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A uniform chain of mass m & length L is kept on a smooth horizontal table such that `(L)/(n) `portion of the chaing hangs from the table. The work dione required to slowly bringsthe chain completely on the table is |
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Answer» Let `lambda=M//L`= mass per unit length of the chain and y is the length of the chain hanging over the edge. So the mass of the chain of length y will be `lambday` and the force acting on it due to gravity will be `mgy`. The work done in pulling the `dy` length of the chain on the table. `dW=F(-dy)` [dy is negative as y is decreasing] As the chain is pulled slowly, F=Weight of the hanging chain `=lambdayg` i.e., `dW=(lambdayg)(-dy)` So the work done in pulling the hanging portion on the table, `W=-underset(L//n)overset0intlambdagydy=-lambdag[y^2/2]_(L//n)^0=(lambdagL^2)/(2n^2)=(MgL)/(2n^2)` `[as lambda=M//L]` |
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