Question

All formulae in oscillation chapter physics.​

Answer 1

Answer:

Formulae

 

Relation Between Variables Of Oscillationσ = 2Πν = 

 

Force Exerted By A Spring With Constant KF = - kx

 

Differential Equation Describing Simple Harmonic Motion + x = 0

 

Formula For The Period Of A Mass-Spring SystemT = 2Π

 

Formula For The Frequency Of A Mass-Spring Systemν = 

 

Formula For The Angular Frequency Of A Mass-Spring Systemσ = 

 

Equation For The Displacement In Simple Harmonic Motionx = xmcos(σt)

 

Equation For The Velocity In Simple Harmonic Motionv = σxmsin(σt)

 

Equation For The Acceleration In Simple Harmonic Motiona = σ2xmcos(σt)

 

Equation For The Potential Energy Of A Simple Harmonic SystemU = kx2

 

Equation For The Torque Felt In A Torsional Oscillatorτ = - κσ

 

Equation For Angular Displacement Of A Torsional Oscillatorθ = θmcos(σt)

 

Equation For The Period Of A Torsional OscillatorT = 2Π

 

Equation For The Angular Frequency Of A Torsional Oscillatorσ = 

 

Equation For The Force Felt By A PendulumF = mg sinθ

 

Approximation Of The Force Felt By A PendulumF - ()x

 

Equation For The Period Of A PendulumT = 2Π

 

Differential Equation Describing Damped Motionkx + b + m = 0

 

Equation For The Displacement Of A Damped Systemx = xmecos(σâ≤t)

 

Equation For The Angular Frequency Of A Damped Systemσâ≤ =