A heavy particle is suspended by a string of length l. The particle is given a horizontal velocity v0. The string becomes slack at some angle and the particle proceeds on a parabola. Find the value of v0 if the particle passes through the point of suspension.
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Suppose the string becomes slack when the particle reaches the point P (figure) suppose the string OP makes an angle θ with the upward vertical. The only force acting on the particle at P is its weight mg. The radial component of the force is mg cosθ. As the particle moves on the circle upto P,
mg cosθ=m(v2l)
Or, v2=glcosθ ---------------(i)
Where v is its speed at P.Using conservation of energy, 12mv20=12mv2+mgl(1+cosθ)
Or, v2=v20−2gl(1+cosθ) --------------------(ii)
From (i) and (ii), v20−2gl(1+cosθ)=glcosθ
Or, v20=gl(2+3cosθ) -----------------(iii)
Now onwards the particle goes in a parabola under the action of gravity.As it passes through the point of suspension O, the equation for horizontal and vertical motion give,
lsinθ=(vcosθ)t
and - lcosθ=(vsinθ)t−12gt2
or, −lcosθ=(vsinθ)t−(lsinθvcosθ)−12g(lsinθvcosθ)2
or, −cos2θ=sin2θ−12glsin2θv2cosθ
or, −cosθ=1−cos2θ−12glsin2θglcos2θ [From (i)]
or, 1=12tan2θ
or, tanθ=√2
From (iii), v0=[gl(2+√3)]12.