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

Find the area of the region [ (x,y) :x^2 le y le x )

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

Consider the set A_(n) of point (x,y) such that 0 le x le n, 0 le y le n where n,x,y are integers. Let S_(n) be the set of all lines passing through at least two distinct points from A_(n) . Suppose we choose a line l at random from S_(n) . Let P_(n) be the probability that l is tangent to the circle x^(2)+y^(2)=n^(2)(1+(1-(1)/(sqrt(n)))^(2)) . Then the limit lim_(n to oo)P_(n) is

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

Let A={(x, y):y^(2) le 4x, y-2x ge -2, y ge 0} . The area of the region A is

Let f(x) = x^(2) + 6x + 1 and R denote the set of points (x, y) in the coordinate plane such that f(x) + f(y) le 0 and f(x) – f(y) le 0 . The area of R is equal to

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

The area of the region : R = {(x, y) : 5x^2 le y le 2x^2 + 9} is :