[" (a) "10:8],[" (8.) Four independent waves are expressed as "],[" feren "hat y" (iii) "y_(3)=a_(1)cos omega t" and "],[" sermen the interference is possible between "]

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

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

Two coherent waves are represented by y_(1)=a_(1)cos_(omega) t and y_(2)=a_(2)sin_(omega) t. The resultant intensity due to interference will be

Two coherent waves are represented by y_(1)=a_(1)cos_(omega) t and y_(2)=a_(2)sin_(omega) t. The resultant intensity due to interference will be

If two independent waves are y_(1)=a_(1)sin omega_(1) and y_(2)=a_(2) sin omega_(2)t then

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

Four independent waves are expressed as y_(1)=a_(1)sinomegat." "y_(2)=a_(2)sin2omegat , y_(3)=a_(3)cosomegat," "y_(4)=a_(4)sin(omegat+pi//3) . A steady interference patternn cann be otained by using

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

Two coherent waves are represented by y_1=a_1 cos omega t and y_2=a_2 cos (pi/2 - omega t) . Their resultant intensity after interference will be-

Two waves are represented by y_(1)=a_(1)cos (omega t - kx) and y_(2)=a_(2)sin (omega t - kx + pi//3) Then the phase difference between them is-