Find area bounded by the curve `sqrt(x) +sqrt(y) =sqrt(a)` & coordinate axes.

What is the area bounded by the curve sqrt(x)+sqrt(y)=sqrt(a)(x,yge0) and the coordinate axes?

" The area bounded by the curve "sqrt(x)+sqrt(y)=sqrt(a)(a>0)" and the co-ordinate axes is "

The area bounded by the curve sqrt(|x|)+sqrt(|y|)=1 and the coordinate axes is ______ sq. units

Sketch and find the area bounded by the curve sqrt(|x|)+sqrt(|y|)=sqrt(a) and x^(2)+y^(2)=a^(2)(wherea>0) If curve |x|+|y|=a divides the area in two parts, then find their ratio in the first quadrant only.

Sketch and find the area bounded by the curve sqrt(|x|)+sqrt(|y|)=sqrt(a) and x^2+y^2=a^2 (where a > 0). If curve |x|+|y|=a divides the area in two parts, then find their ratio in the first quadrant only.

Sketch and find the area bounded by the curve sqrt(|x|)+sqrt(|y|)=sqrt(a) and x^2+y^2=a^2 (where a > 0). If curve |x|+|y|=a divides the area in two parts, then find their ratio in the first quadrant only.

Find the area bounded by the curves y = sqrt(1-x^2) and y = 0.

Find the area bounded between the curves y=x^(2), y=sqrt(x)

Find the area bounded between the curves y=x^(2), y=sqrt(x)

" The area of the region formed by the curve ",sqrt(x)+sqrt(y)=4" between co-ordinate axes "