The amplitude of a particle due to super...

The amplitude of a particle due to superpositon of following `S.H.Ms.`. Along the same line is
`X_(1) = 2 sin 50 pi t , X_(2) = 10 sin (50pi t + 37^(@))`
`X_(3) = -4 sin 50 pi t , X_(4) = -12 cos 50 pi t`

Similar Questions

Explore conceptually related problems

The amplitide of a particle due to superposition of following S.H.Ms. Along the same line is {:(X_(1)=2 sin 50 pi t,,X_(2)=10 sin(50 pi t +37^(@))),(X_(3)=-4 sin 50 pi t,,X_(4)=-12 cos 50 pi t):}

The phase difference between two SHM y_(1) = 10 sin (10 pi t + (pi)/(3)) and y_(2) = 12 sin (8 pi t + (pi)/(4)) to t = 0.5s is

The equations of two SH M's are X_(1) = 4 sin (omega t + pi//2) . X_(2) = 3 sin(omega t + pi)

On the superposition of two waves [y_1 = 3 sin (50 pi t - 20x)] and [y_2 = 3sin (50pi t -20 x +(pi/3)] the equation resultant wave will be

A particle moves along y - axis according to the equation y("in cm") = 3 sin 100pi t + 8sin^(2) 50pi t - 6

The amplitude of a particle due to superpositon of following `S.H.Ms.`. Along the same line is `X_(1) = 2 sin 50 pi t , X_(2) = 10 sin (50pi t + 37^(@))` `X_(3) = -4 sin 50 pi t , X_(4) = -12 cos 50 pi t`

Similar Questions

Recommended Questions

The amplitude of a particle due to superpositon of following `S.H.Ms.`. Along the same line is
`X_(1) = 2 sin 50 pi t , X_(2) = 10 sin (50pi t + 37^(@))`
`X_(3) = -4 sin 50 pi t , X_(4) = -12 cos 50 pi t`