A rectangle has one side on the positive y-axis and one side on the positive x -axis. The upper right hand vertex of the rectangle lies on the curve `y=(lnx)/x^2`. The maximum area of the rectangle 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.

If points A and B lie on x-axis and points C and D lie on the curve y=x^2-1 below the x-axis then maximum area of rectangle ABCD is

If points A and B lie on x-axis and points C and D lie on the curve y=x^2-1 below the x-axis then maximum area of rectangle ABCD is

Perimeter of the rectangle whose sides measure 3x, y is 3xy

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

A rectangle with one side lying along the x-axis is to be inscribed in the closed region of the xy plane bounded by the lines y = 0, y = 3x, and y = 30 - 2x. The largest area of such a rectangle is

Two vertices of a rectangle are on the positive x-axis.The other two vertices lie on the lines y=4x and y=-5x+6. Then the maximum area of the rectangle is: (4)/(3) (b) (3)/(5) (c) (4)/(5) (d) (3)/(4)

A rectangle is inscribed in a equilaternal triangle of side length 2a units . The maximum area of this rectangle can be

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

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