Two parallel S.H.M.s have equations `y_1=A_1sin(omegat+2pi)` and `y_2=A_2sin(omega/t+4pi)`. The amplitude of the resultant motion is

A particle is subjected to SHM as given by equation x_1=Asinomegat and x_2=A_2sin(omegat+(pi)/(3)) . The maximum acceleration and amplitude of the resultant motion are a_(max) and A , respectively Then.

Two S.H.M.s along the same straight line in the same direction and of the same period are given by the equations, x_1=3" "sin(4pit+pi/6) and x_2=4" " sin(4pit+pi/3) . The initial phase of the resultant motion is

The equation of simple harmonic motion of two particle is x_1=A_1" "sin" "omegat and x_2=A_2" "sin(omegat+prop) . If they superimpose, then the amplitude of the resultant S.H.M. will be

The displacement of two interfering light waves are given by y_(1)=3 sinomegat,y_(2)=4 sin(omegat+pi//2) . The amplitude of the resultant wave is

(a) A particle is subjected to two simple harmonic motions x_1=A_1sin omegat and x_2=A_2 sin (omegat+pi//3) . Find (i) the displacement at t=0 , (ii) the maximum speed of the particle and (iii) the maximum acceleration of the particle. (b) A particle is subjected to two simple harmonic motions, one along the x-axis and the other on a line making an angle of 45^@ with the x-axis. The two motions are given by xy=x_0sinomegat and s=s_0sin omegat Find the amplitude of the resultant motion.

On the superposition of the two waves given as y_1=A_0 sin( omegat-kx) and y_2=A_0 cos ( omega t -kx+(pi)/6) , the resultant amplitude of oscillations will be

The S.H.M. of a particle is given by the equation y=3 sin omegat + 4 cosomega t . The amplitude is

Two waves are represented by the equations y_1=a sin omega t and y_2=a cos omegat . The first wave

two waves y_1 = 10sin(omegat - Kx) m and y_2 = 5sin(omegat - Kx + π/3) m are superimposed. the amplitude of resultant wave is

The displacement of the interfaring light waves are y_1 =4 sin omega t and y_2=3sin (omegat +(pi)/( 2)) What is the amplitude of the resultant wave?