The amplitude of a wave represented by displacement equation `y=(1)/(sqrt(a)) sin omega t +-(1)/(sqrt(b)) cos omega t ` will be

The resultant intensity after interference of two coherent waves represented by the equation Y_(1)=a_(1)sin omega t and Y_(2)=a_(2)sin((pi)/(2)-omega t) will be proportional to

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

The displacement of a particle is represented by the equation y = sin^3 omega t . The motion is

Two wave are represented by equation y_(1) = a sin omega t and y_(2) = a cos omega t the first wave :-

The displacement of a particle is represented by the equation y= sin^(3) omega t . The motion is………..

Two simple harmonic motion are represrnted by the following equation y_(1) = 40 sin omega t and y_(2) = 10 (sin omega t + c cos omega t) . If their displacement amplitudes are equal, then the value of c (in appropriate units) is

Two simple harmonic motion are represrnted by the following equation y_(1) = 40 sin omega t and y_(2) = 10 (sin omega t + c cos omega t) . If their displacement amplitudes are equal, then the value of c (in appropriate units) is

Two simple harmonic motion are represrnted by the following equation y_(1) = 40 sin omega t and y_(2) = 10 (sin omega t + c cos omega t) . If their displacement amplitudes are equal, then the value of c (in appropriate units) is

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)=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