Assuming that `f(t)=(t-1)/(t+1)` is an invertible function then `f^(-1)((1)/(c)+1)` is equal to:

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:

If A={1,2,3,4} and f : A->A, then total number of invertible functions,'f',such that f(2)!=2,f(4)!=4,f(1)=1 is equal to:

Differentiate the function f(t)=sqrt(t)(1-t)

Let f be an invertible real function. Write (f^(-1)\ of)(1)+(f^(-1)\ of)(2)++(f^(-1)\ of)(100)dot

Let f(t)=(t^(2)-1)/(t+3) find f'(1) :

If f(x)=int_(1)^(x) (log t)/(1+t) dt"then" f(x)+f((1)/(x)) is equal to

For x>0, let f(x)=int_(1)^(x)(log t)/(1+t)dt. Find the function f(x)+f((1)/(x)) and find the value of f(e)+f((1)/(e))