A string with one end fixed on a rigid wall, passing over a fixed frictionless pulley at a distance of `2m` from the wall, has a point mass M of `2kg` attached to it at a distance of `1m` from the wall. A mass `m` of `0.5kg` is attached to the free end. The system is initially held at rest so that the stirng is horizontal between wall and pulley and vertical beyond the pulley as shown in figure.

What will be the speed with which point mass M will hit the wall when the system is released? `(g=10ms^-2)`

When M strikes the wall, vertically downward component of its displacement from initial position is 1m and its distance from pulley B is,
`C'B = sqrt(1^2 + 2^2) = sqrt(5)m`.
While its initial distance from the pulley was CB = 1 m. It mean vertically upward displacement mass m is `(sqrt(5) - 1)m` .
Let M strikes the wall with velocity V. Since, string between two blocks always remains taut, therefore at any instant speed of m is equal to that component of velocity of M which is along the string C’B. Hence, velocity of m when M strikes the wall is `v = V cos theta`, where `cos theta = 2/(sqrt5)`.
Now using conservation of mechanical energy
`Delta K + Delta U = 0`
`(1/2 MV^2 + 1/2 mv^2 -0) + [mg (sqrt(5) -1) - Mg(1)] = 0` On solving we get,
`v = 5sqrt((5 - sqrt(5))/(6)) ms^(-1)` .