie
Werner Heisenberg and the Uncertainty Principle
To locate something, we need to “bounce” something off the object, e.g., airport air traffic control towers “bounce” radar beams (radio waves) off of airplanes to locate and guide them.
But note that when any two objects collide, a transfer of momentum always occurs.
One object ends up “losing” some momentum, and the other object “gains” an equal amount of momentum (thus the total amount of momentum does not change – momentum, like energy, must be conserved).
Just as things started to go well, a new problem arose…
Ideally, the object we are trying to locate should not be affected by the particle we are “bouncing” off it.
It would not make sense to locate a moving airplane by throwing, for example, a dump truck at it! The dump truck would transfer sufficient momentum to the plane to dramatically alter the plane’s momentum (hence its position, as well)...
So we locate the plane using something which cannot transfer a significant amount of momentum to it – say, a photon of electromagnetic radiation in the radio region of the spectrum – i.e., radar!
Heisenberg’s Uncertainty Principle
In 1927, Werner Heisenberg realized that we run into a real problem when we are trying to locate very tiny objects, like an electron.
It seems that the momentum of something as insignificant as a photon of light is sufficient to alter the position of the electron (as is evidenced in the photoelectric effect, among other things)!
The very act of trying to find the electron would move it as the photon transferred momentum to the electron!
Heisenberg’s Uncertainty Principle
Unfortunately, this presents yet another problem:
Heisenberg’s Uncertainty Principle
To avoid this problem we must use very low momentum photons. But, as deBroglie showed us, to reduce the momentum, we must increase the wavelength of the photons used, since p =h/λ
To locate an object precisely, the wavelength of light used must be smaller than the object being located. Not a problem for finding an airplane, but to locate a tiny electron means a very short wavelength is needed.
But a shorter wavelength means we have greater momentum.
There is a trade-off here: we cannot have both low momentum and short wavelength.
Heisenberg reasoned that, if we let the minimum uncertainty in the position, Δx, of the electron correspond to the wavelength of light (λ) used to locate it, and Δp be the minimum uncertainty in the momentum of the photon that would be transferred to the electron, then:
Since p = h /λ, according to deBroglie’s equation, the combined minimum uncertainty is given by:
This is called Heisenberg’s Uncertainty Principle. This means that we cannot simultaneously determine both the momentum and position of an electron with a high degree of precision.
xp > () x (h/) or xp > h*
Heisenberg’s Uncertainty Principle
*actually, Heisenberg’s equation is xp > h/4π
Suppose the speed of an electron in an atom is on the order of 106 m/s. It’s momentum would be:
This is ~ 1½ times larger than the diameter of a hydrogen atom! Wow! The uncertainty in the position of the electron in a hydrogen atom is larger than the whole atom! This is not good news...
mv = (9.11 x 10– 31 kg)(106 m/s) = 9.11 x 10– 25 kgm/s
The uncertainty in the position of that electron can be estimated using Heisenberg’s equation: ΔxΔp ≥ h/4π
Δx ≥ h / 4πΔp
x ≥ 6.626 x 10– 34 Js / 1.114 x 10– 23 kgm/s = 5.79 x 10– 11 m.
Heisenberg’s Uncertainty Principle
So...how bad is this, really?
To use the Bohr model of the atom to predict the allowed energy states of the electrons we must know both the position and momentum of the electron. Heisenberg just showed us we cannot do this! How do we get around this problem? We need to find a way of understanding the energy of the electron without having to know its position.
The solution came when scientists took a closer look at what a matter-wave meant.
The Development of the Quantum Mechanical(or Wave Mechanical)
Model of the Atom
The Quantum Wave Mechanical Model
In 1926, Erwin Schrödinger developed a model of the atom, called the Quantum Wave Mechanical Model of the Atom, by plotting the position and energy of an electron based on its wave-like properties.
Instead of plotting the electron’s position to find its energy, he plotted the wave’s amplitude (intensity) to find its position.
Erwin Schrödinger
The intensity of a light wave is proportional to the square of its amplitude: I = kA2
Schrödinger’s Wave Equation (ψ)
The brightest band is always the central one because that’s where the greatest degree of constructive interference occurs.
From a particle viewpoint, we could say that this is where the greatest concentration of photons occurs.
High intensity means a brighter light. Think of the interference pattern when light is passed through two slits: we get bright bands (constructive interference) separated by dark bands (destructive interference).
This means we can relate the amplitude2 (intensity) with the particle concentration. We could also say there is a greater likelihood, if you will, of finding a photon at the point of greatest intensity.
Schrödinger’s Wave Equation (ψ)
Schrödinger reasoned that if an electron behaved as a matter-wave, we can develop an equation that describes the energy of the electron in terms of its amplitude.
This equation is called a wave function symbolized as ψ (psi).
Think of ψ as a “pointer” that gives us the amplitude of a wave at any given point in space, such that ψ(x,y,z) gives the amplitude at the 3-dimensional Cartesian coordinates, x,y, and z.
Schrödinger’s Wave Equation (ψ)
Since ψ is a function of the amplitude of the matter-wave, then ψ2 is a measure of the intensity of the matter-wave, that is, a measure of the probability of finding an electron at that point.
r
x
z
y
e-
As an analogy: Imagine a beehive with only one bee. If you take a time exposure photo of the one bee as it buzzes around, you might get an image like this:
Quantum Wave Mechanical Model
If I ask you where the bee is right now – you could not say for certain. But you could be about 90% certain that the bee was most likely somewhere inside the circle shown around the bee hive…
Quantum Wave Mechanical Model
When the probability (using ) of finding an electron vs distance from the nucleus is plotted , we obtain “shells” just like Bohr’s model.
Quantum Wave Mechanical Model
ψ2
All of the orbitals in all of the shells combined is called the electron cloud.
The shells can be sub-divided into regions of highest probability called orbitals.
Quantum Wave Mechanical Model
The shell is a more specific probability region. This is like asking, “Which floor of the house is the person most likely on, between 3:00 and 5:00 pm?
Finding an e- in an atom is a little like guessing where a person might be in a house at any given time.
The electron cloud is the broadest, or most general probability region of the atom. This is like saying that at sometime during the day, we know the person will be at home.
The orbital is a very specific probability region. This is like asking, “Which room of the house is the person most l likely in, at exactly 1 am?” Note that the person might be in the kitchen getting a late night snack, but the most likely location of the person at that time is in bed.
Quantum Wave Mechanical Model
Schrödinger’s actual equation was:
2 2 2 2
2
80
x y z
m
hE V
When Schrödinger’s equation is solved, it turns out that there are 3 terms in the solution. We call these terms “quantum numbers,” and we use these numbers to more fully describe the electron’s energy state. (A 4th quantum number, unrelated to Schrödinger’s numbers, popped up in later studies.)
Keep in mind as we discuss these quantum numbers that they are mathematical solutions to a “probability density plot,” and have no physical reality to them.
Schrödinger’s Wave Equation (ψ)
Schrödinger’s Wave Equation (ψ)
Thus, the atom is no longer viewed as a nucleus with orbiting particles called electrons. We now understand the atom as being a nucleus surrounded by a diffuse “cloud” of electrons in which the electrons act more as a “probability wave” than as a particle.
The work of Louis DeBroglie and Erwin Schrödinger in the 1920's showed that the electron could be treated as a wave, specifically a standing wave, rather than as a particle. The electron wave must have a whole number of wavelengths “encircling” the nucleus, or else destructive interference could occur, which effectively destroys the electron-wave...and thus the electron!
To increase the number of waves by whole wavelengths means that there are only certain allowed radial distances the electron wave can be from the nucleus and have the waves “fit” without interference --- these are the same restrictions as those arbitrarily imposed by Bohr on his model to create the shells. b
Electron Configurations
We can describe the matter-wave by its wave function (ψ) , which is a three dimensional pattern of “ups” and “downs” and nodes analogous to the standing wave on a vibrating string. It is a function of the amplitude of the “electron wave,” and thus is partly determined by the energy of the electron.
Thus, the quantum model, like the Bohr model, also has shells. However, these “shells” are not of exact dimensions, as was the case with the Bohr model – they are merely “probability regions.”
The square of the wave function, ψ2 , gives the probability distribution mapping of the electron in space (as an analogy, the square of the amplitude of a light wave equals the intensity of that wave, which essentially is where there is the greatest density of photons).
The “point by point tabulation” of the most probable location of an electron of a specified energy is called an orbital. Note that the orbital is simply a “mapping” of the most likely position for the electron – like mapping the most likely location of a bee in a time lapsed photo of a bee-hive. An orbital is a mathematical construct, and has no physical reality to it.
To describe the location of any given point, we need three dimensions. Using polar coordinates, these dimensions are radial distance, r, longitudinal angle, Φ, and latitudinal angle, θ (see drawing below).
r
x
z
y
There are three quantum numbers, which are essentially the solutions for the three dimensions, r, θ, and Φ for an electron of a specified energy state:
θ
Φ
1. Principal quantum number (n) determines the radial value, r, for an electron. The potential energy of the e– increases with increasing distance, r, from the (+) nucleus. The “direction” of r (north, south, east, etc.) is immaterial – the potential energy depends only on how far away the electron is from the nucleus.
The Quantum Numbers
Thus, the principle quantum number gives the shell number for the electron, and has values n = 1,2,3,4... This is by far the most important factor in determining the energy of the electron.
2. Angular (azimuthal) quantum number ( l ) determines the longitudinal angle, θ. This angle depends on the electron’s angular momentum.
Angular momentum is a bit abstract – you are most familiar with its conservation in rotating systems: it is conservation of angular momentum that prevents gyroscopes and bicycles from tipping over when the gyroscope or tires are rotating fast, but when the gyroscope or bicycle tires are not rotating, there is no angular momentum and they fall over.
The Quantum Numbers
The values for l depend on the values for the principle quantum number, n, as follows:
l = 0…(n -1)
Thus
when n = 1 l = 0…(1-1) = 0, that is, when n = 1, l = 0
when n = 2, l = 0, … (2-1) = 1, so when n = 1, l has two possible values: 0 and 1
when n = 3, l = 0, 1, … (3-1) = 2, so when n = 1, l has three possible values: 0, 1 and 2
…etc.
The Quantum Numbers
s-subshell is made up of s-orbitals which are spherical shape
p-subshell is made up of p-orbitals which are "peanut" shaped
d-subshell is made up of d-orbitals which are "double peanut" or "donut peanut" shaped
f-subshell is made up of f-orbitals which are "flower" shaped
The angular quantum number defines the subshell of n, and determines the SHAPE of the orbital.
The Quantum Numbers
Remember, the “shape” of these orbitals is just the probability distribution mapping of the most likely location of an electron with the specified angular momentum (l-value) – the orbital has no other physical “reality” to it beyond this. There are no little spheres or peanuts, etc. inside the atom!
a p-orbitalelectron
distribution plot
The Quantum Numbers
The energy of the electron's shell puts limits on the angular momentum of the electron, hence, as we noted earlier, different shells can contain different types of subshells (orbital types):
The Quantum Numbers
shell (n-value) l -values orbital types
1 0 s
2 0, 1 s, p
3 0, 1, 2 s, p, d
4 0, 1, 2, 3 s, p, d, f
3.Magnetic quantum number (m l ): a charged particle in motion creates a magnetic field. These magnetic interactions between the electron and the nucleus adds a second “directional” component, Φ, to the orbital’s angular momentum.
What this means is that the magnetic quantum number gives the spatial orientation of each orbital. Different orbitals have different numbers of possible orientations in space.
Thus, each subshell is made up of one or more orbitals, and each orbital is oriented differently than the others.
The Quantum Numbers
ml = (– l…0..+ l )
The magnetic quantum number (and hence, the number of orientations possible for each orbital type) depends on the angular number, l, and can have the following values:
orbital
(l-value)
ml valuesfor orbital type
# of orientations
s = 0 0 1
p = 1 -1, 0, +1 3
d = 2 -2, -1, 0, +1, +2 5
f = 3 -3, -2, -1, 0, +1, +2, +3 7
The Quantum Numbers
The three orientations of p-orbitals
The five orientations of d-orbitals
The Quantum Numbers
4. Spin quantum number (ms ): In addition to locating the electron based on its energy, a fourth quantum number was required to account for a property known as electron spin.
