The figure shows a triangle AOB and the parabola y = x2. The ratio of the area of the triangle AOB to the area of the region AOB of the parabola y = x is equal to
The area of the plane region bounded by the curve x = y2 - 2 and the· line y = - x is (in square units)
The area bounded by the curve y = sin(x) between x = 0 and x = 2 is (in square units)
1
2
0
4
D.
4
Given curves, y = sin x, x = 0 and x =
Area of OAB = 2Area of OA
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Area bounded by the curve y = log (x - 2), x-axis and x = 4 is equal to
2log(2) + 1
log(2) - 1
log(2) + 1
2log(2) - 1