The least integer which is greater than or equal to the area of region in `x-y` plane satisfying `x ^(6) -x ^(2) +y ^(2) le 0` is:

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

Find the area of the region in which points satisfy 3 le |x| + |y| le 5.

Find the area of the region given by x+y le 6, x^2+y^2 le 6y and y^2 le 8x .

Using integration ,find the area of the region {(x,y) : y^(2) le 4x, 4x^(2) +4y^(2) le 9 }

Find the area of the region formed by the points satisfying |x| + |y| + |x+y| le 2.

The area of the region defined by | |x|-|y| | le1 and x^(2)+y^(2)le1 in the xy plane is

Let |__x__| be defined to be the ''floor'' of x, where |__x__| is the greatest integer that is less than or equal to x, and let |~x~| be the ''ceiling'' of x, where |~x~| is the least integer that is greater than or equal to x. If f(x) |~x~| + |__x__| and x is not an integer, than f(x) is also equal to

If f(x)=|2-x|+(2+x) , where (x)=the least integer greater than or equal to x, them

The area of the region {(x,y): xy le 8,1 le y le x^(2)} is :

Let f (x)= {{:(x [x] , 0 le x lt 2),( (x-1), 2 le x le 3):} where [x]= greatest integer less than or equal to x, then: The number of integers in the range of y =f (x) is: