For function `f (x) = x + (1)/(x) , x in [1,2],` the value of C for mean value theorem is ___________.

For the function f(x)= x + (1)/(x), x in [1, 3] the value of c for mean value theorem is

f(x)= x^(2)-3x + 4 If f(x)= f(2x+1) find the value of x .

f(x)+f(1-1/x)=1+x for x in R-{0,1}. Find the value of 4f(2).

f(x) is linear function of the type mx + c and f(-1) = -5 and f(3) = 3 then values of m and c are ….and ….. .

Show that the function f(x)=(x-a)^2(x-b)^2+x takes the value (a+b)/2 for some value of x in [a , b]dot

If the function f(x)=x^(3)+e^(x//2)andg(x)=f^(-1)(x) , then the value of g'(1) is

Suppose, the function f(x)-f(2x) has the derivative 5 at x=1 and derivative 7 at x=2 . The derivative of the function f(x)-f(4x) at x=1 , has the value 10+lambda , then the value of lambda is equal to……..

If the functions f(x)=x^(5)+e^(x//3) " and " g(x)=f^(-1)(x) , the value of g'(1) is ………… .

Let f(x)=(alphax)/(x+1),x ne -1 . Then, for what values of alpha is f[f(x)]=x?