A differentiable function f(x) has a relative minimum at x = 0. Then the function y = f(x) + ax + b has a relative minimum at x = 0 for

Show that the function given by f(x)=(log x)/x has maximum at x=e .

Let f(x) be differentiable function and g(x) be twice differentiable function. Zeros of f(x), g'(x) be a, b, respectively, (a lt b) . Show that there exists at least one root of equation f'(x) g'(x) + f(x) g''(x) = "0 on" (a, b) .

The minimum value of the function m ax (x, x^(2)) is equal to

Consider the function f(x)={(sinx/x, x Is f(x) continuous at x=0 ?

Find value of f at x=0 so that functions f (x) = (2^(x) -2^(-x))/(x) , x ne 0 is continuous at x = 0 ,

The local minimum value of the function f given by f(x)=x^(2)-x,x inR , is

Find local minimum value of the function f given by f(x)=3+|x|, x in R