The largest area of a rectangle which has one side on the x-axis and the two vertices on the curve `y=e^(-x^2)` is

Find the area of the largest rectangle with lower base on the x-axis and upper vertices on the curve y=12-x^2.

Find the area of the largest rectangle with lower base on the x-axis and upper vertices on the curve y=12-x^(2)

Find the area of the largest rectangle with lower base on the x-axis and upper vertices on the curve y=12-x^2.

The maximum area of a rectangle whose two vertices lie on the x-axis and two on the curve y=3-|x|,-3<=x<=3

The maximum area of a rectangle whose two vertices lie on the x-axis and two on the curve y=3-|x| , -3 <= x <= 3

Maximum area of rectangle whose two vertices lie on the x -axis and two on the curve y=4-|x| quad AA|x|<4 is

Find the area of the largest rectangle in the first quadrant with two sides on x-axis and y-axis and one vertex on the curve y= 12-x^2

The area (in sq. units) of the largest rectangle ABCD whose vertices A and B lie on the x - axis and vertices C and D lie on the parabola, y=x^(2)-1 below the x - axis, is :

A rectangle has one side on the positive side of Y - axis and one side on the positive side of X - axis. The upper right hand vertiex is on the curve y=(log x)/(x^(2)) . The maximum area of the rectangle is ………. sq. unit.

A rectangle with its sides parallel to the x-axis and y-axis is inscibed in the region bounded by the curves y=x^(2)-4 and 2y=4-x^(2) . The maximum possible area of such a rectangle is closest to the integer