Essential Question #1 Is it possible to have two right angles as exterior angles of a triangle? Why or why not?
|
|
- Colin Lambert
- 5 years ago
- Views:
Transcription
1
2 Essential Question #1 Is it possible to have two right angles as exterior angles of a triangle? Why or why not?
3 Triangles are classified into two categories: Triangles Sides Angles Scalene Equilateral Acute Equiangular Isosceles Right Obtuse
4 (by sides) Scalene A triangle with no equal sides Isosceles A triangle with 2 equal sides Equilateral A triangle with all equal sides
5 (by angles) Acute A triangle with all angles less than 90 Right A triangle with one 90 angle Obtuse A triangle with one angle greater than 90 Equiangular A triangle with all equal angles
6 Legs The congruent sides Vertex Angle formed by the congruent sides Base Side opposite the vertex Base Angles Formed by the base and one of the congruent sides
7 If two sides of a triangle are congruent (legs), then the two angles opposite those sides (base angles) are congruent. If two angles of a triangle are congruent (base angles), then the two sides opposite those angles (legs) are congruent.
8 Triangle RST is an isosceles triangle. R is the vertex angle, RS = x + 7, ST = x 1, and RT = 3x 5. Find x and the length of each side. S R T
9 Given DAR with vertices D(2,6), A(4,-5), and R (-3,0). Determine type of triangle it is based on its side lengths.
10 Page 185 #30-41, 46
11 The sum of the measures of the angles of a triangle is
12 Find the measure of each numbered angle in the figure is AB CD. A B 135 C D
13 Given: ΔABC Prove: m 4 = m 1 + m 2
14 The measure of an exterior angle of a triangle is equal to the sum of the measures of the two remote interior angles. Remote Interior Angle 2 Exterior Angle 1 3 4
15 Find the measure of each numbered angle
16 Worksheet 4-2 Homework: Page 226 #30-32
17 Essential Question #2 Explain why you cannot prove that two triangles are congruent using 3 angles.
18 Are the following triangles congruent? Why or why not? M R T S Write a congruence statement for the triangles. L 85 N
19 Write a congruence statement for the set of triangles.
20 DO YOU NEED TO HAVE ALL SIX CONGRUENT PARTS IN ORDER TO DETERMINE IF TWO TRIANGLES ARE CONGRUENT?
21 1. Side-Side-Side Postulate (SSS) 2. Side-Angle-Side Postulate (SAS) 3. Angle-Side-Angle Postulate (ASA) 4. Angle-Angle-Side Theorem (AAS)
22 If the sides of one triangle are congruent to the sides of a second triangle, then the triangles are congruent.
23 If two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle, then the triangles are congruent.
24 If two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, then the triangles are congruent.
25 If two angles and a non-included side of one triangle are congruent to two angles and a non-included side of another triangle, then the triangles are congruent.
26 Determine whether the triangles are congruent. If they are indicate the congruence postulate.
27 Given ΔSTU with vertices S(0,5), T(0,0), and U(-2,0) and ΔXYZ with vertices X(4,8), Y(4,3), and Z(6,3). Determine if ΔSTY ΔXYZ.
28 Page 200 #19-21 Page 210 #14-19, 20, 21
29 Given: C is the midpoint of BF AC CE Prove: ΔABC ΔEFC Statements Reasons
30 Given: AB ll DE C is the midpoint of BD Prove: ΔCBA ΔCDE Statements Reasons
31 Given: BD bisects CDA CD DA Prove: ΔBCD ΔBAD Statements Reasons
32 Page 210 #25-28, 31, 32
33 If two triangles are congruent, then all of their corresponding parts are congruent. In a proof, you MUST show that triangles are congruent, before you can show their parts are congruent.
34 Given: Prove: BC DC Statements Reasons
35 Given: 1 4 Prove: DE EF Statements Reasons
36 Page 210 #29, 30, 33, 34
37 Essential Question #2 Compare and contrast the tests of triangle congruence (SAS, AAS, ASA) and the tests for right triangle congruence (LL, HA, LA).
38 A wind-surfing sail has 2 right triangles for the sailboard. In order for the sail to function properly, the two sails must be the same size and shape. Suppose that ΔDEF and ΔRST model the sails. What would be required to prove the triangles are congruent using SAS? D R E F S T
39 If the legs of one right triangle are congruent to the corresponding legs of another right triangle, then the triangles are congruent.
