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Transcript
Chapter 12
Oscillatory Motion
2
12.1 Periodic Motion

Periodic motion is motion of an object that
regularly repeats


The object returns to a given position after a fixed
time interval
A special kind of periodic motion occurs in
mechanical systems when the force acting on
the object is proportional to the position of the
object relative to some equilibrium position

If the force is always directed toward the
equilibrium position, the motion is called simple
harmonic motion
3
Motion of a Spring-Mass
System


A block of mass m is
attached to a spring, the
block is free to move on
a frictionless horizontal
surface
When the spring is
neither stretched nor
compressed, the block
is at the equilibrium
position

x=0
Fig 12.14
Hooke’s Law

Hooke’s Law states Fs = - k x

Fs is the linear restoring force




It is always directed toward the equilibrium
position
Therefore, it is always opposite the
displacement from equilibrium
k is the force (spring) constant
x is the displacement
5
More About Restoring Force

The block is
displaced to the
right of x = 0


The position is
positive
The restoring force
is directed to the left
Fig 12.1(a)
6
More About Restoring Force,
2

The block is at the
equilibrium position



x=0
The spring is neither
stretched nor
compressed
The force is 0
Fig 12.1(b)
7
More About Restoring Force,
3

The block is
displaced to the left
of x = 0


The position is
negative
The restoring force
is directed to the
right
Fig 12.1(c)
8
Active Figure
12.1
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9
Acceleration

The force described by Hooke’s Law is
the net force in Newton’s Second Law
10
Acceleration, cont.



The acceleration is proportional to the
displacement of the block
The direction of the acceleration is opposite
the direction of the displacement from
equilibrium
An object moves with simple harmonic motion
whenever its acceleration is proportional to its
position and is oppositely directed to the
displacement from equilibrium
11
Acceleration, final

The acceleration is not constant


Therefore, the kinematic equations cannot be
applied
If the block is released from some position x = A,
then the initial acceleration is –kA/m


When the block passes through the equilibrium
position, a = 0


Its speed is zero
Its speed is a maximum
The block continues to x = -A where its
acceleration is +kA/m
12
Motion of the Block

The block continues to oscillate
between –A and +A



These are turning points of the motion
The force is conservative
In the absence of friction, the motion will
continue forever

Real systems are generally subject to
friction, so they do not actually oscillate
forever
13
12.2 Simple Harmonic Motion –
Mathematical Representation

Model the block as a particle
Choose x as the axis along which the
oscillation occurs
Acceleration

We let

Then a = -w2x


14
Simple Harmonic Motion –
Mathematical Representation, 2

A function that satisfies the equation is
needed


Need a function x(t) whose second
derivative is the same as the original
function with a negative sign and multiplied
by w2
The sine and cosine functions meet these
requirements
15
Simple Harmonic Motion –
Graphical Representation



A solution is x(t) =
A cos (wt + f)
A, w, f are all
constants
A cosine curve can
be used to give
physical
significance to
these constants
Fig 12.2
16
Active Figure
12.2
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17
Simple Harmonic Motion –
Definitions

A is the amplitude of the motion


w is called the angular frequency


This is the maximum position of the particle
in either the positive or negative direction
Units are rad/s
f is the phase constant or the initial
phase angle
18
Simple Harmonic Motion, cont




A and f are determined uniquely by the
position and velocity of the particle at t =
0
If the particle is at x = A at t = 0, then f
=0
The phase of the motion is the quantity
(wt + f)
x (t) is periodic and its value is the same
each time wt increases by 2p radians
19
Period

The period, T, is the time interval
required for the particle to go through
one full cycle of its motion

The values of x and v for the particle at
time t equal the values of x and v at t + T
20
Frequency

The inverse of the period is called the
frequency
The frequency represents the number of
oscillations that the particle undergoes
per unit time interval

Units are cycles per second = hertz (Hz)

21
Summary Equations – Period
and Frequency

The frequency and period equations
can be rewritten to solve for w

The period and frequency can also be
expressed as:
22
Period and Frequency, cont



The frequency and the period depend
only on the mass of the particle and the
force constant of the spring
They do not depend on the parameters
of motion
The frequency is larger for a stiffer
spring (large values of k) and decreases
with increasing mass of the particle
23
Motion Equations for Simple
Harmonic Motion

