The area bounded by the curve `y=|cos^(-1)(sinx)|-|sin^(-1)(cosx)|` and axis from `(3pi)/(2)lex le 2pi`

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

The area bounded by the curves y=sin^(-1)|sin x|and y=(sin^(-1)|sin x|)^(2)," where "0 le x le 2pi , is

The area bounded by the curve y = sin2x, axis and y=1, is

The area bounded by the curve y=sin^(-1)(sinx) and the x - axis from x=0" to "x=4pi is equal to the area bounded by the curve y=cos^(-1)(cosx) and the x - axis from x=-pi " to "x=a , then the value of a is equal to

Find the area bounded by the curve |y|+1/2 le e^(-|x|) .

Find the area bounded by the curve y=sin^(-1)x and the line x=0,|y|=pi/2dot

Find the area bounded by the curve y=sin^(-1)x and the line x=0,|y|=pi/2dot

The area bounded by the curve y=sin^(2)x-2 sin x and the x-axis, where x in [0, 2pi] , is

The area bounded by the curves y=cosx and y=sinx between the ordinates x=0 and x=(3pi)/2 is

Solve cos^(-1)(cosx)>sin^(-1)(sinx),x in [0,2pi]