In an organ pipe whose one end is at x =0, the presence is expressed by `P = P_(0) "cos" (3 pi x)/(2) sin 300 pi t` where x is in meter and t in sec. The organ pipe can be :-

The equation of a wave is given as y= 0.07 sin ( 12pi x -3000pi t ), where x is in metre and t is in x,then the correct value is

A wave is represented by the equation y = A sin(10pix + 15pit + (pi)/(3)) where x is in meter and t is in seconds. The expression represents :

The wave described by y = 0.25 sin ( 10 pix -2pi t ) where x and y are in meters and t in seconds , is a wave travelling along the

Progressive wave of sound is represented by y =A sin [400 pi t -pi x // 6.85 ] where x is in m and t is in s. frequency of the wave will be

The equation of a transverse wave on a stretched string is , y = 2 sin 2 (pi) [ t / 0.04 - x / 40 ] where distances are in meter and time in second .Find the amplitude

A transverse progressive wave is given by the equation y = 2 cos (pi) (0.5x - 200 t) , where x and y are in cm and 't' in second. The true following statement is

The equation of a transverse wave on a stretched string is , y = 2 sin 2 (pi) [ t / 0.04 - x / 40 ] where distances are in meter and time in second .Find the frequency

The equation of a transverse wave on a stretched string is , y = 2 sin 2 (pi) [ t / 0.04 - x / 40 ] where distances are in meter and time in second .Find the velocity of the wave.

A wave travels in a medium according to the equation of displacement given by y(x, t) = 0.03 sin pi where y and x are in metres and t in seconds. The wavelength of the wave is

The equation of a simple harmonic progressive wave is y = 4 sin 2 (pi) [ t / 0.002 - x /35] where x and y are in cm and t in second . Calculate wave length