For a system of n pulleys, the weight of the lower block along with pulleys is w, then its efficiency is given by:

1. $\eta = 1 - \dfrac{w}{nE}$
2. $\eta = 1 + \dfrac{w}{nE}$
3. $\eta = \dfrac{w}{nE}$
4. $\eta = n - \dfrac{w}{E}$

$\eta = 1 - \dfrac{w}{nE}$

Reason — For a system of n pulleys, let w be the total weight of the lower block along with the pulleys in it. In the balanced position,

E = T and L + w = nT

or L = nT - w = nE - w

M.A. = $\dfrac{L}{E} = \dfrac{nE-w}{E} = n - \dfrac{w}{E}$

Thus, the mechanical advantage is less than the ideal value n.

The velocity ratio does not change, it remains n, i.e., V.R. = n

Hence, efficiency $\eta = \dfrac{M.A.}{V.R.} = \dfrac{n - \dfrac{w}{E} }{n} = 1 - \dfrac{w}{nE}$.