Two functions f & g have first & second derivatives at x=0 & satisfy the relations, `f(0) = 2/(g(0)), f'(0)=2g'(0) = 4g(0), g"(0)= 5 f"(0)=6f(0) = 3` then-

Let f,g and h be differentiable function. If f(0)=1,g(0)=2, h(0)=3 and the derivatives of their pair wise products at x = 0 are (fg)'(0)=6,(gh)'(0)=4 and (hf)'(0)=5 then the value of ((fgh) ′ (0))/2 is

Let f(x) be a polynomial satisfying f(0)=2 , f'(0)=3 and f''(x)=f(x) then f(4) equals

If y=(f_(0)f_(0)f)(x)andf(0)=0,f'(0)=2 then y'(0) is equal to

Find the anti derivative F of f defined by f(x) = 4x^3 - 6 , where F(0) =3

Let fandg be real valued functions defined on interval (-1,1) such that g''(x) is constinous, g(0)=0 , g'(0)=0,g''(0)=0andf(x)=g(x)sinx . Statement I underset(xrarr0)lim(g(x)cotx-g(0)cosecx)=f''(0) Statement II f'(0)=g'(0)

If f:[0,1] to [0,oo) is differentiable function with decreasing first derivative such that f(0)=0 and f'(x) gt 0 , then

If f(x)= (1 + x)^n then the value of f(0) + f'(0) + (f''(0))/(2!) + .... + (f^n(0))/(n!) is

If f'(x) = a sin x + b cos x and f'(0) = 4,f(0) = 3, f((pi)/(2))= 5 , find f(x).

If f and g are continuous functions in [0, 1] satisfying f(x) = f(a-x) and g(x) + g(a-x) = a , then int_(0)^(a)f(x)* g(x)dx is equal to