Unit 5 Gravitation - pnhs.psd202.orgpnhs.psd202.org/documents/msusnis/1516801370.pdf · The...
Transcript of Unit 5 Gravitation - pnhs.psd202.orgpnhs.psd202.org/documents/msusnis/1516801370.pdf · The...
Unit 5Gravitation
• Newton’s Law of Universal Gravitation
• Kepler’s Laws of Planetary Motion
Into to Gravity Phet Simulation
Today: Make sure to collect all data.Finished lab due tomorrow!!
Universal Law of Gravitation
Developed by Isaac Newton
All objects attract each other through gravitational force.
Depends on the masses of the objects and the distance between them• Gravity increases when mass increases
• Gravity decreases when distance increases
Both objects will feel the same force
Universal Law of Gravitation: Relationships
•Gravity and distance: Inversed squared
distance
Universal Law of Gravitation: Relationships
•Gravity and mass: Direct
The gravitational force of attraction between two objects would be increased by:
A. Doubling the mass of both objects only
B. Doubling the distance between the objects only
C. Doubling the mass of both objects and doubling the distance between the objects
D. Doubling the mass of one object and doubling the distance between the objects
Answer: A
Law of Gravitation Practice
• The gravitational force between two objects is 50N. If the distance between the objects is cut in half, what happens to the force?
200 N (quadruples)
• The gravitational force between two objects is 50N. If the mass of each object is tripled, what happens to the force?
450 N (50 x3 x3)
Law of Gravitation Practice
Law of Gravitation Practice
Draw a graph that represents the gravitational force F that a rocket experiences as it
travels a distance D away from the surface of the Earth.
Law of Gravitation Practice
A 72 kg woman stands on top of a very tall ladder so she is one Earth radius above Earth's surface (double the distance she normally is)
Step 1: Figure out her normal weight on the surface of the Earth:
Step 2: Gravity and distance have an inverse squared relationship so if she is double the distance away the force of gravity is 1/4 th as strong. So divide her normal weight by 4.
Law of Gravitation Practice
A rocket moves away from the surface of Earth. As the distance r from the
center of the planet increases, what happens to the force of gravity on the rocket?
A. The force increases directly proportional to r
B .The force increases directly proportional to 𝑟2
C. The force doesn’t change
D. The force becomes zero after the rocket loses the contact with Earth
E. The force decreases inversely proportional to 1𝑟2
Universal Law of Gravitation Calculations
• The relationship between gravity, mass and distance can be calculated using the below equation:
Where:
F = gravitational force mB = mass of second object
G = gravitational constant mA = mass of first object
d = distance between the two objects
Law of Gravitation PracticeTwo spherical objects have masses of 200 kg and 500 kg. Their centers are separated by a distance of 25 m. Find the gravitational attraction between them.
Law of Gravitation PracticeTwo spherical objects have masses of 3.1 x 105 kg and 6.5 x 103 kg. The gravitational attraction between them is 65 N. How far apart are their centers?
Law of Gravitation PracticeA 1 kg object is located at a distance of 6.4 x106 m from the center of a larger object whose mass is 6.0 x 1024 kg.
• What is the size of the force acting on the smaller object? 9.8N
• What is the size of the force acting on the larger object?
Newton’s Third Law – the forces are equal so the answer is 9.8N
Law of Gravitation Formula Rearrangement
If we know the gravitational force between two objects that have the same mass, how can we rearrange our equation to solve for those masses?
• 𝑛𝑒𝑒𝑑 𝑡𝑜 𝑠𝑜𝑙𝑣𝑒 f𝑜𝑟 𝑡ℎ𝑒 𝑚𝑎𝑠𝑠𝑒𝑠:
𝑚a x 𝑚b = 𝑚2
𝐹 = 𝐺𝑚2
Fd2 = Gm2
Fd2 = m2
𝑚 = 𝐹d2
G
d2
G
What is gravity?
•What do you think gravity is?
