8: Oscillations Flashcards
Define simple harmonic motion
SHM is a motion where
the acceleration is directly proportional to its displacement and
the direction of acceleration is always opposite of its displacement
Imagine graph: (SHM)
1. Acceleration - displacement
2. Acceleration - time
3. Velocity - displacement
4. Energy - time
5. Energy - displacement
:’)
Formula for KE and PE, KE max
KE = 1/2 x (m) x (w^2) x (xmax^2 - x^2)
PE = 1/2 x (m) x (w^2) x (x^2)
KE max = 1/2 x (m) x (w^2) x (x max ^2)
What are the three types of forces that can exist in certain types of oscillations
Restoring Force
Resistive Force
Driving Force
What is a free oscillation?
- In free oscillation, there is only restoring force acting on the system
- Total energy is always constant
- Oscillation frequency = Natural Frequency
What is Damped Oscillation
- There are restoring and resistive force
- System loses energy until object comes to a stop
Imagine graphs:
1.Underdamped
2. Crticial damped
3. Over damped
- Amplitude decreasing, period remains constant
- Amplitude goes to zero before period
- Amplitude goes to zero after period
What is a Forced Oscillation
- There must be a driving force provide by an external oscillator
- Thus there is continuous energy input
- System oscillated at frequency of driver
Define Resonance
Resonance is the phenomenon in which there is maximum transfer of energy from driver to the oscillating system in a forced oscillation.
Imagine graph of:
amplitude and frequency of driver
1. Whose amplitude is it?
2. Where does resonance occur?
3. How would the graph be affected when there is increased resistive force?
4. How would the graph be affected when there is a change in natural frequency?
- Amplitude is of the oscillator
- Resonance occurs where amplitude is max - max amplitude explains the largest energy transfer
- The graph shifts down, however the peak remains at original resonant frequency
- The graph shifts left/right, however peak amplitude remains the same