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**Factoring**: At a Glance

- Topics At a Glance
- Polynomial Division
- Common Factors
- Factoring
- Long Division
**More Polynomial Division**- Common Factors
**Factoring**- Long Division
- A Clever Trick
- Rational Expressions
- Evaluating Rational Expressions
- Simplifying Rational Expressions
- Multiplying and Dividing Rational Expressions
- Adding and Subtracting Rational Expressions
- Simplifying Complex Rational Expressions
- Equations Involving Rational Expressions
- Word Problems
- In the Real World
- I Like Abstract Stuff; Why Should I Care?
- How to Solve a Math Problem

After looking for single-term common factors, the next thing to do is to factor the numerator and denominator to see if there are any other factors we can cancel. We're on an absolute canceling tear. We can't be stopped!

Okay, fine. *This* is the next thing to do if it looks like factoring the numerator and factoring the denominator are reasonable tasks. Otherwise, skip this step. We're on an absolute unreasonable step-skipping tear. We can't be stopped!

The rational expression factors as . We can cancel out a factor of (*x* + 1) from the numerator and denominator, which leaves us with .

Meanwhile, the expression is way too grody to factor. Our eyes are burning from looking at it. However, it turns out to factor quite nicely as

but there's no way to know this from looking at it unless you're some kind of mathematical savant. If you are, what in the world are you doing here? Don't you have bigger fish to fry?

Exercise 1

For the following expression, factor the numerator and denominator or state as impossible (simplify by canceling where possible): .

Exercise 2

For the following expression, factor the numerator and denominator or state as impossible (simplify by canceling where possible): .

Exercise 3

For the following expression, factor the numerator and denominator or state as impossible (simplify by canceling where possible): .

Exercise 4

Exercise 5