Maximum area of the rectangle whose two vertices lie on the x-axis and two on the curve `y = 3-|x|` and `|x| le 3` is

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 area contained between the x-axis and one area of the curve y=cos 3x, is

The area bounded by the x-axis and the curve y = 4x - x^2 - 3 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

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

Area between the x -axis and the curve y=cosx , when 0 le x le 2pi is:

The area bounded by the curve y=3/|x| and y+|2-x|=2 is

Let a parabola be y=12-x^2 . Find the maximum area of rectangle whose base lie on x-axis and two points lie on parabola. (A) 8 (B) 4 (C) 32 (D) 34

Let a parabola be y=12-x^2 . Find the maximum area of rectangle whose base lie on x-axis and two points lie on parabola. (A) 8 (B) 4 (C) 32 (D) 34

The area bounded by the X-axis and the curve y=4x-x^(2)-3 is