Remember, simple harmonic motion is
not uniformly accelerated motion
24
Maximum Values of v and a

Because the sine and cosine functions
oscillate between ±1, we can find the
maximum values of velocity and
acceleration for an object in SHM
25
Graphs

The graphs show:




(a) displacement as a function
of time
(b) velocity as a function of
time
(c ) acceleration as a function
of time
The velocity is 90o out of
phase with the displacement
and the acceleration is 180o
out of phase with the
displacement
Fig 12.3
26
Fig 12.4
27
Active Figure
12.4
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28
SHM Example 1




Initial conditions at t = 0
are
 x (0)= A
 v (0) = 0
This means f = 0
The acceleration reaches
extremes of ± w2A
The velocity reaches
extremes of ± wA
Fig 12.5(a)
29
SHM Example 2



Initial conditions at
t = 0 are
 x (0)=0
 v (0) = vi
This means f = - p/2
The graph is shifted
one-quarter cycle to
the right compared to
the graph of x (0) = A
Fig 12.5(b)
30
Fig 12.6
31
Active Figure
12.6
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32
Fig 12.7
33
Fig 12.8
34
35
36
37
38
39
40
41
42
43
12.3 Energy Considerations in
SHM

Assume a spring-mass system is moving on a
frictionless surface



This tells us the total energy is constant
The kinetic energy can be found by


K = 1/2 mv 2 = 1/2 mw2 A2 sin2 (wt + f)
The elastic potential energy can be found by


This is an isolated system
U = 1/2 kx 2 = 1/2 kA2 cos2 (wt + f)
The total energy is K + U = 1/2 kA 2
44
Energy Considerations in
SHM, cont



The total mechanical
energy is constant
The total mechanical
energy is proportional to
the square of the
amplitude
Energy is continuously
being transferred
between potential
energy stored in the
spring and the kinetic
energy of the block
Fig 12.9
45
Energy of the SHM Oscillator,
cont


As the motion
continues, the
exchange of energy
also continues
Energy can be used
to find the velocity
Fig 12.9
46
Active Figure
12.9
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47
Energy in SHM, summary
Fig 12.10
48
Active Figure
12.10
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49
50
51
52
53
54
12.4 Simple Pendulum


A simple pendulum also exhibits periodic motion
A simple pendulum consists of an object of mass
m suspended by a light string or rod of length L



The upper end of the string is fixed
When the object is pulled to the side and released, it
oscillates about the lowest point, which is the
equilibrium position
The motion occurs in the vertical plane and is driven
by the gravitational force
55
Simple Pendulum, 2

The forces acting on
the bob are and



is the force exerted
on the bob by the
string
is the gravitational
force
The tangential
component of the
gravitational force is a
restoring force
Fig 12.11
56
Active Figure
12.11
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57
Simple Pendulum, 3

In the tangential direction,

The length, L, of the pendulum is constant,
and for small values of q

This confirms the form of the motion is SHM
58
Small Angle Approximation

The small angle approximation states
that sin q  q


When q is measured in radians
When q is small


Less than 10o or 0.2 rad
The approximation is accurate to within about
0.1% when q is than 10o
59
Simple Pendulum, 4

The function q can be written as
q = qmax cos (wt + f)
The angular frequency is

The period is

60
Simple Pendulum, Summary



The period and frequency of a simple
pendulum depend only on the length of
the string and the acceleration due to
gravity
The period is independent of the mass
All simple pendula that are of equal
length and are at the same location
oscillate with the same period
61
62
63
12.5 Physical Pendulum

If a hanging object oscillates about a
fixed axis that does not pass through
the center of mass and the object
cannot be approximated as a particle,
the system is called a physical
pendulum


It cannot be treated as a simple pendulum
Use the rigid object model instead of the
particle model
64
Physical Pendulum, 2



The gravitational force
provides a torque about
an axis through O
The magnitude of the
torque is
mgd sin q
I is the moment of
inertia about the axis
through O
Fig 12.12
65
Physical Pendulum, 3