A moving electron creates a magnetic field. The random motion of the electron as it moves around the nucleus produces random magnetic fields that tend to cancel each other out. However, another way an electron can move is to spin -- although the e– is not actually spinning like a top, it produces a consistent magnetic field as if it were.
The Quantum Numbers
N if the e- spins clockwise, it produces a magnetic field pointing up (we call this spin up).
N
if the e- spins counter clockwise, it produces a magnetic field pointing down (we call this spin down).
The Quantum Numbers
The spin quantum number can have one of two values: it is either + ½ or – ½ , depending on whether the electron’s magnetic field has spin “up” or spin “down.”
From a chemical point of view, the spin of the electron makes no difference in how that atom behaves. However, what is important for our purposes is that, in a given orbital, no two electrons can have the same spin.
The Quantum Numbers
We know two electrons in a given orbital will repel each other due to their like charges. But if the electrons are also repelling because their magnetic fields both point in the same direction, that is just too much repulsion to handle.
Instead, the electrons will pair up with their spins opposite (we say they are “spin paired”). This means that, magnetically, the two electrons are actually attracting each other, which helps off-set the electron-electron repulsion and stabilizes the electrons in the orbital.
The Quantum Numbers
This is called the Pauli Exclusion Principle, which states that no two electrons in an atom can have the exact same four quantum numbers. At least one (typically the spin) must be different.
This means that an orbital can have a maximum of two electrons, and those two electrons must be spin-paired – that is, their spin quantum numbers cannot both be the same value.
eg: only one electron can be in the first shell (n = 1), in the px-orbital, (ml = -1) of the p-subshell, (l = 1), with its spin up (s = + ½).
The Quantum Numbers
Thus, since there are at most two electrons per orbital, we can determine the maximum number of electrons per subshell or shell.
The Quantum Numbers
1 s-subshell x 1 s-orbital x 2 e- per orbital = 2 e-
1 s-subshell x 1 s-orbital x 2 e- per orbital = 2 e-
1st shell:
2nd shell:
1 p-subshell x 3 p-orbitals x 2 e- per orbital = 6 e-
maximum number of electrons = 8 e-
1 s-subshell x 1 s-orbital x 2 e- per orbital = 2 e-
3rd shell:
1 p-subshell x 3 p-orbitals x 2 e- per orbital = 6 e-
maximum number of electrons = 18 e-
1 d-subshell x 5 d-orbitals x 2 e- per orbital = 10 e-
1 s-subshell x 1 s-orbital x 2 e- per orbital = 2 e-
4th shell:
1 p-subshell x 3 p-orbitals x 2 e- per orbital = 6 e-
maximum number of electrons = 32 e-
1 d-subshell x 5 d-orbitals x 2 e- per orbital = 10 e-1 f-subshell x 7 f-orbitals x 2 e- per orbital = 14 e-
The Quantum Numbers
Mathematically, the maximum number of electrons in any given shell follows the formula:
# of electrons = 2n2
Thusn = 1 holds 2 x (1)2 = 2 e-
n = 2 holds 2 x (2)2 = 8 e-
n = 3 holds 2 x (3)2 = 18 e-
n = 4 holds 2 x (4)2 = 32 e-
The Quantum Numbers
Among the Elements
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
Periodic Relationships
Chapter 8
In the latter part of the 19th century, chemists began trying to organize the elements into some kind of pattern.
John Newlands (1838-1898) noted that, if the elements were arranged in order of increasing atomic mass, every eighth element had similar properties. He called this the Law of Octaves. However, this law only worked for the first 20 elements, and then broke down. Most chemists did not pay much attention to it.
The Search for Patterns Among the Elements
Dmitri Mendeleev (1834-1907)
The first chemist to develop a meaningful pattern to the elements was Dmitri Mendeleev.
1. First, he arranged the elements in order of increasing atomic mass.
3. The properties were more important than the mass – this resulted in several “blank” spaces. Mendeleev realized that these blanks represented missing elements.
Mendeleev
2. Elements that had similar properties were placed in the same column or group.
For example… Arsenic (As) followed zinc (Zn) by mass – but arsenic belonged in the group with phosphorus (P) based on its properties -- this left two blanks below Al and Si…
He
B C N O F Ne
Al Si P S Cl Ar
Ga Ge As Se Br KrZn
Cd In Sn Sb Te I Xe
2
4.003
5 6 7 8 9 10
10.81 12.011 14.007 15.999 18.998 20.179
13 14 15 16 17 18
26.982 28.086 30.974 32.06 35.453 39.948
65.38
30 31 32 33 34 35 36
69.72 72.59 74.922 78.96 79.904 83.80
48 49
80 81112.41 114.82
50 51 52 53 55
8685848382118.69 121.75 127.60 126.90 131.30
IIIA IVA VA VIA VIIA
VIIIA
IIB
12
13 14 15 16 17
? ?
Mendeleev
Mendeleev
4. Mendeleev noticed trends in the properties of the elements in his table.
For example: he noticed that the reactivity of some elements, like Na, Li and K, located on the left side of his table, increased as you moved down the column in which they were located.
He also noted that all of these elements formed compounds in a one to one ratio with chlorine: LiCl, NaCl, KCl, RbCl, etc.
On the other hand, oxygen was more reactive than sulfur, which was more reactive than selenium, etc. – for these elements, located at the right side of the table, reactivity seemed to increase as you moved up the column.
In addition, these elements all formed compounds with Na in a two to one ratio: Na2O, Na2S, Na2Se, etc.
Mendeleev
He also noted that the density and melting points of the elements generally increased as you moved down a column, and that they increased, and then decreased again as you moved across a period.
Mendeleev
these elements have the highest densities and melting
points within their rows
incr
easi
ng d
ens
ity
and
mel
ting
poin
ts
Once we knew what the properties of these missing elements might be, it was easier to search for and find the elements. As a result, these two elements, (which we now know as gallium and germanium) were discovered within a short time.
Mendeleev
5. Based on the observed trends, Mendeleev was able to predict the properties of the missing elements below Al and Si in his table.
property predicted actual
atomic mass 72 amu 72.6 amu
density 5.5 g/cm3 5.6 g/cm3
formula with oxygen XO2 GeO2
Predicted and actual properties of the missing element eka-silicon (now called germanium) based on Mendeleev’s periodic table trends:
Mendeleev
When the Elements Were Discovered
Modern Periodic Table
Mendeleev believed the properties of the elements were a periodic function of their atomic mass. There were some elements that were “glitches” to this hypothesis.
For example, based on its properties, iodine clearly goes in the same group as F, Cl and Br -- but iodine’s mass of 126.9 amu is LESS than the atomic mass of Te (127.6 amu). When ordered by mass, iodine should follow Te, rather than precede it. This would place I in the same group as S and O, whose properties are not at all similar to iodine.
Modern Periodic Table
In 1912, Henry Moseley proposed that the elements be listed in order of increasing atomic number rather than increasing atomic mass. When he did this, the glitch with iodine and tellurium disappeared, since iodine’s atomic number is greater than the atomic number of tellurium.
The Modern Periodic Law states that the chemical and physical properties of the elements are a periodic function of their atomic number.
Organization of the
Periodic Table
Recall we learned earlier that the periodic table is “broken down” into periods (rows) and groups (columns):
period
gro
up
As we have seen, the periodic table can be divided into s, p, d and f “blocks” based on which subshell the highest energy electron in the atom occupies:
Organization of Periodic Table
Periodic Classification of the Elements
Depending on the type of subshell being filled, we can categorize the elements into several sub-groups:
Representative elements (also called the main group elements) are elements in Group 1A through 7A. These elements have incompletely filled s or p subshells in their valence (outermost) shell.
The representative elements can be further broken down into families, each with similar but unique valence electron configurations, as follows:
Families of Representative Elements
1A = alkali metals: ns1 electron configuration
2A = alkaline earths: ns2 electron configuration
3A = boron family: ns2 np1 electron configuration
4A = carbon family: ns2 np2 electron configuration
5A = pnictides: ns2 np3 electron configuration
6A = chalcogens: ns2 np4 electron configuration
7A = halogens: ns2 np5 electron configuration
Classification of the Elements
note that for representative elements, the group A number gives the number of valence electrons for atoms within that family.
Classification of the Elements
The transition metals are the elements in groups 3-11 and are characterized by having incompletely filled d-subshells, or readily form cations with incompletely filled d-subshells. Note that Zn, Cd and Hg are technically not transition metals, although many texts label them as such.
The noble gases are actually not representative elements; these elements have a completely filled s and p-subshell (ns2np6). Recall that this is the most stable electron arrangement for any atom.
The inner-transition metals or the rare earths as they are often called, are those elements in which the f-subshell is being filled.
Classification of the Elements
There are two rows:
1. The lanthanides, which are the elements following lanthanum (La)
2. The actinides, which are the elements following actinium (Ac).
The Major Classes of Elements
PERIODIC TRENDS
Periodic Trends
It turns out that the electron configuration (shell and subshell) of an atom, especially its valence shell configuration, is the most important factor in determining many of the physical, and most of the chemical properties of a given atom.
We can identify certain trends that arise which also relate to the electron configuration of the atoms.
So, before we look at the specific characteristics of specific atoms or families, lets look at some of the general trends which we find within the periodic table as a whole.
Within a family, the trends are dependent on which shell the valence electrons are in.
Periodic Trends
For most trends, there are two main factors that must be examined:
Across a period, the trends depend on the number of electrons in that shell, and on the number of protons in the nucleus for that particular shell.
Isoelectronic series
Atoms and ions that have the same number of electrons (hence, the same ground state electron configuration) are said to be isoelectronic.
e.g.: Na+, Al3+, O2- and N3- all have a total of 10 electrons – that is, they all have the same electron configuration as [Ne].
Example: what would be an isoelectronic series for elements # 19 – 25?
K+ Ca2+ Sc3+ Ti4+ V5+ Cr6+ Mn7+ = [Ar]
Effective Nuclear Charge (Zeff)
Electrons in interior filled shells (which occupy the space between the nucleus and the valence electron) act to “screen” the nucleus from the valence electrons.
Periodic Trends
Each interior or “screening” (-) electron partially cancels out or reduces the effective (+) charge acting on the valence electron, which weakens the attractive forces acting on that electron.
In addition, electrons in the same shell can repel each other, which further limits the net attraction a given electron experiences towards the nucleus.
Effective Nuclear Charge
Effective nuclear charge (Zeff) is the “net” positive charge felt by a valence electron, and is given by:
Zeff Z – (number of inner shell screening electrons)
Zeff = Z - σ Where Z = atomic number (nuclear charge) and σ = shielding constant.
Electrons in the same shell do not shield each other nearly as effectively as those in interior shells, so to a very good approximation, the effective nuclear charge can be given as:
Valence electron
Screening electrons
Consider sodium (Na). Na has 11 protons and 11 electrons.
Of the 11 electrons, 1 is a valence electron, and the remaining 10 are screening electrons in interior filled shells,
(2 + 8 = 10)
Zeff = Z – interior e-
Zeff = (11-10) = +1
For example:
Effective Nuclear Charge
Finding the effective nuclear charge of an element
Mg 12
S 16
Ca 20
10
10
18
Li 3 2 +1
+2
+6
+2
Zeffscreen e-ZElement
Note: even though Ca has 8 more protons than Mg, they have the same Zeff
(+2). The valence electrons in both atoms “feel” as if only 2 protons are pulling on them.
Al3+ 13 2 +11
Se2- 34 28 +6
pay careful attention to Zeff of cations and anions!
Effective Nuclear Charge
Trends in Zeff : Within a family
Consider the trend within the Group 1A family
H (Z = 1) has 1 valence electron, with no inner shell screening electrons, so it has a Zeff of (1-0) = +1
Li (Z = 3) has 1 valence electron, with 2 inner shell screening electrons, so it has a Zeff = (3-2) = +1
Na (Z = 11) has 1 valence electrons, with 10 inner shell screening electrons, so it’s Zeff = (11 -10) = +1
Effective Nuclear Charge
We see that the effective nuclear charge stays constant within a family.
