The area of bounded by `e^(ln(x+1)) ge |y|, |x| le 1` is….

The area bounded by y=x^(2), y=sqrt(x), 0 le x le 4 is

The area of bounded by the curve y=log x the x -axis and the line x=e is

The area of the region on place bounded by max (|x|,|y|) le 1/2 is

The area bounded by y=|log_(e)|x|| and y=0 is

Sketch the region and find the area bounded by the curves |y+x|le1,|y-x|le1 and 2x^(2)+2y^(2)ge1 .

If the area bounded by the curves x^(2)+y^(2) le 4, x+y le 2, and y ge1 is (2pi)/(K)-(sqrtK)/(2)-(1)/(2)sq . units, then the value of K is equal to

The area bounded by y+x^(2)le 4x and y ge3 is k sq. units, then 3k is equal to

Area bounded by |y|+1/2<=e^(-|x|) is

If the area bounded by y le e -|x-e| and y ge 0 is A sq. units, then log_(e)(A) is equal is