Geometry 3.1 Big Idea: Identify pairs of lines and angles Big Idea: Identify pairs of lines and angles.

Slides:

Advertisements

Similar presentations

NM Standards: GT-A-7.

Advertisements

3.1 Identify Pairs of Lines and Angles

Relationships Between Lines Parallel Lines – two lines that are coplanar and do not intersect Skew Lines – two lines that are NOT coplanar and do not intersect.

NM Standards: GT-A-7. Parallel Lines Coplanar lines that do not intersect. The symbol || means “is parallel to” The red arrows also mean “is parallel.

Investigating Angle Pairs Vocabulary Transversal: a line intersecting two or more lines at different points Corresponding Angles: angles that appear to.

Angle Relationships Vocabulary

E.Q. What angle pairs are formed by a transversal?

Chapter 3.1: Identify Pairs of Lines and Angles. M11.B.2.1, M11.C.1.2 What angle pairs are formed by transversals?

Geometry 3-1 Parallel Lines and Angles Parallel Lines- lines that never intersect Symbol: || Perpendicular Lines- lines that intersect and make right angles.

Identify Pairs of Lines and Angles

1 Angles and Parallel Lines. 2 Transversal Definition: A line that intersects two or more lines in a plane at different points is called a transversal.

Parallel lines, transversals and angles

Angle Relationships Common Necessary Vocabulary for Parallel and Intersecting Lines.

3.1 Lines and Angles Relationships between lines Identify angles formed by a transversal.

3-1 Lines and Angles. Parallel and Skew Parallel lines are coplanar lines that do not intersect. – The symbol  means “is parallel to”. Skew lines are.

Boyd/Usilton. Parallel and Skew Lines Parallel lines: coplanar lines that do not intersect. Skew lines: are noncoplanar, not parallel and do not intersect.

TODAY IN GEOMETRY…  STATs to Ch. 2 Test  Learning Goal: 3.1 Identify pairs of lines and angles formed by intersecting lines  Independent Practice/Return.

1.Name the relationship between  3 and  m  3 = ____ 3. Name the relationship between  9 and  m  10 = ____ Warm Up: l.

3.1 Lines and Angles Unit IC Day 1. Do Now Parallel lines have _________ slopes. ◦ Give an example of a line that is parallel to y = -3x + 7 Perpendicular.

 Lesson 1: Parallel Lines and Transversals.  Parallel lines ( || )- coplanar lines that do not intersect (arrows on lines indicate which sets are parallel.

VOCABULARY UNIT 3. PARALLEL LINES Lines on the same plane that never intersect.

Wednesday, September 5, 2012 BUT BUT Homework: p. 128 #16-33 mentally; writing Homework: p. 128 #16-33 mentally; writing.

GEOMETRY 3-1 Lines and Angles. Vocabulary Examples Identify each of the following. a. a pair of parallel segments b. a pair of skew segments d. a pair.

IDENTIFY PAIRS OF LINES AND ANGLES SECTION

Section 3.1 Lines and Angles. Perpendicular Lines Intersecting lines that form right angles Symbol XS SR.

SWLT: Identify angle pairs formed by three intersecting lines GEOMETRY 3.1.

Lines that are coplanar and do not intersect. Parallel Lines.

Chapter 3 Perpendicular & Parallel Lines Sec. 3.1 Lines and Angles GOALS: To identify relationships between lines and angles formed by transversals.

Warm Up Week 1 If I run, then you walk. 1) What is the inverse? 2) Place marks to show congruence: AB ≅ EF and DE ≅ BC : B A C E D F.

Unit 3 Definitions. Parallel Lines Coplanar lines that do not intersect are called parallel. Segments and rays contained within parallel lines are also.

Warm Up: 1.Using lined paper and a ruler trace over a set of parallel lines. Then, draw a line intersecting these lines as shown below. 2.Using a protractor,

3-1 Parallel and Perpendicular Lines 3-1 Parallel Lines and Transversals.

DO NOW: 1. Write as a biconditional: If it is an egg then it is green. 2.

