Both springs, string and pulley shown in the figure are light. Initially when both the springs were in their natural state, the system was released from rest. The maximum displacement of the block having mass m is:
A
5mgk
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B
3mgk
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C
10mgk
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D
4mgk
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Solution
The correct option is C10mgk When block is at maximum displacement (v=0), let the extension in upper spring be x. Then the pulley will be also be lowered by x. This will result in slackening of string by length 2x, hence the block will be lowered by 2x.
Balancing forces ( for massless pulley) gives tension 2T in upper spring, Spring force=2T ⇒kx=2T ∴T=kx2 In lower pulley, T=kx′ kx2=kx′ Hence extension in lower spring, x′=x2
Therefore, the block will be lowered by a total distance =2x+x2=5x2
Applying mechanical energy conservation for system: Loss in Grav. PE of block=Gain in elastic PE of springs ⇒mg×5x2=12kx2+12k(x2)2 ⇒52mgx=kx22+kx28
⇒52mgx=58kx2 ∴x=4mgk The maximum displacment of block is, xm=5x2 ∴xm=52×4mgk=10mgk