This document provides information about solving absolute value equations and inequalities, as well as quadratic equations. It discusses: 1) To solve absolute value equations, you must divide the equation into two equations by treating the expression inside the absolute value bars as both positive and negative. 2) For inequalities, the direction of the inequality sign must be reversed when multiplying or dividing both sides by a negative number. 3) Quadratic equations can be solved by factoring if possible, or using the quadratic formula. The discriminant determines the number of real roots.

1. MATH: COLLEGE ALGEBRA Section III DePaul Math Placement Test

3. Absolute values Here is one more example: Q. Solve for x in terms of y in the equation |( x+2)/3|= (y 2 – 1)/3 A. First, isolate the expression within the absolute value brackets: |(x+2)/3|= (y 2 – 1). Then solve for the variable as if the expression within absolute value brackets were positive: x+2 = y 2 - 1 3 3 x+2 = y 2 - 1 x = y 2 -3 Next, solve for the variable as if the expression within absolute value brackets were negative: x+2 = - ( y 2 – 1) 3 3 x+2 =- y 2 + 1 x+2 = y 2 +1 x = -y 2 -1 The solution set for x is {y 2 – 3, –y 2 –1}.

4. Inequalities Before you get too comfortable with expressions and equations, we should introduce inequalities. An inequality is like an equation, but instead of relating equal quantities, it specifies exactly how two expressions that are not equal. x > y - “x is greater than y.” x < y - “x is less than y.” x ≥ y - “x is greater than or equal to y.” x ≤ y - “x is less than or equal to y.” Solving inequalities is exactly like solving equations except for of one verey important difference: when both sides of an inequality are multiplied or divided by a negative number, the relationship between the two sides changes and so the direction of the inequality must be switched .

5. Inequalities Here are a few examples: Solve for x in the inequality : ( x/2) – 3 < 2y (x/2) < 2y + 3 x<2(2y+3) x<4y+6 (4/x)< -2 4≥ -2x 2 ≤ x Notice that in the last example, the inequality had to be reversed . Another way to express the solution is x ≥ –2. To help you remember that multiplication or division by a negative number reverses the direction of the inequality, recall that if x > y , then, just as 5 > 4 and –5 < –4 . Intuitively, this makes sense, and it might help you remember this special rule of inequalities. The number of solutions to an equation is usually equal to the highest power of the equation. A linear equation (highest term of x ) has one solution, a quadratic equation (highest term of x 2 ) has two solutions, and a cubic equation (highest term of x 3 ) has three solutions. In an inequality, this rule does not hold true.

6. Absolute Value and Inequalities An equation without any absolute values generally results in, at most, only a few different solutions. Solutions to inequalities are often large regions of the x-y plane, such as x < 5. A s we’ve seen before, inequalities produce usually introduces two sets of solutions. The same is true when absolute values are introduced to inequalities: the solutions often come in the form of two regions of the x-y plane. If the absolute value is less than a given quantity, then the solution is a single range, with a lower and an upper bound. Q. Solve for x in the inequality |2x – 4| ≤ 6 . A. First, solve for the upper bound: 2x – 4 ≤ 6 2x≤10 x≤10 x≤5 Second, solve for the lower bound: 2x -4≥ -6 2x≥-2 x≥ -1 Now combine the two bounds into a range of values for x {–1 ≤ x ≤ 5 }.

7. Absolute values and Inequalities Q. Solve for x in the inequality | 3x + 4| > 16 A. First, solve for the upper range : 3x+4>16 3x>12 x>4 Then, solve for the lower range: 3x +4<-16 3x<-20 x<-20/3 Now combine the two ranges to form the solution , 4<x<-20/3 . The other solution for an absolute value inequality involves disjoint ranges : one whose lower bound is negative infinity and whose upper bound is a real number, and the second whose lower bound is a real number and whose upper bound is infinity. This occurs when the absolute value is greater than a given quantity which is two disjoint ranges: –∞ < x < – 20/3 or 4 < x < ∞ .