Even though we are adding protons, we are also adding interior shell screening electrons at the same time, and so the Zeff does not change.
Effective Nuclear Charge
Trends in Zeff : Across a period
As you move across a period, the number of protons (Z) increases steadily. The added electrons are entering the same shell, so the number of interior shell screening electrons does not change.
Na (Z = 11) Al (Z = 13) P (Z =15) Cl (Z = 17)
[Ne]3s1 [Ne]3s23p1 [Ne]3s23p3 [Ne]3s23p5
Effective Nuclear Charge
Na (Z = 11) Al (Z = 13) P (Z =15) Cl (Z = 17)
= +1Zeff = (11-10)
= +3Zeff = (13-10)
= +5Zeff = (15-10)
= +7Zeff = (17-10)
Since Zeff = Z – core electrons, we see that theeffective nuclear charge steadily increases from left to right across a period.
Trends in Zeff : Across a period
Effective Nuclear Charge
Trends in Zeff across the transition metals
For transition elements, the electron configuration is: ns2(n-1)dx . All the added electrons as you move across the period are entering the (n-1) d-subshell – that is, they are entering an interior shell and they therefore act as screening electrons.
As a result, although the number of protons increases across the period, the Zeff stays nearly constant, just as it does down a family. Thus Zeff will be ≈ +2 for most transition metals, and +1 for Groups 6 and 11 (why?)
Effective Nuclear Charge
Atomic Radius
Defining the size of an atom is difficult, because the electron cloud is diffuse. We use the following definitions for atomic radius:
a) two adjacent metal atoms, or
b) two adjacent atoms in a diatomic molecule
atomic radius = ½ the distance between the nuclei in:
Trends in the radius (size) of the elements
Size Trends
Note that, like Zeff , there are two distinct trends in the size of the atoms:
1. Within a family2. Across a period
The radius of the elements ranges in size from 31 picometers (He) to about 280 picometers (Fr). A picometer is 10-12 m.
Size Trends
Size trend within a family
The size of the atoms gets larger as you move down a family
valence shell #
1
2
3
The valence electrons are entering successively larger shells – larger shell means larger atomic radius.
H
Li
Narecall that Zeff ≈ constant within a family, so it has no significant effect on size trend within a family.
Size Trends
Size trend across a Period
As we move across a period from left to right, the electrons are entering the same shell, and the number of protons is increasing. We have already seen that this causes the Zeff
to increase. This increase in Zeff pulls more strongly on the electrons. The electron cloud is pulled inward, and the size of the atom gets smaller as you move across the period.
Na (Z = 11) Al (Z = 13) P (Z =15) Cl (Z = 17)
Zeff = +1 Zeff = +3 Zeff = +5 Zeff = +7
Increasing size
Incr
easi
ng
siz
eGeneral Size Trends for
Representative Elements
Size Trends
So far, we have only looked at the “general” trends in size. There are some “adjustments” in this general trend that we need to include.
The “good news” is the fact that the quantum model of the atom predicts both the general trend AND these adjustments.
This is one piece of physical evidence that the quantum model is the correct model.
Size Trends
Although the atoms tend to get smaller due to the increasing Zeff as you move from left to right across a period, the rate at which they get smaller tends to level off.
As you move from left to right, the number of valence electrons increases. This causes an increase in electron-electron repulsion, which tends to limit how much the electron cloud can be pulled inwards, despite the increasing Zeff.
Electron-electron repulsion effects
Thus, the trend in decreasing size as you move across a period “levels off” as you move farther to the right.
atomic number
radi
us
increasing electron-electron
repulsion
Size Trends
Size trends across the Transition Metals
As you move across the transition metals (and the inner-transition metals, as well) we have already seen that Zeff ≈ constant.
Thus, since all the added electrons are entering the same (n-1) shell as you go across a given the period, the size of the elements across a given period among the transition metals is roughly constant.
Size Trends
Putting it all together, we obtain the following graph of atomic radius vs atomic number…
Size Trends
Size Trends
Note the jump in size as you move to a new shell…
…and the fairly steady decrease in size moving across a period, which levels off at the far right.
…and the roughly constant size across the transition metals
The Atomic Radii of Elements 1-86
*note: unfortunately, the graph in your textbook has several mis-plotted points, so it does not look like the graph above…but it should.
Cation is always smaller than the atom from which it is formed.
If we compare the size of ions with the neutral atom from which the ion was formed, we find that the…
Anion is always larger than the atom from which it is formed.
Size of Ions
+ --
Size trends of ions
Explanation: Size of the cation
A cation is formed when an atom loses valence electrons. When an atom loses its valence electrons, it tends to lose the entire valence shell – so the cation is much smaller than the original atom.
Na : [Ne]3s1
…only the 2 inner shells remain
When this 3rd shell e- is removed…
Size of Ions
+
Na+ : [Ne] 3s0
Note also that the Zeff acting on the remaining valence shell electrons is now (11-2) = +9, so the 2nd shell is pulled inward, making the cation even smaller.
Explanation: size of the anion
An anion is formed when an atom gains electrons in its valence shell. But the atom gains electrons without gaining any protons – there is no increase in Zeff to off-set the electron-electron repulsion of the extra electrons in the valence shell. This causes the electron cloud to “swell” and as a result, the anion becomes larger than the original atom.
Size of Ions
This electron is added to the valence shell
Cl
Cl—
Radii of some common cations and anions
cations
anions
neutral atoms
neutral atoms
Ionization Energy (IE)
Ionization energy is the energy required to remove a valence electron from an atom (in the gas phase, to insure that there are no interactions with neighboring atoms that might influence the IE.).
Ionization Energy
1st IE: energy + X (g) X+ (g) + e-
Multiple electron atoms will have a different IE for each electron removed:
2nd IE: energy + X+ (g) X2+ (g) + e-
3rd IE: energy + X2+ (g) X3+ (g) + e-
The force of attraction for an electron depends on the Zeff and the distance of the electron from the nucleus.
Force of attraction = Zeff
r2k
*k is just a constant of proportionality
To understand the trends in ionization energies among the elements, we must recognize that the strength of the attraction between the nucleus and the electron is what determines the energy required to remove that electron.
Trends in Ionization Energies
The greater the Zeff , and the closer the electron is to the nucleus, the stronger the attraction.
The stronger the attraction, the more energy will be required to pull the electron loose.
Ionization Energy
high Zeff IE
close to nucleus
Unnhh…! Let go already!!
e-
this is my electron!
1st Ionization Energy within a Family
Ionization Energy
1. Within a family, the Zeff remains constant
2. As you move down a family, the valence electrons are farther from the nucleus (larger shells), which weakens the attraction.
The 1st Ionization energy DECREASES as you go down a family
1st Ionization Energy Across a Period
Ionization Energy
1. Across a period, the Zeff steadily increases from left to right.
2. Across a period, the size of the atoms gets steadily smaller as you move from left to right.
3. Both of these factors increases the attraction for the valence electrons.
1st Ionization energy INCREASES as you move from left to right across a period.
Increasing IE
Incr
easi
ng
IE
General Trend in 1st Ionization Energy
Variation of Ionization Energy with Atomic Number
Note that there are several irregularities, but the general trend shows IE increasing across a period and decreasing down a family
Irregularities in the General Trends for 1st IE
It turns out that the “irregularities” in the first ionization energy trends are actually predicted by the quantum model!
Consider the apparent “glitch” in the 2A family:
The general trend would have the IE of Al greater than that of Mg, but in fact, Mg is greater than Al…
Na = 495.9 kJ/mol Mg = 738.1 kJ/mol Al = 577.9 kJ/mol
??
The explanation for this apparent glitch is as follows:
1. The electron being removed from group 2A atom is an ns2 electron – meaning, you are breaking up that very stable filled sub-shell arrangement, so it takes a little more energy than expected.
2. In addition, the electron being removed from a group 3A atom is an ns2np1 electron. It turns out that s-orbitals have greater electron density near the nucleus than do p-orbitals (we say the s-orbital electron is is able to “penetrate” better.)
Irregularities in IE Trends
As a result, s-orbital electrons can partially screen a p-orbital electrons, even though they are in the same shell. Thus, it takes less energy to remove the partially screened p-orbital electron.
The combination of slightly higher IE for Mg and slightly lower IE for Al makes a marked “glitch” in the trend.
Irregularities in IE Trends
A second “hiccup” in the general trend of increasing IE across a period occurs among members of the Group 5A elements.
Consider the apparent “glitch” in the first IE of P:
The general trend would have the IE of S greater than that of P, but in fact, P is greater than S…
Si = 786.3 kJ/mol P = 1012 kJ/mol S = 999.5 kJ/mol
??
Irregularities in IE Trends
The explanation for this apparent glitch is as follows:
1. In group 5A atoms there are 3 p-orbital electrons – one each in the px, py and pz orbital, following Hund’s rule.
group 5A
Irregularities in IE Trends
Removing an electron from a group 5A atom involves breaking up the special stability of exactly ½ filled sub-shells, so its IE is higher than expected.
2. On the other hand, group 6A atoms have one set of spin-paired electrons in one p-orbital:
The spin-paired electron in group 6A has a lower than expected IE, since removing one of these electrons would eliminate the electron-electron repulsion effects on the remaining electron, lowering its potential energy state.
Irregularities in IE Trends
Group 6A
Again, the higher than expected IE for group 5A elements, coupled with lower than expected IE for group 6A elements makes a marked “spike” in the graph of IE.
Finally, we note that the IE is relatively constant across the transition metal elements, reflecting the fact that these atoms have relatively constant size and Zeff.
Irregularities across the Transition Metals
Irregularities in IE Trends
However, the IE of group 13 (3A) is much lower than that of group 12 for the same reason that the IE of group 3A is lower than that of group 2A – the electron being removed is coming from a higher energy p-subshell.
The IE of group 12 is also higher than expected, because you are breaking up the special stability of a filled s,d subshell combination. This produces the marked “glitch” between groups 12 and 13.
Irregularities in IE Trends
Irregularities in 1st Ionization Energy Trends
Another important trend appears when we examine multiple ionization energies ( i.e., 1st, 2nd, 3rd, etc.) for atoms in a given family
Multiple Ionization Energies
As you remove an electron, the amount of electron-electron repulsion in the atom’s remaining valence shell electrons is reduced. This, in turn, reduces the shielding effect, σ, and increases the attraction for whatever valence electrons remain. As a result, successive ionization energies are higher:
IE1 < IE2 < IE3 < …
Multiple Ionization Energies
Removing an electron may leave the atom with a filled or half-filled subshell. Removing the next electron will require a somewhat larger than expected jump in energy, due to the special stability of such filled and exactly half-filled subshells.
Example: consider the successive IE for oxygen:
O O+ O2+ O3+ O4+ O5+
[He]2s22p4 [He]2s22p3 [He]2s22p2 [He]2s22p1 [He]2s2 [He]2s1
1,314 3,390 5,300 7,470 11,000 13,000
increase: +2,076 +1,910 +2,170 +3,530 +2,000
If removing an electron leaves the atom with a noble gas core (s2p6 valence configuration) then removing the next electron will require a much larger jump in energy, since a noble gas core electron configuration is the most stable possible configuration.
Compare the first four ionization energies for Na and Al:
1st IE (kJ/mol)2nd IE (kJ/mol)
3rd IE (kJ/mol) 4th IE (kJ/mol)
Na [Ne]2s1 [Ne] [He]2s22p5 [He]2s22p4
496 4,560 6,900 9,540
Al [Ne]2s22p1 [Ne]2s2 [Ne]2s1 [Ne]
578 1,820 2,750 11,600
Multiple Ionization Energies
see page 331
Electron Affinity (EA)
Electron affinity is a measure of the tendency of a single neutral atom (in the gas phase) to gain an electron in its valence shell.
The force of attraction for an “added electron” will also depend on the Zeff pulling on it, and how far from the nucleus the added electron will be (i.e., which shell the electron goes in)..
Electron Affinity
*k is just a constant of proportionality
Force of attraction = Zeff
r2k
Just as was the case for ionization energy, the greater the Zeff , and the closer the electron is to the nucleus, the stronger the attraction.
