1.

The number of independent constituent simple harmonic motions yielding a resultant displacement equation of the periodic motion as `y=8sin^2((t)/(2))sin(10t)` isA. 8B. 6C. 4D. 3

Answer» Correct Answer - D
`y=8sin^2((1)/(2))sin(10t)`
`=4[1-cost]sin(10t)` (using `2sin^2(theta)/(2)=1-costheta`)
`=4sin(10t)-4sin(10t)cost`
`=4sin(10t)-2[sin11t+sin9t]`
(using `2sinCcosD=sin(C+D)+sin(C-D))`
`=4sin(10t)-2sin(11t)-2sin(9t)`
Evindently, y is obtained as the superimposition of three independent (i.e., having different anglar frequency `omega`) `SHM`s


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