Let `agt1` be a real number and `f(x)=log_(a)x^(2)" for "xgt 0.` If `f^(-1)` is the inverse function fo f and b and c are real numbers then `f^(-1)(b+c)` is equal to

Let agt1 be a real number and f(x)=log_(a)x^(2)" for "xgt 0. If f^(-1) is the inverse function of f and b and c are real numbers then f^(-1)(b+c) is equal to

Let f(x)=log_(2)x^(4) for x>0 ,If g(x) is the inverse function of f(x) and b and c are real numbers then g(b+c) is equal to .

a gt 1 is a real number f(x) = log_(a)x^2 , where x gt 0 If f^(-1)(x) is a inverse of f(x) and b and c are real numbers then f^(-1) (b+c) = ......

Let g(x) be the inverse of the function f(x)=ln x^(2),x>0 . If a,b,c in R ,then g(a+b+c) 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 f^(-1) be the inverse function of fdot Then (f^(-1))^'(2) is equal to

Let f(x)=log_(2)(x+sqrt(x^(2)+1)). If f(a)=b, then f(-a) 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 :

3f(x)-f(1/x)=log_(e)x^(4)(xgt0) , then f(10^(-x)) is equal to

If f(a+b+1-x)=f(x) , for all x where a and b are fixed positive real numbers, the (1)/(a+b) int_(a)^(b) x(f(x)+f(x+1) dx is equal to :

If f(a+b+1-x)=f(x) , for all x where a and b are fixed positive real numbers, the (1)/(a+b) int_(a)^(b) x(f(x)+f(x+1) dx is equal to :