Concept explainers
In problems 13-46, find the partial fraction decomposition of each rational expression.
To find: The partial fraction decomposition of the given rational function.
Answer to Problem 36AYU
Solution:
Explanation of Solution
Given:
Formula used:
If contains a non-repeated irreducible quadratic factor of the form , then, in the partial fraction decomposition of , takes the form:
where the numbers and are to be determined.
If has repeated linear factor of the form an integer, then, in the partial fraction decomposition of , takes the form:
Where the numbers are to be determined.
Calculation:
The given partial fraction decomposition takes the form
----- Eq (1)
Equating the co-efficients on both sides in Eq(1),
-----Eq(2)
-----Eq(3)
… -----Eq(4)
… -----Eq(5)
Solving for we get
The partial fraction decomposition of is .
Chapter 11 Solutions
Precalculus Enhanced with Graphing Utilities
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