The minimum value of (x^(4)+y^(4)+z^(2))...

The minimum value of `(x^(4)+y^(4)+z^(2))/(xyz)` for positive real numbers `x`, `y` , `z` is

A

`sqrt(2)`

B

`2sqrt(2)`

C

`4sqrt(2)`

D

`8sqrt(2)`

Text Solution

Verified by Experts

The correct Answer is:

B

Using A.M. `ge`. G.M we have
`x^(4) + y^(4) ge 2 x^(2) y^(2)` and `2 x^(2) y^(2) + z^(2) ge sqrt(8)xyz`
`implies (x^(4) + y^(4) + z^(2))/(xyz) ge sqrt(8)`

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If (x-3)^2+(y-4)^2+(z+5)^2=0 (x, y, z are real numbers), then the value of (x+y+z)^2 is :

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