MCQMediumJEE 2025Applications of Integrals (Area)

JEE Mathematics 2025 Question with Solution

The area of the region enclosed by the curves y=exy = e^x, y=ex1y = |e^x - 1|, and the y-axis is:

  • A

    1+log221 + \log_2 2

  • B

    log22\log_2 2

  • C

    2log2212 \log_2 2 - 1

  • D

    1log221 - \log_2 2

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The curves are y=exy = e^x and y=ex1y = |e^x - 1|, and the region is enclosed with the y-axis.

Find: The enclosed area.

For x<0x < 0, we have ex1<0e^x - 1 < 0, so

y=ex1=1exy = |e^x - 1| = 1 - e^x

The intersection with y=exy = e^x is obtained from

ex=1exe^x = 1 - e^x

so

2ex=12e^x = 1

and hence

ex=12,x=loge2e^x = \frac{1}{2}, \qquad x = -\log_e 2

Detailed Working from Extracted Solution

Between x=loge2x = -\log_e 2 and x=0x = 0, the upper curve is y=exy = e^x and the lower curve is y=1exy = 1 - e^x. Therefore,

Area=loge20(ex(1ex))dx\text{Area} = \int_{-\log_e 2}^{0} \left(e^x - (1 - e^x)\right) dx

which becomes

Area=loge20(2ex1)dx\text{Area} = \int_{-\log_e 2}^{0} (2e^x - 1) \, dx

Evaluate and Compare with Options

Now evaluate:

(2ex1)dx=2exx\int (2e^x - 1) \, dx = 2e^x - x

So,

Area=[2exx]loge20\text{Area} = \left[2e^x - x\right]_{-\log_e 2}^{0} =(20)(2eloge2+loge2)= (2 - 0) - \left(2e^{-\log_e 2} + \log_e 2\right)

Since eloge2=12e^{-\log_e 2} = \frac{1}{2},

Area=2(1+loge2)=1loge2\text{Area} = 2 - (1 + \log_e 2) = 1 - \log_e 2

The extracted solution declares the correct option as D, and the option text is 1log221 - \log_2 2. This notation is inconsistent because log22=1\log_2 2 = 1, while the working gives 1loge21 - \log_e 2. Following the recorded answer, the correct option is D.

Common mistakes

  • Using ex1=ex1|e^x - 1| = e^x - 1 for all xx is wrong because the absolute value changes form when x<0x < 0. For the enclosed region to the left of the y-axis, use ex1=1ex|e^x - 1| = 1 - e^x.

  • Setting the limits as 00 to loge2-\log_e 2 without correcting orientation can produce a negative integral. Area must be taken with limits in increasing order, or the absolute value of the integral must be used.

  • Assuming the curves intersect at x=0x = 0 is incorrect. At x=0x = 0, the values are 11 and 00 respectively, so they do not meet there. First solve ex=ex1e^x = |e^x - 1| to get the actual intersection.

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