Calculus II: Integration of Rational Functions with Repeated Irreducible Quadratic Factors (II)
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- Опубликовано: 19 окт 2024
- This video explains the case of Q(x) which contains repeated irreducible Quadratic factor . The Q(x) has the factor (ax^2 + bx+c) which repeats itself then instead of single partial fraction the partial fraction decomposition becomes as R(x)/Q(x) = AX1+B1/(ax^2 + bx + c) + AX2+B2/(x2+bx +c)^2.
The approach use in the solution to this question is to take the rational function - the fraction out and solve it using partial Fraction decomposition then after that we do the integration .
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