Warm-Up: September 22, 2015 Simplify
Homework Questions?
Factoring Polynomials Section P.5
Factoring Factoring is the process of writing a polynomial as the product of two or more polynomials. Prime polynomials cannot be factored using integer coefficients. Factor completely means keep factoring until everything is prime
Methods of Factoring Greatest common factor Difference of two perfect squares Perfect-square trinomials Factoring x2 + bx + c (big X) Factoring ax2 + bx + c (big X) Factor by grouping – use with 4 terms Sum and difference of perfect cubes
Factoring out greatest common factor Find the greatest common factor (GCF) of all terms. Divide each term by the greatest common factor. Write the GCF outside parenthesis, with the rest of the divided terms added together inside 3a2 – 12a 3a is the GCF
You-Try #1: Factor a. 18x3 + 27x2 b. x2(x + 3) + 5(x + 3)
Warm-Up: September 24, 2012 Simplify
Factor by Grouping Works with an even number of terms. Split the terms into two groups. Factor each group separately using GCF. If factor by grouping is possible, the part inside parentheses of each group will be the same. Treat the parentheses as common factors to finish factoring.
Example 2: Factor
You-Try #2: Factor
Factoring x2 + bx + c c r s b Look for integers r and s such that: r × s = c r + s = b c b r s
Example 3
You-Try #3
September 18, 2013 Pick up a 1.1-1.4 review worksheet and start working on it immediately in your assigned seat. You have until the end of class to complete it Have your homework out for Mr. Szwast to check. If you have questions on the homework due tomorrow, ask after Mr. Szwast checks today’s homework
Warm-Up: September 19, 2013 Factor each expression:
You-Try #3
Factoring ax2 + bx + c Look for integers r and s such that: r × s = ac r + s = b Divide r and s by a, then reduce fractions In your factors, any remaining denominator gets moved in front of the x ac b r s
Example 4
You-Try #4
Factoring Perfect Square Trinomials Let A and B be real numbers, variables, or algebraic expressions, 1. A2 + 2AB + B2 = (A + B)2 2. A2 – 2AB + B2 = (A – B)2
Example 7 Factor: 16x2 – 56x + 49
You-Try #7 Factor: x2 + 14x + 49
Difference of Two Perfect Squares
Warm-Up: September 20, 2013 Factor Completely
Homework Questions?
Factoring the Sum and Difference of 2 Cubes 64x3 – 125 = (4x)3 – 53 = (4x – 5)((4x)2 + (4x)(5) + 52) = (4x – 5)(16x2 + 20x + 25) A3 – B3 = (A – B)(A2 + AB + B2) x3 + 8 = x3 + 23 = (x + 2)( x2 – x·2 + 22) = (x + 2)( x2 – 2x + 4) A3 + B3 = (A + B)(A2 – AB + B2) Example Type
Example 8
You-Try #8
A Strategy for Factoring a Polynomial If there is a common factor, factor out the GCF. Determine the number of terms in the polynomial and try factoring as follows: If there are two terms, can the binomial be factored by one of the special forms including difference of two squares, sum of two cubes, or difference of two cubes? If there are three terms, is the trinomial a perfect square trinomial? If the trinomial is not a perfect square trinomial, try factoring using the big X. If there are four or more terms, try factoring by grouping. Check to see if any factors with more than one term in the factored polynomial can be factored further. If so, factor completely.
Factoring Flowchart Factor out GCF Count number of terms 4 2 Check for: Difference of perfect squares Sum of perfect cubes Difference of perfect cubes Factor by Grouping 3 Check for perfect square trinomial Use big X factoring Check each factor to see if it can be factored further
Assignment Page 53 #1-75 Odd
In Exercises 1-10, factor out the greatest common factor. In Exercises 11-16, factor by grouping. In Exercises 17-30, factor each trinomial, or state that the trinomial is prime.
In Exercises 17-30, factor each trinomial, or state that the trinomial is prime. In Exercises 31-40, factor the difference of two squares.
In Exercises 41-48, factor any perfect square trinomials, or state that the polynomial is prime. In Exercises 49-56, factor using the formula for the sum or difference of two cubes. In Exercises 57-84, factor completely, or state that the polynomial is prime.
Quiz P.1-P.4 Clear everything off of your desk except a pen/pencil, eraser. If you appear to be talking while any quizzes are out, you will receive a zero. If you appear to be looking at anyone else’s quiz, or allowing anyone to look at your quiz, you will receive a zero. When finished, turn in your quiz and work on the homework (questions will be on the board).
Homework Questions?