A particle of mass m is fixed to one end of a light spring of force constant k and unstretched length l. The system is rotated about the other end of the spring with an angular ω, in gravity free space. The increase in length of the spring will be
mω2lk−mω2
mω2lk+mω2
none
mω2lk
A
mω2lk−mω2
B
none
C
mω2lk
D
mω2lk+mω2
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Solution
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Let x= the increase in the length of spring. Then the particle moves along a circular path of radius (l+x) and the spring force =kx= centripetal force.
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