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A variable plane is at a constant distan...

A variable plane is at a constant distance 2p from the origin meets the axes in A, B, C. Throught A, B, C planes are drawn parallel to the coordinate planes, then show that locus of their point of intersection is `x^(-2)+y^(-2)+z^(-2)=(2p)^(-2)`.

Text Solution

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The correct Answer is:
`(4p)^(-2)`
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