NVAMediumJEE 2023Applications of Integrals (Area)

JEE Mathematics 2023 Question with Solution

Let α\alpha be the area of the larger region bounded by the curve y2=8xy^2 = 8x and the lines y=xandx=2,y = x \quad \text{and} \quad x = 2, which lies in the first quadrant. Then the value of 3α3\alpha is equal to:

Answer

Correct answer:22

Step-by-step solution

Standard Method

Given: The curve is y2=8xy^2 = 8x and the lines are y=xy = x and x=2x = 2 in the first quadrant.

Find: The value of 3α3\alpha, where α\alpha is the area of the larger bounded region.

First find the intersection points of y=xy = x and y2=8xy^2 = 8x.

x2=8xx^2 = 8x x(x8)=0x(x-8)=0

So, x=0x=0 or x=8x=8. Since y=xy=x, the intersection points are O(0,0)O(0,0) and A(8,8)A(8,8).

The line x=2x=2 meets the parabola y2=8xy^2=8x at

y2=16y^2=16

so y=±4y=\pm 4. In the first quadrant, the relevant point is Q(2,4)Q(2,4).

For xx from 22 to 88, the upper branch of the parabola is y=8xy=\sqrt{8x} and the line is y=xy=x. Hence the required area is

α=28(8xx)dx\alpha = \int_{2}^{8} \left(\sqrt{8x}-x\right) \, dx

Detailed Evaluation

Now evaluate the integral:

α=288xdx28xdx\alpha = \int_{2}^{8} \sqrt{8x} \, dx - \int_{2}^{8} x \, dx

Using 8x=22x1/2\sqrt{8x}=2\sqrt{2}\,x^{1/2},

288xdx=2228x1/2dx\int_{2}^{8} \sqrt{8x} \, dx = 2\sqrt{2} \int_{2}^{8} x^{1/2} \, dx =22[23x3/2]28= 2\sqrt{2} \left[ \frac{2}{3}x^{3/2} \right]_{2}^{8} =423(83/223/2)= \frac{4\sqrt{2}}{3}\left(8^{3/2}-2^{3/2}\right) =423(16222)= \frac{4\sqrt{2}}{3}\left(16\sqrt{2}-2\sqrt{2}\right) =423142=1123= \frac{4\sqrt{2}}{3}\cdot 14\sqrt{2} = \frac{112}{3}

Also,

28xdx=[x22]28=64242=30\int_{2}^{8} x \, dx = \left[\frac{x^2}{2}\right]_{2}^{8} = \frac{64}{2}-\frac{4}{2}=30

Therefore,

α=112330=1123903=223\alpha = \frac{112}{3}-30 = \frac{112}{3}-\frac{90}{3}=\frac{22}{3}

Hence,

3α=223\alpha = 22

Therefore, the required numerical value is 2222.

The solution contains an intermediate inconsistent simplification for 288xdx\int_{2}^{8}\sqrt{8x}\,dx, but its final conclusion α=223\alpha = \frac{22}{3} and hence 3α=223\alpha = 22 is correct.

Common mistakes

  • Using the full parabola instead of only the first-quadrant branch. Here the relevant curve is y=8xy=\sqrt{8x}, not both y=±8xy=\pm\sqrt{8x}. Restrict the graph to the region stated in the question.

  • Integrating over the wrong interval, such as from x=0x=0 to x=8x=8. The boundary includes the line x=2x=2, so the enclosed larger first-quadrant region is computed from x=2x=2 to x=8x=8.

  • Taking the line minus parabola in the wrong order. For 2x82 \le x \le 8, 8xx\sqrt{8x} \ge x, so the area must be (upperlower)dx=28(8xx)dx\int (\text{upper} - \text{lower}) \, dx = \int_{2}^{8}(\sqrt{8x}-x)\,dx.

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