Post on 08-Mar-2018
Chapter 11 Sections 1 – 4
Fluids, Density, Pressure
What is a Fluid?
• Before we begin to understand the nature of a Fluid
we must understand the nature of all the states of
matter:
• The 3 primary states of matter:
• Solid: Definite shape and volume.
• Liquid: Takes the shape of its container, yet has
a definite volume.
• Gas: Takes the shape and volume of its container.
• Special "states”
• Plasma - high temperature matter, most common in the
universe, ionized gas, found in stars
A Fluid is:
• By definition, a fluid is any material that is unable to
withstand a static shear stress.
• Unlike an elastic solid which responds to a shear
stress with a recoverable deformation, a fluid
responds with an irrecoverable flow.
HOT AIR BALLOONS use
heated air, which is less dense
than the surrounding air, to
create an upward buoyant
force. According to Archi-
emedes’ Principle, the buoyant
force is equal to the weight of
the air displaced by the
balloon.
Fluids at Rest
Paul E. Tippens
Objectives
• Define and apply the concepts of density and fluid pressure to solve physical problems.
• Define and apply concepts of absolute, gauge, and atmospheric pressures.
Density • The 3 primary states have a distinct density,
which is defined as mass per unit of volume.
• Mass – material or matter in a body or “stuff”.
• Volume – The space an object takes up.
• Two ways to find volume:
• Measure the length, width, and height.
• L x w x h = volume
• Water displacement method – put in water and measure amount of water displaced or pushed out.
Mass Density
2 kg, 4000 cm3
Wood
177 cm3
45.2 kg
; mass m
Densityvolume V
Lead: 11,300 kg/m3
Wood: 500 kg/m3
4000 cm3
Lead
Same volume as the wood
2 kg Lead
Same mass as the wood
Demonstration of Density
• Density of water – 1 g = 1 ml = 1 cm3, so the density of water is 1 g/cm3 or 1000 kg/m3
• Normal wood block #2 – mass = 75 g, v = 3.8 x 3.8 x 8 cm = 115.5 cm3, Density = .65 g/cm3
• “Second “ Wood Block – m = 141 g, v = 4.3 x 4.3 x 7 cm = 129.4 cm3, Density = 1.1 g/ cm3.
• Which will Float in water?
Density of Each Coke
• πr 2h = volume of cylinder, Diameter = 6.5 cm/2 =
3.25 cm, height = 12 cm, so volume = 398.2 cm3.
Minus some of the top and bottom = ~ 380 cm3.
• Diet coke – mass = ~370 g, so Density = .974 g/
cm3.
• Regular coke – mass = ~390 g, so Density = 1.03 g/
cm3.
• From the data, what will happen when each is
put is a beaker of water?
Example 1: The density of steel is 7800 kg/m3. What is the volume of a 4-kg block of steel?
4 kg
3
4 kg;
7800 kg/m
m mV
V
V = 5.13 x 10-4 m3
What is the mass if the volume is 0.046 m3?
m = 359 kg
3m/kg7800
kg4
ρ
mV;
V
mρ
)m 046.0)(kg/m (7800 33 V m
Specific Gravity The relative density r of a material is the ratio of its density to the density of water (1000 kg/m3).
Steel (7800 kg/m3) r = 7.80
Brass (8700 kg/m3) r = 8.70
Wood (500 kg/m3) r = 0.500
Examples:
31000 kg/m
xr
Example Problem
2. A king orders a gold crown having a mass of
0.5 kg. When it arrives from the metal smith,
the volume of the crown is found to be
185 cm3. Is the crown made of gold, which
has a density of 19.3 x 103 kg/m3?
Pressure Pressure is the ratio of a force, F, to the area, A, over which it is applied:
Pressure ; Force F
PArea A
A = 2 cm2
1.5 kg
P = 73,500 N/m2
2
2
m .
)m/s kg)(9.8 .(
A
F P
00020
51
The Unit of Pressure (Pascal):
A pressure of one pascal (1 Pa) is defined as a
force of one newton (1 N) applied to an area of one
square meter (1 m2).
21 Pa = 1 N/mPascal:
In the previous example the pressure was 73,500
N/m2. This should be expressed as:
P = 73,500 Pa
Example Problem
3. A 50 kg woman balances on one heel of a
pair of high heel shoes. If the heel is circular
with radius 0.5 cm, what pressure does she
exert on the floor?
Example Problem
4. What must be the contact area between a
suction cup (completely exhausted) and a
ceiling in order to support the weight of an
80 kg student?
Fluid Pressure A liquid or gas cannot sustain a shearing stress - it is
only restrained by a boundary. Thus, it will exert a
force against and perpendicular to that boundary.
• The force F exerted by a
fluid on the walls of its
container always acts
perpendicular to the walls. Water flow shows perpendicular Flow
Fluid Pressure Fluid exerts forces in many directions. Try to submerse a
rubber ball in water to see that an upward force acts on
the float.
• Fluids exert pressure in
all directions.
F
Pressure vs. Depth in Fluid Pressure = force/area
h
mg Area
• Pressure at any point in a
fluid is directly proportional
to the density of the fluid
and to the depth in the fluid. P = gh
Fluid Pressure:
A
hgAp
A
Vg P So,
Ah V V; m ;A
mg P
Independence of Shape and Area.
Water seeks its own level,
indicating that fluid pressure
is independent of area and
shape of its container.
• At any depth h below the surface of the water
in any column, the pressure P is the same.
The shape and area are not factors.
Properties of Fluid Pressure
• The forces exerted by a fluid on the walls of its container are always perpendicular.
• The fluid pressure is directly proportional to the depth of the fluid and to its density.
• At any particular depth, the fluid pressure is the same in all directions.
• Fluid pressure is independent of the shape or area of its container.
Example 5. A diver is located 20 m below the surface of a lake ( = 1000 kg/m3). What is the pressure due to the water?
h = 1000 kg/m3
DP = gh
The difference in pressure
from the top of the lake to
the diver is:
h = 20 m; g = 9.8 m/s2
ΔP = 196 kPa
20m))(m/s (9.8)(1000kg/m P 23D
Atmospheric Pressure
atm atm h
Mercury
P = 0 One way to measure atmospheric
pressure is to fill a test tube with
mercury, then invert it into a bowl of
mercury.
Density of Hg = 13,600 kg/m3
Patm = ρgh h = 0.760 m
Patm = (13,600 kg/m3)(9.8 m/s2)(0.760 m)
Patm = 101,300 Pa
Absolute Pressure
Absolute Pressure: The sum of the
pressure due to a fluid and the pressure
due to atmosphere.
Gauge Pressure: The difference between
the absolute pressure and the pressure due
to the atmosphere:
Absolute Pressure = Gauge Pressure + 1 atm
h
DP = 196 kPa
1 atm = 101.3 kPa
ΔP = 196 kPa
1 atm = 101.3 kPa
Pabs = 196 kPa + 101.3 kPa
Pabs = 297 kPa
Atmospheric Pressure at sea level = 1.013 X 105 Pa = 101.3 kPa
= 760 mm Hg = 14.7 lb/in2 = 1 atmosphere
Example Problem
6. At what depth in a lake is the absolute
pressure equal to three times atmospheric
pressure?
Example Problem
7. If the fluid in the barometer is water, what
will be the height of the water column in the
vertical tube at atmospheric pressure?
Example Problem
8. The spring of a pressure gauge has a force
constant of 1000 N/m, and the piston has a
diameter of 2 cm. Find the depth in water
for which the spring compresses by 0.5 cm.
Assignment
• pages 350 – 352,
• #3, 6, 11, 14, 16, 21, 27