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Multiplying and Factoring Polynomials Part I Math 100 Ms. Edna Reyes. 22 July 2010 Definition of Polynomials Expression with: - a finite number of terms - with variables and constants - Using only addition, subtraction, and multiplication - If there are exponents these are whole numbers and non-negative YES: x2 + 2x + 1 terms NO: 5y x Other Definitions - Degree of the variable is the exponent of that variable x3 : degree = 3 Degree of the term is the sum of degrees of the variables x2y2: degree = 2+2 = 4 Degree of the polynomial is the largest degree of any term: X3 + y2 + 1 : degree = 3 Polynomials are usually written in order of descending degrees. Multiplying Polynomials • To multiply a monomial (one term) by a polynomial, use the distributive property -x3 (9x4 – 2x3 + 7) = -x3(9x4) -x3(–2x3) -x3(7) Use distributive prop. = -9x3+4 + 2x3+3 -7x3 Multiply coefficients and add exponents (of same variable). = -9x7 + 2x6 -7x3 Simplify. Example 5n (3n3 – n2 + 8) = 5n(3n3) +5n(–n2) +5n(8) Use distributive prop. = 15n1+3 – 5n1+2 +40n Multiply coefficients and add exponents (of same variable). = 15n4 - 5n3 + 40n Simplify. Exercises 1. 2. 3. 4. 5. 6. 7x(x + 4) (b + 11)2b 3m2(10+m) -w2(w-15) 4x(2x3 – 7x2 + x) -8y3(7y2 – 4y -1) Factoring a Monomial from a Polynomial Step 1: To factor out a monomial (one term) by a polynomial, first look for the Greatest Common Factor (GCF). To find GCF: list prime factors of each term. Identify the factors common to ALL terms. Finding GCF - Example 5x3 + 25x2 + 45x 5x3 : 5 ·x ·x ·x 25x2 : 5 ·5 ·x ·x 45x: 5 ·3 ·3 ·x GCF is 5 · x or 5x Factoring a Monomial from a Polynomial Step 2: Factor out the GCF from each term of the polynomial. 5x3 + 25x2 + 45x = 5x(x2) + 5x(5x) + 5x(9) = 5x(x2 + 5x + 9) Example: 4x5 - 24x3 + 8x Find GCF: 4x5 2 ·2 ·x ·x ·x ·x ·x 24x3 3 ·2 ·2 ·2 ·x ·x ·x 8x: 2 ·2 ·2 ·x GCF is 4x 4x5 - 24x3 + 8x = 4x(x4) +4x(-6x2) + 4x(2) = 4x(x4 -6x2 + 2) Exercises Find GCF: 1. 12x + 20 2. 8w2 – 18w 3. a3 + 6a2 -11a 4. 4x3 + 12x – 28 5. 14z4 – 42z3 + 21z2 Factor each polynomial: 1. 9x - 6 2. t2 + 8t 3. 14n3 – 35n2 + 28 4. 5k3 + 20k2 – 15 5. g4 + 24g3 + 12g2 + 4g Pearson p. 483
