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Volume of a cuboid

The areas of ...

Question

The areas of three adjacent faces of a cuboid are x, y and z. If the volume is V, prove that $V^{2} = x y z .$

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Solution

Let the dimensions of the cuboid be a, b and c.

x = ab, y = bc, z = ca

and V = abc

Now L.H.S. = $V^{2}$

$= (a b c)^{2} = a^{2} b^{2} c^{2}$

$= a b . b c . c a$

$= x y z = R . H . S$

Hence $V^{2} = x y z$

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