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 <= 2pi`

Find the area bounded by the curve y=sin^(-1)|sin x|+cos^(-1)cos x and y=cos x+ the lines x=0 and x=4 pi

The area bounded by the curves y= "sin" x, y= cos x and y-axis in 1 quadrant is -

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

Find the area bounded by y=sin^(-1)x ,y=cos^(-1)x ,and the X -axis.

Find the area bounded by y=sin^(-1)x ,y=cos^(-1)x ,and the X -axis.

Find the area bounded by y=sin^(-1)x,y=cos^(-1)x, and the x-axis .

Find the area bounded by y=sin^(-1)x,y=cos^(-1)x , and the x-axis.

Find the value of sin^-1 (cos(sin^-1x)) + cos^-1 (sin (cos^-1 x))

The area of the region bounded by the curves y=sqrt((1+sin x)/(cos x)) and y=sqrt((1-sin x)/(cos x)) bounded by the lines x=0 and x=(pi)/(4) is