Suppose f and g are differentiabel funct...

Suppose f and g are differentiabel functions such that `xg (f(x))f'(g (x))g '(x) =(g(x))g '(f(x)) f'(x) AA x in R and f` is positive `AA n in R.` Also `int _( 0)^(x) f (g(t )) dt =1/2 (1-e^(-2x))AA x in R, g (f(0))=1 and h (x) = (g(f (x)))/(f (g(x)))AA x in R.`
The graph of `y =h (x)` is symmetric with respect to line:

`x=-1`

`x=0`

`x=1`

`x=2`

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