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Multiplying Polynomials Warm Up Multiply. 1. x(x3) x4 2. 3x2(x5) 3x7 3. 2(5x3) 10x3 4. x(6x2) 6x3 5. xy(7x2) 7x3y 6. 3y2(–3y) –9y3 Holt McDougal Algebra 2 Multiplying Polynomials Objectives Use binomial expansion to expand binomial expressions that are raised to positive integer powers. Holt McDougal Algebra 2 Multiplying Polynomials Notice the coefficients of the variables in the final product of (a + b)3. these coefficients are the numbers from the third row of Pascal's triangle. Each row of Pascal’s triangle gives the coefficients of the corresponding binomial expansion. The pattern in the table can be extended to apply to the expansion of any binomial of the form (a + b)n, where n is a whole number. Holt McDougal Algebra 2 Multiplying Polynomials This information is formalized by the Binomial Theorem, which you will study further in Chapter 11. Holt McDougal Algebra 2 Multiplying Polynomials Example 5: Using Pascal’s Triangle to Expand Binomial Expressions Expand each expression. A. (k – 5)3 1331 Identify the coefficients for n = 3, or row 3. [1(k)3(–5)0] + [3(k)2(–5)1] + [3(k)1(–5)2] + [1(k)0(–5)3] k3 – 15k2 + 75k – 125 B. (6m – 8)3 1331 Identify the coefficients for n = 3, or row 3. [1(6m)3(–8)0] + [3(6m)2(–8)1] + [3(6m)1(–8)2] + [1(6m)0(–8)3] 216m3 – 864m2 + 1152m – 512 Holt McDougal Algebra 2 Multiplying Polynomials Check It Out! Example 5 Expand each expression. a. (x + 2)3 Identify the coefficients for n = 3, or row 3. 1331 [1(x)3(2)0] + [3(x)2(2)1] + [3(x)1(2)2] + [1(x)0(2)3] x3 + 6x2 + 12x + 8 b. (x – 4)5 1 5 10 10 5 1 Identify the coefficients for n = 5, or row 5. [1(x)5(–4)0] + [5(x)4(–4)1] + [10(x)3(–4)2] + [10(x)2(–4)3] + [5(x)1(–4)4] + [1(x)0(–4)5] x5 – 20x4 + 160x3 – 640x2 + 1280x – 1024 Holt McDougal Algebra 2 Multiplying Polynomials Check It Out! Example 5 Expand the expression. c. (3x + 1)4 14641 Identify the coefficients for n = 4, or row 4. [1(3x)4(1)0] + [4(3x)3(1)1] + [6(3x)2(1)2] + [4(3x)1(1)3] + [1(3x)0(1)4] 81x4 + 108x3 + 54x2 + 12x + 1 Holt McDougal Algebra 2 Multiplying Polynomials Lesson Quiz Find each product. 1. 5jk(k – 2j) 5jk2 – 10j2k 2. (2a3 – a + 3)(a2 + 3a – 5) 2a5 + 6a4 – 11a3 + 14a – 15 3. Find the product. (y – 5)4 y4 – 20y3 + 150y2 – 500y + 625 4. Expand the expression. (3a – b)3 27a3 – 27a2b + 9ab2 – b3 Holt McDougal Algebra 2