The area bounded by the coordinate axes and the curve `sqrt(x) + sqrt(y) = 1`, is

The area bounded by the line x=1 and the curve sqrt((y)/(x))+sqrt((x)/(y))=4 is

The area bounded by the coordinate axes and normal to the curve y=log_(e)x at the point P( 1 , 0), is

Show that the sum of the intercept on the coordinates axes of tangent to the curve sqrt(x)+sqrt(y)=sqrt(a) at any point on it is constant.

The area bounded by the curve y=f(x) the coordinate axes and the line x = t is given by te^(t) then f(x) =

The area bounded by the curve y=f(x) the coordinate axes and the line x = t is given by te^(t) then f(x) =

Show that the sum of the intercepts on the coordinate axes of any tangent to the curve sqrt x + sqrt y = sqrt a is constant.

The sum of the intercepts made on the axes of coordinates by any tangent to the curve sqrt(x)+sqrt(y)=2 is equal to

The sum of the intercepts made on the axes of coordinates by any tangent to the curve sqrt(x)+sqrt(y)=sqrt(a) is equal to