Chapter 2

Segment Measure and Coordinate Graphing Chapter 2

Real Numbers and Number Lines Section 2-1

NATURAL NUMBERS - set of counting numbers {1, 2, 3, 4, 5, 6, 7, 8…}

WHOLE NUMBERS – set of counting numbers plus zero {0, 1, 2, 3, 4, 5, 6, 7, 8…}

INTEGERS – set of the whole numbers plus their opposites {…, -3, -2, -1, 0, 1, 2, 3, …}

RATIONAL NUMBERS - numbers that can be expressed as a ratio of two integers a and b and includes fractions, repeating decimals, and terminating decimals

EXAMPLES OFRATIONAL NUMBERS 0.375 = 3/8 0.66666…= 2/3 0/5 = 0

IRRATIONAL NUMBERS - numbers that cannot be expressed as a ratio of two integers a and b and can still be designated on a number line

REAL NUMBERS Include both rational and irrational numbers

Coordinate • The number that corresponds to a point on a number line

AbsoluteValue • The number of units a number is from zero on the number line

Segments and Properties of Real Numbers Section 2-2

Betweeness • Refers to collinear points • Point B is between points A and C if A, B, and C are collinear and AB + BC = AC

Example • Three segment measures are given. Determine which point is between the other two. • AB = 12, BC = 47, and AC = 35

Measurement and Unit of Measure • Measurement is composed of the measure and the unit of measure • Measure tells you how many units • Unit of measure tells you what unit you are using

Precision • Depends on the smallest unit of measure being used

Greatest Possible Error • Half of the smallest unit used to make the measurement

Percent Error Greatest Possible Error x 100 measurement

Congruent Segments Section 2-3

Congruent Segments • Two segments are congruent if and only if they have the same length

Theorems • Statements that can be justified by using logical reasoning

Theorem 2-1 • Congruence of segments is reflexive

Theorem 2-2 • Congruence of segments is symmetric

Theorem 2-3 • Congruence of segments is transitive

Midpoint • A point M is the midpoint of a segment ST if and only if M is between S and T and SM = MT

Bisect • To separate something into two congruent parts

The Coordinate Plane Section 2-4

Coordinate Plane • Grid used to locate points • Divided by the y-axis and the x-axis into four quadrants • The intersection of the axes is the origin

An ordered pair of numbers names the coordinate of a point • X-coordinate is first in the ordered pair • Y-coordinate is second in the ordered pair

Postulate 2-4 • Each point in a coordinate plane corresponds to exactly one ordered pair of real numbers. Each ordered pair of real numbers corresponds to exactly one point in a coordinate plane.

Theorem 2-4 • If a and b are real numbers, a vertical line contains all points (x, y) such that x = a, and a horizontal line contains all points (x, y) such that y = b.

Midpoints Section 2-5

Theorem 2-5Midpoint formula for a line • On a number line, the coordinate of the midpoint of a segment whose endpoints have coordinate a and b is a+b. 2

Theorem 2-6Midpoint formula for a Coordinate Plane • On a coordinate plane, the coordinates of the midpoint of a segment whose endpoints have coordinates (x1, y1) and (x2, y2) are (x1 + x2 , y1 + y2) 2 2

Chapter 2

Chapter 2

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Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2

Chapter 2:

Chapter 2

chapter 2

chapter 2

Chapter 2-2

CHAPTER 2

Chapter 2

Chapter 2

CHAPTER 2

Chapter 2

Chapter 2

CHAPTER 2

Chapter 2