If the graph of the function y = f(x) passes through the points (1, 2) and (3, 5), then `int_(1)^(3)f'(x) dx=`

The graph of the function y = f(x) passing through the point (0, 1) and satisfying the differential equation (dy)/(dx) + y cos x = cos x is such that

If graph of the function y=f(x) is continuous and passes through point (3,1) then lim_(x rarr3)(log_(e)(3f(x)-2))/(2(1-f(x))) is equal (3)/(2) b.(1)/(2)c.-(3)/(2)d

If the graph of the function y=f(x) is as shown : the graph of y=(1)/(2)(|f(x)|-f(x)) is

If the graph of the function y = f(x) is as shown : The graph of y = 1//2(|f(x)|-f(x)) is

Suppose that the graph of y=f(x) , contains the points (0,4) and (2,7) . If f' is continuous then int_(0)^(2) f'(x) dx is equal to

If f'(x)=x-1, the equation of a curve y=f(x) passing through the point (1,0) is given by

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 the curve y=f(x) passing through the point (1,2) and satisfies the differential equation xdy+(y+x^(3)y^(2))dx=0 ,then

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

If the graph of the function y=f(x) has a unique tangent at the point (a,0) through which the graph passes,then evaluate lim_(x rarr a)(log_(e){1+6f(x)})/(3f(x))