Determine the ratio of the length of the longest rod that can be fitted in a sphere to the length of the longest rod that can be fitted in a cube, given that the sphere exactly fits inside the cube.

2 : 1

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$\sqrt{3} : 1$

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1 : 1

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$1 : \sqrt{3}$

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Solution

The correct option is D
$1 : \sqrt{3}$

Let the side of the cube be $x$ .
$∴$ Diameter of sphere $= x$ .
[The sphere fits exactly into the cube]

Length of the longest rod that can be fit into the cube
= main diagonal of the cube across the opposite vertices
= $\sqrt{3} x$

Length of the longest rod that can be fit into a sphere is the diameter i.e. $x$ .

$∴$ Ratio of length of the longest rod in sphere to the length of the longest rod in cube
$= \frac{x}{\sqrt{3} x}$

$= \frac{1}{\sqrt{3}}$

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Determine the ratio of the largest length of rods that can be fitted in a sphere and cube, given that the sphere exactly fits inside the cube.

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