Chapter 9

Factoring Basics

Factoring algebraic expressions is one of the most important techniques you'll practice. Not much else can be done in terms of solving equations, graphing functions and conics, and working on applications if you can't pull out a common factor and simplify an expression. Factoring changes an expression of two or more terms into one big product, which is really just one term. Having everything multiplied together allows for finding common factors in two or more expressions and reducing fractions. It also allows for the application of the multiplication property of zero. Factoring is crucial, essential, and basic to algebra.

The Problems You'll Work On

In this chapter, you work through factoring basics in the following ways:

What to Watch Out For

Here are a few things to keep in mind as you factor your way through this chapter:

Finding Divisors Using Rules of Divisibility

416–421 Use divisibility rules for numbers 2 through 11 to determine values that evenly divide the given number.

416. 88

417. 1,010

418. 3,492

419. 4,257

420. 1,940

421. 3,003

Writing Prime Factorizations

422–429 Write the prime factorization of each number.

422. 28

423. 45

424. 150

425. 108

426. 512

427. 500

428. 1,936

429. 2,700

Factoring Out a GCF

430–443 Factor each using the GCF.

430. 24x⁴ − 30y⁸

431. 44z⁵ + 60a − 8

432. 300abc + 420xyz

433. 121x⁴ − 165z

434. 24x²y³ − 48x³y²

435. 36a³b − 24a²b² − 40ab³

436. 9z⁻⁴ + 15z⁻³ − 27z⁻¹

437. 20y^3/4 − 25y^1/4

438. 16a^1/2b^3/4c^4/5 − 48a^3/2b^7/4c^9/5

439. 8x²(5x − 1) + 6x³(5x − 1)

440. 36x⁻³y⁴ + 20x⁻⁵y²

441. 125x⁻³y⁻⁴ + 500x⁻⁵y⁻²

442. x(3x − 1)² + 2x²(3x − 1)

443. 4x³(x − 4)⁴ − 6x⁴(x − 4)³

Reducing Fractions with a Common GCF

444–455 Reduce the fractions by dividing with the GCF of the numerator and denominator.

444.

445.

446.

447.

448.

449.

450.

451.

452.

453.

454.

455.