The resultant of two rechangular simple harmonic motion of the same frequency and unequal amplitude but differing in phase by `pi//2` isA. Simple harmonicB. CircularC. EllipticalD. Parabolic

The resultant of two rechangular simple harmonic motion of the same fr

1.	The resultant of two rechangular simple harmonic motion of the same frequency and unequal amplitude but differing in phase by `pi//2` isA. Simple harmonicB. CircularC. EllipticalD. Parabolic
Answer» Correct Answer - C If first equation is `y_(1) = a_(1) sin omega t` `rArr sin omega t = (y_(1))/(a_(1))` then second equation will be `y_(2) = a_(2) sin (sin omega t cos (pi)/(2))` `= a_(2)[sin omega t cos "(pi)/(2)+ cos omega t sin"(pi)/(2)]= a_(2) cos omega t ` `rArr cos omega t = (y_(2))/(a_(2))` By squiring and adding (i) and (ii) `sin ^(2) omega t + cos^(2) omega t = (y_(1)^(2))/(a_(1)^(2)) + (y_(2)^(2))/(a_(2)^(2))` `rArr (y_(1)^(2))/(a_(1)^(2)) + (y_(2)^(2))/(a_(2)^(2)) = 1`. This is the equation of ellipse

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The resultant of two rechangular simple harmonic motion of the same frequency and unequal amplitude but differing in phase by `pi//2` isA. Simple harmonicB. CircularC. EllipticalD. Parabolic

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