Rational Functions Do Now Factor the following polynomial

Rational Functions

Do Now Factor the following polynomial completely: 1) x 2 – 11 x – 26 2) 2 x 3 – 4 x 2 + 2 x 3) 2 y 5 – 18 y 3

Rational Functions A RATIONAL FUNCTION has the form where p(x) and q(x) are polynomials and q(x) ≠ 0. A rational expression is in SIMPLIFIED FORM if its numerator and denominator have no common factors other than 1.

Simplifying Rational Expressions To simplify a rational expression: Let a, b, and c be expressions with b ≠ 0 and c ≠ 0. Then the following property applies: Ex:

Simplifying Rational Expressions What if we have an example where we do not have any obvious common factors? Example 1:

Simplifying Rational Expressions 0 Example 2: 0 Example 3: 0 Example 4:

Simplifying Rational Expressions Classwork – Worksheet Homework – page 577 #3 – 17

Do Now Simplify the following rational expressions: 1. 2. 3.

Multiplying Fractions 0 How do we multiply fractions? 0 Example: 0 The rule for multiplying rational expressions is the same as multiplying numerical fractions: 0 Multiply numerators 0 Multiply denominators 0 Write new fraction in simplified form. 0 Property:

Multiplying Rational Expressions 0 Example 1: Perform the indicated operation. 0 Example 2: Perform the indicated operation.

Multiplying Rational Expressions 0 Example 3: Perform the indicated operation. 0 Example 4: Perform the indicated operation.

Multiplying Rational Expressions 0 Classwork – Worksheet on Multiplying Rational Expresssions 0 Homework – Textbook page 578 #18 -20, 24 -33

Do Now 0 Perform the indicated operation. Be sure your answer is in simplest form. 1. 2. 3.

Dividing Rational Expressions 0 How do we divide fractions? Example: 0 RULE: 0 Keep – change – flip (keep the first fraction the same, change division to multiplication, flip the second fraction) 0 Multiply as usual 0 Property: 0 Excluded values: values that make the denominator equal to zero

Dividing Rational Expressions 0 Example 1: Perform the indicated operation and state the excluded values

Example 2: Perform the indicated operation and state the excluded values

Example 3: Perform the indicated operation and state the excluded values

Example 4: Perform the indicated operation and state the excluded values

Example 5: Perform the indicated operation and state the excluded values

Dividing Rational Expressions 0 Class work: Work in partners on Dividing Rational Expressions Worksheet 0 Homework: Textbook page 578 #34 -43

Do Now 0 Perform the indicated operation: 1. 2. 3.

Adding and Subtracting Rational Expressions -Combine the numerators together -Put the sum or difference in step 1 over the common denominator -Reduce to lowest terms

Example:

Example:

What if we do NOT have an LCD? ? ? Step 1: Find LCD Step 2: Multiply the numerator(s) by the factor that is missing Step 3: Combine and simplify as usual

Example:

Find the LCDs of the following expressions: a) b) c)

DAY 2 Example: Find the LCD: xy Multiply by what’s missing Simplify!

Example: Find the LCD: 90 xy 2 Multiply by what’s missing Simplify!

Example: Find the LCD: -What can’t x equal? ? Multiply by what’s missing

Example: -LCD? -What can’t x equal? ?

Solving Rational Equations Example: **this is a proportion, can solve using cross multiplication 5 (x – 1) = 2 (15) 5 x – 5 = 30 5 x = 35 x=7

Example: Solve the equation Step 1: Find LCD and state the excluded values 5 x ( x + 2 ) x cannot equal 0 or -2 Step 2: Multiply all expressions by LCD to cancel out the denominators Step 3: Simplify, solve, and check

Solve: Step 1: Find LCD and state the excluded values Step 2: Multiply all expressions by LCD to cancel out the denominators Step 3: Simplify, solve, and check

Solve:

Solve:

Solve: