Use special products and mental math EXAMPLE 3 Use special products to find the product 26 34. SOLUTION Notice that 26 is 4 less than 30 while 34 is 4.

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Use special products and mental math EXAMPLE 3 Use special products to find the product SOLUTION Notice that 26 is 4 less than 30 while 34 is 4 more than Write as product of difference and sum. = 30 2 – 4 2 Sum and difference pattern = 900 – 16 Evaluate powers. = 884 Simplify. = (30 – 4)(30 + 4)

Solve a multi-step problem EXAMPLE 4 BORDER COLLIES The color of the dark patches of a border collie’s coat is determined by a combination of two genes. An offspring inherits one patch color gene from each parent. Each parent has two color genes, and the offspring has an equal chance of inheriting either one.

Solve a multi-step problem EXAMPLE 4 The gene B is for black patches, and the gene r is for red patches. Any gene combination with a B results in black patches. Suppose each parent has the same gene combination Br. The Punnett square shows the possible gene combinations of the offspring and the resulting patch color. What percent of the possible gene combinations of the offspring result in black patches ? Show how you could use a polynomial to model thepossible gene combinations of the offspring.

Solve a multi-step problem EXAMPLE 4 SOLUTION Notice that the Punnett square shows 4 possible gene combinations of the offspring. Of these combinations, 3 result in black patches. STEP 1 ANSWER 75% of the possible gene combinations result in black patches.

Solve a multi-step problem EXAMPLE 4 STEP 2 Model the gene from each parent with 0.5B + 0.5r. There is an equal chance that the collie inherits a black or red gene from each parent. The possible genes of the offspring can be modeled by (0.5B + 0.5r) 2. Notice that this product also represents the area of the Punnett square. Expand the product to find the possible patch colors of the offspring. (0.5B + 0.5r) 2 = (0.5B) 2 + 2(0.5B)(0.5r) + (0.5r) 2 = 0.25B Br r 2

Solve a multi-step problem EXAMPLE 4 Consider the coefficients in the polynomial. = 0.25B Br r 2 The coefficients show that 25% + 50% = 75% of the possible gene combinations will result in black patches.

GUIDED PRACTICE for Examples 3 and 4 8. Describe how you can use special product to find Use the square of binomial pattern to find the product (20 +1) 2. ANSWER BORDER COLLIES Look back at Example 4. What percent of the possible gene combinations of the offspring result in red patches ? ANSWER 25%