The linear density of a vibrating string is `10^(-4) kg//m`. A transverse wave is propagating on the string, which is described by the equation `y=0.02 sin (x+30t)`, where x and y are in metres and time t in seconds. Then tension in the string is

The linear density of a vibrating string is 2xx10^(-4) kg/m. A transverse wave is propagating on the string and is described by the equation y=0.021 sin (x + 30 t) where x and y are in metre and t is in second. The tension in the string is

The linear density of a vibrating string is 1.3 xx 10^(-4) kg//m A transverse wave is propagating on the string and is described by the equation y= 0.021 sin (x + 30 t) where x and y are measured in meter and t t in second the tension in the string is :-

The linear density of a vibrating string is 1.3 xx 10^(-4) kg//m A transverse wave is propagating on the string and is described by the equation y= 0.021 sin (x + 30 t) where x and y are measured in meter and t t in second the tension in the string is :-

The linear density of a vibrating string is 1.3 xx 10^(-4) kg//m A transverse wave is propagating on the string and is described by the equation y= 0.021 sin (x + 30 t) where x and y are measured in meter and t t in second the tension in the string is :-

A transverse wave propagating on the string can be described by the equation y=2sin(10x+300t) where x and y are in metres and t in second.If the vibrating string has linear density of 0.6times10^(-3)g/cm ,then the tension in the string is

A transverse wave propagating on a stretched string of linear density 3xx10^-4 kg-m^-1 is represented by the equation y=0.2sin(1.5x+60t) Where x is in metre and t is in second. The tension in the string (in Newton) is

The linear density of a string is 1.9 xx 10^(-4)"kg/m." A transverse wave on the string is described by the equation y=(0.021 m) sin[(2.0 m^(-1))x +(30 s^(-1))t]. What are (a) the wave speed and (b) the tension in the string?