320 Chapter 5 Polynomials Eample 1 Multiplying Monomials Multiply the monomials. a. 13 2 y 7 215 3 y2 b. 1 3 4 y 3 21 2 6 yz 8 2 a. 13 2 y 7 215 3 y2 13 521 2 3 21y 7 y2 15 5 y 8 Group coefficients and like bases. Add eponents and simplify. b. 1 3 4 y 3 21 2 6 yz 8 2 31 321 2241 4 6 21y 3 y21z 8 2 6 10 y 4 z 8 Group coefficients and like bases. Add eponents and simplify. Skill Practice 1. 1 8r 3 s21 4r 4 s 4 2 2. 1 4ab217a 2 2 The distributive property is used to multiply polynomials: a1b c2 ab ac. Eample 2 Multiplying a Polynomial by a Monomial a. 5y 3 12y 2 7y 62 b. 4a 3 b 7 c a2ab 2 c 4 1 2 a5 bb a. 5y 3 12y 2 7y 62 15y 3 212y 2 2 15y 3 21 7y2 15y 3 2162 10y 5 35y 4 30y 3 b. 4a 3 b 7 c a2ab 2 c 4 1 2 a5 bb 1 4a 3 b 7 c212ab 2 c 4 2 1 4a 3 b 7 c2a 1 2 a5 bb 8a 4 b 9 c 5 2a 8 b 8 c Skill Practice 3. 6b 2 12b 2 3b 82 4. 8t 3 a 1 2 t 3 1 4 t 2 b 1. 32r 7 s 5 2. 28a 3 b 3. 12b 4 18b 3 48b 2 4. 4t 6 2t 5
Section 5.2 Multiplication of Polynomials 321 Thus far, we have illustrated polynomial multiplication involving monomials. Net, the distributive property will be used to multiply polynomials with more than one term. For eample: Note: e 1 321 52 1 32 1 325 1 32 1 325 3 5 3 5 2 3 5 15 2 8 15 property again. Using the distributive property results in multiplying each term of the first polynomial by each term of the second polynomial: 1 321 52 5 3 3 5 2 5 3 15 2 8 15 Eample 3 Multiplying Polynomials a. 12 2 4213 2 52 b. 13y 2217y 62 a. 12 2 4213 2 52 Multiply each term in the first polynomial by each term in the second. 12 2 213 2 2 12 2 21 2 12 2 2152 14213 2 2 1421 2 142152 6 4 2 3 10 2 12 2 4 20 6 4 2 3 22 2 4 20 TIP: Multiplication of polynomials can be performed vertically by a process similar to column multiplication of real numbers. 12 2 4213 2 52 3 2 5 2 2 4 12 2 4 20 6 4 2 3 10 2 6 4 2 3 22 2 4 20 Note: When multiplying by the column method, it is important to align like terms vertically before adding terms.
322 Chapter 5 Polynomials b. 13y 2217y 62 13y217y2 13y21 62 12217y2 1221 62 Multiply each term in the first polynomial by each term in the second. 21y 2 18y 14y 12 21y 2 4y 12 TIP: The acronym, FOIL (First Outer Inner Last) can be used as a memory device to multiply two binomials. Outer terms First Outer Inner Last First terms 13y 2217y 62 13y217y2 13y21 62 12217y2 1221 62 Inner terms 21y 2 18y 14y 12 Last terms 21y 2 4y 12 Note: It is important to realize that the acronym FOIL may only be used when finding the product of two binomials. Skill Practice 5. 15y 2 6212y 2 8y 12 6. 14t 5212t 32 2. Special Case Products: Difference of Squares and Perfect Square Trinomials In some cases the product of two binomials takes on a special pattern. I. The first special case occurs when multiplying the sum and difference of the same two terms. For eample: Notice that the middle terms are 12 3212 32 opposites. This leaves only the difference w 4 2 6 6 9 between the square of the first term and the square of the second term. For this reason, 4 2 9 the product is called a difference of squares. Definition of Conjugates The sum and difference of the same two terms are called conjugates. For eample, we call 2 3 the conjugate of 2 3 and vice versa. In general, a b and a b are conjugates of each other. 5. 10y 4 40y 3 17y 2 48y 6 6. 8t 2 22t 15
