If g-f-x-sin-x- and-f-g-x-sin-x-2- then f and g cannot be determined-f-x-sin-2 x- g-x-x-f-x-sin-x- g-x-x-f-x-x-2- g-x-sin-x-

The correct option is B f(x)=sin^2 x, g(x)=√(x) Let f(x)=sin^2x and g(x)√(x) Now, fog(x)=f[g(x)]=f(√(x))=sin^2√(x) and gof(x)=g[f(x)]=g(sin^2 x)=√(sin^2x)=|sin ...

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Byju's Answer

Standard VIII

Mathematics

Definition of functions

If g{f(x)}=|s...

Question

If $g {f (x)} = | s i n x |$ and $f {g (x)} = (s i n \sqrt{x})^{2}$ , then

$f (x) = s i n^{2} x, g (x) = \sqrt{x}$

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$f (x) = s i n x, g (x) = | x |$

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$f (x) = x^{2}, g (x) = s i n \sqrt{x}$

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f and g cannot be determined

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Solution

The correct option is A
$f (x) = s i n^{2} x, g (x) = \sqrt{x}$

Let $f (x) = s i n^{2} x$ and $g (x) \sqrt{x}$
Now, $f o g (x) = f [g (x)] = f (\sqrt{x}) = s i n^{2} \sqrt{x}$
and $g o f (x) = g [f (x)] = g (s i n^{2} x) = \sqrt{s i n^{2} x} = | s i n x |$
Again, let $f (x) = s i n x, g (x) = | x |$
$f o g (x) = f [g (x)] = f (| x |) = s i n | x | \neq (s i n \sqrt{x})^{2}$
When, $f (x) = x^{2}, g (x) = s i n \sqrt{x}$
$f o g (x) = f [g (x)] = f (s i n \sqrt{x}) = (s i n \sqrt{x})^{2}$
and $(g o f) (x) = g [f (x)] = g (x^{2}) = s i n \sqrt{x^{2}}$
$= s i n | x | \neq | s i n x |$

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Similar questions

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If g{f(x)}=|sin x| and f{g(x)}=(sin√x)2, then

If $g {f (x)} = | s i n x |$ and $f {g (x)} = (s i n \sqrt{x})^{2}$ , then