Let f be a real-valued function defind on the interval (-,1) such that `e^(-x)f(x)2+int_0^(x) sqrt(t^(4)+1)dt` for all `x in (-1,1)` and let `f^(-1)` be the inverse function of f. Then, `(f^(-1))`'(2) is equal to

Let f be a real valued function defined on the interval (-1,1) such that e^(-x) f(x) = 2 + int_0^x sqrt(t^4 + 1) dt , for all x in (-1, 0) and let f^(-1) be the inverse function of f. Then (f^(-1))'(2) is equal to :

Let f be a real-valued function defined on the inverval (-1,1) such that e^(-x)f(x)=2+int_0^xsqrt(t^4+1)dt , for all, x in (-1,1) and let f^(-1) be the inverse function of fdot Then (f^(-1))^'(2) is equal to (a) 1 (b) 1/3 (c) 1/2 (d) 1/e

Let f be a real-valued function defined on the inverval (-1,1) such that e^(-x)f(x)=2+int_0^xsqrt(t^4+1)dt , for all, x in (-1,1)and f^(-1) be the inverse function of fdot Then (f^(-1))^'(2) is equal to

Let f be a real -valued function defined on the interval (-1, 1) such that e^(-x)f(x) = 2+int_(0)^(x) sqrt(t^(4) + 1)dt for all x in (-1, 1) and let f^(-1) be the inverse function of f. then show that (f^(-1)(2))^1 = (1)/(3)

Let f be a real-valued function on the interval (-1,1) such that e^(-x) f(x)=2+underset(0)overset(x)int sqrt(t^(4)+1), dt, AA x in (-1,1) and let f^(-1) be the inverse function of f. Then [f^(-1) (2)] is a equal to:

Let f is a real valued function defined on the interval (-1,1) such that e^(-x)f(x) = 2 + int_0^x sqrt(t^4 + 1 dt) AA x in (-1,1) and f^(-1) is the inverse of f. If (f^(-1)(2)) = 1/k then k is

Let 'f' be a non-negative function defined on the interval [0,1]. If int_0^x sqrt(1 - (f'(t))^(2)) dt = int_0^x f(t) dt, 0 le x le 1 and f(0) = 0, then :