A function `y=f(x)` has a second order derivative `f"(x)=6(x-1)`. If its graph passes through the point `(2,1)` and at that point the tangent to the graph is `y=3x-5` then the function is

A function y-f(x) has a second-order derivative f'(x)=6(x-1). It its graph passes through the point (2,1) and at that point tangent to the graph is y=3x-5 , then the value of f(0) is 1 (b) -1(c)2 (d) 0

The graph of y =x passes through the point

The anti - derivative of f(x) = e^(x//2) whose graph passes through the point (0,3) is :

Let F(x) be the anti derivative of f(x)=3cos x-2sin x whose graph passes through the the point ((pi)/(2),1) then F(0) is equal to=-

1.The slope of the normal at the point with abscissa x=-2 of the graph of the function f(x)=|x^(2)-x| is

Let F(x) be the antidericative of f(x) = 3 cos x - 2 sin x whose graph passes through the point (pi//2,1) Then F(pi//4) is equal to (sqrt(2) = 1.41)

If f (x) is the anti-derivative of tan^(-1) sqrt(x) such that the curve y = f(x) passes through the point (0,2) then f(x) =