The area enclosed by `y=sqrt(5-x^(2))` and `y=|x-1|` is

Find the area of the region enclosed by y=-5x-x^(2) and y=x on interval [-1,5]

The area enclosed between y^(2) = x and y=x is:

If the area enclosed by the curve y=sqrt(x) and x=-sqrt(y) , the circle x^2+y^2=2 above the x-axis is A , then the value of (16)/piA is___

Let S be the area of the region enclosed by y=e^(-x^(2)),y=0, x=0 and x=1 . Then

Sketch the region bounded by the curves y=sqrt(5-x^2) and y=|x-1| and find its area.

Find the area bounded by the curves y=sqrt(1-x^(2)) and y=x^(3)-x without using integration.

If S is the area bounded byb the curve y =sqrt( 1-x^(2)) and y= x^(3) -x then the value of (pi)/( S) is equal to-

Let S be the area of the region enclosed by y= e^(-x^(2)) ,y=0 x =0 and x=1 ,Then -

If A is the area bounded by the curves y=sqrt(1-x^2) and y=x^3-x , then of pi/Adot

Find the area enclosed by the curves y= sqrtx and x= -sqrty and the circle x^(2) + y^(2) =2 above the x-axis.