Two waves represented by the following equations are travelling in the same ` y_1 = 5 sin 2pi ( 75 t - 0.25x ) and y_2 = 10 sin 2pi ( 150 t - 0.50x ) .` The intensity ratio ` I_1//I_2 `of the two waves is

The displacement of two sinusoidal waves propagating through a string are given by the following equation y_1 = 4 sin (20 x - 30 t) , y_2 = 4 sin (25 x - 40 t) .where x and y are in centimeter and t in second When these two waves interfere , what are the maximum and minimum values of the intensity ?

The equations of two sound waves are given by, y_1 = 3sin ( 100 pi t ) and y_2 =4sin ( 150 pi t ) , The ratio of intensites of sound produced in the medium is

The displacement of two sinusoidal waves propagating through a string are given by the following equation y_1 = 4 sin (20 x - 30 t) , y_2 = 4 sin (25 x - 40 t) .where x and y are in centimeter and t in second Calculate the phase difference between these two waves at the points x = 5 cm and t = 2 s .

The equation of a wave travelling in a string can be written as y=3cos pi ( 100 t- x) . Its wavelength is

The equation of a progressive wave traveling on a stretched string is y = 10sin 2pi ((t/0.02)-(x/100)) where x and y arein cm and t is in sec. What is the speed of the waves?

If two waves, Y_1= 5 sin 2pi (2t - 0.02 x) and Y_2= 5 sin 2pi (2t- 0.02 x) in S.I. unit superposed to produce stationary waves. Determine the distance between node and next antinode.

If two waves, Y_1= 5 sin 2pi (2t - 0.02 x ) and Y_2= 5 sin 2pi (2t - 0.02 x) in S.I. unit superposed to produce stationary waves. Find Amplitude, frequency, wavelength and velocity

A wave is represented by the equation y = 0.06 sin (200 (pi) t - 20 (pi) x) quantities are in S.I. units . Calculate frequency

A wave is represented by the equation y = 0.06 sin (200 (pi) t - 20 (pi) x) quantities are in S.I. units . Calculate amplitude