Introduction to Geometry – Complimentary / Supplementary Angles Angle Addition Postulate – If D is a point interior to angle ABC, then AD BC.

Slides:

Advertisements

Similar presentations

Adjacent, Vertical, Supplementary, and Complementary Angles

Advertisements

Standard 2.0, 4.0.  Angles formed by opposite rays.

Adjacent, Vertical, Supplementary, Complementary and Alternate, Angles.

ANGLES Geometry 1.3a. State Standard: LG.1.G.4Geometry Apply, with and without appropriate technology, definitions, theorems, properties, and postulates.

Parallel Lines & Transversals & Angles

Vertical Angles Supplementary Angles Complementary Angles.

Objectives Angle Pair Relationships Adjacent Angles Vertical Angles

Angle Relationships.

Objectives-What we’ll learn…

PARALLEL LINES and TRANSVERSALS.

1-5 Angle Relationships What are: adjacent angles linear pairs

Title of Lesson: Angle Pair Relationships Section: 1.6Pages:

Angle Pair Relationships

1Geometry Lesson: Angle Theorems (Day 2) Aim: Do Now: What are the theorems related to angles? (Day 2) A D Q C B 70º,acute 90º,right 120º,obtuse.

1-5 Angle Relationships What are: adjacent angles linear pairs

Angle Relationships Section 1-5 Adjacent angles Angles in the same plane that have a common vertex and a common side, but no common interior points.

SPECIAL PAIRS OF ANGLES. Congruent Angles: Two angles that have equal measures.

2.4 Vertical Angles. Vertical Angles: Two angles are vertical if they are not adjacent and their sides are formed by two intersecting lines.

Geometry Section 1.5 Describe Angle Pair Relationships.

L.T. I can identify special angle pairs and use their relationships to find angle measure.

Geometry Section 1.6 Special Angle Pairs. Two angles are adjacent angles if Two angles are vertical angles if.

Angles Acute angle (def)- angle measure less than 90° Right angle (def)- angle measure= 90° Obtuse angle (def)- angle measure greater than 90° Straight.

1-5 Exploring Angle Pairs. Problem 1: Identifying Angle Pairs Use the diagram provided. Is the statement true? Explain.

Angle Relationships Geometry 1.5.

GEOMETRY Section 1.5: Angle Relationships. Adjacent angles - two angles that lie in the same plane and have a common vertex and common side, but no common.

1.4 Pairs of Angles Adjacent angles- two angles with a common vertex and common side. (Side by side) Linear pair- a pair of adjacent angles that make a.

1.5 Exploring Angle Pairs.

2-4 Special Pairs of Angles Objectives -Supplementary Angles Complementary Angles -Vertical angles.

Angle Relationships Common Necessary Vocabulary for Parallel and Intersecting Lines.

Chapter 1 Exploring Geometry: Points, Lines, and Angles in the Plane

Section 1-6 Angle Pair Relationships. Vertical angles Formed when two lines intersect. Vertical Angles are Congruent. 1 2.

10-3 Angle Relationships G2:Properties of 2- dimensional figures.

Warm up 1. Solve 8x + 16 = Simplify the expression 9x + 2y, where x=-7 and y= b + 3c – 4f, let b = -2, c= - 3 and f = 2 4. Find the midpoint.

Warm Up Name an example of: Obtuse, acute, straight, & adjacent ∠ ’s (Be sure to use 3 letters when naming the ∠ ) B H T A M.

4.1 Notes Fill in your notes. Adjacent angles share a ______________ and _______, but have no _______________________. vertexsidePoints in common.

Angle Relationships.

Angle Pair Relationships

How do you measure, name and classify angles? What is the Angle Addition Postulate? How do you identify angle pairs? Chapter 1 Section 1.6.

Special Pairs of Angles Return to table of contents.

1-5 Angle Relationships Students will learn how to identify and use special pairs of angles, namely, supplementary, complementary, and congruent (have.

Special Angle Pairs. Definitions Adjacent Angles: Angles that have a common ray or side and a common vertex, but points inside either one of the angles.

ANGLERELATIONSHIPS SECTION 1-5 and 2-8 Jim Smith JCHS Spi.3.2.E.

7.G.5 ~ Find measures of angles formed by intersecting lines.

Pairs of Angles Geometry Farris O I can identify adjacent, vertical, complementary, and supplementary angles. I can find measures of pairs of angles.

Any two angles whose sum is 180 degrees. Supplementary Angles.

Geometry. Definitions Geometry Definitions 1.straight angle - 180º.

ANGLE RELATIONSHIPS Mrs. Insalaca 8 th Grade Math.

Section 1.6 Angle Pair Relationships standard #13 7/3/2016.

+ CHAPTER 2 Section 4: Complementary and Supplementary Angles.

