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Velocity of a Point

The velocity ...

Question

The velocity of centre of mass of a rolling disc is $v$ . Considering sufficient friction to prevent any slipping, the magnitude of velocity at the highest point on the disc is

A

\sqrt{2} v

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B

v

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C

2 v

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D

\frac{v}{\sqrt{2}}

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Solution

The correct option is C $2 v$
Applying condition of pure rolling,
$v = r ω . . . (i)$
where $v =$ velocity of $COM$ of disc

Considering righwards as $+ v e x$ direction expressing the velocity at highest point $B$ :
${\to v}_{B} = v^i + r ω^i = (v + r ω)^i$
From Eq $(i)$
${\to v}_{B} = (v + r ω)^i = 2 v^i$
$| {\to v}_{B} | = 2 v$

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Velocity of a Point

Standard XII Physics

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