Math, asked by anuragpawar13901, 1 year ago

integrate by substitution method

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Answered by brunoconti

0

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Answered by diwanamrmznu

3

solution:-

$\implies \int \: \frac{x {}^{2} }{1 + x {}^{6} }dx \\ \\$

can We be written as

$\implies \int \: \frac{x {}^{2} }{1 + (x {}^{3}) {}^{2} } \\$

let x^3=t

$\implies \: \frac{d}{dx} x {}^{3} = dt \\ \\ \implies \: 3x {}^{2} dx = dt \\ \\ \implies \: x {}^{2} dx = \frac{dt}{3} \\$

put value

$\implies \int \: \frac{1}{1 + t {}^{2} } \frac{dt}{3} \\$

$\implies \: \frac{1}{3} \tan {}^{ - 1} t$

put t value

$\implies \: \frac{1}{3} \tan {}^{ - 1} x {}^{3} + c$

________________________________

I hope it helps you

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