The area (in square units) bounded by the curves `y=cos^(-1)|cos x|` and `y=(cos^(-1)|cos x|)^(2)`,`x in[0,pi]` is

The area bounded by the curve y=cos^(-1)(cos x) and y=|x-pi| is

The area in square units bounded by the curves y=x^(3),y=x^(2) and the ordinates x=1, x=2 is

Area bounded by the curves y=sin^(-1)x , y -axis and y=cos^(-1)x is equal to

The area (in sq. units) bounded between the curves y=e^(x)cos x and y=e^(x)sin x from x=(pi)/(4) to x=(pi)/(2) is

Find the area bounded by the curves y=(sin^(-1)(sin x)+cos^(-1)(cos x)) and y=(sin^(-1)(sin x)+cos^(-1)(cos x))^(2) for 0<=x<=2 pi

Find the area of that region bounded by the curve y="cos"x, X-axis, x=0 and x=pi .

Find the total area bounded by the curve y=cos x-cos^(2)x and y=x^(2)(x^(2)-(pi^2)/4)

The area bounded by the curves y=cos^(-1)x,y =sin^(-1) x and y=-pix^(3), where -1lex le1 ,is

If the area bounded by the curve y=cos^-1(cosx) and y=|x-pi| is pi^2/n , then n is equal to…