The tangent to the graph of the function `y=f(x)` at the point with abscissa `x=a` forms with the x-axis an angle of `pi/3` and at the point with abscissa `x=b` at an angle of `pi/4`, then the value of the integral, `int_1^b f'(x).f'' (x) dx` is equal to

int e^x(f(x)+f'(x))dx is equal to :

The tangent, represented by the graph of the function y=f(x), at the point with abscissa x = 1 form an angle of pi//6 , at the point x = 2 form an angle of pi//3 and at the point x = 3 form and angle of pi//4 . Then, find the value of, int_(1)^(3)f'(x)f''(x)dx+int_(2)^(3)f''(x)dx.

If f(a+b-x) = f(x) , then int_a^b x f(x) dx is equal to:

int _(0) ^(pi) x f (sin x )dx is equal to :

If f(x)=min{|x-1|,|x|,|x+1|, then the value of int_-1^1 f(x)dx is equal to

Abscissa of all the points on the x-axis is