INDEFINITE INTEGRALS | METHOD OF INTEGRA...

INDEFINITE INTEGRALS | METHOD OF INTEGRATION | Integration of `sin^m x cos^n x` m n are integer, Examples: `sin^3x cos^4x dx`, Integration of `sin^m x cos^n x` (m+n) is negative integer, Examples: `sin^4x / cos^8x dx`, Integration by trigonometric substitution, Examples: `intx^2 / sqrt (1-x) dx`, By substitution: Theorem: If `int (ax+b)^n dx = (ax+b)^(n+1)/(a(n+1))+c`, By substitution: Theorem: If `int 1/(ax+b) dx = 1/a ln(ax+b)`, By substitution: Theorem: If `int sin (ax+b) dx = -1/a cos (ax+b)`, Integration of the form `(f, Integral of the form: `(ax+b)^n P(x) dx; (P(x)) / (ax+b)^n dx`, Examples: `intx(1-x)^n dx`

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