Two SHM are represented by equations `x_1=4sin(omega t+37°)` and `x_2=5cos(omega t)`. The phase difference between them is

Two SHM's are represented by y = a sin (omegat - kx) and y = b cos (omegat - kx) . The phase difference between the two is :

Assume x_1 = A Sin(omega t) and x_2 = A Cos (omega t + π/6) . The phase difference between x_1 and x_2 is

Two simple harmonic motion are represented by equations y_(1) = 4 sin (10 t + phi) rArr y_(2) = 5 cos 10t What is the phase difference between their velocities ?

Two waves are represented by the equations y_(1)=a sin (omega t+kx+0.785) and y_(2)=a cos (omega t+kx) where, x is in meter and t in second The phase difference between them and resultant amplitude due to their superposition are

Two waves are represented by the equations y_(1)=asin(omegat+kx+0.57)m and y_(2)=acos(omegat+kx) m, where x is in metres and t is in seconds. The phase difference between them is

if x = a sin (omegat + pi//6) and x' = a cos omega , t, then what is the phase difference between the two waves

Equations of a stationary and a travelling waves are as follows y_(1) = sin kx cos omega t and y_(2) = a sin ( omega t - kx) . The phase difference between two points x_(1) = pi//3k and x_(2) = 3 pi// 2k is phi_(1) in the standing wave (y_(1)) and is phi_(2) in the travelling wave (y_(2)) then ratio phi_(1)//phi_(2) is

The displacement of two identical particles executing SHM are represented by equations x_(1) = 4 sin (10t+(pi)/(6)) & x_(2) = 5 cos (omegat) For what value of • , energy of both the particles is same.

The displacement of two identical particles executing SHM are represented by equations. x_(1) = 4sin(10t+pi/6) and x_(2)=5cosepsilont For what value of epsilon energy of both the particles is same?

If i_(1)=3 sin omega t and (i_2) = 4 cos omega t, then (i_3) is