Notes 1.: Factoring w/ Epressions & Eqs Chapter 1.: Factoring with Epressions & Equations Factoring is a very important, amazingly fun skill, especially for polynomials, because it undoes an epanded epression, with possibly many terms, into factors. It is a super-duper important skill to possess in this class. You, too, can become a fluent factored(ererererer) with enough practice, practice, practice (repeat). I. Factoring Epressions With an epression factored, one can use the zero-product property to find the zeros of that factored epression. We ll get to solving equations soon enough. First, though, we must work with mathemtical/algebraic epressions (as opposed to colloquial epressions, such as Blazing Bananas, I m Bursting with Bataquatulence!) Mathematical (Algebraic) Epression--An algebraic epression is a collection of either numbers and/or variables combined with mathematical operators such as multiplication, division, addition, and subtraction symbols. 5 3 1 sin 1 17 1 ln 9 e 7 10 Terms in an epression are separated by plus or minus signs. Terms may contain several factors. sin 1 17 1 ln 9 e term 1 term term 3 term Factors are separated by multiplication or division symbols. Factors may consist of terms. sin 1 17 1 ln 9 e 1 factor Page 1 of 5
Notes 1.: Factoring w/ Epressions & Eqs Eample 1: Factor each of the following epressions completely into linear or irreducible prime factors. (a) 7 10 (b) 16 (c) 3 (d) 3 3 u v uv 3 (e) 18 1 (f) 8 6 8 (g) 35 1 (h) 3 (i) 5 3 110 3 6 Page of 5
Notes 1.: Factoring w/ Epressions & Eqs II. Solving Equations Algebraic Equation is an mathematical sentence that equates two epressions. There are several types of mathematical equations. A Name Equation is an equation that names an epression o y o f sin 3 1 5 Contradiction is an equation that has no solutions and is never true. o 0 1 o! ln(1) ln o Identity is an equation that is true for all values in the domain of the epression, has infinitely many solutions, and is always true. o 0! 1! o sin cos 1 o Conditional Equation is an equation that is true for a finite number of values, or is true only in certain conditions, that is. THESE ARE THE EQUATIONS WE ARE INTERESTED IN SOLVING!!! To solve a conditional equation systematically, I. Is there only a single variable to the same power? If so, collect variables on the left side, numbers on the right (epanding if necessary), then etract the roots. Eample : Solve for the indicated variable: (b) y y 3 z 5 z 3 z 17 (a) 8 3 6 16 Page 3 of 5
Notes 1.: Factoring w/ Epressions & Eqs You can often clear out pesky fractions by multiplying through the equation by the LCM of all denominators in the equation. If you really like fractions, or like to build your mental skills, you may work them WITH the fractions. Eample 3: Solve for the indicated variable. (a) Keep Fractions t 1 t 5 1 3 (b) Clear out Fractions t 1 t 5 1 3 II. Are there two or more powers of a single variable? Use the Zero Product Property. Zero Product Property If a b 0, then either a 0 or b 0 (or both). This means the product of factors equals zero if and only if at least one of the factors is zero, and it ONLY works for zero! Our goal, typically, is to factor a polynomial into its prime linear factors of the form a b, a, b, a 0. So how can we systematically reach our goal to solve equations? THE FIRST RULE OF FACTORING IS TO LOOK FOR A COMMON FACTOR (GCF)!!! NEVER, NEVER, NEVER divide out a variable from a conditional equation. WHEN YOU LOSE VARIABLE INFORMATION, YOU LOSE POSSIBLE SOLUTIONS. For quadratics (an polynomial equations in general), we must put the equation in standard form (descending order): a b c 0 Here we go! Page of 5
Notes 1.: Factoring w/ Epressions & Eqs Eample : Solve for. (a) 5 10 (b) (c) 10 8 3 1 (d) 3 (e) 3 (f) 3 18 6 1 7 (g) 3 3 5 15 (h) 3 3 6 7 5 Eample 5: Verify eample (h) using the graphing calculator. Page 5 of 5