Work Power And Energy Ques 31
- A stone tied to a string of length $L$ is whirled in a vertical circle with the other end of the string at the centre. At a certain instant of time, the stone is at its lowest position, and has a speed $u$. The magnitude of the change in its velocity as it reaches a position, where the string is horizontal, is
(a) $\sqrt{u^{2}-2 g L}$
(b) $\sqrt{2 g L}$
(c) $\sqrt{u^{2}-g L}$
(d) $\sqrt{2\left(u^{2}-g L\right)}$
(1998, 2M)
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Answer:
Correct Answer: 31.(d)
Solution:
Formula:
- From energy conservation, $v^{2}=u^{2}-2 g L \cdots(i)$
Now, since the two velocity vectors shown in figure are mutually perpendicular, hence the magnitude of change of velocity will be given by $|\Delta \mathbf{v}|=\sqrt{u^{2}+v^{2}}$
Substituting value of $v^{2}$ from Eq.(i), we get
$|\Delta \mathbf{v}|=\sqrt{u^2+u^2-2 g L}=\sqrt{2\left(u^2-g L\right)}$
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