If f-x- and g-x- are inverse function of each other such that f-1- - 3 amp- f-3- - 1- then -3-1 -g-x- - x-f-g-x-dx is equal to

F^ 1 (x) = g(x) ⇒ f(g(x)) = x ⇒ f'(g(x)). g'(x) = 1 We have, ∫^3_1 (g(x) + x/f'(g(x)))dx =∫^3_1 (g(x) + xg'(x))dx = [x g(x)]^3_1 = 3(g(3)) 1(g(1)) We know tha ...

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Byju's Answer

Standard XII

Mathematics

Functions without Antiderivatives as Known Combination of Basic Functions

If f(x) and g...

Question

If $f (x)$ and $g (x)$ are inverse function of each other such that $f (1) = 3$ & $f (3) = 1$ , then $\int_{1}^{3} (g (x) + \frac{x}{f^{'} (g (x))}) d x$ is equal to

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Solution

$f^{- 1} (x) = g (x) \Rightarrow f (g (x)) = x$
$\Rightarrow f^{'} (g (x)) . g^{'} (x) = 1$
We have,
$\int_{1}^{3} (g (x) + \frac{x}{f^{'} (g (x))}) d x$
$= \int_{1}^{3} (g (x) + x g^{'} (x)) d x = [x g (x)]_{1}^{3}$
$= 3 (g (3)) - 1 (g (1))$
We know that,
$f (3) = 1 \Rightarrow g (1) = 3$ &
$f (1) = 3 \Rightarrow g (3) = 1$
After substituting we get,
$= 3 (1) - 1 (3) = 0$

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If f(x) and g(x) are inverse function of each other such that f(1)=3 & f(3)=1, then ∫31(g(x)+xf′(g(x)))dx is equal to

f−1(x)=g(x)⇒f(g(x))=x ⇒f′(g(x)).g′(x)=1 We have, ∫31(g(x)+xf′(g(x)))dx =∫31(g(x)+xg′(x))dx=[x g(x)]31 =3(g(3))−1(g(1)) We know that, f(3)=1⇒g(1)=3 & f(1)=3⇒g(3)=1 After substituting we get, =3(1)−1(3)=0

If $f (x)$ and $g (x)$ are inverse function of each other such that $f (1) = 3$ & $f (3) = 1$ , then $\int_{1}^{3} (g (x) + \frac{x}{f^{'} (g (x))}) d x$ is equal to