Given that `x in [0,1]` and `y in [0,1]`. Let `A` be the event of selecting a point `(x,y)` satisfying `y^(2) le x` and `B` be the event selecting a point `(x,y)` satisfying `x^(2) le y`, then

Let us define a region R is xy-plane as a set of points (x,y) satisfying [x^2]=[y] (where [x] denotes greatest integer le x) ,then the region R defines

The area (in sqaure units) of the region {(x,y):x ge 0, x + y le 3, x^(2) le 4y and y le 1 + sqrt(x)} is

The area of the region described by A={(x,y):x^(2)+y^(2)le1 and y^(2)le1-x} is

Two positive real numbers x and y satisfying xle1 and yle1 are chosen at random. The probability that x+yle1 , given that x^2+y^2le(1)/(4) , is

For points P -= (x_(1) ,y_(1)) and Q = (x_(2),y_(2)) of the coordinate 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) ,A -= (1,2), B -= (2,3) and C-= (4,3) are four fixed points on x-y plane Let R(x,y) such that R is equidistant from the point O and A with respect to new distance and if 0 le x lt 1 and 0 le y lt 2 , then R lie on a line segment whose equation is

If sin^-1 x = y , then 0 le y le pi

If 0 le x le 3 pi , 0 le y le 3 pi and cos x * sin y=1 , then find the possible number of values of the orederd pair (x,y) .

Let a solution y = y(x) of the differential equation xsqrt(x^2-1) dy - y sqrt(y^2-1) dx=0 , satisfy y(2)= 2/sqrt 3