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Question

A heavy particle hanging from a fixed point by a light in extensible string of length l is projected horizontally with speed (gl). Find the speed of the particle and the inclination of the string to the vertical at the instant of the motion when the tension in the string is equal to the weight of the particle.

A
v=gl3,cosθ=23
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B
v=gl3,cosθ=13
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C
v=2gl3,cosθ=13
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D
v=gl3,cosθ=25
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Solution

The correct option is A v=gl3,cosθ=23

Assume tension in the string becomes equal to the weight of the particle when particle reaches the point B and deflection of the string from vertical is θ. Resolving mg along the string and perpendicular to the string, we get net radial force on the particle at B i.e.
FR=Tmgcosθ (i)
If v is the speed of the particle at B, then FR=mv2l (ii)
From (i) and (ii), we get Tmgcosθ=mv2l (iii)
Since at B, T = mg mg(1cosθ)=mv2l v2=gl(1cosθ) (iv)
Conserving the energy of the particle at point A and B, we have
12mv20=mgl(1cosθ)+12mv2
Where v0=gl and v=gl(1cosθ)
gl=2gl(1cosθ)+gl(1cosθ), cosθ=23
Putting the value of cosθ in equation (iv) we get
v=gl3

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