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Break Even Point

If f : R → R ...

Question

If $f : R \to R$ and $g : R \to R$ are given by f(x) = |x| and g(x) = [x], then $g (f (x)) \leq f (g (x)$ is true for -

A

Z \cup (- \infty, 0)

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B

(- \infty, 0)

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C

Z

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D

R

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Solution

The correct option is D $R$
$g (f (x)) \leq f (g (x)) \Rightarrow g (| x |) \leq f [x] \Rightarrow [| x |] \leq | [x] |$
This is true for $x ϵ R .$ .

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