Evaluate the following
`int[f(x)g''(x)-f''(x)g(x)]dx`

f(x)intg(x)dx-int(f'(x)intg(x)dx)dx

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) .

Let f:RtoR and g:R toR be continuous functions. Then the value of int_(-pi//2)^(pi//2)(f(x)+f(-x))(g(x)-g(-x))dx is

If the following f:RrarrR is given by f(x)=(x+3)/3 and g:RrarrR is given by g(x)=2x-3 .Is f^(-1)=g

If the following f:RrarrR is given by f(x)=(x+3)/3 and g:RrarrR is given by g(x)=2x-3.Find fog

If the following f:RrarrR is given by f(x)=(x+3)/3 and g:RrarrR is given by g(x)=2x-3 .Find gof

Find the values of x of which the following functions are identical. f(x) = x and g(x) =1/(1//x)

The function f, g and h satisfy the relations f'(x)=g(x+1)andg'(x)=h(x-1) . Then, f''(2x) is equal to