Four waves are expressed as
1. `y_1=a_1 sin omega t`
2. `y_2=a_2 sin2 omega t`
3. `y_3=a_3 cos omega t`
4. `y_4=a_4 sin (omega t+phi)`
The interference is possible between

For different independent waves are represented by a) Y_(1)=a_(1)sin omega_(1)t , b) Y_(2)=a_(2) sin omega_(2)t c) Y_(3)=a_(3) sin omega_(3)t , d) Y_(4)=a_(4) sin(omega_(4)t+(pi)/(3)) The sustained interference is possible due to

Two SHM's are represented by y_(1) = A sin (omega t+ phi), y_(2) = (A)/(2) [sin omega t + sqrt3 cos omega t] . Find ratio of their amplitudes.

Four sound sources produce the following four waves (i) y_(1)=a sin (omega t+phi_(1)) (ii) y_(2)=a sin 2 omega t (iii) y_(3)= a' sin (omega t+phi_(2)) (iv) y_(4)=a' sin (3 omega t+phi) Superposition of which two waves gives rise to interference?

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

Four simple harmonic vibrations y_(1)=8 sin omega t , y_(2)= 6 sin (omega t+pi//2) , y_(3)=4 sin (omega t+pi) , y_(4)=2sin(omegat+3pi//2) are susperimposed on each other. The resulting amplitude and phase are respectively.

In y= A sin omega t + A sin ( omega t+(2 pi )/3) match the following table.

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

x_(1) = 5 sin omega t x_(2) = 5 sin (omega t + 53^(@)) x_(3) = - 10 cos omega t Find amplitude of resultant SHM.

x_(1) = 5 sin omega t x_(2) = 5 sin (omega t + 53^(@)) x_(3) = - 10 cos omega t Find amplitude of resultant SHM.

A particule moves in x - y plane acording to rule x = a sin omega t and y = a cos omega t . The particle follows