8. Ranges Inequalities are also used to express the range of values that a variable can take. a < x < b means that the value of x is greater than a and less than b . Consider the following word problem example: Q “This game is appropriate for people older than 40, but no older than 65.” What is the range of the age of people for which the board game is appropriate? A. Let a be the age of people for whom the board game is appropriate. The lower bound of a is 40, and the upper bound is 65. The range of a does not include its lower bound (it is appropriate for people “older than 40”), but it does include its upper bound (“no older than 65,” i.e., 65 is appropriate, but 66 is not). Therefore, the range of the age of people for which the board game is appropriate can be expressed by the inequality: 40≤ a≤65

9. Ranges Every time you come across a question involving r anges, you should carefully scrutinize the problem to pick out whether or not a particular variable’s range includes its bounds. This inclusion is the difference between “less than or equal to” and simply “less than.” Operations like addition, subtraction, and multiplication can be performed on ranges just as they are performed on variables or inequalities. For example: If 4 < x < 7, what is the range of 2 x + 3 ? To solve this problem, simply manipulate the range like an inequality until you have a solution. Begin with the original range: 4<x<7 Then multiply the inequality by 2 : 8<2x<14 Add 3 to the inequality, and you have the answer. 11<2x+3<17 There is one crucial rule that you need to know about multiplying ranges: if you multiply a range by a negative number, you must flip the greater than or less than signs. For instance, if you multiply the range 2 < x < 8 by –1 , the new range will be –2 > x > –8 .

10. Quadratic Equations A quadratic, or quadratic polynomial, is a polynomial of the form ax 2 + bx + c , where a ≠ 0 . The following polynomials are quadratics: x 2 +3x =4, x 2 -6x, t 2 + 1, u 2 A quadratic equation sets a quadratic polynomial equal to zero. That is, a quadratic equation is an equation of the form ax 2 + bx + c = 0 . The values of x for which the equation holds are called the roots , or solutions, of the quadratic equation. Most of the questions on quadratic equations involve finding their roots. There are two basic ways to find roots: by factoring and by using the quadratic formula . Factoring is faster, but it can’t always be done. The quadratic formula takes longer to work out, but it works for all quadratic equations. We’ll study both in detail.

12. Quadratics with Negative Terms So far we’ve seen only with quadratics in which the terms are all positive. Factoring a quadratic that has negative terms is no more difficult, but it might take slightly longer to get the hang of it, simply because you are less used to thinking about negative numbers. Q. Consider the quadratic equation x 2 – 4x – 21 = 0. A. There are a number of things you can tell from this equation: the first term of each binomial is x , since the first term of the quadratic is x 2 ; the product of m and n is –21; and the sum of a and b equals –4 . The equation also tells you that either m or n must be negative but that both cannot be negative, because the multiplication of one positive and one negative number can only result in a negative number. Now you need to look for the numbers that fit these requirements for m and n . The numbers that multiply together to give you –21 are: –21 and 1, –7 and 3, 3 and –7, and 21 and –1 . The pair that works in the equation is –7 and 3.

14. Polynomial Identities Q. Here’s an instance where knowing the perfect square or difference of two square equations can help you: 2 x 2 + 20 x + 50 = 0 A. To solve this problem by working out the math, you would do the following: 2 x 2 + 20 x + 50 = 0 2( x 2 + 10 x + 25) = 0 (x+5) 2 = 0 x = -5 If you got to the step where you had 2( x 2 + 10 x +25) = 0 and realized that you were working with a perfect square of 2( x + 5) 2 , you could immediately have divided out the 2 from both sides of the equation and seen that the solution to the problem is – 5 . Practice Quadratics Take a look at the following examples and try to factor them on your own before you peek at the answers. x 2 + x-2 = 0 Roots: {-2.1} x 2 + 13x + 42 = 0 Roots: {-7,-6} x 2 -8x+15= 0 Roots:{3,5}

15. The Quadratic Formula Factoring using the reverse-FOIL method is really only practical when the roots are integers. Quadratics, however, can have decimal numbers or fractions as roots. Equations like these can be solved using the quadratic formula. For an equation of the form ax 2 + bx + c = 0, the quadratic formula states: Consider the quadratic equation x 2 + 5 x + 3 = 0. There are no integers with a sum of 5 and product of 3. So, this quadratic can’t be factored, and we must resort to the quadratic equation. We plug the values, a = 1, b = 5, and c = 3 into the formula: , The roots of the quadratic are approximately { –4.303, –.697}.