Class 12

Math

Calculus

Application of Integrals

Find the area of the region bounded by the curve $y_{2}=4x$ and the line $x=3$.

Connecting you to a tutor in 60 seconds.

Get answers to your doubts.

Using the method of integration find the area of the region bounded by lines:$2x+y=4,3x2y=6$and $x3y+5=0$

For which of the following values of $m$ is the area of the regions bounded by the curve $y=x−x_{2}$ and the line $y=mx$ equal $29 ?$ (a) $−4$ (b) $−2$ (c) 2 (d) 4

Find the area of the region bounded by the parabola $y=x_{2}$ and $y=∣x∣$.

Find the area bounded by a . $y=(g)_{e}∣x∣andy=0$ b $y=∣(g)_{3}∣x∣∣andy=0$

Find the area lying above x-axis and included between the circle $x_{2}+y_{2}=8x$and the parabola $y_{2}=4x$.

The area enclosed between the curve $y_{2}(2a−x)=x_{3}$ and the line $x=2a$ above the x-axis is (a) $πa_{2}squ˙nits$ (b) $23πa_{2} squ˙nits$ (c) $2πa_{2}squ˙nits$ (d) $3πa_{2}squ˙nits$

Find the area bounded by the curve $x_{2}=4y$and the line $x=4y_{2}$.

Find the area of the region in the first quadrant enclosed by the x-axis, the line $y=x$, and the circle $x_{2}+y_{2}=32$.