Warm Up. Announcements Quiz Tomorrow Linear Pair Adjacent angles equaling 180˚

Do Now Classify each angle as acute, right, obtuse or straight.

Objective: To recognize and classify angles and

Use a protractor to draw angles with the following measurements:

1.6 Angle Pair Relationship

Chapter 1 section 7 Angle relationships

Lesson 14.1: Angles Formed by Intersecting Lines

Angle Relationships.

Sec. 1.5: Angle Pairs There are five special pairs of angles:

Types of Angles & Their Relationships

Adjacent, Vertical, Supplementary, and Complementary Angles

Two angles that add up to 90 degrees.

Describe Angle Pair Relationships

Angles An angle is made up of 2 rays with a common end point called the vertex. Angles are measured in units called degrees. Vertex- the point where the.

2.6 Deductive Reasoning GEOMETRY.

Warm Up Your folder How many angles are in this picture?

Vertical Angles, Linear Pairs, Exterior Angles

Geo MT 3 Lesson 1 Angle Pairs.

Proving Angles Congruent

Adjacent, Vertical, Supplementary, and Complementary Angles

Presentation transcript:

Introduction to Geometry – Complimentary / Supplementary Angles Angle Addition Postulate – If D is a point interior to angle ABC, then AD BC

Introduction to Geometry – Complimentary / Supplementary Angles Angle Addition Postulate – If D is a point interior to angle ABC, then AD BC A 50° 75° In this example :

Introduction to Geometry – Complimentary / Supplementary Angles Angle Addition Postulate – If D is a point interior to angle ABC, then AD BC A 50° 75° In this example : A straight angle is formed by two rays going away from each other. It measures 180°. 180° BC

Introduction to Geometry – Complimentary / Supplementary Angles Angle Addition Postulate – If D is a point interior to angle ABC, then AD BC A 50° 75° In this example : A straight angle is formed by two rays going away from each other. It measures 180°. Draw a third ray and you have a linear pair. This linear pair forms a straight line, they are supplementary angles and add up to 180°. BAC D

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180°

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60° These pairs should all add up to 180°

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60°120 ° These pairs should all add up to 180°

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60°120° 155° These pairs should all add up to 180°

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60°120° 155°25° These pairs should all add up to 180°

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60°120° 155°25° 42° * 174° * 76° * These pairs should all add up to 180° See if you can get the last three on your own before moving to the next page…

Introduction to Geometry – Complimentary / Supplementary Angles Supplementary Angles – formed by a linear pair and add up to 180° EXAMPLE : Let’s fill in the table with the missing supplementary angle. Angle 1Angle 2 60°120° 155°25° 42°138° 174°6°6° 76°104° These pairs should all add up to 180° See if you can get the last three on your own before moving to the next page…

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° 40° 50°

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60° These pairs should all add up to 90°

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60°30° These pairs should all add up to 90°

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60°30° 45° These pairs should all add up to 90°

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60°30° 45° These pairs should all add up to 90°

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60°30° 45° 27° * 79° * 16° * These pairs should all add up to 90° See if you can get the last three on your own before moving to the next page…

Introduction to Geometry – Complimentary / Supplementary Angles Complementary Angles – two angles that form a right angle and add up to 90° EXAMPLE : Let’s fill in the table with the missing complementary angle. Angle 1Angle 2 60°30° 45° 27°63° 79°11° 16°74° These pairs should all add up to 90° See if you can get the last three on your own before moving to the next page…

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines and on the opposite side A E D CB

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines and on the opposite side A E D CB

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines and on the opposite side A E D CB Vertical angles are also congruent

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA? Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA∟CQD Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA∟CQD ∟FQC Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA∟CQD ∟FQC∟AQE Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA∟CQD ∟FQC∟AQE ∟FQD Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA∟CQD ∟FQC∟AQE ∟FQD∟BQE Find the partner for the given angle to make a vertical angle pair. Q

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = ? ∟FQC∟AQE ∟FQD∟BQE Complete the table with the missing measurement. Q 50°

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = 50° ∟FQC∟AQE ∟FQD∟BQE Q 50° Complete the table with the missing measurement.

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = 50° ∟FQC = 38°∟AQE = ? ∟FQD∟BQE Q 38° Complete the table with the missing measurement.

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = 50° ∟FQC = 38°∟AQE = 38° ∟FQD∟BQE Q 38° Complete the table with the missing measurement.

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = 50° ∟FQC = 38°∟AQE = 38° ∟FQD = 136°∟BQF = ? Q 136° Complete the table with the missing measurement.

Introduction to Geometry – Complimentary / Supplementary Angles Vertical Angles – angles formed by two intersecting lines A E D CB F Given angleVertical angle ∟BQA = 50°∟CQD = 50° ∟FQC = 38°∟AQE = 38° ∟FQD = 136°∟BQF = 44° Q 136° Complete the table with the missing measurement. 44° Linear pair