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| To MUTLIPLY rational expressions:
Factor first, reduce, and then multiply through.
Always reduce a factor from the top with a factor from the bottom! Steps
to Multiplying Rational Expressions:
Your teacher may, or may not, ask you to state the domains of rational expressions.
1. Factor first, if possible. Listing the factors may be helpful for seeing what can be reduced. Reduce a factor from the numerator with a factor from the denominator.
| 1. Domain: x ≠ 0; y ≠ 0
| 2. Multiply through the numerator and multiply through the denominator.
Check to see if the final answer can be reduced further, in case you did not reduce all factors prior to multiplying.
| 2. Ans.Domain: x ≠ 0; y ≠ 0
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Examples:
Example 1:
Domain: a ≠ 0, a ≠ -5
| Factor first. Reduce common factors. Do NOT reduce single terms from within parentheses containing a "+" or "-" sign. Reduce the entire parentheses.
State the domain if so directed by the problem or by your teacher.
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| Example 2:
Domain: x ≠ 0
| Multiplying by 20 is the same as multiplying
by . Writing may make the process more observable.Factor the numerator of the fraction. Reduce common factors.
State the answer as directed by your teacher.
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| Example 3:
Multiply: Domain: a ≠ -1, 0, 1
| Factor first.
The denominator of the second fraction factors:
a3 - a = a(a2 - 1) = a(a + 1)(a - 1) Reduce common factors (top with bottom). Express your final answer in the form desired by your teacher, or by the form that may be stated in the problem (such as "in simplest form" or "in simplest factored form").
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To DIVIDE rational expressions:
Flip second fraction, factor, reduce, multiply through.
Always reduce a factor from the top with a factor from the bottom! Steps to Dividing Rational Expressions:
Your
teacher may, or may not, ask you to state the domains of rational expressions.
1. Invert (flip) the second fraction, and change the division sign to multiply. Just as you do when dividing numerical fractions, you need to take the reciprocal (invert, flip) the second fraction and then multiply.
Note the domain of the original problem.
| 1. Domain: x ≠ 0
| 2. Factor, if possible. Reduce a factor from the numerator with a factor from the denominator. Reduce entire parentheses.
| 2.
| 3. Multiply through the numerator and multiply through the denominator. Check if any further reducing may be possible.
| 3. Ans.Domain: x ≠ 0
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Examples:
Example 1:
Domain: x ≠ 0, y ≠ 0
| Flip second fraction and change division sign to multiply. Factor.
Reduce common factors.
This example shows one way to reduce the factors. State the domain if so directed by the problem or by your teacher.
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| Example 2:
Domain: x ≠ 0
| Remember that 42 is really .
Flip second fraction and change to multiplication.Factor and reduce common factors.
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| Example 3:
Domain: x ≠ 0; x ≠ 3; x ≠ -2
| Flip second fraction and change to multiplication. Factor. Reduce common factors.
Be careful to reduce entire parentheses. State the answer as directed by your teacher.
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How do you multiply rational algebraic expressions to multiply?
To multiply rational expressions: Completely factor all numerators and denominators. Reduce all common factors. Either multiply the denominators and numerators or leave the answer in factored form.
What are the rules for multiplying and dividing rational numbers?
Determine the sign of your answer..
Change any improper fractions to mixed numbers..
Use keep change flip (multiply by the reciprocal) ---> keep the first fraction the same, change your division to multiplication, flip the second fraction so your denominator becomes your numerator and your numerator your denominator..