The amplitude of a damped oscillator becomes `((1)/(3))^(rd)` in 2 second. If its amplitude after 6 second is `(1)/(n)` times the original amplitude, the value of n is :-

The amplitude of damped oscillator becomes 1/3 in 2s . Its amplitude after 6s is 1//n times the original. The value of n is

The amplitude of a damped oscillator becomes half in one minutes. The amplitude after 3 minutes will be 1/x times of the original . Determine the value of x.

The amplitude (A) of damped oscillator becomes half in 5 minutes. The amplitude after next 10 minutes will be

The amplitude of a S.H.O. reduces to 1/3 in first 20 secs. then in first 40 sec. its amplitude becomes -

The amplitude of a damped oscillator decreases to 0.9 times ist oringinal magnitude in 5s , In anothet 10s it will decrease to α times its original magnitude, where α equals to .

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

The amplitude of (-2)/(1+isqrt(3)) is

Amplitude of a damped oscillator decreases up to 0.6 times of its initial value in 5 seconds. In next 10 seconds, it decreases upto 'alpha' times of its intial value where 'alpha' is equal to ?

The amplitude of a particle in damped oscillation is given by A=A_0e^(-kt) where symbols have usual meanings if at time t=4s,the amplitude is half of initial amplitude then the amplitude is 1/8 of initial value t=

Amplitude of a swing decreases to 0.5 times its original magnitude in 4s due to damping by air friction. Its amplitude becomes how many times of the original magnitude in another 8s?