For `j =0,1,2…n ` let `S _(j)` be the area of region bounded by the x-axis and the curve `ye ^(x)=sin x ` for `j pi le x le (j +1) pi`
The ratio `(S_(2009))/(S_(2010))` equals :

For j =0,1,2…n let S _(j) be the area of region bounded by the x-axis and the curve ye ^(x)=sin x for jpi le x le (j +1) pi The value of sum _(j =0)^(oo) S_(j) equals to :

The area of the region bounded by the X-axis and the curves defined by y=tan x, (-pi/3 le x le pi/3) is

The area of the region bounded by the y-axis, y = cos x and y = sin x, 0 le x le pi//2 is

The area of the region bounded by the y-axis, y = cos x and y = sin x, 0 le x le (pi)/(2) is:

The area of the region bounded by the curve y=cosx, X-axis and the lines x=0, x= 2pi is

Let b!=0 and for j=0,1,2,....,n . Let S_(j) be the area of the region bounded by Y_axis and the curve x cdot e^(ay)=sin by, (jpi)/bleyle((j+1)pi)/(b) . Show that S_(0),S_(1),S_(2),...S_(n) are in geometric progression. Also, find their sum for a=-1 and b=pi .

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

Find the area of the region bounded by the curve y = sin x, the X−axis and the given lines x = - pi , x = pi

Area of the region bounded by the curves y = tan x, y = cot x and X-axis in 0 le x le (pi)/(2) is