`f(x) = x^(2)+xg'(1) +g''(2) and g(x) =f(1)x^2+xf'(x)+f''(x)`
The value of f(3) is

f(x) = x^(2)+xg'(1) +g''(2) and g(x) =f(1)x^2+xf'(x)+f''(x) The value of g(0) is

f(x) = x^(2)+xg'(1) +g''(2) and g(x) =f(1)x^2+xf'(x)+f''(x) The domain of the function sqrt((f(x))/(g(x)) is

Suppose that f(0) = 0 and f'(0) = 2 and let g(x) = f(-xf(f(x))). The value of g'(0) is equal to ........

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

Let F(x) = f(x) +g(x) , G(x) = f(x) - g( x) and H(x) =(f( x))/( g(x)) where f(x) = 1- 2 sin ^(2) x and g(x) =cos (2x) AA f: R to [-1,1] and g, R to [-1,1] Now answer the following If the solution of F(x) -G (x) =0 are x_1,x_2, x_3 --------- x_n Where x in [0,5 pi] then

Let F(x) = f(x) +g(x) , G(x) = f(x) - g( x) and H(x) =(f( x))/( g(x)) where f(x) = 1- 2 sin ^(2) x and g(x) =cos (2x) AA f: R to [-1,1] and g, R to [-1,1] Now answer the following If F :R to [-2,2] then F(x) is

If f(g(x)) = x and g(f(x)) = x then g(x) is the inverse of f(x) . (g'(x))f'(x) = 1 implies g'(f(x))=1/(f'(x)) Let g(x) be the inverse of f(x) such that f'(x) =1/(1+x^5) ,then (d^2(g(x)))/(dx^2) is equal to

Let F(x) = f(x) +g(x) , G(x) = f(x) - g( x) and H(x) =(f( x))/( g(x)) where f(x) = 1- 2 sin ^(2) x and g(x) =cos (2x) AA f: R to [-1,1] and g, R to [-1,1] Now answer the following Domain and range of H(x) are