The stronger the attraction, the more likely an atom will gain the extra electron and form an anion.
Electron Affinity
Electron Affinity
high Zeff IE
close to nucleus
high Zeff
close to nucleus
I’ll take you!Sob…no
one wants me…
e-
Measuring Electron Affinity
Experimentally, EA is measured by first adding an electron to the neutral, isolated atom – in the gas phase -- then measuring how much energy it takes to “pull” the electron off again.
That is, EA is the ionization energy of an anion.
e.g., F− (g) F (g) + e− H = +328 kJ/mol
As a result, EA has a positive H. The larger the +H for the process, the more stable the anion, which means it has a high electron affinity.
Electron Affinity
Some atoms do not readily accept an electron, so it is difficult to measure their electron affinity.
These atoms are assigned a (-) EA, which cannot be precisely determined (what is the energy required to remove an electron from an atom that will not gain an electron?)
EA values for some representative elements
Electron Affinity Down a Family
1. Within a family, the Zeff remains constant
2. As you move down a family, the added electron would enter a valence shell farther from the nucleus (larger shells), which weakens the attraction.
Electron Affinity DECREASES as you go down a family
Electron Affinity
Electron Affinity Across a Period
Electron Affinity
1. Across a period, the Zeff steadily increases from left to right.
2. Across a period, the atom gets steadily smaller as you move from left to right, so the added electron would be ever closer to the nucleus.
3. Both of these factors increase the attraction for an added electron.
Electron Affinity INCREASES as you move from left to right across a period.
Increasing EA
Incr
easi
ng
EA
Electron Affinity (General Trend)
Irregularities in EA Trends
There are more irregularities in EA trends than for IE trends. Some of these irregularities can, however, be explained.
If an atom gains a stable filled or half-filled subshell when it gains an electron, it will require more energy to remove it, and hence it’s EA is greater as well.
Thus, the EA of Group 1A, 4A and 7A are higher than might otherwise be expected.
If an atom already has a stable filled or half-filled subshell, then it’s tendency to gain another electron is very low.
As a result, the EA of Group 2A, 5A and 8A elements tends to be lower than expected.
Coupled with the higher than expected EA values for Group 1A and 7A, we can account for the “glitches” in the general trend, so that the EA of carbon is greater than that for nitrogen, even though nitrogen is a smaller atom with a higher Zeff.
Irregularities in EA Trends
Electron Affinity for the Group 8A Family
The EA values for the noble gases deserves a special note. As we might expect, since the noble gases have a filled s and p subshell, their tendency to gain another electron is quite low.
If we examine the Zeff acting on any electron that might be gained, we see a secondary reason for the low EA value for noble gases…
Irregularities in EA Trends
Neon (Z=10) filled shell!
added electron must go to a new shell
all electrons are now screening e-
Zeff = 10 - 10 = 0; EA < 0
Since the valence shell is already filled for all noble gases, the added electron would have to enter the next larger shell. The Zeff acting on the added electron would be zero because all the other electrons in the atom would now act as screening electrons:
Irregularities in EA Trends
Irregularities in Electron Affinity Trends
Glitches:
Be N Ne
EA of 2A, 5A and 8A are much lower
than expected
EA of 1A, 4A and 7A are
much higher than expected
The observed trends in the radius of the atoms, the first ionization energies, multiple ionization energies, and the electron affinities for the atoms are all in agreement, including the “glitches,” with what the quantum mechanical model of the atom would predict.
This is strong evidence in support of our quantum mechanical model of the atom.
Finally, we note that…
Variation in the Physical & Chemical
Properties of the Representative
Elements
General Trends in Physical Properties
Before we examine the chemical properties of individual groups in detail, there are some general trends in the physical properties of the elements which we can point out.
The periodic table is broken down into three major groups: metals, non-metals and metalloids.
Note that metals are on the left; non-metals are on the right.
Classification of the Elements
General Properties of Metals
malleable: can be hammered into thin sheets
ductile: can be pulled into long, thin wires
lustrous: shiny (has a metallic “sheen.”)
good conductors: allow heat and electricity to easily pass through them
tend to lose e- due to their low IE, they tend to lose electrons in reactions to form cations
Classification of Elements
The density & melting point of metals tends to increase as you go down a family (atomic mass increases faster than atomic radius).
Across a period, these values tend to increase to a maximum among the d-block transition metals, and then slowly decrease again. (Transition metals are relatively small and have a close-packed structure.)
Li is the lightest metal known (0.53 g/cm3), and osmium has the highest density of any element (22.6 g/cm3). Tungsten has the highest melting point of any known element (3,410 ºC); gallium will melt in your hand.
Metals
sodium copper
gallium gold
beryllium magnesium
Metals
brittle (break into fragments when stressed)
dull (not lustrous)
poor conductors (that is, good insulators)
gain e- to form anions (have high EA)
General Properties of Non-metals
Classification of Elements
For example, fluorine and chlorine are gases, bromine is the only liquid non-metal, and iodine is a solid (which readily sublimes).
The density & melting points of non-metals is somewhat more varied than that for metals. However, like metals, these values tend to increase moving down a family.
Non-Metals
$ properties are intermediate between those of metals and nonmetals
$ many are semi-conductors
As Sb
Si
Ge
General Properties of Metalloids
Classification of Elements
Trends in the Metallic Properties of the
Elements
increasingly metallic in properties…(or less non-metallic)
The general trend is for elements to become more and more metallic as you move from right to left across a period.
Across the 3rd period, if we begin at the far right and move to the left, we have the non-metals argon (Ar), chlorine (Cl) sulfur (S) and phosphorus (P); moving farther left we reach the metalloid silicon (Si), then a true metal, aluminum (Al) and continuing, we have the metals magnesium (Mg) and sodium (Na).
Classification of Elements
increasin
gly m
etallic
Trends in the Metallic Properties of the
Elements
Within the Group 4A family, moving downward, we see the first element is carbon (C), a non-metal, followed by silicon (Si) and germanium (Ge), both metalloids, and finally, there are two metals, tin and lead (Sn and Pb).
The general trend is for elements in the same family to become more and more metallic as you move downward.
Classification of Elements
Note that the trend in increased metallic properties follows the same general trend as that for decreasing IE. Because one of the most important chemical properties of metals is that they tend to lose electrons in reactions, it follows that the lower the IE, the more metallic the element!
Classification of Elements
Across a period, the most reactive metals are those at the far left (Group 1A).
In a family, the most reactive metals are at the bottom of the family.
Note that the trend in increased non-metallic properties follows the same general trend as that for increasing EA. Because one of the most important chemical properties of non-metals is that they tend to gain electrons in reactions, it follows that the greater the EA, the more non-metallic the element! As a result:
Across a period, the most reactive non-metals are those at the far right (halogens);
Within a family, the most reactive non-metals are at the top of the family.
Classification of Elements
A Brief Guided Tour
of the Elements
Elements with similar valence electron configurations tend to have similar chemical properties.
Thus, members of the same group tend to have similar properties. Chlorine reacts very similarly to how bromine reacts; sodium behaves much the same as potassium, etc.
Since the electron configuration of an atom – especially its valence shell configuration -- is the most important factor in determining most of the chemical properties of a given atom, it is not surprising that:
Group Properties
Note also that all the transition metal elements have similar valence electron configurations – nearly every one has an ns2 (n-1)dx configuration.
Thus, as a group, many transition elements are fairly similar in their chemical behaviors.
However, the presence of an incomplete d-subshell does affect the properties of the transition metals, so they are different from those of, say Group 2A metals, which also have a valence ns2 configuration, but do not have any (n-1) d-subshell electrons.
Group Properties
For example, carbon, silicon, lead and tin all have an s2p2 valence electron configuration, yet carbon is a non-metal, silicon is a metalloid, and lead is a metal!
The first element in a given family also tends to be somewhat different from the rest of the elements in the family. This is due to the fact that elements at the top of a family tend to be smaller, with higher IE and EA compared to other elements in the family.
Group Properties
There are exceptions to this “similar e- configuration means similar properties” group rule.
Finally, similarities exist between pairs of elements in different adjacent groups and periods, known as the diagonal rule.
Specifically, the first three members of the second period exhibit many similarities to those elements located diagonally below them in the periodic table.
The reason for this has to do with the fact that “diagonal elements” have similar charge densities (charge per unit volume); this makes them react similarly with anions.
Group Properties
Now let us examine specific groups
Hydrogen: Its Own Special Group
Hydrogen is unique among the elements. It has only one electron, which it loses quite readily. For this reason, we place it in the same vertical row as the alkali metals, which also only have one electron -- but H is not a metal.
e.g., HCl + H2O → H3O+ Cl-
H can also gain one electron, like the halogens, to form the hydride ion, H‾. For this reason, some periodic tables place H at the top of both groups 1A and 7A.
e.g., 2 NaH + 2 H2O → 2 NaOH + H2
Probably the most important compound containing H is water
2 H2 (g) + O2 (g) → 2 H2O (l)
Hydrogen is highly flammable. Because it is also lighter than air, it was used in making dirigibles (blimps) for many years.
Hydrogen
A spectacular accident occurred in New Jersey in 1937 when a spark ignited the hydrogen in the Hindenburg dirigible as it was “docking,” killing many people aboard. Today, we use helium instead, which is not flammable!
Group 1A Elements: The Alkali MetalsIn
crea
sing
rea
ctiv
ity
The alkali metals are all metals with an ns1valence electron configuration (n >1).
soft, low density metals
lose 1 electron to form +1 ions in reactions
very reactive; not found in nature in elemental state. Alkali metals are found only in compounds, such as NaCl and KI.
react with water to form alkaline (basic) solutions, (that is, they form hydroxides); hence the name:
The Alkali Metals
e.g., 2 Na + 2 H2O → 2 H2 + NaOH
all react with oxygen to form oxides; all but Li can also form peroxides:
e.g., Na + O2 → Na2O2
Group 1A Elements: Alkali Metals
8.6
Group 2A Elements: The Alkaline EarthsIn
crea
sing
rea
ctiv
ity
The alkaline earths are all metals with an ns2 valence electron configuration.
lose 2 electrons to form +2 ions in reactions
relatively soft, low density metals (but harder and more dense than the group 1A metals)
very reactive, but not as reactive as alkali metals. Alkaline earths are still too reactive to be found in nature in elemental state (they, too, are only found in compounds).
Ca, Ba and Sr react with water (Mg reacts with steam) to form alkaline (basic) solutions (that is, hydroxides) – hence the name. Be does not react, however, even with steam.
Sr-90, a radioactive isotope of Sr, was released during the Chernobyl accident. This toxic isotope, which is chemically very similar to Ca, is readily taken up by bones, and led to a sharp increase in cases of leukemia.
The Alkaline Earths
Group 2A Elements : Alkaline Earths
The Transition Metals
Fe Co CuNiSc Ti V Cr Mn
3 4 5 6 7 8 9 10 11 12
The transition metals are the elements that make up the “B” groups, or groups #3-11 using the newer numbering system.
tend to be harder, with higher melting points than the Group 1A and 2A metals (their smaller size allows them to pack more tightly together).
most form colorful compounds (most compounds with representative elements are white)
not as reactive as 1A and 2A metals; many found in elemental state, such as gold and silver.
like Al, most react with oxygen and form a protective oxide layer that prevents further oxidation (e.g., chrome plating).
The Transition Metals
most can form +2 or +3 ions (often both). The +3 charge state is most stable at the left side, and the +2 state is more common on the right side.
Charge states in red are the most common.
Note that the oxidation state climbs to a maximum at Mn, and then drops back down.
The Transition Metals
Some Properties & Trends among the 1st Row Transition Metals
transition metal compounds in aqueous solutions
Tra
nsi
tio
n M
etal
s
Ti3+ Mn2+Cr3+ Fe3+ Co2+ Ni2+ Cu2+
A Comparison of Group A and Group B metals
Consider the electron configurations of Groups 1A and Groups 2A with their B group counterparts (groups 11,12):
Group number electron configuration
group 1A metals [noble] ns1
group 1B (11) metals [noble] (n-1)d10ns1
group 2A metals [noble] ns2
group 2B (12) metals [noble] (n-1)d10ns2
Note that the A groups and B groups differ only in the presence or absence of a filled d-subshell of electrons.
