The area bounded by the curves `y=sin^-1|sinx| and y=(sin^-1|sinx|)^2,` where `0 le x le 2pi` is (a) `1/3+pi^2/4` sq. units (b) `1/6+pi^3/8` sq. units (c) `2` sq. units (d) `4/3+pi^2[(2pi-3)/6]`

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 curves y=sin^(-1)|sin x| and y=(sin^(-1)|sin x|)^(2) where 0<=x<=2 pi is (a) (1)/(3)+(pi^(2))/(4) sq.units (b) (1)/(6)+(pi^(3))/(8) sq.units (c) 2 sq.units (d) (4)/(3)+pi^(2)[(2 pi-3)/(6)]

The area bounded by the curves y=sin^(-1)|sin x| and y=(sin^(-1)|sin x|^(2), where 0<=x<=2 pi is (1)/(3)+(pi^(2))/(4)sq. units (b) (1)/(6)+(pi^(3))/(8) sq.units 2 sq.units (d) none of these

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

The area enclosed by 2|x|+3|y|<=6 is (a) 3 sq.units (b) 4 sq.units (c)12 sq.units (d) 24 sq.units

The area enclosed between the curve y=sin^(2)x and y=cos^(2)x in the interval 0le x le pi is _____ sq. units.

The area bounded by the parabola y=(x+1)^2 and y=(x-1)^2 and the line y=1/4 is (A) 4 sq. units (B) 1/6 sq. units (C) 3/4 sq. units (D) 1/3 sq. units

The area bounded by the curve y=x^3 , x-axis and two ordinates x=1 and x=2 is equal to (A) 15/2 sq. units (B) 15/4 sq. units (C) 17/2 sq. units (D) 17/4 sq. units

Area enclosed between the curve y^(2)(2a-x)=x^(3) and line x=2a above X -axis is (a) pi a^(2) sq units (b) (3 pi a^(2))/(2) squnits (c) 2 pi a^(2) sq units (d) 3 pi a^(2) sq units

The area of the region bounded by the curves y=|x-1| and y=3-|x| is (A) 6 sq. units (B) 2 sq. units (C) 3 sq. units (D) 4 sq. units