$\"\"$

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(a) Right circular cylinder:

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Volume of right circular cylinder can be found by the revolving the base radius about $\"\"$ axis.

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$\"\"$

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Hence, $\"\"$ .

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$\"\"$ .

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Thus, option (ii) $\"\"$ is correct choice.

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$\"\"$

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(b)

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Ellipsoid:

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Equation of the vertical ellipse with axis $\"\"$ and $\"\"$ is $\"\"$ .

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$\"\"$

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Volume of right ellipsoid can be found by the revolving the base radius about $\"\"$ axis.

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$\"\"$

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Hence, $\"\"$ .

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$\"\"$ .

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Here value of $\"\"$ varies from $\"\"$ to $\"\"$ .

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Therefore, volume of the ellipsoid is $\"\"$

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Thus, option (iv) $\"\"$ is correct choice.

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$\"\"$

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(c)

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Sphere:

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Outer part of the sphere is alike the circle.

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Equation of the circle center at origin and with radius $\"\"$ is $\"\"$ . $\"\"$

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Volume of sphere can be found by the revolving the base radius about $\"\"$ axis.

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Hence, $\"\"$ .

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$\"\"$ .

\

Here value of $\"\"$ varies from $\"\"$ to $\"\"$ .

\

Therefore, volume of the ellipsoid is $\"\"$ .

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Thus, option (iii) $\"\"$ is correct choice.

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$\"\"$

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(d)

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Right circular cone:

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Consider cone with base radius $\"\"$ and height $\"\"$ .

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$\"\"$

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Observe the figure:

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Radius of the region is $\"\"$ .

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$\"\"$ .

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Therefore, volume of the ellipsoid is $\"\"$ .

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Thus, option (i) $\"\"$ is correct choice.

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$\"\"$

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(d)

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Torus:

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Radius of the cross section of torus is $\"\"$ and distance from the center of its cross section to

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the axis of the torus is $\"\"$ .

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Inner part is a circle $\"\"$

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$\"\"$

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$\"\"$

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Observe the figure:

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$\"\"$ .

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Here outer radius of the region is $\"\"$ .

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Inner radius of the region is $\"\"$ .

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Therefore, volume of the torus is $\"\"$ .

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Thus, option (v) $\"\"$ is correct choice.

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$\"\"$

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(a) Option (ii).

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(b) Option (iv).

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(c) Option (iii).

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(d) Option (i).

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(e) Option (v).