Section 5.2 Multiplication of Polynomials 323 II. The second special case involves the square of a binomial. For eample: 13 72 2 13 7213 72 9 2 21 21 49 w 9 2 42 49 When squaring a binomial, the product will be a trinomial called a perfect square trinomial. The first and third terms are formed by squaring the terms of the binomial. The middle term is twice the product of the terms in the binomial. 132 2 2132172 172 2 Note: The epression 13 72 2 also results in a perfect square trinomial, but the middle term is negative. 13 7213 72 9 2 21 21 49 9 2 42 49 The following table summarizes these special case products. Special Case Product Formulas 1. 1a b21a b2 a 2 b 2 The product is called a difference of squares. 2. 1a b2 2 a 2 2ab b 2 1a b2 2 a 2 2ab b 2 } The product is called a perfect square trinomial. It is advantageous for you to become familiar with these special case products because they will be presented again when we factor polynomials. Eample 4 Finding Special Products a 5, b 2 Use the special product formulas to multiply the polynomials. a. 15 22 2 b. 16c 7d216c 7d2 c. 14 3 3y 2 2 2 a. 15 22 2 152 2 2152122 122 2 25 2 20 4 Apply the formula a 2 2ab b 2. b. 16c 7d216c 7d2 a 6c, b 7d 16c2 2 17d2 2 Apply the formula b2. 36c 2 49d 2 c. 14 3 3y 2 2 2 a 43, b 3y2 14 3 2 2 214 3 213y 2 2 13y 2 2 2 Apply the formula 2ab b2. 16 6 24 3 y 2 9y 4
324 Chapter 5 Polynomials Skill Practice 7. 1c 32 2 8. 15 4215 42 9. 17s 2 2t2 2 The special case products can be used to simplify more complicated algebraic epressions. Eample 5 Using Special Products Multiply the following epressions. a. 1 y2 3 b. 3 1y z243 1y z24 a. 1 y2 3 1 y2 2 1 y2 1 2 2y y 2 21 y2 1 2 212 1 2 21y2 12y212 12y21y2 1y 2 212 1y 2 21y2 3 2 y 2 2 y 2y 2 y 2 y 3 3 3 2 y 3y 2 y 3 Rewrite as the square of a binomial and another factor. Epand 1 y2 2 by using the special case product formula. b. 3 1y z243 1y z24 12 2 1y z2 2 12 2 1y 2 2yz z 2 2 2 y 2 2yz z 2 This product is in the form 1a b21a b2, where a and b 1y z2. Apply the formula a 2 b 2. Epand 1y z2 2 by using the special case product formula. Skill Practice 10. 1b 22 3 11. 3a 1b 3243a 1b 324 3. Translations Involving Polynomials Eample 6 Complete the table. Translating Between English Form and Algebraic Form 7. c 2 6c 9 8. 25 2 16 9. 49s 4 28s 2 t 4t 2 10. b 3 6b 2 12b 8 11. a 2 b 2 6b 9 English Form The square of the sum of and y The square of the product of 3 and Algebraic Form 2 y 2
Section 5.2 Multiplication of Polynomials 325 English Form Algebraic Form Notes The square of the sum The sum is squared, not the of and y 1 y2 2 individual terms. The sum of the squares of and y The square of the product of 3 and 2 y 2 132 2 The individual terms and y are squared first. Then the sum is taken. The product of 3 and is taken. Then the result is squared. Skill Practice Translate to algebraic form: 12. The square of the difference of a and b 13. The difference of the square of a and the square of b 14. Translate to English form: a b 2. 4. Applications Involving a Product of Polynomials Eample 7 Applying a Product of Polynomials A bo is created from a sheet of cardboard 20 in. on a side by cutting a square from each corner and folding up the sides (Figures 5-3 and 5-4). Let represent the length of the sides of the squares removed from each corner. a. Find an epression for the volume of the bo in terms of. b. Find the volume if a 4-in. square is removed. 20 20 2 20 2 20 20 2 Figure 5-3 Figure 5-4 20 2 a. The volume of a rectangular bo is given by the formula V lwh. The length and width can both be epressed as 20 2. The height of the bo is. Hence the volume is given by V l w h 120 22120 22 120 22 2 1400 80 4 2 2 400 80 2 4 3 4 3 80 2 400 12. 1a b2 2 13. a 2 b 2 14. The difference of a and the square of b
326 Chapter 5 Polynomials b. If a 4-in. square is removed from the corners of the bo, we have 4 in. The volume is The volume is 576 in. 3 Skill Practice V 4142 3 80142 2 400142 41642 801162 400142 256 1280 1600 576 15. A rectangular photograph is mounted on a square piece of cardboard whose sides have length. The border that surrounds the photo is 3 in. on each side and 4 in. on both top and bottom. 4 in. 3 in. 3 in. 4 in. 15a. A 1 821 62; A 2 14 48 b. 24 in. 2 a. Write an epression for the area of the photograph and multiply. b. Determine the area of the photograph if is 12.