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Lecture 24
General Physics (PHY 2130)
http://www.physics.wayne.edu/~apetrov/PHY2130/
Solids and fluids Fluids in motion
Oscillations Simple harmonic motion
Lightning Review
Last lecture: 1. Solids and fluids
different states of matter; fluids density, pressure, etc.
Review Problem: A piece of metal is released under water. The volume of the metal is 50.0 cm3 and its specific gravity is 5.0. What is its initial acceleration? (Note: when v = 0, there is no drag force.)
3
Example: A piece of metal is released under water. The volume of the metal is 50.0 cm3 and its specific gravity is 5.0. What is its initial acceleration? (Note: when v = 0, there is no drag force.)
FBD for the metal mawFF B ==
VgFB water=
The magnitude of the buoyant force equals the weight of the fluid displaced by the metal.
Solve for a:
=== 1
objectobject
water
objectobject
water
VVgg
VVgg
mFa B
Idea: apply Newtons 2nd Law to the piece of metal:
x
y
w
FB
4
Since the object is completely submerged V=Vobject.
water
gravity specific
=
where water = 1000 kg/m3 is the density of water at 4 C.
Given 0.5gravity specificwater
object ==
2
objectobject
water m/s 8.710.5
11..
11
=
=
=
= g
GSg
VVga
Example continued:
5
Fluid Flow
A moving fluid will exert forces parallel to the surface over which it moves, unlike a static fluid. This gives rise to a viscous force that impedes the forward motion of the fluid.
A steady flow is one where the velocity at a given point in a fluid is constant. Steady flow is laminar; the fluid flows in layers.
V1 = constant
V2 = constant
v1v2
An ideal fluid is incompressible, undergoes laminar flow, and has no viscosity.
Fluids in Motion: Streamline Flow Streamline flow
every particle that passes a particular point moves exactly along the smooth path followed by particles that passed the point earlier
also called laminar flow Streamline is the path
different streamlines cannot cross each other the streamline at any point coincides with the direction of fluid
velocity at that point
Fluids in Motion: Turbulent Flow The flow becomes irregular
exceeds a certain velocity any condition that causes abrupt changes in velocity
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The amount of mass that flows though the cross-sectional area A1 is the same as the mass that flows through cross-sectional area A2.
Equation of Continuity
AvtV=
is called the volume flow rate (units m3/s)
8
is the mass flow rate (units kg/s) Avtm
=
222111 vAvA =The continuity equation is
If the fluid is incompressible, then 1= 2.
9
Example: A garden hose of inner radius 1.0 cm carries water at 2.0 m/s. The nozzle at the end has radius 0.20 cm. How fast does the water move through the constriction?
( ) m/s 50m/s 0.2cm 0.20
cm 0.1 2
122
21
12
12
2211
=
=
=
=
=
vrrv
AAv
vAvA
Oscillations Simple Harmonic Motion
Recall: Hookes Law Fs = - k x
Fs is the spring force k is the spring constant
It is a measure of the stiffness of the spring A large k indicates a stiff spring and a small k indicates a soft spring
x is the displacement of the object from its equilibrium position
The negative sign indicates that the force is always directed opposite to the displacement
The force always acts toward the equilibrium position It is called the restoring force
Hookes Law Applied to a Spring Mass System
When x is positive (to the right), F is negative (to the left)
When x = 0 (at equilibrium), F is 0
When x is negative (to the left), F is positive (to the right)
Example: two springs The springs 1 and 2 in Figure have spring constants of 40.0 N/cm and 25.0 N/cm, respectively. The object A remains at rest, and both springs are stretched equally. Determine the stretch.
