Calculus II - 5

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Stewart Calculus Section 7.4

$7.4 Integration of Rational Functions First step: if the rational function is improper, decompose it to a polynomial plus a proper rational function. Second step: factor the dominator to be a product of linear factors and/or irreducible quadratic factors. Third step: decompose the proper rational function to be a sum of partial fractions.$

CASE I: the dominator is a product of
distinct linear factors.

CASE II: the dominator is a product of
linear factors, some of which are repeated.

CASE III: the dominator contains distinct
irreducible quadratic factors.

Case IV: the dominator contains repeated
irreducible quadratic factors.

Ex: find
+
I
CA S E II
We recognize + is irreducible.

Ex: find
+
I
CA S E II
We recognize + is irreducible.

Complete the square: + =( ) +

+
Ex: find
+
+ +
We assume = + CAS E III
+ +

+
Ex: find
+
+ +
We assume = + CAS E III
+ +

and solve = , = , = .

+
Ex: find
+
+ +
We assume = + CAS E III
+ +

and solve = , = , = .
+
so = +
+ + +

+ +
Ex: find
( + ) CAS E
IV
+ + + +
We assume = +
( + ) + ( + )

+ +
Ex: find
( + ) CAS E
IV
+ + + +
We assume = +
( + ) + ( + )

and solve = , = , = , = .

+ +
Ex: find
( + ) CAS E
IV
+ + + +
We assume = +
( + ) + ( + )

and solve = , = , = , = .
+ + +
so =
( + ) + ( + )

+
Ex: find

√
Let = +
zation
Rati onali
+
then =

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Calculus II - 5

1. 7.4 Integration of Rational Functions First step: if the rational function is improper, decompose it to a polynomial plus a proper rational function. Second step: factor the dominator to be a product of linear factors and/or irreducible quadratic factors. Third step: decompose the proper rational function to be a sum of partial fractions.

2. CASE I: the dominator is a product of distinct linear factors. CASE II: the dominator is a product of linear factors, some of which are repeated. CASE III: the dominator contains distinct irreducible quadratic factors. Case IV: the dominator contains repeated irreducible quadratic factors.

3. Ex: find +

4. Ex: find + I CA S E II We recognize + is irreducible.

5. Ex: find + I CA S E II We recognize + is irreducible. Complete the square: + =( ) +

6. Ex: find + I CA S E II We recognize + is irreducible. Complete the square: + =( ) + = ( + ) − = + +

7. Ex: find + I CA S E II We recognize + is irreducible. Complete the square: + =( ) + = ( + ) − = + + = + +

8. Ex: find + I CA S E II We recognize + is irreducible. Complete the square: + =( ) + = ( + ) − = + + = + + = ( + ) +

9. Ex: find + I CA S E II We recognize + is irreducible. Complete the square: + =( ) + = ( + ) − = + + = + + = ( + ) + = ( + ) +

10. + Ex: find +

11. + Ex: find + + + We assume = + CAS E III + +

12. + Ex: find + + + We assume = + CAS E III + + and solve = , = , = .

13. + Ex: find + + + We assume = + CAS E III + + and solve = , = , = . + so = + + + +

14. + Ex: find + + + We assume = + CAS E III + + and solve = , = , = . + so = + + + + = | |+ ( + ) +

15. + + Ex: find ( + )

16. + + Ex: find ( + ) CAS E IV + + + + We assume = + ( + ) + ( + )

17. + + Ex: find ( + ) CAS E IV + + + + We assume = + ( + ) + ( + ) and solve = , = , = , = .

18. + + Ex: find ( + ) CAS E IV + + + + We assume = + ( + ) + ( + ) and solve = , = , = , = . + + + so = ( + ) + ( + )

19. + + Ex: find ( + ) CAS E IV + + + + We assume = + ( + ) + ( + ) and solve = , = , = , = . + + + so = ( + ) + ( + ) = ( + )+ + + ( + )

20. + Ex: find

21. + Ex: find √ Let = +

22. + Ex: find √ Let = + zation Rati onali + then =

23. + Ex: find √ Let = + zation Rati onali + then = = +

24. + Ex: find √ Let = + zation Rati onali + then = = + = + | | | + |+

25. + Ex: find √ Let = + zation Rati onali + then = = + = + | | | + |+ + = + + + + +

Calculus II - 5

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