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Greatest Common Factor and Difference of Squares Greatest Common Factor Essential Question What is the greatest common factor and how does it relate to quadratic functions? What is factoring by the GCF? •The biggest number and highest power of a variable that can be divided out of all terms. •Whatever you can take out goes to the front of the parentheses. •Your answer should look like a distribution problem. Example 1 Factor: 2 3x + 6x What is the biggest number that will divide out of each number? 3 What is the highest power of a variable that can be divided out of each term? x1 So, our factored form is: 3x(x + 2) Example 2 Factor: 3 25y – 2 30y What is the biggest number that will divide out of each number? 5 What is the highest power of a variable that can be divided out of each term? y2 So, our factored form is: 5y2(5y – 6) Example 3 Factor: 3 -6x – 2 4x +8 What is the biggest number that will divide out of each number? -2 (ALWAYS factor out the negative) What is the highest power of a variable that can be divided out of each term? There isn’t one since 8 doesn’t have a variable. So, our factored form is: -2(3x3 + 2x2 – 4) Example 4 Factor: 3 -6x + 2 15x + 11x What is the biggest number that will divide out of each number? -1 What is the highest power of a variable that can be divided out of each term? x1 So, our factored form is: -x(6x2 – 15x – 11) Difference of Squares Essential Question What skills that I have already learned will help me with finding the difference of squares? What is this method for factoring? •If there are only 2 terms, check for difference of squares (2 terms that you can take the square root of). •Factor like this… a2 – b2 = (a + b)(a – b) It will always factor into the sum times the difference of the square roots. *Always look for GCF first! Example 1 Factor: 2 x –9 •Is there a GCF? • No. •Remember: a2 – b2 = (a + b)(a – b) • a = x and b = 3 •So…factored form is… • (x + 3)(x – 3) Example 2 Factor: 2 16x – 2 4y •Is there a GCF? • Yes, 4. So divide both terms: 4(4x2 – y2) •Factor inside the ( ) using: a2 – b2 = (a + b)(a – b) • a = 2x and b = y •So…factored form is… • 4(2x + y)(2x – y) Example 3 Factor: 2 25x – 2 49y •Is there a GCF? • No. •Factor using: a2 – b2 = (a + b)(a – b) • a = 5x and b = 7y •So…factored form is… • (5x + 7y)(5x – 7y) Example 4 Factor: 2 5x – 12 •Is there a GCF? • No. •5 is not a perfect square so it cannot be factored. •This is called a “prime polynomial.” • Prime Example 5 Factor: 2 x +9 •Addition of perfect squares can never be factored! • Prime Example 6 Factor: 4 x – 16 •Is there a GCF? • No. •Remember: a2 – b2 = (a + b)(a – b) • a = x2 and b = 4 •So…factored form is… • (x2 + 4)(x2 – 4) •But the second binomial will factor again… • (x2 + 4)(x + 2)(x – 2) Completely factored Assignment GCF / Difference of Squares Worksheet Due Tomorrow! Reflection Explain to your partner in your own words what greatest common factor is.