Motion of the Spring-Mass System Assume the object is initially pulled to x = A and released from rest
As the object moves toward the equilibrium position, F and a decrease, but v increases
At x = 0, F and a are zero, but v is a maximum The objects momentum causes it to overshoot the equilibrium position
The force and acceleration start to increase in the opposite direction and velocity decreases
The motion continues indefinitely
Simple Harmonic Motion Motion that occurs when the net force along the direction of motion is a Hookes Law type of force The force is proportional to the displacement and in the
opposite direction The motion of a spring mass system is an example of Simple Harmonic Motion
Not all periodic motion over the same path can be considered Simple Harmonic motion
To be Simple Harmonic motion, the force needs to obey Hookes Law
Amplitude, Period and Frequency Amplitude, A
The amplitude is the maximum position of the object relative to the equilibrium position
In the absence of friction, an object in simple harmonic motion will oscillate between A on each side of the equilibrium position
The period, T, is the time that it takes for the object to complete one complete cycle of motion From x = A to x = - A and back to x = A
The frequency, , is the number of complete cycles or vibrations per unit time
Acceleration of an Object in Simple Harmonic Motion
Newtons second law will relate force and acceleration
The force is given by Hookes Law
F = - k x = m a or a = -kx / m
The acceleration is a function of position Acceleration is not constant and therefore the uniformly
accelerated motion equation cannot be applied
Elastic Potential Energy The energy stored in a stretched or compressed spring or other elastic material is called elastic potential energy
PEs = kx2
The energy is stored only when the spring is stretched or compressed
Elastic potential energy can be added to the statements of Conservation of Energy and Work-Energy
Energy in a Spring Mass System
Consider a situation:
1. A block sliding on a frictionless system collides with a light spring
2. The block attaches to the spring
Energy Transformations
The block is moving on a frictionless surface The total mechanical energy of the system is the kinetic energy of the block
Energy Transformations, 2
The spring is partially compressed The energy is shared between kinetic energy and elastic
potential energy The total mechanical energy is the sum of the kinetic energy
and the elastic potential energy
Energy Transformations, 3
The spring is now fully compressed The block momentarily stops The total mechanical energy is stored as elastic potential energy of the spring
Energy Transformations, 4
When the block leaves the spring, the total mechanical energy is in the kinetic energy of the block
The spring force is conservative and the total energy of the system remains constant
Velocity as a Function of Position Conservation of Energy allows a calculation of the velocity of the object at any position in its motion
Speed is a maximum at x = 0 Speed is zero at x = A The indicates the object can be traveling in either
direction
( )22 xAmkv =
25
When a mass-spring system is oriented vertically, it will exhibit SHM with the same period and frequency as a horizontally placed system.
A Vertical Mass and Spring
At equilibrium position (b)
0=+= mgkdFy
)(, ydkF yspring =
kymgkykdmgydkFy === )(
At (c), displaced the equilibrium by y
kyFy =
Example: oscillator A block of mass 1.00 kg is attached to a spring with a spring constant of 30.0 N/m, which is stretched 0.200 m from its equilibrium position. How much work must be done to stretch it an additional 0.100 m? What maximum speed will the block attain if the system is then let go?
Simple Harmonic Motion and Uniform Circular Motion A ball is attached to the rim of a turntable of radius A
The focus is on the shadow that the ball casts on the screen
When the turntable rotates with a constant angular speed, the shadow moves in simple harmonic motion
Period and Frequency from Circular Motion
Period
This gives the time required for an object of mass m attached to a spring of constant k to complete one cycle of its motion
Frequency
Units are cycles/second or Hertz, Hz The angular frequency is related to the frequency
km2T =
mk
21
T1
==
mk2 ==
Motion as a Function of Time
Use of a reference circle allows a description of the motion
x = A cos (2t) x is the position at time t x varies between +A and -A
Graphical Representation of Motion
When x is a maximum or minimum, velocity is zero
When x is zero, the velocity is a maximum
When x is a maximum in the positive direction, a is a maximum in the negative direction
Verification of Sinusoidal Nature
This experiment shows the sinusoidal nature of simple harmonic motion
The spring mass system oscillates in simple harmonic motion
The attached pen traces out the sinusoidal motion
32
Example: The period of oscillation of an object in an ideal mass-spring system is 0.50 sec and the amplitude is 5.0 cm. What is the speed at the equilibrium point?
Idea: lets use energy conservation: at equilibrium x = 0:
222
21
21
21 mvkxmvUKE =+=+=
Since E=constant, at equilibrium (x = 0) the KE must be a maximum.
Thus, v = vmax = A.
( )( ) cm/sec 8.62rads/sec 6.12cm 5.0 and
rads/sec 6.12s 50.0
22
===
===
Av
T