A simple harmonic wave is represent by the relation
`y(x,t)=a_(0) sin 2pi(vt-(x)/(lambda))`
if the maximum particle velocity is three times the wave velocity, the wavelength `lambda` of the wave is

Simple harmonic wave is represented by the relation y (x, t) = a_(0) sin 2pi (vt - (x)/(lambda)) If the maximum particle velocity is three times the wave velocity, the wavelength lambda of the wave is

A transverse wave is represented by the equation y=y_0sin2pi(vt-x/lambda) .The maximum particle velocity is equal to four times the wave velocity if

A transverse wave is described by the equation Y=Y_(0) sin 2 pi (ft-frac(x)(lambda) . The maximum particle velocity is four times the wave velocity if

A longitudinal wave is represented by x = x_(0) "sin"2pi("nt" - ("x")/(lambda)) The maximum particle velocity will be four times the wave velocity if

A longitudinal wave is represented by x = x_(0) "sin"2pi("nt" - ("x")/(lambda)) The maximum particle velocity will be four times the wave velocity if

A transverse wave is derscried by the equation y=y_(0) sin 2 pi (ft - (x)/(lamda)) . The maximum particle velocity is equal to four times the wave velocity if :-

A transverse wave is derscried by the equation y=y_(0) sin 2 pi (ft - (x)/(lamda)) . The maximum particle velocity is equal to four times the wave velocity if :-

A transverse wave is derscried by the equation y=y_(0) sin 2 pi (ft - (x)/(lamda)) . The maximum particle velocity is equal to four times the wave velocity if :-