Lines and Angles Geometry Farris  I can identify parallel, perpendicular and skew lines.  I can identify the angles formed by two lines and a.

Lesson 3.1 Identify Pairs of Lines and Angles. Definitions Parallel Lines- They don’t intersect and are COPLANAR Perpendicular Lines- They intersect at.

3.1 & 3.2 Identify Pairs of Lines and Angles Use Parallel Lines and Transversals.

3.1 & 3.2 Identify Pairs of Lines and Angles Use Parallel Lines and Transversals.

PARALLEL LINES & TRANSVERSALS Parallel Lines - lines in the same plane that will never intersect.

Section 3.1. Parallel Lines – coplanar lines that never intersect and have the same slope Parallel Lines – coplanar lines that never intersect and have.

2.4 Angle Postulates and Theorems

Section 3.1 Lines and Angles 6/30/2016 Goals 1. Identify relationships between lines 2. Identify angles formed by transversals.

3.1 Identify Pairs of Lines and Angles. Parallel Lines Have the same slope Can be contained in the same plane Are everywhere the same distance apart.

3.1 Lines and Angles.

3.1 – 3.2 Quiz Review Identify each of the following.

Find the Area of the Figures Below:

Warm Up Word Bank Vertical Angles Congruent Angles Linear Pair Parallel Lines Skew Lines – Lines that do not intersect and are not coplanar.

Objectives Identify parallel, perpendicular, and skew lines.

Parallel lines Section 3-1.

Parallel Lines and Transversals

Parallel Lines and Transversals

Properties of Parallel Lines

Lesson 3.1 Lines and Angles

Lines and Angles.

Chapter 3.1: Identify Pairs of Lines and Angles

Ch. 3 Vocabulary 1.) parallel lines 2.) perpendicular lines

LT 3.1: Identify parallel lines, perpendicular lines, skew lines and angles formed by two lines and a transversal.

Warm Up #3 9/14 Given m<1 = 7x-24 m<2 = 5x+14

Parallel and Perpendicular Lines

3.1 Pairs of Lines and Angles

Chapter 3: Parallel and Perpendicular Lines

3-1: Parallel Line Theorem

VOCABULARY (Definitions)

3.1 Identify Pairs of Lines and Angles

Objectives: Identify parallel and perpendicular lines

Relationships Between Lines

Lesson 3.1 : Identify Pairs of Lines and Angles

Chapter 3 Sec 3.1 Lines and Angles.

3.1 – Identify pairs of lines and Angles

3.1 Lines and Angles.

Section 3.1: Lines and Angles

Presentation transcript:

Geometry 3.1 Big Idea: Identify pairs of lines and angles Big Idea: Identify pairs of lines and angles

Vocabulary Parallel Lines: Two lines that do not intersect and are coplanar.

Skew Lines: Two lines that do not intersect and are not coplanar.

Parallel Planes: Two planes that do not intersect. Ex: plane RSTU || plane WXYZ

Note: a small triangle (like an arrow, pointed in one direction of a line) is used to indicate that lines are parallel (our book uses red color to denote this) – the arrow is on each line, not at the end

Postulates Postulate 13:Parallel Postulate If there is a line and a point not on the line, then there is exactly one line through the point ║ to the given line.  P m

Postulate 14:Perpendicular Lines If there is a line and a point not on the line, then there is exactly one line through the point ┴ to the given line.  P m

More Vocabulary Transversal: A line that intersects 2 or more coplanar lines at different points.

Corresponding Angles: on same side of transversal with same relationship (on top or on bottom) to other 2 lines (2 & 6), others?

Alternate Interior Angles : Angles that lie between the 2 lines on opposite sides of the transversal (3 & 5), others?

Alternate Exterior Angles: Angles that lie outside the 2 lines on opposite sides of the transversal. (2 & 8), others? (2 & 8), others?

Consecutive Interior Angles: Angles that lie between the 2 lines on the same side of the transversal.(4 & 5 ),others?

Example: Identify all pairs of angles of the given type. Corresponding Alternate Interior Alternate Exterior Consecutive interior Vertical