Algebra 1 Common Core Student Edition, Grade 8-9

(Marvins-Underground-K-12) #1
Factor each expression. ^ See Problems 3-5.


  1. t


w2 - 144 25. a2-4 9 26. y2- 121

t2 — 25 28. k2 -^64 29. m2 - 225
4 p2 - 49 31. 81r2 — 1 32. 36u2 - 25
64q2 - 81 34. 16x2 - 121 35. 9n2 — 400

2h2 — 2 37. 27iv2 -^12 38. 80g2 - 45

IT) Apply 39. Rewrite the expression x4 - y4 so that it is a difference of squares. Then factor the expression


completely.


  1. Error Analysis Describe and correct the error made
    in factoring.


(^ 4 1. Writing Summarize the procedure for factoring a
difference of two squares. Give at least two examples.
( ^ 4 2. T h in k A b o u t a Plan Two square windows and their areas are
shown at the right. What is an expression that represents the
difference of the areas of the windows? Show two different
ways to find the solution.


  • How can you solve the problem without factoring?

  • How can you use the factored forms of the areas to find the
    difference of the areas of the windows?



  1. Interior Design A square rug has an area of
    49x2 - 56x + 16. A second square rug has an area of
    16x2 + 24x + 9. What is an expression that represents the
    difference of the areas of the rugs? Show two different ways to
    find the solution.


@ M e n ta l M a t h For Exercises 44-48, find a pair of factors for each number by
using the difference of two squares.
Sample 1 1 7 = 1 2 1 - 4 W rite 117 as the difference o f tw o squares.
= 1 12 - 22 W rite each term as a square.
= (1 1 + 2 )(1 1 - 2 ) Use the rule fo r the difference o f squares.
= ( 1 3 ) ( 9 ) Simplify.


  1. 143 45. 99 46. 224 47. 84 48. 91


@49. a. Open-Ended Write an expression that is a perfect-square trinomial,
b. Explain how you know your trinomial is a perfect-square trinomial.

c


PowerAlgebra.com | Lesson 8- 7 Fact oring Special Cases^527
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