MHT CET · Maths · Indefinite Integration
\( \int[1+2 \tan x(\tan x+\sec x)]^{\frac{1}{2}} d x= \)
- A \(\log [\sec x(\sec x-\tan \mathrm{x})]+\mathrm{c}\)
- B \(\log [\operatorname{cosec} x(\sec x+\tan x)]+c\)
- C \(\log [\sec x(\sec x+\tan x)]+c\)
- D \(\log [\sec \mathrm{x}+\tan \mathrm{x}]+\mathrm{c}\)
Answer & Solution
Correct Answer
(C) \(\log [\sec x(\sec x+\tan x)]+c\)
Step-by-step Solution
Detailed explanation
Let \(I=\int[1+2 \tan x(\tan x+\sec x)]^{1 / 2} d x=\) \(\int 1+2 \tan ^2 x+2 \tan x \sec x)^{1 / 2} d x\)
\(
\int\left[\left(1+\tan ^2 x\right)+\tan ^2 x+2 \sec x \tan x\right]^{1 / 2} d x=\int\) \(\left(\sec ^2 x+\tan ^2 x+2 \sec x \tan x\right)^{1 / 2} d x
\)
\(=\int\left[(\sec x+\tan x)^2\right]^{1 / 2} d x=\int(\sec x+\) \(\tan x) d x=\int \sec x d x+\int \tan x d x \)
\( =\log |\sec x+\tan x|-\log |\cos x|+c\) \(=\log \frac{|\sec x+\tan x|}{|\cos x|}+c \)
\( =\log [\sec x(\sec x+\tan x)]+c\)
\(
\int\left[\left(1+\tan ^2 x\right)+\tan ^2 x+2 \sec x \tan x\right]^{1 / 2} d x=\int\) \(\left(\sec ^2 x+\tan ^2 x+2 \sec x \tan x\right)^{1 / 2} d x
\)
\(=\int\left[(\sec x+\tan x)^2\right]^{1 / 2} d x=\int(\sec x+\) \(\tan x) d x=\int \sec x d x+\int \tan x d x \)
\( =\log |\sec x+\tan x|-\log |\cos x|+c\) \(=\log \frac{|\sec x+\tan x|}{|\cos x|}+c \)
\( =\log [\sec x(\sec x+\tan x)]+c\)
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