•What do you think causes gravity?
•Is gravity a push/pull force?
Gravity: From Newton to Einstein
Relationships that affect Gravity
•More mass = greater gravity
• Same mass in smaller radius = greater gravity
Why do you think that is?
General Relativity
•Why do more dense things create a stronger gravity?• They create a deeper bend in the fabric of space-time
• “Space tells masses how to move and masses tell space how to curve/bend”
General Relativity• Gravity is not a pulling force, but instead a warping of space-time
which creates “dimples” that objects “fall” into
• Too much mass in too small an area, the warping causes a black hole!
General Relativity
Relationships that affect Gravity
•Mass & Gravity = Direct relationship
Relationships that affect Gravity•Gravity & Radius = Inverse Squared Relationship
Radius Size
Gra
vita
tio
nal
Str
engt
h
Calculating Acceleration Due to Gravity
• Use the formula below to calculate the acceleration due to gravity created by any mass:
**where G is the same gravitational constant used before, m is the
mass of the object and r is the radius of the object**
d
Calculating Gravity Practice
• Jupiter’s mass is hundred’s of times that of the Earth. Why is the acceleration due to gravity on that planet only 3x that of Earth? • Jupiter is much bigger/less dense
Compute g at a distance of 4.5 x 107m from the center of a spherical object whose mass is 3.0 x 1023 kg.
d
Kepler’s Laws of Planetary Motion
• 1st Law: Law of Ellipses
• 2nd Law: Law of Equal Areas
• 3rd Law: Law of Periods
Kepler’s 1st Law
• The orbits of the planets are elliptical (not circular) with the Sun at one focus of the ellipse.
Kepler’s 1st Law
• The further a planet is from the sun the more “flattened” the ellipse will be
Kepler’s 2nd Law• Law of equal areas
• Planets move faster closer to the sun, slower further away, but over the same period of time, the area of the circle will be equal
Kepler’s 3rd Law
• Shows the relationship between the distance of planets from the Sun, and their orbital periods.
• Further away = longer time it takes to make one orbit around the sun
Kepler’s 3rd Law• Relationships:
• Distance and Velocity: Direct
• Distance and Period: Inverse Squared
Keplers 3rd Law: Part 1
• The Law of Periods: The square of the period of any planet is proportional to the cube of the planets distance from the sun.
•T2 r3
T = Period of the object• Period is the time it takes for the object to orbit the sun
• Measured in years
r = distance to the sun• Measured in au
(astronomical units=distance from Earth to Sun=1.50 x 1011 m)
Kepler’s 3rd Law PracticeAn asteroid is found and its distance from the Sun is measured to be 4 A.U. What is the period of its orbit round the Sun?
T in years and r in AU
Since T = 4 A.U
T2 = r3
T2 =(4)3
T2 = 64
So T = 8 years.
Kepler’s 3rd Law: Part 1• If you plot the ratio of T2 = r3 values for objects in the solar system you get the
below graph
• Straight slope indicates that the ratio of T2 = r3 is the same for all bodies in orbit.
Kepler’s 3rd Law: Part 1
What would happen if we drew in the moons orbiting different planets?
Why?
Kepler’s 3rd Law: Part 2
• In order to compare objects orbiting a different object than the sun, we must use a ratio:
Doesn’t matter what the units are as long as they match!
Kepler’s 3rd Law PracticeBased on the below chart what is the orbital period of Phobos around Mars?
Need to compare to another satellite of Mars
Compare Phobos and Deimos
(x/1.262)2 = (9.38/23.46)3
Kepler’s 3rd Law PracticeBased on the below chart what is the orbital period of Janis around Saturn?
Need to compare to another satellite of Saturn
Compare Janis and Mimas
(x/0.942)2 = (151.47/185.54)3
Kepler’s Review• Use the diagram below to explain how and why a planet’s
speed changes as it travels around its sun. Think about when a planet travels faster/slower in its orbit.