SHM revision

Question 1

What is the period of oscillation?

Answer 1

The time for one complete cycle of oscillation.

Question 2

If a trolley is at equilibrium attached to two springs, when pushed in one direction, what will the trolley do and why?

Answer 2

It will accelerate toward the equilibrium point. The extended spring provides a restoring force.

Question 3

Define a free oscillator

Answer 3

Oscillations where there is no periodic force acting on the system

Question 4

Define a forced oscillator

Answer 4

A system is forced to oscillate by an external periodic force

Question 5

For an object undergoing SHM where does it have the greatest velocity?

Answer 5

At the equilibrium position

Question 6

For an object undergoing SHM where does it have zero velocity?

Answer 6

At the amplitudes

Question 7

For an object undergoing SHM where does it have the greatest acceleration?

Answer 7

At the amplitudes

Question 8

For an object undergoing SHM where does it have the least acceleration?

Answer 8

At the equilibrium point

Question 9

State the two conditions required for SHM

Answer 9

1. Acceleration always directed towards the equilibrium position 2. The acceleration is proportional to the displacement of the object from the equilibrium position

Question 10

What is the relationship between displacement and frequency for a shm oscillator?

Answer 10

They are independent. As displacement increases the accelerations increases. This increases the average velocity which cancels out the additional distance the oscillator needs to travel

Question 11

What is the relationship between mass and frequency for a shm oscillator?

Answer 11

As mass increases the accelerations decreases (F=ma).

the lower acceleration causes a lower average velocity.

This means time period will increase and from

f = 1/T then frequency will decrease

Question 12

What is the relationship between spring constant and frequency for a shm oscillator?

Answer 12

As spring constant increases the resting force increases (F=ke).

This causes a larger acceleration (F = ma)

which means the average velocity will be greater.

The will reduced the time period and

increase the frequency (f = 1/T)

Question 13

Describe the displacement against time graph for an oscillator starting at the right hand side amplitude

Answer 13

Sin (x)

Question 14

Describe the velocity against time graph for an oscillator starting at the right hand side amplitude

Answer 14

cos (x)

Question 15

Describe the acceleration against time graph for an oscillator starting at the right hand side amplitude

Answer 15

-sin (X)

Question 16

What function should your calculator be in when using the displacement equation

Answer 16

Radians

Question 17

Describe the acceleration against displacement graph for a SHM oscillator

Answer 17

A straight line through the origin with a negative gradient

Question 18

What can be found from the gradiant of a graph of acceleration vs dispacement?

Answer 18

(2πf)²

Question 19

Describe the velocity against displacement graph for a SHM oscillator

Answer 19

A circle with the origin as the mid point

Question 20

Describe the kinetic energy against displacement graph for a SHM oscillator

Answer 20

a n shape

Question 21

Describe the potential energy against displacement graph for a SHM oscillator

Answer 21

a u shape

Question 22

For a mass spring system plan a practical to prove the relationship between time period and mass

Answer 22

1. Vary the mass 8 times.
2. Measure the time period
3. Keep spring constant a control variable
4. make the experiment more accurate by repeat readings, timing for 10 oscillations and reduce parallax errors by keeping your eye level with the start and end of an oscillation
5. Plot a graph of T² against m.
6. Relationship is proven if the graph is a straight line through the origin.

Question 23

For a pendulum plan a practical to prove the relationship between time period and length

Answer 23

1. Vary the length 8 times.
2. Measure the time period
3. Keep mass of the pendulum bob a control variable
4. make the experiment more accurate by repeat reading, timing for 10 oscillations and reduce parallax errors by keeping your eye level with the start and end of an oscillation
5. Plot a graph of T² against l.
6. Relationship is proven if the graph is a straight line through the origin.

Question 24

What is damping?

Answer 24

The term used to describe the removal of energy from an oscillating system.

Question 25

How can you tell an oscillator is being damped?

Answer 25

It will be losing energy so the amplitude will be decreasing

Question 26

What are the four levels of damping?

Answer 26

1. Light
2. Heavy
3. Critical
4. over damped

Question 27

Describe light damping of a system

Answer 27

The system oscillates over a long time frame before coming to rest.

Energy is lost slowly.

The amplitude of the oscillations follow an exponential decay envelope.

Question 28

Describe Heavy damping

Answer 28

The system oscillates over a short time frame before coming to rest.

Energy is lost quickly.

The amplitude of the oscillations follow an exponential decay envelope.

Question 29

Describe critical damping

Answer 29

The oscillating system returns to the zero position of the oscillation after one quarter of a time period.

Does not affect frequency.

Doesn’t oscilate - it just stops when it first returns to the equilibrium position.

Question 30

Describe over damped

Answer 30

The oscillating system returns to zero over an extended time frame. (No discernible oscillation)

Question 31

Why does light and heavy damping take place within an exponential envelope?

Answer 31

At the start the oscillator has the maximum energy and maximum kinetic energy (as it passes through the mid point)

As the oscialltor is moving the quickest is has the largest value of air resistance.

The large air resistance cause energy to be lost quickly (gradient decreases quickly)

As the oscillator loses energy it slows down.

This means air resistance decreases and energy is lost as a slower rate. (gradient becomes less steep)

Question 32

What is natural frequency?

Answer 32

The frequency of free oscillations of an oscillating system.

Question 33

What are forced vibrations?

Answer 33

Making an object oscillate at a frequency that is not it’s natural frequency

Question 34

When does resonance occur?

Answer 34

When the driving force on the oscillation matches the natural frequency of the system.

Question 35

What is the outcome of resonance?

Answer 35

An increase in amplitude of the system’s oscillation.

Question 36

What is the effect of increasing damping on an oscillator that is resonating

Answer 36

1. the amplitude of vibrations at any frequency decreases
2. resonance occurs at a lower frequency
3. The peak becomes flatter and broader

Question 37

State some examples where resonance is useful

Answer 37

Microwaves heating water molecules

An antenna receiving a radio signal

Musical instruments

Question 38

State some examples where resonance is a nuisance

Answer 38

wind causing bridges to oscillate

Buildings during an earthquake

Question 39

State the phase relationship between the driving force and the object that is oscillating

Answer 39

Below resonance they are in phase with each other.

At resonance the phase relationship is 90^o or π/2 rad.

Above resonance the phase relationship is 180^o or π rad.

Question 40

Sand is placed on a surface oscillating up and down, explain why above a certain frequency, the sand loses contact with the surface (3)

Answer 40

When the vibrating surface accelerates down with an acceleration less than g, the sand stays in contact

Above a particular frequency, the acceleration is greater than g

There is no contact force on the sand