The d-subshell electrons are not as effective at screening the s-orbital electrons. As a result, the 1B (11)and 2B (12) metals have higher IE than their A-group counterparts, which makes them less reactive.
As a result, although alkali metals are never found in nature in their elemental state, the 1B elements of copper, silver and gold are very commonly found in their elemental state; indeed, they are sufficiently inert to be used in making coins (they are often called the coinage metals for this reason.)
Similarly, the alkaline earths are too reactive to be found in their elemental states, but Zn, Cd and Hg (group 2B) are less reactive and can be found in their elemental states.
Compare A & B Metals
The Rare EarthsElements in the bottom two rows on the periodic table are called the rare earth (metals). The rare earths are broken down into two groups…
The Lanthanides: Elements # 58-71 immediately following lanthanum (La).
The Actinides: Elements #90-103 immediately following actinium (Ac).
Elements with atomic numbers greater than 92 are called the trans-uranium elements. None of these elements are naturally occurring – they are all man-made.
The Rare Earths
Group 3A Elements: The Boron Family
These elements all have an ns2np1 configuration. Boron is a metalloid. The rest of the elements in this family are true metals.
Aluminum is the most abundant metal in the earth’s crust. It is usually found in the ore, bauxite (Al2O3). About 200 years ago, it was so expensive to extract pure Al from bauxite that aluminum was worth more than gold! We have since found cheaper methods of extracting the Al.
Al is actually quite reactive, but quickly forms a thin coating of Al2O3 when exposed to air. This protects the Al from further corrosion, making it a good, lightweight, structural metal.
Group 3A Elements
In addition to forming ionic compounds, these metals can also form molecular compounds.
Group 3A Elements: The Boron Family
8.6
Group 4A Elements: The Carbon Family These elements all have a ns2np2 electron configuration. Carbon is a non-metal, silicon (Si) and germanium (Ge) are metalloids; tin (Sn) and lead (Pb) are true metals.
Group 4A Elements
Carbon comes in several allotropes. Recall that an allotrope is one of two or more distinct molecular forms of an element, each having unique properties. The allotropes of carbon are: graphite, diamond, and buckminster fullerene (also called “buckyballs” for short!)
graphite and diamond buckminster fullerene (C60) – its structure looks like a soccer ball
Carbon is also unique among the elements in its ability to bond to itself to form long chains. This process is called catenation. This allows carbon compounds to have a wide range of structures, etc., which enables them to have biological roles. The study of carbon based compounds is called organic chemistry.
Silicon is the second most abundant element in the earth’s crust (SiO2 is the chemical formula for sand). Si is also important in the semi-conductor industry, and is an important ingredient in making computer chips.
The most stable oxidation state for both C and Si is 4+. (Recall that this does NOT mean they form +4 ions!)
Group 4A Elements
Lead is a toxic metal. It was once used in paints and also as an “anti-knock agent” in gasoline. Exposing young children to lead can lead to mental retardation and neurological problems, so its use has been cut back drastically in the past 20 years. In ancient Rome, the wealthy used lead pipes to carry water to their homes. Some historians believe the effects of lead poisoning on the people of Rome contributed to the decline and fall of the Roman Empire!
Elements at the top of the family are most stable in the +4 oxidation state, while lead, at the bottom of the family, is most stable in the +2 oxidation state (although the Pb4+ also exists.)
Group 4A Elements
Group 4A Elements: The Carbon Family
Group 5A Elements: the PnictidesThese elements all have an ns2np3 electron configuration. Elements in the nitrogen family include non-metals, metalloids (As and Sb) and one true metal (bismuth).
Nitrogen in its diatomic form (N2) is a chemically inert gas (will not react) which makes up about 70% of our air. Nitrous oxide (N2O), or laughing gas, is used by many dentists as an analgesic. Ammonium nitrate (NH4NO3) and other nitrates (TNT) are explosives. Ammonia (NH3) is a common cleaning agent.
Phosphorus has two allotropes: white (yellow) phosphorus exists as P4 molecules and must be stored under water because it burns in air with an intense, hot flame. Red phosphorus, the other allotrope, is less reactive.
The Pnictides
Arsenic is used as a pesticide. There is evidence that Napoleon died of arsenic poisoning; it was first believed he was poisoned by a rival, but we now believe the arsenic actually came from his wallpaper, which used arsenic in its dyes!
The oxoacids of P and N are formed by reacting the oxides with water:
N2O5 + H2O → 2 HNO3
P4O10 + 6 H2O → 4 H3PO4
The Pnictides
Group 5A Elements: the pnictide family
8.6
Group 6A Elements: The Chalcogens
These elements all have an ns2np4 valence electron configuration. Most of the members of this family are non-metals, except for Te and Po. Oxygen is the most reactive element in the family.
reactivity increases
Oxygen is a diatomic element. It is the most abundant element in the earth’s crust – mainly as silicate rocks (SiO2) -- and makes up about 20% of the air we breathe. Ozone (O3) is an allotrope of oxygen that is present in the upper atmosphere that screens out harmful UV rays. The ozone layer now has “holes” in it, caused partly by pollutants.
Most oxides of non-metals form acids in water (the word oxygen means “acid former”). SO3 is a common pollutant from burning coal that reacts with water in the air to form sulfuric acid (H2SO4) – or acid rain:
The Chalcogens
SO3 + H2O → H2SO4
Sulfur comes in several allotropic forms. Crown sulfur (S8), the most common allotrope of sulfur, is used in making matches; it is also added to latex rubber in a process called vulcanization, which makes the rubber less “tacky” and harder (the inventor of this process used the vulcanized rubber to make tires – his name was Charles Goodyear.)
Group 6A Elements: the chalcogen family
The Chalcogens
Group 7A Elements: the Halogens
Incr
ea
sing
re
activ
ity
These elements all have a ns2np5 valence electron configuration. The word halogen means “salt former.” All the halogens are diatomic elements. Bromine is a liquid, iodine and astatine are solids, and fluorine and chlorine are gases.
Fluorine is the most reactive of all the non-metals. It is a pale yellow-green gas at room temperature. F is used in making non-stick teflon, and compounds containing F- ions are used to fight tooth decay.
Chlorine is a pale green gas that is also quite reactive. Chlorine bleach is actually the compound, NaClO (sodium hypochlorite). Never mix bleach with other household cleaning agents such as toilet bowl cleaners and ammonia – they react with bleach to produce toxic fumes!
The Halogens
Bromine is a corrosive, reddish brown liquid. Compounds containing bromine or chlorine are often used as antibacterial agents in swimming pools and hot tubs.
Iodine is a purple solid that sublimes very easily. Tincture of iodine (iodine dissolved in alcohol) used to be a common antiseptic to put on cuts, etc.
All the halogens react with water to form binary halic acids:
e.g., Cl2 + H2O → 2 HCl (aq)
Organic compounds containing Cl and F are called chlorofluorocarbons or CFC’s. These compounds, used in making refrigerants, have been shown to destroy the ozone in the earth’s upper atmosphere.
The Halogens
Group 7A Elements: the Halogens
Group 8A Elements: The Noble Gases
The noble gases all have a filled s2p6 valence shell (except He which is filled with only a 1s2 configuration). Most are chemically inert (they will not react with anything). As their name implies, these elements are all gases at room temperature -- they have some of the lowest boiling points of any element (e.g., He boils at -269 oC!)
The Noble Gases
Helium has the distinction of being first discovered in the spectrum of the sun before it was discovered here on earth. The name “helium” comes from “Helios,” the Greek god of the sun.
Neon is often used in lighted signs.
Properties of Oxides Across a Period
There is one last comparison we will make of the properties of the representative elements will help distinguish the behavior of metals from that of non-metals.
We will examine the properties of the oxides of the 3rd period: Na2O, MgO, Al2O3, SiO2, P4O10, SO3, and Cl2O7
Oxygen tends to form -2 ions, especially when bonded to metals with low IE, such as Na, Mg and Al.
These compounds form ionic bonds (as attested to by their very high melting points and extensive 3-dimensional lattice structures.)
Oxides Across a Period
As the ionization energy of the elements increases across a period, the ionic character of the oxides decreases, while the molecular nature of the oxides increases. Most molecular oxides exist as small, discrete molecules, except for SiO2, or quartz, which has a three dimensional structure very similar to that of diamond.
ionic oxides molecular oxides
Trends in Ionic vs Molecular Nature of Oxides
Oxides Across a Period
Acid-Base Properties of Oxides
Oxides Across a Period
Basic oxides are metal oxides that react with water to form bases (hydroxides) and/or react with acids.
e.g., Na2O + H2O → 2 NaOH (aq)
e.g., MgO + 2 HCl (aq) → MgCl2 + H2O
Acidic oxides are non-metal oxides that react with water to form acids, and/or react with bases to form salts and water.
e.g., P4O10 + 6 H2O → 4 H3PO4 (aq)
e.g., SO3 + 2 NaOH → Na2SO4 + H2O
Amphoteric oxides can display both acidic and basic properties.
Al2O3 + 6 HCl (aq) → 2 AlCl3 + 3 H2O
Al2O3 will also react with bases, which is what we would expect of an acidic oxide…
Al2O3 + 2 NaOH + 3 H2O → 2 NaAl(OH)4 (aq)
Al2O3 will react with acids to form salts and water, which is what we would expect of basic oxides:
Oxides Across a Period
basic oxides amphoteric oxides acidic oxides
Trends in Basic/Acidic Nature of Oxides
Oxides Across a Period
Finally, note also that because the metallic character of the elements increases as you move down a family,
oxides at the top of the family tend to be more acidic than those at the bottom of the family
oxides at the bottom of the family are more basic than those at the top.
Oxides Within a Family
Chapter 9
Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.
Chemical Bonding: Basic Concepts
AP Inorganic Chemistry
Why do atoms form bonds?
We now know that the most energetically stable electron arrangement for an atom is to have a filled valence shell, or to have an s2p6 valence electron configuration (the so-called octet rule) – that is, to be isolectronic with a noble gas.
Gilbert Lewis suggested that atoms obtain this stable valence electron configuration by sharing, gaining or losing electrons, which results in the formation of chemical bonds.
1. ionic bond: electrostatic attraction between cations and anions, which are created by the transfer of electrons.
The type of bond formed depends on the ionization energy and electronegativity of the atoms involved
2. covalent bond: a bond formed by the equal sharing of valence electrons between the nuclei of two
atoms.
Types of Chemical Bonds
3. polar covalent bond: a bond formed by the unequal sharing of valence electrons between two atoms.
Electronegativity (EN) = a measure, developed by Linus Pauling, of the tendency for an atom to attract or pull electrons towards itself in a chemical bond.
Chemical Bonding
Electronegativity
Electron affinity refers to an isolated, gas phase atom’s attraction for electrons
Note the difference between EN and EA:
Electronegativity involves shifts in electron density between atoms that are bonded to each other.
Electronegativity
In general, elements with high EA and high IE also have high electronegativities.
The electronegativity of an atom is a relative value that can only be measured in relation to the EN of other elements. Thus, EN is a calculated value, not an experimentally determined value.
In general, however, we can say that the factors that increase EA also increase EN, so we may predict periodic trends in EN.
The Electronegativities of Common Elements
The trend for EN is very similar to the trend for EA: EN increases up a family, and L→R across a period.
*note the EN values for some of the common elements
Variation of Electronegativity with Atomic Number
Electronegativity
Note that there are fewer glitches in EN compared to EA!
Bond Type and EN
By comparing the difference in electronegativity, E, between two atoms, we can estimate the degree to which electrons shared or transferred between the atoms.
K Na Li Al B H C N O F 0.8 0.9 1.0 1.5 2.0 2.1 2.5 3.0 3.5 4.0
ΔEN = 3.1
ΔEN = 1.0
ΔEN = 0.4
A large ΔEN between the two atoms (ΔEN ≥ 1.7), indicates the electrons will be shifted or transferred to the more electronegative atom to a significant extent (greater ionic character to the bond).
