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McGraw Hill Integrated II, 2012 View details

Study Guide and Review

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Exercise 46 Page 83

Start by identifying the values of b and c.

(x-3)(x-5)

Practice makes perfect

To factor the quadratic expression we will start by identifying the values of a, b, and c. x^2-8x+15 ⇔ 1x^2+( - 8)x+ 15 For our expression, we have that a= 1, b= - 8, and c= 15. To factor a quadratic expression with leading coefficient a= 1, we need to find two factors of c= 15 whose sum is b= - 8. Since 15 is a positive number, we will only consider factors with the same sign — both positive or both negative — so that their product is positive.

Factor Pair	Product	Sum
1 and 15	^(1* 15) 15	1+15 16
- 1 and - 15	^(- 1* (- 15)) 15	^(- 1+(- 15)) - 16
3 and 5	^(3* 5) 15	3+5 8
- 3 and - 5	^(- 3* (- 5)) 15	^(- 3+(- 5)) - 8

The integers whose product is 15 and whose sum is - 8 are - 3 and - 5. x^2-8x+15 ⇔ (x-3)(x-5) Let's use a graphing calculator to confirm our answer. To do so, we will graph the related functions in the same coordinate plane.