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Question

In order that the resultant path on superimposing two mutually perpendicular SHM be a circle, the conditions are that:

A
the amplitudes on both SHM should be equal and they should have a phase difference of π2
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B
the amplitudes should be in the ratio 1:2 and the phase difference should be zero
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C
the amplitudes should be in the ratio 1:2 and the phase difference should be π2
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D
the amplitudes should be equal and the phase difference should be zero
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Solution

The correct option is A the amplitudes on both SHM should be equal and they should have a phase difference of π2
Let the multually perpendicular SHM be,
x=A1sinωt ....(1)
& y=A2cosωt ....(2)
Squaring and adding equation (1) and (2)
x2+y2=(A1sinωt)2+(A2cosωt)2
x2+y2=A21sin2wt+A22cos2wt
When A1=A2=A(say)
x2+y2=A2(sin2ωt+cos2ωt)
x2+y2=A2
Comparing the above relation with x2+y2=a2, we conclude that it is an equation of circle with radius =amplitude(A).

Hence resultant path of two mutually perpendicular SHM on superposition will be circle, if the amplitudes are equal and phase difference between them is π2

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