Math, asked by shajisurendran821, 4 months ago

solve the integral and (please don't spam)​

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Answered by TrustedAnswerer19
37

Answer:

See the attachment please

Step-by-step explanation:

Extra formula :

\odot\: \: \: \displaystyle \bf\int \dfrac{1}{x} \: dx =log |x |+ C \\ \\ \odot \: \: \: \displaystyle \bf\int {a}^{x} \: dx = \frac{ {a}^{x} }{log \: a} + C \\ \\ \odot \: \: \: \displaystyle \bf\int sinx \: dx = - cosx + C \\ \\ \odot\: \: \: \displaystyle \bf\int cosx \: dx =sinx + C \\ \\ \odot \: \: \: \displaystyle \bf\int sec {}^{2} x \: dx =tanc + C \\ \\ \odot \: \: \: \displaystyle \bf\int {cosec}^{2} x \: dx = - cotx + C \\ \\ \odot \: \: \: \displaystyle \bf\int secx.tanx \: dx =secx + C \\ \\ \odot \: \: \: \displaystyle \bf\int cosecx.cotx \: dx = - cosecx + C \:

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