A body of mass `m` is attached by an inelastic string to a suspended spring of spring constant `k`. Both the string and the spring have negligible mass and the string is inextensible and of length `L`. Initially, the mass `m` is at rest. The largest amplitude `A_(max)`, for which the string will remain taut throughout the motion isA. `(mg)/(2k)`B. `(mg)/(k)`C. `(2mg)/(3k)`D. `L`

A body of mass `m` is attached by an inelastic string to a suspended s

1.	A body of mass `m` is attached by an inelastic string to a suspended spring of spring constant `k`. Both the string and the spring have negligible mass and the string is inextensible and of length `L`. Initially, the mass `m` is at rest. The largest amplitude `A_(max)`, for which the string will remain taut throughout the motion isA. `(mg)/(2k)`B. `(mg)/(k)`C. `(2mg)/(3k)`D. `L`
Answer» Correct Answer - B In the position of equilibrium when the tension in the string `=mg` the extension in the spring is `x_0=(mg)/(k)`. If the amplitude exceeds this value, then in its upward motion, the body will rise to a height at which the string will become loose and `T=0` Hence maximum amplitude is `x_m=(mg)/(k)`. It also follows from the fact that for `Tge0` the maximum downwards acceleration that the body can have is `g`. Since `f(t)=(g-T(t))/(m)`, `f(t)leg`. Hence maximum amplitude is `A_m=(g)/(omega^2)=(mg)/(k)`

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