Two simple harmonic waves are represented by the equations given as
`y_(1) = 0.3 sin(314 t - 1.57 x)`
`y_(2) = 0.1 sin(314 t - 1.57x + 1.57)`
where `x, y_(1)` and `y_(2)` are in metre and t is in second, then we have

Two simple harmonic motions are represented by the equations y_(1)=2(sqrt(3)cos3 pi t+sin3 pi t) and y_(2)=3sin(6 pi t+pi/6)

The simple harmonic motions are represented by the equations: y_(1)=10sin((pi)/(4))(12t+1), y_(2)=5(sin3pit+sqrt(3)))

Standing waves are produced by superposition of two waves y_(1) = 0.05 sin(3pi t - 2x), y_(2) = 0.05 six(3pi t +2x) where x and y are measured in metre and t in second. Find the amplitude of the particle at x = 0.5m.

A wave is represented by the equation, y = 0.1 sin (60 t + 2x) , where x and y are in metres and t is in seconds. This represents a wave

Standing waves are produced by the superposition of two waves y_(1)=0.05 sin (3 pit-2x) and y_(2) = 0.05 sin (3pit+2x) Where x and y are in metres and t is in second. What is the amplitude of the particle at x = 0.5 m ? (Given, cos 57. 3 ^(@) = 0. 54)

The standing waves are set up by the superimposition of two waves: y_(1)=0.05 sin (15pit-x) and y_(2)=0.05 sin (15pit+x) , where x and y are in metre and t in seconds. Find the displacement of particle at x=0.5m.

Two waves are represented by the equations y_1=a sin omega t and y_2=a cos omegat . The first wave