In damped oscillations, the amplitude is reduced to one-third of its initial value `a_(0)` at the end of 100 oscillations. When the oscillator completes 200 oscillations ,its amplitude must be

In dampled oscillation , the amplitude of oscillation is reduced to half of its initial value of 5 cm at the end of 25 osciallations. What will be its amplitude when the oscillator completes 50 oscillations ? Hint : A= A_(0) e^((-bt)/(2m)) , let T be the time period of oxcillation Case -I : (A_(0))/(2) = A_(0)e^(-bx(25T)/(2m)) or (1)/(2)= e^(-25(bT)/(2m)) ......(i) Case -II A=A_(0)e^(-bxx50(T)/(2m)) A _(0)(e^(-25(bT)/(2m)))^(2) Use euation (i) to find a .

When an oscillator completes 50 oscillations its amplitude reduced to half of initial value (A_0) . The amplitude of oscillation, when it completes 150 oscillations is

In the case of sustained force oscillations the amplitude of oscillations

When an oscillator completes 100 oscillations its amplitude reduced to (1)/(3) of initial values. What will be amplitude, when it completes 200 oscillations :

At resonance, the amplitude of forced oscillations is

Consider a damped oscillation due to air resistance. It is given that air resistance is directly proportional to velocity but in opposite direction. It us found that amplitude reduces to half in 20 oscillations. Whaat eill be amplitude when it completes 80 oscillations? (Initially amplitude is 15 cm)

A damped harmonic oscillator has a frequency of 5 oscillations per second . The amplitude drops to half its value for every 10 oscillation. The times it will take to drop to 1/(1000) of the original amplitude is close to:

If amplitude of velocity is V_0 then the velocity of simple harmonic oscillator at half of the amplitude is

State the numerical value of the frequency of oscillation of a seconds' pendulum. Does it depend on the amplitude of oscillation ?