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Any questions on the Section 6.1 homework? . Please CLOSE YOUR LAPTOPS, and turn off and put away your cell phones, and get out your note-taking materials. Section 6.2 A. Adding and Subtracting Rational Expressions. First, let’s review adding and subtracting rational numbers .
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Please CLOSE YOUR LAPTOPS, and turn off and put away your cell phones, and get out your note-taking materials.
Section 6.2 A Adding and Subtracting Rational Expressions
First, let’s review adding and subtracting rational numbers. To add two fractions, the denominators must be the same. For example, 1/5 + 2/5 = 3/5. Likewise, 5/14 – 3/14 = 2/14, which simplifies to 1/7. But to add 2/15 + 5/6, we would first have to find a way to make the denominators the same, i.e. we’d need to find a common denominator.
Example Add the following rational expressions. As with fractions, if the denominators are already the same, you can simply add the two numerators and put them together over that common denominator.
Example Subtract the following rational expressions.
Example Subtract the following rational expressions.
Now let’s review adding and subtracting fractions what do not start out with the same denominators. Addingfractions and subtractingfractions both require finding a least common denominator (LCD), which is most easily done by factoring the denominator (bottom number) of each fraction into a product of prime numbers (a number that can be divided only by itself and 1.)
Example: Adding Fractions Step 1: Factor the two denominators into prime factors, then write each fraction with its denominator in factored form: 10 = 2∙5 and35 = 5∙7 so 3 + 2 = 3 + 2 10 35 2∙5 5∙7 Step 2: Find the least common denominator (LCD): LCD =2∙5∙7
Step 3: Multiply the numerator (top)and denominator of each fraction by the factor(s) it’s missing from the LCD. LCD = 2∙5∙73∙7 + 2 ∙2 . 2∙5∙7 5∙7∙2 Step 4: Multiply each numerator out, leaving the denominators in factored form, then add the two numerators and put them over the common denominator. 21 + 4 = 21 + 4 = 25 2∙5∙7 5∙7∙2 2∙5∙7 2∙5∙7 Step 5: Now factor the numerator, then cancel any common factors that appear in both numerator and denominator. Once you multiply out any remaining factors, the result is your simplified answer. = 25 = 5∙5 = 5∙5 = 5 = 5 . 2∙5∙7 2∙5∙7 2∙5∙7 2∙7 14 / /
Rational expressions can be added or subtracted in the same way as fractions: • Find a least common denominator by factoring the polynomials in each denominator. • Multiply each rational expression top and bottom by the missing factor(s) in the LCD. • Multiply out the polynomials in each numerator, but leave the denominators as they are (in factored form). • Add or subtract the resulting numerator polynomials and put the result over the factored LCD polynomial. • Simplify if needed, by seeing if you can factor the numerator polynomial, then cancelling any common factors. Don’t cancel until this final step!
As with adding rational numbers (fractions), to add or subtract rational expressions with unlike denominators, you have to change them to equivalent forms that have the same denominator (a common denominator). This involves finding the least common denominator of the two original rational expressions, which is just like the process of finding the LCD of two numbers.
To find a Least Common Denominator 1) Factor the given denominators. 2) Take the product of all the unique factors. Factors that appear in more than one denominator are not included more than once in the LCD unless they are repeated more than once in any ONE denominator. Do not multiply out the LCD factors (other than any pure number factors) – leave the denominator in factored form. e.g. leave (x+2)(x+3) as is, not as x2 + 5x + 6.
Example Find the LCD of the following rational expressions.
Example Find the LCD of the following rational expressions.
Example Find the LCD of the following rational expressions.
Example Find the LCD of the following rational expressions. Neither denominator can be factored further. Since x – 3 = –(3 – x), you can use x – 3 as the LCD. (Note: The product (x – 3)(3 – x) would work as a common denominator, but it would not be the smallest or leastcommon denominator.)
Example Rewrite the rational expression as an equivalent rational expression with the given denominator. * *
Adding or Subtracting Rational Expressions with Unlike Denominators • Find the LCD of all the rational expressions. • Rewrite each rational expression as an equivalent one with the LCD as the denominator. • Multiply out each numerator, then add or subtract and write result over the LCD. • Simplify rational expression, if possible.
Reminder: This homework assignment on section 6.2A is due at the start of next class period.
You may now OPEN your LAPTOPS and begin working on the homework assignment.