If the area enclosed by the curves `f(x) = cos^(-1) (cos x) and g(x) = sin^(-1) (cos x) " in " x in [9 pi//4, 15 pi//4] " is " 9pi^(2)//b` (where a and b are coprime), then the value of b is ____

If the area enclosed by the curves f(x) = cos^(-1) (cos x) and g(x) = sin^(-1) (cos x) " in " x in [9 pi//4, 15 pi//4] " is " 9pi^(2)//b ' (where a and b are coprime), then the value of (a- b) is ____

Let f(x) = x cos^(-1)(-sin|x|) , x in (-pi/2,pi/2)

Find the area of the region enclosed by the given curves . y=cos x , y=1 -(2x)/(pi)

If f(x) = cos x cos 2x cos 4x cos (8x). cos 16x then find f' (pi/4)

If f(x) = cos x cos 2x cos 4x cos (8x). cos 16x then find f' (pi/4)

Find the range of f(x) = (sin^(-1) x)^(2) + 2pi cos^(-1) x + pi^(2)

If f(x) = cos x cos 2x cos 4x cos 8x cos 16x then find f' (pi/4)

The angle of intersection of the curves y=2\ sin^2x and y=cos2\ x at x=pi/6 is (a) pi//4 (b) pi//2 (c) pi//3 (d) pi//6

Using the identity sin^(4) x=3/8-1/2 cos 2x+1/8 cos 4x or otherwise, if the value of sin^(4)(pi/7)+sin^(4)((3pi)/(7))+sin^(4)((5pi)/(7))=a/b , where a and b are coprime, find the value of (a-b) .

Area enclosed by the curve (y-sin^(- 1)x)^2=x-x^2 , is (A) pi/2 sq.units (B) pi/4 sq.units (C) pi/8 sq.units (D) none of these