Two circle of radii a and b touching externally are inscribed in area bounded by `y= sqrt(1-x^(2))` and x-axis. If `b= (1)/(2) and a= (1)/(k)`, then k is

Two circles of radii a and b touching each other externally,are inscribed in the area bounded by y=sqrt(1-x^(2)) and the x-axis.If b=(1)/(2), then a is equal to (1)/(4) (b) (1)/(8)(c)(1)/(2) (d) (1)/(sqrt(2))

The area bounded by y = -x^(2) + 1 and the x-axis is

The area bounded by the curve y=x(x^(2)-1) and x-axis is

Find area bounded by y = log_(1/2) x and x-axis between x = 1 and x = 2

Area bounded by x=1,x=2,xy=1 and X-axis is

The area bounded by y = sin^(-1)x,x=(1)/(sqrt(2)) and X-axis is

The area bounded by the lines y= || x-1| -2| and x axis is

Find the area bounded by the curves y=x+sqrt(x^(2)) and xy=1, the x -axis and the line x=2

The area bounded by y=x^(2),y=[x+1],x<=1 and the y axis is

Area bounded by the curves y = x-x^(2) and X-axis, between Y-axis and the line x = 1, is