A smaller ΔEN between the two atoms indicates that each atom’s pull on the electrons is more equal, which means the electrons will be shared between them (greater covalent character to the bond).
The smaller the ΔEN, the more equally the electrons are shared.
Bond Type and EN
Covalent
roughly equal sharing of e-
Polar Covalent
unequal sharing or partial transfer of e-
Ionic
complete transfer of e-
Bond Type and ΔEN
% ionic character
ΔEN
50%5%
ionicpolar covalentcovalent
1.70.3
100%
3
Approximate ΔEN values and bond type:
The Ionic Bond
+EN ≥ 2
Ionic Bonding
The Ionic Bond
If an atom with a low IE collides and reacts with an atom which has a high EA, the first atom can transfer electrons to the second atom.
The atom that gives up the electron becomes a positively charged cation, and the atom that gains the electron becomes a negatively charged anion.
An ionic bond is the “electrostatic” attraction formed between the oppositely charged cation and anion.
Ionic Bonding
+
metal (low IE) loses electron
non-metal (high EN) gains electron
this creates oppositely charged cations and anions
ΔEN ≥ 1.7
This electron transfer most often occurs between fairly reactive metals (very low IE) such as group 1A or 2A metals, and reactive non-metals (high EN) such as the halogens and oxygen.
Please note: you may have learned in a previous science class that “an ionic bond is a transfer of electrons.” This is incorrect. An ionic bond is simply the electrostatic attraction that occurs between oppositely charged ions.
The cations and anions involved in an ionic bond, as often as not, were already ions before the reaction. But we can break apart and recombine these ions to form new ionic bonds.
For example, consider the reaction between Ag+ and Cl− to form the ionic compound, AgCl in the reaction:
AgNO3 + NaCl AgCl + NaNO3
No electron transfer occurs between Ag and Cl – the Ag+ and Cl‾ ions were already ions before the reaction began! But the bond in AgCl is an ionic bond.
Ionic Bonding
Ionic Bonding
Note that compounds involving alkali metals and halogens always form ionic bonds between them --
For this class, we will generally assume that any compound involving a metal and a nonmetal will be primarily ionic in its characteristics.
Bond is at least 50% ionic, and ΔEN ≥ 1.7
Lewis Dot NotationTo keep track of the valence electrons involved in bonding, we use Lewis dot symbols which consists of the element’s symbol, with one dot for each valence electron.
Thus, alkali metals have 1 dot, chalcogens have 6 dots, etc.
Lewis Dot Symbols
We can represent the ionic bond that forms between two atoms using Lewis dot symbols, as follows:
= [He]
= [Ne]Li + F Li F
1s22s1 1s22s22p5 1s2
1s22s22p6
We often use a curved arrow to depict shifts in the e- during reactions. The arrow always
points in the direction of e- movement.
Ionic Bonding
Arrangement of ions in ionic compounds
Ionic compounds do not form individual “molecules,” composed of just two or three atoms.
Instead, ionic compounds are composed of literally billions of cations and anions electrostatically attracted to each other.
The empirical formula for an ionic compound is just the simplest ratio of the cations to the anions in compound.
Ionic Bonding
The regular, repeating arrangement of ions in an ionic compound is called the crystal lattice.
expanded view of the crystal lattice of NaCl
actual crystal lattice structure of NaCl
Ionic Bonding
Factors that Determine the Structure of an Ionic Compound’s Crystal Lattice
1. The charge of the ions: this determines the ratio of cations to anions
2. The size of the ions: larger ions will not fit in the same arrangement as smaller ions will.
3. Ions are arranged within the lattice in such a way as to maximize the separation of like charged ions, and minimize the separation of un-like charged ions. (Like charges repel and opposite charges attract.)
Ionic Bonding
Lattice Energy
The same factors that determine the structure of the lattice also determine the stability of a solid ionic compound, which is measured by its lattice energy.
Lattice energy = energy required to completely separate 1 mole of a solid ionic compound into its gaseous ions.
Thus, this is the same amount of energy released when those ions come together to form the solid compound.
E = k Q+ Q-
r
Knowing the structure and formula of the compound, we can determine it’s potential energy, and hence its lattice energy using Coulomb’s Law:
r = distance between the ions
Note that the lattice energy will be greatest when r is small and the charges are large and opposite in sign.
+/- Q = charges of the ions
Lattice Energy
The Born-Haber Cycle
The lattice energy of an ionic compound cannot be measured directly. Instead, we measure it indirectly by assuming the formation of an ionic compound takes place in a series of steps, involving the ionization energy of the cations and the electron affinities of the anions,
and then use Hess’s Law!
This process was developed by Max Born and Fritz Haber, hence, it is referred to as the Born-Haber cycle.
But this is the rxn for the enthalpy of formation for LiF. From the Appendix we find that, for LiF:
6. when rxns 1-5 are added, we obtain the net reaction:
Li (s) + ½ F2 (g) → LiF (s)
The Born-Haber Cycle
1. convert: Li (s) → Li (g) ΔHº1 = 155 kJ/mol
example: determine the lattice energy for LiF
2. dissociate F2: ½ F2 (g) → F (g) ΔHº2 = 75 kJ/mol
3. ionize Li: Li (g) → Li+ (g) + e– ΔHº3 = 520 kJ/mol
4. add e- to F: F (g) + e– → F‾ (g) ΔHº4 = -328 kJ/mol
ΔH°f = –594 kJ/mol
5. Li+ (g) + F– (g) → LiF (s) ΔH°5 = U = ??add lattice energy
ΔH5 = U = ΔH°f − (ΔHº1 + ΔHº2 + ΔHº3 + ΔHº4 )
U = −594.1 −[(155 + 75 + 520 + (−328)] kJ/mol
U = −594 − (422) = −1016 kJ/mol LiF
That is, −1016 kJ of heat energy is released in forming 1.0 mole of LiF from its component ions (or +1016 kJ of energy are needed to separate 1 mole of LiF into its gaseous ions).
The Born-Haber Cycle
Solving for ΔHº5 = lattice energy (U) , we obtain:
By Hess’s Law, we have:
ΔHº1 + ΔHº2 + ΔHº3 + ΔHº4 + ΔHº5 = ΔH°f
Hoverall = H°1 + H°2 + H°3 + H°4 + H°5
The Born-Haber Cycle
Lattice Energy =
Forming a cation, even if forming the cation results in an s2p6 electron configuration, requires energy.
Indeed, it requires more energy for each electron removed, so an Al3+ ion requires more energy to form than an Al+ ion, even though Al3+ has a noble gas configuration. So where does the energy come from to form cations?
Lattice Energy
It is the huge release of the lattice energy that supplies the energy required to remove the electrons from all the cations.
If the lattice energy is not sufficient to “off-set” the energy needed to form the cations and anions from the neutral atoms, then no electron transfer occurs, and no ionic bonding is possible between those two atoms.
lattice energyNa + Cl2
Na+-Cl-
net release of energy
Ene
rgy
neutral Na atoms & Cl2 molecules
combined ions in lattice
reaction progression
ions formed
+
+
Lattice Energy
−−
−
+
If, for example, Mg obtains a noble gas electron configuration by losing 2 e- to form Mg2+, this gain in stability does not outweigh the energy required to remove the two electrons.
Lattice Energy
There is a “trade-off” between increasing the charge of the metal cations (which increases the lattice energy) and the greater ionization energy required to remove multiple electrons.
However, the increase in the lattice energy released by forming ionic attractions with +2 ions instead of +1 ions is more than enough to compensate for the extra energy needed to form the doubly charged Mg2+ ion.
Thus, Mg reacts with Cl‾ ions to form MgCl2, rather than MgCl:
Lattice Energy
Mg Mg2+ ΔH = +2188 kJ/mol
Mg2+ + 2 Cl‾ MgCl2 (s) ΔHlat = -2527 kJ/mol
ΔHnet = -339 kJ/molnet energy change
Lattice Energy
By the same token, Na does not form Na2+ ions in its compounds – the gain in lattice energy is not sufficient to make up the difference for the huge increase in ionization energy required to remove the second electron from the stable [Ne] electron configuration of the Na+ ion.
What is true about the cations also holds for the anions: there is a trade off in the (-) EA of forming higher charged anions (eg, F3−) vs the lattice energy released when such higher charged ions combine to form compounds.
The lattice energy vs energy required to form the ions also helps explain why elements with higher EN do not form cations (and hence, do not form ionic bonds), even though such a cation could form a stable ionic bond with an anion.
It is simply because the energy required to form a cation from an element with high EN is greater than the lattice energy that could be released if such a compound were to form.
Lattice Energy
lattice energy
P + Se2
PSe
this much energy is still
needed!
Ene
rgy
neutral P atoms & Se2 molecules
combined ions in lattice
reaction progression
Lattice Energy
ions formed
+
+−
−
−
+
energy required
The energy needed to form P+ and Se− ions is greater than the lattice energy that would be released if PSe formed. As a result, P+ and Se− ions do not form, and the ionic compound PSe does not exist.
Lattice Energy
Thus, there is always a balance between the IE or EA needed to form the highest charge that can reasonably be obtained on the atoms, and the increased lattice energy released when these higher charged ions come together to form a solid ionic compound.
Properties of Ionic Compounds
Ionic Bonding
1. Definite crystalline structure
2. High melting points
3. Brittle as solids
4. Most dissolve in water
5. Conduct electricity only when in the molten state or when dissolved in water.
Definite Crystalline Structure:
This is explained by the factors already discussed concerning the crystal lattice structure: charge of ions, size of ions, and attraction/repulsion of ions.
Ionic Bonding
High Melting Points:
To melt a substance requires that the particles of the substance be separated, which requires energy to accomplish.
In ionic compounds, each particle is attracted to multiple other particles of opposite charge in a three-dimensional lattice network.
Melting ionic compounds requires breaking multiple ion-ion attractions, which requires more energy = higher melting pt.
Ionic Bonding
this cation is held in place by attractions to three anions, all three of which must be overcome in order to melt the compound.
+
Brittle as Solids:
If you “hammer” on an ionic crystal, it shatters. Any attempt to distort the crystal lattice causes the “layers” to shift, which causes like-charged ions to become aligned. The resulting repulsive forces shatters the crystal.
Ionic Bonding
force applied to crystal
++ +
++
like charges become aligned
+ + +
+ +
crystal shatters due to repulsive forces between
like-charged ions
+ +
+ + +
O
H
H
water molecule
Ionic Bonding
Dissolve in Water:As we shall see later, water is a polar molecule. Polar molecules are molecules which have a small degree of charge separation, so that one end of the molecule is slightly negatively charged, and the other end is slightly positively charged.
red = region of higher electron density, which gives a partial negative charge to the oxygen atom in this area of the water molecule
blue = region of reduced electron density, which gives a partial positive charge to the hydrogen atoms in this area of the water molecule
The partial positive charge on the hydrogen atoms in water are attracted to the anions in an ionic compound; the partial negative charge on the oxygen atom in water are attracted to the cations in an ionic compound.
The water molecule is able to literally “pluck apart” the ionic compound, and carry the ions off into the solution.
Dissolve in Water: continued
= water = anion ( ) = cation (+)++
Ionic Bonding
Ionic Compounds Conduct Electricity when Molten or Dissolved in Water
Ionic Bonding
When a voltage is applied, a current will flow only if there are charged particles present that are free to move. These charge carriers can be electrons or ions.
We refer to these as “mobile charge carriers.”
A A
Ionic Bonding
When an ionic compound is in the solid phase, the ions are “locked” in place and cannot move. Thus, ionic solids are poor conductors.
However, when an ionic compound is dissolved in water or in the molten (liquid) phase, the ions are separated and held less tightly.
They are thus free to move, which allows a current to flow.
−+
−
−
−
+
+
+
e−e−
Ionic Bonding
Electrolytes are compounds that, when dissolved in water, produce a solution that conducts electricity. All ionic compounds are electrolytes.
Compounds can be classified as strong or weak electrolytes, depending on the extent to which they dissociate into ions in solution. Strong electrolytes dissociate 100% into ions.
