A harmonic oscillation is represented by y=0.34 cos (3000t+0.74), where y and t are in mm and s respectively. Deduce (i) and amplitude (ii) the frequency and angular frequency (iii) the period and (iv) the intial phase.

A harmonic oscillation is represented by y = 0.34 cos(3000 t + 0.74) where y and t are in mm and second respectively. Deduce amplitude, frequency and angular frequency, time period and intianl phase.

A harmonic osillator is represented by y=0.5cos (1500pi t+0.8) where 'y' and 't' are in 'm' and 's' respectively. Calculate (i) amplitude, (ii) frequency, (iii) angular frequency, (iv) period (v) intial phase or epoch of the particle

A harmonic osciallation is represented by x=0.25 cos ( 6000t + 0.85) ,where x and t are in mm and second respectively . Deduce (i) amplitude , (ii) frequency (iii) angular frequency Hint : Compare with x= A cos ( omega t + phi) a is amplitude frequency , v = ( omega)/(2pi) , omega = 6000 rad s^(-1)

A harmonic osciallation is represented by x=0.25 cos ( 6000t + 0.85) ,where x and t are in mm and second respectively . Deduce (i) amplitude , (ii) frequency (iii) angular frequency Hint : Compare with x= A cos ( omega t + phi) a is amplitude frequency , v = ( omega)/(2pi) , omega = 6000 rad s^(-1)

A simple harmonic oscillation is represented by the equation y=5sin(100pi t+0.8) , when y and t are in metre and second respectively. Write down its amplitude, angular frequency, frequency time period and initial phase.

A harmonic osillator is represented by y=0.5cos (1500pi t+0.8) where 'y' and 't' are in 'm' and 's' respectively. Calculate intial phase or epoch of the particle

A simple harmonic oscillation is represented by the equation. y=0.40sin(440t+0.61) Here y and t are in m are s respectively. What are the values of (i) amplitude (ii) angular frequency (iii) frequency of oscillations (iv) time period of oscillations and (v) initial phase?