From Newton’s Second Law,
The gravitational force produces a
restoring force
Assuming q is small, this becomes
66
Physical Pendulum,4

This equation is in the form of an object
in simple harmonic motion
The angular frequency is

The period is

67
Physical Pendulum, 5

A physical pendulum can be used to
measure the moment of inertia of a flat
rigid object


If you know d, you can find I by measuring
the period
If I = md then the physical pendulum is
the same as a simple pendulum

The mass is all concentrated at the center
of mass
68
Fig 12.13
69
70
71
12.6 Damped Oscillations

In many real systems, nonconservative
forces are present



This is no longer an ideal system (the type
we have dealt with so far)
Friction is a common nonconservative
force
In this case, the mechanical energy of
the system diminishes in time, the
motion is said to be damped
72
Damped Oscillations, cont



A graph for a
damped oscillation
The amplitude
decreases with time
The blue dashed
lines represent the
envelope of the
motion
Fig 12.14(b)
73
Damped Oscillation, Example


One example of damped
motion occurs when an
object is attached to a
spring and submerged in a
viscous liquid
The retarding force can be
expressed as
where b is a constant

b is related to the resistive
force
Fig 12.14(a)
74
Damping Oscillation, Example
Part 2



The restoring force is – kx
From Newton’s Second Law
SFx = -k x – bvx = max
When the retarding force is small
compared to the maximum restoring
force, we can determine the expression
for x

This occurs when b is small
75
Damping Oscillation, Example,
Part 3

The position can be described by

The angular frequency will be
76
Damping Oscillation, Example
Summary



When the retarding force is small, the
oscillatory character of the motion is
preserved, but the amplitude decays
exponentially with time
The motion ultimately ceases
Another form for the angular frequency
where w0 is the angular
frequency in the
absence of the retarding
force
77
Active Figure
12.14
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78
Types of Damping



is also called the natural
frequency of the system
If Rmax = bvmax < kA, the system is said to be
underdamped
When b reaches a critical value bc such that
bc / 2 m = w0 , the system will not oscillate


The system is said to be critically damped
If b/2m > w0, the system is said to be
overdamped
79
Types of Damping, cont

Graphs of position versus
time for




(a) an underdamped oscillator
(b) a critically damped
oscillator
(c) an overdamped oscillator
For critically damped and
overdamped there is no
angular frequency
Fig 12.15
80
Active Figure
12.15
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81
12.7 Forced Oscillations


It is possible to compensate for the loss
of energy in a damped system by
applying an external force
The amplitude of the motion remains
constant if the energy input per cycle
exactly equals the decrease in
mechanical energy in each cycle that
results from resistive forces
82
Forced Oscillations, 2


After a driving force on an initially
stationary object begins to act, the
amplitude of the oscillation will increase
After a sufficiently long period of time,
Edriving = Elost to internal


Then a steady-state condition is reached
The oscillations will proceed with constant
amplitude
83
Forced Oscillations, 3

The amplitude of a driven oscillation is

w0 is the natural frequency of the
undamped oscillator
84
Resonance



When the frequency of the driving force
is near the natural frequency (w  w0) an
increase in amplitude occurs
This dramatic increase in the amplitude
is called resonance
The natural frequency w0 is also called
the resonance frequency of the system
85
Resonance, cont.




Resonance (maximum peak)
occurs when driving
frequency equals the natural
frequency
The amplitude increases
with decreased damping
The curve broadens as the
damping increases
The shape of the resonance
curve depends on b
Fig 12.16
86
1.8 Resonance in Structures

A structure can be considered an
oscillator


It has a set of natural frequencies,
determined by its stiffness, its mass, and
the details of its construction
A periodic driving force is applied by the
shaking of the ground during an
earthquake
87
Resonance in Structures


If the natural frequency of the building
matches a frequency contained in the
shaking ground, resonance vibrations can
build to the point of damaging or destroying
the building
Prevention includes


Designing the building so its natural frequencies
are outside the range of earthquake frequencies
Include damping in the building
88
Resonance in Bridges,
Example

Fig 12.17 The Tacoma Narrows Bridge was
destroyed because the vibration frequencies
of wind blowing through the structure
matched a natural frequency of the bridge
89