Non-Electrolytes are compounds that, when dissolved in water, produce a solution that does NOT conduct electricity. Most molecular, covalently bonded compounds are non-electrolytes
Ionic Bonding
Covalent Bonds
NN
O C O
O
- -O C O
O
-
-
OCO
O
-
-
The Covalent Bond
Covalent bonds involve nonmetals with relatively high, but similar electronegativities. These atoms compete roughly equally for the electrons, and thus must obtain a stable octet of electrons by sharing electrons between them, rather than transferring electrons from one atom to another.
This sharing of electrons by overlapping orbitals between two atoms is called a covalent bond.
Covalent Bonding
As the orbitals of two atoms overlap, electrons are attracted to the nuclei of both atoms. This “traps” the electrons in a region between the two atoms, which holds the atoms together in the covalent bond. The trapped electrons are “shared” by both atoms in the molecule formed.
RED = electron rich area
BLUE = electron poor area
Covalent Bonding
overlap = covalent bond
Covalent Bonding
Pure covalent bonds occur only in diatomic nonmetal elements, such as Cl2 or N2, which have identical electronegativities (ΔEN = 0).
Polar covalent bonds form when there is a slight to moderate difference in EN between the two bonded atoms ( 0.30 < ΔEN < 1.7).
If an ionic bond is a complete transfer of electrons, and a pure covalent bond is an equal sharing of electrons, then we can say a polar covalent bond is an un-equal sharing of electrons, or a “partial transfer” of electrons.
In polar covalent bonds, the shared electrons are shifted towards the atom with the greater electronegativity. This electron shift can produce a charge separation within the molecule as a whole.
Polar Covalent Bonds
H — F
For example: F is more EN than H. As a result, the electrons are shifted away from H and towards F. We represent this shift with an arrow, pointing towards the more electronegative atom, with a cross-bar at the more electropositive end of the bond.
Polar Covalent Bonds
H F = δ- δ+
The region with increased e- density is symbolized δ- and the region with reduced e- density is symbolized δ+ .
Molecules like HF and H2O which have a net charge separation are said to be polar molecules.
We will investigate the nature of polar molecules in more detail when we discuss intermolecular forces in Chapter 11
H
δ
δ+ δ+H
O
Polar Covalent Bonds
Covalent Bonds
Because molecules can exist as individual, isolated units, many of the properties of molecular compounds depend on the nature of the attractive forces that exist between two or more molecules. Note carefully that these attractive forces are NOT covalent bonds.
We will investigate the nature of these so-called “intermolecular” attractive forces in more detail in the next chapter…
Properties of Covalently Bonded Compounds
1. Molecular compounds have lower melting points than ionic compounds.
2. Molecular compounds are poor conductors of electricity in any phase.
3. Molecular compounds have a wide range of solubility in water – some dissolve easily in water, some do not dissolve at all.
Covalent Bonds
Properties of Covalently Bonded Compounds
Low Melting Points
The bonding within a molecule is a covalent bond between two atoms – however, there are only very weak attractions between separate molecules. As a result, it does not take a lot of energy to separate two molecules (melting).
weak or no attractions between molecules…
Covalent Bonds
Molecules are easily separated = low melt pt.
Poor Conductors of Electricity
Recall that, in order to conduct a current of electricity, you must have charged particles that are some distance apart to create an electric field.
Molecules are made up of neutral atoms. By sharing the electrons, neither atom has gained or lost electrons to become ions, even when the molecules are separated.
Thus, there are no charged particles with which to create an electric field, and so they are non-conductors.
Covalent Bonds
Solubility in Water
Water is a polar molecule, in which there is a charge separation within the molecule so that one end is partially positive and other end is partially negative.
Polar molecules can dissolve in water because they form attractions to water molecules, much like ionic compounds.
Non-polar molecules do not dissolve in water because they cannot form attractions to the polar water molecules.
Covalent Bonds
9.4
Some “Special Case” Types of Covalent Bonding
Some molecular compounds do not exhibit the properties typical of most molecules. Some of these special molecules have extremely high melting and boiling points; some have an actual electric charge to them.
The two types of special molecules are:
1. network solids
2. polyatomic ions
Network SolidsNetwork solids (also called covalent crystals) are a type of crystal in which every atom is covalently bonded to its neighbors in a vast, complex interconnected “network.”
Quartz crystals (SiO2) and diamonds are examples of these network solids.
Some “Special Cases”
Because every atom is covalently bonded to its neighbor, network solids can be thought of as giant “macro-molecules.” In order to melt network solids, you must break multiple covalent bonds, much as we have to overcome multiple ion-ion attractions in ionic solids.
As a result, network solids tend to have extremely high melting points, and tend to be very hard.
diamond:
melting point = 3550 oC
diamond is the hardest substance known
Network Solids
Polyatomic Ions
Polyatomic ions are groups of atoms covalently bonded together, which have a net charge.
Most polyatomic ions are anions, in which the group of atoms picks up one or more electrons to fill the valence needs of one of the atoms in the group.
sulfate anion (SO42-)
cyanide anion (CN-)
nitrate anion (NO3-)
Lewis Structures
O C O
O
- -O C O
O
-
-
OCO
O
-
-
F N F
F
Lewis Structures
We are frequently interested in which atoms are bonded to which in a molecule. To show this, we use Lewis structures, which were developed by Gilbert Lewis.
In the Lewis structure (or structural formula, as it is sometimes called), we indicate all the valence electrons around each atom, and which electrons are shared in order to form the covalent bonds between two atoms.
9.1
Lewis Dot Symbols for the Representative Elements
and Noble Gases
Lewis proposed that a single covalent bond requires the sharing of a pair of electrons between two atoms.
A double bond occurs whenever two atoms share two pair of electrons between them.
A triple bond occurs when atoms share three pair of electrons between them.
Lewis structure terminology
Unshared electron pairs on an atom are called lone pair electrons.
RULES FOR DETERMINING THE LEWIS STRUCTURE OF MOLECULES
1. Determine the TOTAL number of valence electrons supplied by ALL the atoms in the compound. If the compound has a net charge, add or remove e- from the total count accordingly.
2. Determine which element is the central element. This will be the element that is the LEAST electronegative element of those present in the compound, with the exception of hydrogen. Hydrogen can NEVER be the central element, since H can never form more than one bond.
3. Arrange the other atoms around the central atom.
Example: Consider the molecule CHF3
CHF3 = 1C + 1 H + 3 F
= 1(4) + 1(1) + 3(7) = 26 valence electrons
The least electronegative element is H, but H cannot be the central atom; carbon has the next lowest EN so the central atom will be carbon. Arranging the other elements around C we write:
F
H C F
F
Lewis Structure Rules
the arrangement of the outer atoms is arbitrary – typically, if the molecule has 3 atoms we place them in a straight line, for 4 atoms we use a T-shape, and for 5 atoms we use a + sign pattern as shown here.
4. Form a single bond between the central element and all the other elements in the compound. Each single bond requires 2 electrons. Subtract the number of e- used in making the single bonds from the total number of electrons available, which you determined in step #1.
Lewis Structure Rules
F
H C F
F
: ::: It requires 8 electrons to form the 4
single bonds needed to attach the outside elements to the carbon atom
This leaves: (26 — 8) = 18 electrons
5. IF the number of electrons needed to make the single bonds is LESS than the total number of electrons available, then place electrons, IN PAIRS, around the outside elements until their valence requirements are met. IF the number of e- needed for this equals the number of e- available, you are finished
F
H C F
F
: :::
:
::
:
:: add electrons in pairs around each F
atom until each has a total of 8 electrons; none are added to H because it already has 2 electrons.
Lewis Structure Rules
:
:
This used an additional 18 electrons, which is all that were left – we are done. This is the Lewis structure for CHF3.
:
: :: F
H C F
F
: :::
:
:
:
:
:
::
:
:
:
::
::
F
H C F
F
:
:
:
:
:
::
:
::
We often show single bonds as a single line, rather than as 2 dots. We still show all the lone pairs as dots, however.
Lewis Structure Rules
Example: consider the molecule OF2
total number of valence e- = 2(7) + 1(6) = 20 e-
Arranging the elements with O as the central atom and forming the 2 bonds required to attach the F’s to the O requires 4 electrons. This leaves (20 – 4) = 16 e-
Lewis Structure Rules
F O F :::
:
::: :
Next we place 6 e- around each F to fill their valence needs. This uses 12 e- . So far we have used 4 + 12 = 16 electrons.
This leaves us with 4 e- left over: (20 – 16) = 4
6. IF there are any electrons left over after filling the valence needs of the outer atoms, add these extra electrons to the central atom, in pairs.
If the valence requirements of all atoms has been met at this point, you are finished.
F O F ::
: ::
: :: ::
When we add the 4 remaining electrons to the central oxygen atom (in pairs), we have now met the valence needs for every atom in the compound. We are done.
Lewis Structure Rules
F O F
: ::
: :: ::
Example: consider the molecule CH2O
total number of valence e- = 1(4) + 2(1) + 1(6) = 12 e-
Arranging the elements with C as the central atom and forming the 3 bonds required to attach the H’s and the O to the C requires 6 electrons. This leaves (12 – 6) = 6 e-
The 2 H’s now have 2 e- each, so their valences are filled. The remaining e- are placed on the oxygen atom. At this point, the oxygen’s valence needs are met.
H C H
O
: ::
::
:
However, the carbon only has 6 electrons in its valence, and it needs 8 – and we are out of electrons!
Lewis Structure Rules
Lewis Structure Rules
H C H
O
: :
:
::
:
7. If there are insufficient electrons to meet the valence requirements of every element, you must share 2 or more pairs of electrons with the central atom.
shift this pair of electrons down so that there are now 4 electrons being shared between carbon and oxygen…
H C H
O
: :
:
:
::
Now every element has a filled octet (or a filled shell, which only requires 2 e- in the case of H)
H C H
O
: :
:
:
::
When an atom shares 4 electrons (2 pairs) we say the bond is a double bond. We represent a double bond as 2 lines.
Double bonds are stronger and shorter than single bonds.
Lewis Structure Rules
H C H
O: :
Example: Consider HCN
The compound contains 1 + 4 + 5 = 10 e-. We form the bonds needed to attach the H and N to the central C atom. Next we place the remaining 6 e- around the nitrogen atom.
H C N: : ::
: H C N: : :::
To meet the valence needs of the carbon, we will have to shift TWO pairs of electrons from the nitrogen, so that C and N share 3 electron pairs.
Lewis Structure Rules
H C N: : :
::
When an atom shares 6 electrons (3 pairs) we say the bond is a triple bond. We represent a triple bond as 3 lines.
Triple bonds are stronger and shorter than double bonds.
Lewis Structure Rules
H C NOR :H C N: : :::
Example: Write the Lewis structure of nitrogen trifluoride (NF3).
Step 1 – N is less electronegative than F, put N in center
F N F
F
Step 2 – Count valence electrons N = 5 and F = 7
5 + (3 x 7) = 26 valence electrons
Step 3 – Draw single bonds between N and F atoms and complete octets on outside F atoms. This uses 24 e-
Step 4 - Add remaining two electrons to central atom. Check, do all atoms have filled octets?
NF
F
F
Resonance
When drawing out Lewis structures, you may encounter a situation where a double bond is needed, but there are two or more different atoms that could donate the extra electrons.
For example, consider the molecule O3 (ozone). When you draw out its Lewis structure, you reach this structure after putting in all the available electrons:
O O OThe question becomes, which of the two oxygens will donate a second e- pair with the central atom with which the required double bond can be made? Does it make any difference?
Lewis Structure Rules
The answer turns out to be – BOTH of the oxygens will donate electrons. If only one did, that would imply there is something unique about that particular O—O bond, when in fact, all O—O bonds should be identical.
I’m an oxygen, they’re an
oxygen, wouldn’t you like to be an
oxygen, too?
Lewis Structure Rules
Lewis Structure Rules
The problem is, how do we show that both oxygens are simultaneously donating electrons? This would require that the oxygen atoms share 3 electrons – that is, we need to show there are two “1½ bonds” to the central atom…
O O O O O O
?? ??this would imply that two orbitals on the central oxygen have
3 electrons in them – that is, it does not really have an s2p6 e- configuration, and violates both Pauli’s and Hund’s rules, too!
