The area of the region bounded by y2 = 16 - x2, y = 0, x = 0 in the first quadrant is (in, square units)
The area bounded by the lines y - 2x = 2, y = 4 and the (Y-axis is equal to in square units)
1
4
0
3
The area bounded by the curve y = sin(x) between the ordinates x = 0, x = and tht x-axis is :
2 sq unit
4 sq unit
1 sq unit
3 sq unit
If the area bounded by the parabola y = 2 - x2 and the line x + y = 0 is A sq unit, then A equals:
1/2
1/3
2/9
9/2
D.
9/2
Required area
The area cut off by the latus rectum from the parabola y2 = 4ax is :
(8/3)a sq unit
(8/3) sq unit
(3/8)a2 sq unit
(8/3)a3 sq unit
The area between the curves y = xex and y = xe-x and the line x = 1, in sq unit, is :
sq unit
0 sq unit
2e sq unit
sq unit