Difference between revisions of "022 Sample Final A, Problem 3"

Revision as of 12:26, 30 May 2015

Find the antiderivative: $\int {\frac {6}{x^{2}-x-12}}$

Foundations:
1) What does the denominator factor into? What will be the form of the decomposition?
2) How do you solve for the numerators?
3) What special integral do we have to use?
Answer:
1) Since $x^{2}-x-12=(x-4)(x+3)$ , and each term has multiplicity one, the decomposition will be of the form: ${\frac {A}{x-4}}+{\frac {B}{x+3}}$
2) After writing the equality, ${\frac {6}{x^{2}-x-12}}={\frac {A}{x-4}}+{\frac {B}{x+3}}$ , clear the denominators, and evaluate both sides at x = 4, -3, Each evaluation will yield the value of one of the unknowns.
3) We have to remember that $\int {\frac {c}{x-a}}dx=c\ln(x-a)$ , for any numbers c, a.

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+<span class="exam"> Find the antiderivative: <math>\int \frac{6}{x^2 - x - 12}</math>
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 |2) How do you solve for the numerators?
 |-
-) What special integral do we have to use?
+|3) What special integral do we have to use?
 |-
 |Answer: