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Integrating with Partial Fractions (DP IB Maths: AA HL)
Revision Note
Integrating with Partial Fractions
What are partial fractions?
- Partial fractions arise when a quotient is rewritten as the sum of fractions
- The process is the opposite of adding or subtracting fractions
- Each partial fraction has a denominator which is a linear factor of the quotient’s denominator
- e.g. A quotient with a denominator of
- factorises to
- so the quotient will split into two partial fractions
- one with the (linear) denominator
- one with the (linear) denominator
How do I know when to use partial fractions in integration?
- For this course, the denominators of the quotient will be of quadratic form
- i.e.
- check to see if the quotient can be written in the form
- in this case, reverse chain rule applies
- If the denominator does not factorise then the inverse trigonometric functions are involved
How do I integrate using partial fractions?
STEP 1
Write the quotient in the integrand as the sum of partial fractions
This involves factorising the denominator, writing it as an identity of two partial fractions and using values of to find their numerators
e.g.
STEP 2
Integrate each partial fraction leading to an expression involving the sum of natural logarithms
e.g.
STEP 3
Use the laws of logarithms to simplify the expression and/or apply the limits
(Simplifying first may make applying the limits easier)
e.g.
- By rewriting the constant of integration as a logarithm (, say) it is possible to write the final answer as a single term
e.g.
Exam Tip
- Always check to see if the numerator can be written as the derivative of the denominator
- If so then it is reverse chain rule, not partial fractions
- Use the number of marks a question is worth to help judge how much work should be involved
Worked example
Find .
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