Area between the x-axis and the curve `y=cosx`, when `0 le x le 2pi` is (A) `0` (B) `2` (C) `3` (D) `4`

Find the area between the x-axis and the curve y = sqrt(1+cos4x), 0 le x le pi .

The area between the curve y=xsin x and x-axis where o le x le 2 pi , is

The area between the curve y = sec x and y-axis when 1le y le 2 is-

Area under the curve when 2x^2le y le4-2x

The area bounded by the y-axis, y=cos x and y=sin x, 0 le x le pi//4 , is

Draw the graph of y=sin x and y=cosx, 0 le x le 2pi

The area between the curves y=x^(2) and y=x^(1//3), -1 le x le 1 is

The area under the curve y=|cosx-sinx|, 0 le x le pi/2 , and above x-axis is: (A) 2sqrt(2)+2 (B) 0 (C) 2sqrt(2)-2 (D) 2sqrt(2)

Find the area of the region bounded by the x-axis and the curves defined by y = tanx , (where (-pi)/(3) le x le (pi)/(3) ) and y = cotx .(where (pi)/(6) le x le (2pi)/(3) )

The area between y = x and y=x^(2), 0 le x le 2 is