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Question
The sum of the inner and the outer curved surfaces of a hollow metallic cylinder is 1056 cm2 and the volume of material in it is 1056 cm3. Find its internal and external radii. Given that the height of the cylinder is 21 cm.
Solution
Let R and r be the outer and inner radii of hollow metallic cylinder.
Let h be height of the metallic cylinder.
It is given that
Outer curved surface area + Inner curved surface area = 1056
`=>` 2πRh + 2πrh = 1056
`=>` 2πh(R + r) = 1056
`=> 2 xx 22/7 xx 21 (R + r) = 1056`
`=> R + r = (1056 xx 7)/(2 xx 22 xx 21)`
`=>` R + r = 8 ...(i)
Volume of material in it = 1056 cm3
`=>` πR2h – πr2h = 1056
`=>` πh(R2 – r2) = 1056
`=> 22/7 xx 21 (R^2 - r^2) = 1056`
`=> R^2 - r^2 = (1056 xx7)/(22xx21)`
`=>` (R + r)(R – r) = 16
`=>` 8 × (R – r) = 16
`=>` R – r = 2 ...(ii)
Adding (i) and (ii), we get
2R = 10 `=>` R = 5 cm
`=>` 5 – r = 2
`=>` r = 3 cm
∴ Internal radius = 3 cm and External radius = 5 cm
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