MCQMediumJEE 2023Applications of Integrals (Area)

JEE Mathematics 2023 Question with Solution

The area of the region enclosed by the curve y=x3y = x^3 and its tangent at the point (1,1)(-1, -1) is:

  • A

    274\frac{27}{4}

  • B

    194\frac{19}{4}

  • C

    234\frac{23}{4}

  • D

    314\frac{31}{4}

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The curve is y=x3y = x^3 and we need the area enclosed by the curve and its tangent at (1,1)(-1,-1).

Find: The required enclosed area.

The slope of the tangent to y=x3y=x^3 is obtained from

dydx=3x2\frac{dy}{dx}=3x^2

At x=1x=-1, the slope is 33. Hence the tangent is

y+1=3(x+1)y+1=3(x+1)

So,

y=3x+2y=3x+2

Now find the other point of intersection of the tangent and the curve:

x3=3x+2x^3=3x+2 x33x2=0x^3-3x-2=0

This gives the second intersection point as (2,8)(2,8).

Therefore, the bounded area is

Area=12(3x+2x3)dx\text{Area}=\int_{-1}^{2}(3x+2-x^3)\,dx

Evaluating,

12(3x+2x3)dx=274\int_{-1}^{2}(3x+2-x^3)\,dx=\frac{27}{4}

Therefore, the area is 274\frac{27}{4}. So the correct option is A.

The solution labels the correct option as D, but the worked value is 274\frac{27}{4}, which matches option A.

Intersection and area setup

The tangent line at (1,1)(-1,-1) is first found using slope 3x23x^2 at x=1x=-1.

m=3(1)2=3m=3(-1)^2=3

Using point-slope form,

y+1=3(x+1)y+1=3(x+1) y=3x+2y=3x+2

To find the enclosed region, solve the intersection of the line and curve:

x3=3x+2x^3=3x+2

From the solution, the other intersection point is (2,8)(2,8). Over x[1,2]x\in[-1,2], the line lies above the curve, so area is line minus curve:

Area=12(3x+2x3)dx\text{Area}=\int_{-1}^{2}(3x+2-x^3)\,dx

This evaluates to 274\frac{27}{4}.

Common mistakes

  • Using the curve minus tangent instead of tangent minus curve on [1,2][-1,2]. This gives a negative integral, whereas area must be non-negative. Check which graph lies above before setting up the integral.

  • Finding the tangent slope incorrectly by substituting into y=x3y=x^3 instead of differentiating first. The correct slope comes from dydx=3x2\frac{dy}{dx}=3x^2 evaluated at x=1x=-1.

  • Missing the second intersection point with the curve. The enclosed area is not determined only by the tangency point; the other intersection at x=2x=2 is needed to set the limits correctly.

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