MCQMediumJEE 2026Indefinite Integrals

JEE Mathematics 2026 Question with Solution

Let f(t)=(1sin(loget)1cos(loget))dt,  t>1.f(t)=\int \left(\frac{1-\sin(\log_e t)}{1-\cos(\log_e t)}\right)dt,\; t>1. If f(eπ/2)=eπ/2f(e^{\pi/2})=-e^{\pi/2} and f(eπ/4)=αeπ/4,f(e^{\pi/4})=\alpha e^{\pi/4}, then α\alpha equals

  • A

    1+2-1+\sqrt{2}

  • B

    122-1-2\sqrt{2}

  • C

    12-1-\sqrt{2}

  • D

    1+21+\sqrt{2}

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given:

f(t)=(1sin(loget)1cos(loget))dt,  t>1f(t)=\int \left(\frac{1-\sin(\log_e t)}{1-\cos(\log_e t)}\right)dt,\; t>1

with

f(eπ/2)=eπ/2f(e^{\pi/2})=-e^{\pi/2}

and

f(eπ/4)=αeπ/4f(e^{\pi/4})=\alpha e^{\pi/4}

Find: α\alpha

Use the substitution

x=logetdt=exdxx=\log_e t \Rightarrow dt=e^x \, dx

Then

f(t)=1sinx1cosxexdxf(t)=\int \frac{1-\sin x}{1-\cos x}e^x \, dx

Now simplify the trigonometric factor:

1sinx1cosx=(1sinx)(1+cosx)(1cosx)(1+cosx)=(1sinx)(1+cosx)sin2x=1+cscxcotx\frac{1-\sin x}{1-\cos x}=\frac{(1-\sin x)(1+\cos x)}{(1-\cos x)(1+\cos x)}=\frac{(1-\sin x)(1+\cos x)}{\sin^2 x}=1+\csc x-\cot x

Therefore,

f(t)=ex(1+cscxcotx)dxf(t)=\int e^x(1+\csc x-\cot x) \, dx

Hence,

f(t)=ex(1+cscx)+Cf(t)=e^x(1+\csc x)+C

Using f(eπ/2)=eπ/2f(e^{\pi/2})=-e^{\pi/2}, put x=π2x=\frac{\pi}{2}:

eπ/2=eπ/2(1+cscπ2)+C-e^{\pi/2}=e^{\pi/2}\left(1+\csc \frac{\pi}{2}\right)+C

Since cscπ2=1\csc \frac{\pi}{2}=1,

eπ/2=2eπ/2+C-e^{\pi/2}=2e^{\pi/2}+C

So,

C=3eπ/2C=-3e^{\pi/2}

Now evaluate at t=eπ/4t=e^{\pi/4}:

f(eπ/4)=eπ/4(1+2)f(e^{\pi/4})=e^{\pi/4}\left(1+\sqrt{2}\right)

Thus,

α=1+2\alpha=1+\sqrt{2}

Therefore, the correct option is D.

Using the derived antiderivative

The solution concludes after substitution and simplification that

f(t)=ex(1+cscx)+Cf(t)=e^x(1+\csc x)+C

with x=logetx=\log_e t. Substituting x=π4x=\frac{\pi}{4} gives cscπ4=2\csc \frac{\pi}{4}=\sqrt{2}, so

f(eπ/4)=eπ/4(1+2)f(e^{\pi/4})=e^{\pi/4}(1+\sqrt{2})

Comparing with f(eπ/4)=αeπ/4f(e^{\pi/4})=\alpha e^{\pi/4}, we get

α=1+2\alpha=1+\sqrt{2}

So the correct option is D.

Common mistakes

  • Using the substitution incorrectly. If x=logetx=\log_e t, then dt=exdxdt=e^x \, dx, not just dxdx. Missing the factor exe^x changes the integral completely.

  • Simplifying 1sinx1cosx\frac{1-\sin x}{1-\cos x} incorrectly. The solution uses rationalization with 1+cosx1+\cos x to obtain 1+cscxcotx1+\csc x-\cot x. Skipping this algebra leads to a wrong integrand.

  • Confusing the condition on f(eπ/2)f(e^{\pi/2}) with a definite integral limit. Here it is used to determine the constant of integration CC for the antiderivative.

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