A point moves in xy plane such that the sum of its perpendicular distances from x and y axes is 2 .Find the area bounded by the locus of the point in first quadrant.

A point moves in the xy-plane such that the sum of its distance from two mutually perpendicular lines is always equal to 3. The area of the locus of the point is

Find the area bounded by y^(2) =2x, and x<=y+2 in the first quadrant.

Find the area bounded by the curve y^(2) = 36x , the line x = 2 in first quadrant .

Find the area bounded by the curve y=4x^(2),x=0,x=1 and y=4 in first quadrant.

Sum of the distances of a point from two perpendicular lines is 3. The area enclosed by the locus of the point is:

Find the area bounded by the cirxle x^2+y^2 =16 and the line y=x in the first quadrant .

Find the area bounded by the curve y=sqrtx,x=2y+3 in the first quadrant and X-axis.

Find the area bounded by the curve y=sqrtx,x=2y+3 in the first quadrant and X-axis.

A point moves in the XY-plane such that the sum of it’s distances from two mutually perpendicular lines is always equal to 5 units. The area enclosed by the locus of the point is in square units is x then sum of the digits of x 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)