Let P be the set of points `(x, y)` such that `x^2 le y le – 2x + 3`. Then area of region bounded by points in set P is

The shaed region represents the set C of all points (x, y) such that x^(2)+y^(2)le 1 . The transformation T maps the point (x, y) to the point (2x, 4y). Which of the following shows the mapping of the set C by the transformation T ?

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

Find the equation of the set of all points P(x,y) such that the line OP is coincident with the line joining P and the point (3, 2).

The area of the region R={(x,y)//x^(2)le y le x} is

The area of the region bounded by x^(2)+y^(2)-2x-3=0 and y=|x|+1 is

Find the area of the region {(x,y): x^(2)+y^(2) le 1 le x + y}

Find the area of the region {(x,y)//x^(2)-x-1 le y le -1}

The area bounded by 4x^2 le y le 8x+12 is -

For points P-=(x_1,y_1) and Q-=(x_2,y_2) of the coordinates plane, a new distance d (P,Q) is defined by d(P,Q) =|x_1-x_2|+|y_1-y_2| . Let O-=(0,0) and A-=(3,2) . Consider the set of points P in the first quadrant which are equidistant (with respect to the new distance) from O and A. The area of the ragion bounded by the locus of P and the line y=4 in the first quadrant is

A point P(x,y) moves that the sum of its distance from the lines 2x-y-3=0 and x+3y+4=0 is 7. The area bounded by locus P is (in sq. unit)