The area defined by `|y| le e ^(|x|)-1/2` in cartesian co-ordinate system, is :

The area defined by |2x + y| + |x - 2| le 4 in the x - y coordinate plane is

The area defined by 2 le |x + y| + |x - y| le 4 is

The area defined by [x] + [y] = 1, -1 le x , y le 3 in the x - y coordinate plane is

The area of the region defined by | |x|-|y| | le1 and x^(2)+y^(2)le1 in the xy plane is

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

The area bounded by the curve y^(2)=x and the ordinate x=36 is divided in the ratio 1:7 by the ordinate x=a. Then a=

The area bounded by y=log_(e)x , X-axis and the ordinate x = e is

If the ordinate x = a divides the area bounded by the curve y=1+(8)/(x^(2)) and the ordinates x=2, x=4 into two equal parts, then a is equal to

The area (in sq. untis) bounded by [x+y]=2 with the co - ordinate axes is equal to (where [.] denotes the greatest integer function)

The area bounded by y=e^(x),y=e^(-x) and x = 2 is