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Question

A cylinder of radius x and height 2h is to be inscribed in a sphere of radius R centred at O as shown in figure.


i. Evaluate the volume of cylinder in terms of h.
ii. The cylinder has maximum volume when h=?.

A
i. V=2πh(R2h2)
ii. h=R3
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B
i. V=2πh(R2h3)
ii. h=R3
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C
i. V=2πh(R22h2)
ii. h=R5
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D
i. V=3πh(R2h2)
ii. h=2R3
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Solution

The correct option is A i. V=2πh(R2h2)
ii. h=R3
Volume of cylinder V=πx2H (where, H=2h)

From Pythagpras theorem,
x2=R2h2
V=2πh(R2h2)

For volume to be maximum dVdh=0 and d2Vdh2<0

V=2πh(R2h2)=2πhR22πh3

dVdh=2πR26πh2=0
h=R3

Minimum value is zero at h=0, so at h=R3 value should be maximum.
Let's confirm this,
d2Vdx2=12π<0

Hence, at h=R3 volume of cylinder is maximum.

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