Damping (AQA A Level Physics)
Revision Note
Did this video help you?
Damping
In practice, all oscillators eventually stop oscillating
Their amplitudes decrease rapidly, or gradually
This happens due to resistive forces, such as friction or air resistance, which act in the opposite direction to the motion, or velocity, of an oscillator
Resistive forces acting on an oscillating simple harmonic system cause damping
These are known as damped oscillations
Damping is defined as:
The reduction in energy and amplitude of oscillations due to resistive forces on the oscillating system
Damping continues to have an effect until the oscillator comes to rest at the equilibrium position
A key feature of simple harmonic motion is that the frequency of damped oscillations does not change as the amplitude decreases
For example, a child on a swing can oscillate back and forth once every second, but this time remains the same regardless of the amplitude
Damping on a mass on a spring is caused by a resistive force acting in the opposite direction to the motion, or velocity. This continues until the amplitude of the oscillations reaches zero
Types of Damping
There are three degrees of damping depending on how quickly the amplitude of the oscillations decrease:
Light damping
Critical damping
Heavy damping
Light Damping
When oscillations are lightly damped, the amplitude does not decrease linearly
It decays exponentially with time
When a lightly damped oscillator is displaced from the equilibrium, it will oscillate with gradually decreasing amplitude
For example, a swinging pendulum decreasing in amplitude until it comes to a stop
A graph for a lightly damped system consists of oscillations decreasing exponentially
Key features of a displacement-time graph for a lightly damped system:
There are many oscillations represented by a sine or cosine curve with gradually decreasing amplitude over time
This is shown by the height of the curve decreasing in both the positive and negative displacement values
The amplitude decreases exponentially
The frequency of the oscillations remain constant, this means the time period of oscillations must stay the same and each peak and trough is equally spaced
Critical Damping
When a critically damped oscillator is displaced from the equilibrium, it will return to rest at its equilibrium position in the shortest possible time without oscillating
For example, car suspension systems prevent the car from oscillating after travelling over a bump in the road
The graph for a critically damped system shows no oscillations and the displacement returns to zero in the quickest possible time
Key features of a displacement-time graph for a critically damped system:
This system does not oscillate, meaning the displacement falls to 0 straight away
The graph has a fast decreasing gradient when the oscillator is first displaced until it reaches the x axis
When the oscillator reaches the equilibrium position (x = 0), the graph is a horizontal line at x = 0 for the remaining time
Heavy Damping
When a heavily damped oscillator is displaced from the equilibrium, it will take a long time to return to its equilibrium position without oscillating
The system returns to equilibrium more slowly than the critical damping case
For example, door dampers are used on doors to prevent them slamming shut
A heavy damping curve has no oscillations and the displacement returns to zero after a long period of time
Key features of a displacement-time graph for a heavily damped system:
There are no oscillations. This means the displacement does not pass zero
The graph has a slow decreasing gradient from when the oscillator is first displaced until it reaches the x axis
The oscillator reaches the equilibrium position (x = 0) after a long period of time, after which the graph remains a horizontal line for the remaining time
Worked Example
A mechanical weighing scale consists of a needle which moves to a position on a numerical scale depending on the weight applied. Sometimes, the needle moves to the equilibrium position after oscillating slightly, making it difficult to read the number on the scale to which it is pointing to. Suggest, with a reason, whether light, critical or heavy damping should be applied to the mechanical weighing scale to read the scale more easily.
Answer:
Ideally, the needle should not oscillate before settling
This means the scale should have either critical or heavy damping
Since the scale is read straight away after a weight is applied, ideally the needle should settle as quickly as possible
Heavy damping would mean the needle will take some time to settle on the scale
Therefore, critical damping should be applied to the weighing scale so the needle can settle as quickly as possible to read from the scale
Examiner Tips and Tricks
Make sure not to confuse resistive force and restoring force:
Resistive force is what opposes the motion / velocity of the oscillator and causes damping
Restoring force is what brings the oscillator back to the equilibrium position
You've read 0 of your 5 free revision notes this week
Sign up now. It’s free!
Did this page help you?