The area enclosed between the curve `y=log_(e)(x+e)` and the coordinate axes, is

Find the area enclosed between the curve y = x^(2) , the axis and the ordinates x = 1 and x=2 .

The area enclosed between the curves y^2=x and y=|x| is

Find the area enclosed between the curves y=x^(2)+1,y=2x-2 and the ordinates x=-1 and x = 2

The area enclosed between the curves y=(log)_e(x+e),x=(log)_e(1/y), and the x-axis is (a) 2s qdotu n i t s (b) 1s qdotu n i t s (c) 4s qdotu n i t s (d) none of these

The area enclosed between the curve y^(2)(2a-x)=x^(3) and the line x=2 above the x-axis is

Using integration, find the area enclosed between the curve y=2x-x^(2) , and the x-axis.

Find the area enclosed between the curves y^(2)=2x+6 and y=x-1

The area enclosed within the curve |x|+|y|=1 is

The area enclosed by the curve y^2 +x^4=x^2 is

The area bounded by the curve y=x(1-log_(e)x) and x-axis is