Appendix A: Numbers, Inequalities, and Absolute Valuesmath.furman.edu/~tlewis/math140/stewart/Appendix/appa.pdf · Types of numbersNotation for intervalsInequalitiesAbsolute value

Types of numbers Notation for intervals Inequalities Absolute value

Appendix A:Numbers, Inequalities, and

Absolute Values

Tom Lewis

Fall Semester2015


Outline

Types of numbers

Notation for intervals

Inequalities

Absolute value


A hierarchy of numbers

Whole numbers 1, 2, 3, . . .; these are the natural counting numbers.

Integers . . . ,−3,−2,−1, 0, 1, 2, 3, . . .; these are the wholenumbers together with their additive inverses and 0.This is a useful abstraction of the whole numbers.

Rational numbers −3/2, 111/53, .77777 · · · . These are numbersthat can be represented in the form p/q where p andq are integers. For example,

Irrational numbers√

2, π, 3√

5. These are the real numbers whichare not rational; their decimal expansions do notterminate nor do they repeat.


ProblemClassify each of the following numbers in its lowest possible numbertype.

• −6

• 3.134567676767 . . .

•185

45 + 2

5

•√

2

•√

4 +√

121 +√

3


The real numbers as a setThe real numbers are totally ordered. This means that if we aregiven any two distinct real numbers x and y , then they can becompared; thus, either

x > y or x < y .

We can visualize the real numbers therefore in a (familiar) numberline.


Subsets

• A subset of real numbers is any collection of real numbers.• By far the most important subsets of real numbers are theintervals.

• From a geometrical viewpoint, the intervals correspond toconnected segments within the real line.

• The endpoints may or not be contained in an interval. Aninterval can have infinite length.


We have two preferred notations: interval and set-builder notation.

ProblemSketch the intervals given by (−∞, 2] and {x : −3 6 x < 8}.


ProblemConsider the inequality:

2x + 5 < 4x + 8.

• What does it mean to solve the inequality?

• What kind of answer do we expect?

• How do we solve the inequality?


Solving inequalitiesWe can solve an inequality just as we would an equality with oneexception: multiplication by a negative number. If a < b andc < 0, then ca > cb.


Problem

1. Solve 3x + 12 < 6x − 18 for x .

2. Find the set of all x such that

3 − 5x > −3 and 3 − 5x < 18.

3. Find the set of all x such that

3x − 4 > 8 or 3x − 4 < −8.

4. Find the set of all t such that t2 + 3t > 28.


Definition (Absolute value)Given a real number x , the absolute value of x , denoted by |x |, isthe distance from the 0 (the origin) to x . We can think of |x | asthe length of the number x .


ProblemHow can you make a simple calculator return the absolute value ofan input?


Definition (Absolute value)We can formulate a precise definition of |x | as follows:

|x | =

{x if x > 0

−x if x < 0.


ProblemIn each case, describe the indicated set as an interval or union ofintervals:

• |x | 6 3.

• |x | > 2.

• |x | 6 −1.


Problem

1. Solve |x | = 8.

2. Solve |x | < 2 and |x | > 5.

3. Solve |x − 3| < 1. What is the geometric meaning of this set?

4. Find a and b such that the solution set of |x − a | < b is theinterval (−1, 7).

5. Solve |2 − 3x | > 8.

6. Solve the equation |x + 2| = |3x − 1|.


Some properties of absolute valueLet a and b be real numbers.

•√

a2 = |a |

• |ab| = |a ||b|

• |a/b| = |a |/|b|, provided that b 6= 0

• |a + b| 6 |a |+ |b| (triangle inequality)


ProblemSuppose that |x − 3| < .001 and |y − 5| < .002. Use the triangleinequality to give an upper bound for |(x + y) − 8|.

Documents

Appendix A: Numbers, Inequalities, and Absolute Valuesmath.furman.edu/~tlewis/math140/stewart/Appendix/appa.pdf · Types of numbersNotation for intervalsInequalitiesAbsolute value