If f(x) is differentiable in the interval [2,5] , where `f(2) = ( 1)/(5)` and f(5) = ( 1)/(2), then there exists a number `2 lt c lt 5` for which f(c ) is equal to

Let f(x) and g(x) be differentiable functions for 0 le x le 1 such that f(0) = 2, g(0) = 0, f(1) = 6 . Let there exist a real number c in (0,1) such that f ’(c) = 2 g ’(c), then g(1) =

Given that f(x) is a differentiable function of x and that f(x) ,f(y) = f(x) + f(y) +f(xy) -2 and that f(1)=2 , f(2) = 5 Then f(3) is equal to

If f(x) = {:{((x -1)/(2x^(2) - 7 x +5) , " for " x ne 1) , (-1/3 , " for " x = 1):} then f (1) is equal to

If y = f((3x+4)/(5x+6)) and f^(1)(x) = tanx^2 then (dy)/(dx) is equal to

If f (x) = ax ^(2) + bx + c then find Lt _(x to 5) (f (x) - f (5))/(x-5)

If f(x) = min (x^(2) ,x, sgn ( x^(2) +4x + 5) ) then the value of f(2) is equal to

If f (x) = (x^(2) - 10 x + 25)/( x^(2) - 7x + 10) and f is continuous at x =5, then f (5) is equal to