O O O OOO
We rectify this by drawing both possible Lewis structures, in which the central oxygen forms a double bond with one oxygen, and then the other. We use a double arrow between the two to show that the true structure is a blending of the two possible Lewis structures:
The double bond is NOT switching back and forth between the left and right hand oxygens!
Lewis Structure Rules
This “double” Lewis structure is called a resonance structure.
PCl O PCl O
Lewis Structure Rules
When your Lewis structure calls for resonance structures, you must show all possible resonance structures to receive full credit!
Shown below are two compounds – one requires resonance and the other does not. Can you tell which one requires resonance?
NOT resonance – the atoms are not the same!
identical atoms – this requires resonanceSO O SO O
Exceptions to the Octet Rule
2. Odd-Electron Molecules
N = 5e-
O = 6e-
11e-
NO N O
1. The Expanded Octet only for central atoms in 3rd shell and larger; (uses available empty d-orbitals to form the bonds)
SF6
S = 6e-
6F = 42e-
48e-S
F
F
F
FF
F
S has 12 e-: 4 are in the 3 d-subshell, the rest are in 3s and 3p subshells.
N only has 7 valence e-. Odd electron molecules always have multiple bonds to central atom.
3. The Incomplete Octet
H HBeBe = 2e-
2 H = 2e-
4e-
BeH2
BF3
B = 3e-
3 F = 21 e- 24e-
F B F
F
only 2 valence e- on Be
only 6 valence e- on B
Exceptions to the Octet Rule
When setting up the Lewis structure for CH2O (this is formaldehyde), we find that there are actually two possible skeletal structures:
H C O HH
C OH
Formal Charge
We use a concept called “formal charge” to predict which of several possible Lewis structures is the most likely structure for that compound.
formal charge on an atom in a Lewis structure
=
An atom’s formal charge is the difference between the number of valence electrons in an isolated atom and the number of electrons assigned to that atom in a Lewis structure.
total number of valence electrons in the free atom
-total number of nonbonding electrons
+
The sum of the formal charges of the atoms in a molecule or ion must equal the charge on the molecule or ion.
Formal Charge
1
2
total number of bonding electrons( )
H C O H
formal charge on Carbon = 4 -[ 2 + ½ x 6 ] = -1
formal charge on Oxygen = 6 - [ 2 + ½ x 6 ] = +1
-1 +1
Example: What is the formal charge on the possible CH2O structure shown below?
Formal Charge
formal charge on an atom in a Lewis structure
=
total number of valence electrons in the free atom
-total number of nonbonding electrons
+1
2
total number of bonding electrons( )
Σ charge = 0
HC O
H
formal charge on Carbon = 4 - [ 0 + ½ x 8 ] = 0
formal charge on Oxygen = 6 - [ 4 + ½ x 4 ] = 0
0 0
Example: What is the formal charge on the possible CH2O structure shown below?
Formal Charge
formal charge on an atom in a Lewis structure
=
total number of valence electrons in the free atom
-total number of nonbonding electrons
+1
2
total number of bonding electrons( )
Σ charge = 0
Formal Charge & Stability of Lewis Structures
1. For neutral molecules, a Lewis structure in which there are no formal charges is preferable to one in which formal charges are present.
2. Lewis structures with large formal charges are less plausible than those with small formal charges.
3. Among Lewis structures having similar distributions of formal charges, the most plausible structure is the one in which negative formal charges are placed on the more electronegative atoms.
H C O H
-1 +1 HC O
H
0 0
We see that for CH2O, the second structure yielded the smallest valued formal charges (zero) on each atom. Thus, this is the most likely structure for CH2O.
Formal Charge
example: Use formal charges to determine the correct Lewis structure for PClO.
+2 0-2
+2-1
0 00
possible Lewis structures and their
formal charges: -1 0 -1
P Cl O
P Cl O
Cl P O
Cl P O
+1
There is evidence that the correct Lewis structure for H2SO4 involves an expanded octet around S. Compare the Lewis structures with and without an expanded octet.
S O
O
O
OH H S O
O
O
OH H
0
0
00 00 0
-1
-1
00 00+2
with expanded octet, all formal charges are 0
without expanded octet, S has +2 formal charge
Metallic Bonding
Metallic Bonding
Metallic bonding is the type of bonds that form between two or more metal atoms.
This means that the electrons are only loosely held. When the energy levels of many adjacent metal atoms overlap, it creates a “common” energy level called a molecular orbital which the valence e- of any one of the atoms can occupy.
Metals have low IE and they also have low EN.
molecular orbital
We say the electrons are delocalized.
Note that the electrons are NOT being shared between two nuclei as in covalent bonds – rather, the electrons are free to “associate” with any metal atom, and can and do move from atom to atom.
Metallic Bonding
A metallic bond can be thought of as a group of cations in a “sea” of delocalized electrons, which are mutually attracted to and associated with the metal cations.
The (-) electrons act as the “glue” that holds the (+) cations together.
Metallic Bonding
+
+
++
+
+
+
+
+
+
+
+
+
++
+
delocalized electrons cations
Properties of metals
1. Metals are good conductors of heat & electricity
2. Metals are malleable and ductile
3. Metals are lustrous
Our model of the metallic bond can be used to explain why metals have these properties.
Metallic Bonding
Metals are Good Conductors
Metallic Bonding
Recall that to be a conductor of electricity requires that there be charges that are free to move.
The delocalized electrons shared by all the cations in metallic bonds are not locked in place between two specific cations, as they are with covalent bonds, and so they are free to move in the presence of an applied voltage. This makes metals very good conductors in the solid phase.
+
+
++
+
++
+
+
+
+ ++
++
+
+
+
+
+
−
−
−
−
6 V
Band Theory of Conductivity see page 876-877 in text
The band theory is a model to explain the ability of metals to conduct electricity, It gets its name from the idea that delocalized electrons freely move through “bands” formed by overlapping molecular orbital energy levels.
Because of their small size, the atoms in metals are closely packed together, and their outer shells can interact with each other, creating “molecular orbitals” which are very closely spaced in energy – so close that we refer to them as bands rather than shells.
The closely spaced filled energy shells make up the valence band, and the higher energy, unoccupied “molecular orbitals” formed by the overlap of empty p-orbitals make up the conduction band.
Conduction and valence bands for Mg. Note that the conduction band involves the overlap of empty 3p orbitals.
Band Theory
Each band is actually made up of individual energy lines so close together they essentially merge
To conduct a current, electrons in the valence band (which are held to the atom) must be promoted to the conduction band where the electrons are now delocalized and free to move.
The energy gap (called the forbidden zone) between the valence band and the conduction band varies widely from metals to non-metals, and explains why non-metals do not conduct (large forbidden zone), but metals (very small forbidden zone) conduct easily.
Band Theory
+
Heat is a measure of the transfer of kinetic energy between particles. The mobile e- are able to collide with other e- and cations, transferring kinetic energy as they do so. Thus, metals conduct heat very well.
+
+ +
+
+
+
+ +
+
Metallic Bonding
Metals are Malleable and Ductile
Malleability and ductility requires that the bonding between atoms be very “flexible” so that, even when the substance is distorted, the atoms are still bonded.
When a force is applied, the cations are free to move – as long as there are some e- between the cations, the atoms are still bonded together…
force
Metallic Bonding
+
+
+
+
++
+
+
+
+
+ +
+
+
+
+
++
Metals are LustrousAn object that appears lustrous or shiny is reflecting or emitting multiple photons of light with very similar, but slightly different, energies.
The delocalized e- in metals move between shells that are close together in energy levels. This e- shift produces photons of similar energy = “lustrous” quality of the metal.
Larger shells are close together in energy states, so the photons emitted are also similar in energy – this makes it shiny.
Metallic Bonding
Bond Enthal
py
Bonds & EnergyAs the orbitals of two atoms begin to overlap, the extra attraction of the electrons towards two nuclei lowers the potential energy of the atoms – as the atoms approach closer and closer, the shared e- are also closer to both nuclei and the potential energy of the atoms/electrons is lowered more.
However, if the atoms approach too closely, the repulsion of the two (+) nuclei becomes a factor, increasing the energy state of the bonded atoms quite dramatically. The bond is now destabilized.
The bond energy is the ΔE associated with the point of lowest potential energy in forming the bond.
ΔE
Bonds & Energy
There is a point of maximum overlap where the attraction of the e- for the two nuclei is greatest, and the repulsion of the nuclei is not too great, which yields a minimum potential energy for the two atoms.
stable bond
Chemical bonds form because the potential energy of the bonded atoms is lower than the potential energy of the atoms in the free or unbonded state.
THUS:
Forming bonds is always an exothermic process – that is, ΔH < 0
Breaking bonds is always an endothermic process – that is, ΔH > 0
Bonds & Energy
The enthalpy change required to break a bond in one mole of gaseous molecules is the bond energy.
H2 (g) H (g) + H (g) H° = 436.4 kJ
HCl (g) H (g) + Cl (g) H° = 431.9 kJ
O2 (g) O (g) + O (g) H° = 498.7 kJO O
N2 (g) N (g) + N (g) H° = 941.4 kJN N
Bond Energy
Bond Enthalpy (energy) in Binary Compounds
H H
H Cl
molecule
Single bond < Double bond < Triple bond
The bond energies for multiple bonds is always greater than that for single bonds:
Bond Energy
C C ΔHº = 347 kJ/mol
C C ΔHº = 620 kJ/mol
C C ΔHº = 812 kJ/mol
Bond Enthalpies for Polyatomic Molecules
In compounds that contain more than one bond, the bond energies can differ for different bonds, even if the bonds involve the same two kinds of atoms.
example: the bond energy to break the first O-H bond in water is greater than the energy needed to break the second O-H bond:
H2O (g) H (g) + OH (g) ΔH = 502 kJ/mol
OH (g) H (g) + O (g) ΔH = 427 kJ/mol
The structure of the molecule is different after the first O-H bond is broken, so it is not too surprising that the enthalpy change in breaking the second O-H bond is also different.
Note that this also means that the bond energy for the O-H bond in water is different than the bond energy for the O-H bond in, say, methanol (CH3OH) or hydrogen peroxide (H2O2) etc.
For polyatomic molecules, we usually only refer to the average bond energy for a particular bond.
Bond Enthalpies
H2O (g) H (g) + OH (g) Hº = 502 kJ/mol
OH (g) H (g) + O (g) Hº = 427 kJ/mol
Average OH bond energy = 502 + 427
2= 464 kJ/mol
Average O-H bond energy in water:
see page 386
ΔH values in red are for diatomic molecules
Bond Energies (BE) and Enthalpy changes in reactions
Since all reactions involve making and breaking chemical bonds, we can analyze the enthalpies of reactions by examining the enthalpy changes in breaking the bonds of the reactant molecules and forming the bonds among the product molecules.
This technique only gives an approximation of the actual enthalpy of reaction, since we are only using average bond energies, and seems to work best when ΔHrxn > 100 kJ/mol.
Where
ΣBE (react) = bond energy in breaking reactants’ bonds ΣBE (prod) = bond energy in forming product bonds
ΔHº = total energy input – total energy released
ΔHº = BE(reactants) – BE(products)
Mathematically, we imagine a reaction proceeding by breaking all the bonds in the reactants and then using the gaseous atoms to form all the bonds in the products. Then:
Bond Energies and Enthalpy changes in Rxns
endothermic reaction exothermic reaction
Net ΔH
Net ΔH
Bond Energies and Enthalpy changes in Rxns
Example: Use bond energies to calculate the enthalpy change for:
H2 (g) + F2 (g) 2HF (g)
Hº = BE(reactants) – BE(products)
Type of bonds broken
Number of bonds broken
Bond energy (kJ/mol)
Energy change (kJ)
H H 1 436.4 436.4
F F 1 156.9 156.9
Type of bonds formed
Number of bonds formed
Bond energy (kJ/mol)
Energy change (kJ)
H F 2 568.2 1136.4
Hº = ( 436.4 + 156.9 ) – (2 x 568.2 ) = -543.1 kJ