8.5 Partial Fractions.

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Presentation transcript:

8.5 Partial Fractions

1 This would be a lot easier if we could re-write it as two separate terms. These are called non-repeating linear factors. You may already know a short-cut for this type of problem. We will get to that in a few minutes.

1 This would be a lot easier if we could re-write it as two separate terms. Multiply by the common denominator. Set like-terms equal to each other. Solve two equations with two unknowns.

This technique is called 1 This technique is called Partial Fractions Solve two equations with two unknowns.

1 The short-cut for this type of problem is called the Heaviside Method, after English engineer Oliver Heaviside. Multiply by the common denominator. Let x = - 1 Let x = 3

1 The short-cut for this type of problem is called the Heaviside Method, after English engineer Oliver Heaviside.

2 Repeated roots: we must use two terms for partial fractions.

4 If the degree of the numerator is higher than the degree of the denominator, use long division first. (from example one)

Examples Example 1

Examples Example 1 (cont’d) Substitute u=x2+x+1 in the first remaining integral and rewrite the last integral. This expression is the required substitution to finish the computation.

Examples Example 2 We can simplify the function to be integrated by performing polynomial division first. This needs to be done whenever possible. We get: Partial fraction decomposition for the remaining rational expression leads to Now we can integrate

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