The area of the region containing the points (x, y) satisfy-ing `4 <= x^2 + y^2 <= 2(|x| + |y|)` is

Find tha area of the region containing the points (x, y) satisfying 4 le x^(2) + y^(2) le 2 (|x|+ |y|) .

Find tha area of the region containing the points (x, y) satisfying 4 le x^(2) + y^(2) le 2 (|x|+ |y|) .

Find tha area of the region containing the points (x, y) satisfying 4 le x^(2) + y^(2) le 2 (|x|+ |y|) .

The area of the region containing the points (x,y) satisfying 4<=x^(2)+y^(2)<=2(|x|+|y|) is 8 sq.units (b) 2 sq.units 4 pi sq. units (d )2 pi sq. units

Let P(x,y) be a moving point in the x-y plane such that [x].[y] = 2, where [.] denotes the greatest inte- ger function, then area of the region containing the points P(x,y) is equal to :

The area the region containing the points satisfying |y|+(1)/(2)<=e^(-|x|) and max(|x|,|y|<=2) is (A) 2-ln4(B)ln2-4(C)2+ln4(D) none

Area bounded by the region consisting of points (x,y) satisfying y le sqrt(2-x^(2)), y^(2)ge x, sqrt(y)ge -x is

Area bounded by the region consisting of points (x,y) satisfying y le sqrt(2-x^(2)), y^(2)ge x, sqrt(y)ge -x is

Find the area of the region in which the points satisfy the inequaties 4 =0