When two waves `y_(1) A sin 2000 pi t and y_(2) = A sin 2008 pi t ` are superposed, the number of beats produced per second is

Two progressive waves y_(1) = 4 sin 500 pi t and y _(2) = 2 sin 506 pi t are superposed. Find the number of beats produced in one minute .

When the waves y_(1) = A sin omega t and y_(2) = A cos omega t are superposed, then resultant amplitude will be

Y_1 = A sin 2000 pit Y_2 = A sin 2008 pit . If these two waves are superposed then the no. of beats per second will be--------.

When two progressive waves y_(1) = 4 sin (2 x - 6t) and y_(2) = 3 sin (2x - 6t -(pi)/(2)) are superposed, the amplitude of the resultant wave is

The displacement of a particle at the position x = 0 in a medium due to two different progressive waves are y_(1) = sin 4 pi t and y_(2) = sin 2 pi t , respectively. How many times would the particle come to test in every second ?

The equations of two progressive waves superposing on a string are y_(1)= A sin [k(x - ct)] and y_(2) = A sin [k (x + ct)] . What is the distance between two consecutive nodes ?

Equations of two light waves are y_(1) = 4 sin omega t and y_(2) = 3 sin (omega t + (pi)/(2)) . What is the amplitude of the resultant wave as they superpose on each other?

Two waves represented as y_(1) = A_(1) sin omega t and y_(2) = A_(2) cos omega t superpose at a point in space. Find out the amplitude of the resultant wave at that point .

The equations of two sound waves are given below : y_(1) = 0 . 2 "sin" (2pi)/(3) (330 t - x) m and y_(2) = 0 .02 "sin" (2pi)/(3 + k) (330 t - x) m If 10 beats are produced per sound due to superposition of these two waves, determine the value of k .