40 Triangle Proofs SAS AAS ASA/AAS D Right Triangles LL HA LA R E F S T
41 If the hypotenuse and acute angle of one right triangle are congruent to the hypotenuse and corresponding acute angle of another triangle, then the two triangles are congruent.
42 If one leg and an acute angle of one right triangle are congruent to the corresponding leg and acute angle of another right triangle, then the triangles are congruent.
43 If the hypotenuse and the leg of one right triangles are congruent to the hypotenuse and corresponding leg of another right triangle, then the triangles are congruent.
44 State the additional information, if any, that is needed to show that the triangles are congruent by the given postulate or theorem.
45 Find the values of x and y that make the triangles congruent.
46 Given: AB bisects CAD C and D are right angles Prove: BC BD
47 Page 249 #15-23 odd, 24
Chapter 4 part 1. Congruent Triangles
Chapter 4 part 1 Congruent Triangles 4.1 Apply Triangle Sum Properties Objective: Classify triangles and find measures of their angles. Essential Question: How can you find the measure of the third angle
More informationGeometry. Congruent Triangles. Unit 4. Name:
Geometry Unit 4 Congruent Triangles Name: 1 Geometry Chapter 4 Congruent Triangles ***In order to get full credit for your assignments they must me done on time and you must SHOW ALL WORK. *** 1. (4-1)
More information4.1 TRIANGLES AND ANGLES
4.1 TRIANGLES AND ANGLES polygon- a closed figure in a plane that is made up of segments, called sides, that intersect only at their endpoints, called vertices Can you name these? triangle- a three-sided
More informationGeometry - Concepts 9-12 Congruent Triangles and Special Segments
Geometry - Concepts 9-12 Congruent Triangles and Special Segments Concept 9 Parallel Lines and Triangles (Section 3.5) ANGLE Classifications Acute: Obtuse: Right: SIDE Classifications Scalene: Isosceles:
More informationChapter 6.1 Medians. Geometry
Chapter 6.1 Medians Identify medians of triangles Find the midpoint of a line using a compass. A median is a segment that joins a vertex of the triangle and the midpoint of the opposite side. Median AD
More informationIMPORTANT VOCABULARY. Scalene Triangle. Triangle. SSS ASA SAS AAS sides/angles
1 Geometry Chapter 5 Test Review Standards/Goals: C.1.f.: I can prove that two triangles are congruent by applying the SSS, SAS, ASA, and AAS congruence statements. C.1.g. I can use the principle that
More informationChapter 4. Triangles and Congruence
Chapter 4 Triangles and Congruence 4.1 Apply Triangle Sum Properties 4.2 Apply Congruence and Triangles 4.3 Prove Triangles Congruent by SSS 4.4 Prove Triangles Congruent by SAS and HL 4.5 Prove Triangles
More information5.1 Congruent Triangles
5.1 Congruent Triangles Two figures are congruent if they have the same and the same. Definition of Congruent Triangles ΔABC ΔDEF if and only if Corresponding Angles are congruent: Corresponding Sides
More informationGEOMETRY Chapter 4 Lesson Plan: Triangle Congruence
GEOMETRY Chapter 4 Lesson Plan: Triangle Congruence Name Per. Chapter 3 Test 4.1 Learning Goal: I can Read through Lesson 4-2 and fill in study classify triangles by using guide. (pgs.223-226) their angle
More informationTriangle Congruence Packet #3
Triangle Congruence Packet #3 Name Teacher 1 Warm-Up Day 1: Identifying Congruent Triangles Five Ways to Prove Triangles Congruent In previous lessons, you learned that congruent triangles have all corresponding
More informationWarm-Up. Find the domain and range:
Warm-Up Find the domain and range: Geometry Vocabulary & Notation Point Name: Use only the capital letter, without any symbol. Line Name: Use any two points on the line with a line symbol above. AB Line
More informationProving Theorems about Lines and Angles
Proving Theorems about Lines and Angles Angle Vocabulary Complementary- two angles whose sum is 90 degrees. Supplementary- two angles whose sum is 180 degrees. Congruent angles- two or more angles with
More informationH.Geometry Chapter 4 Definition Sheet
Section 4.1 Triangle Sum Theorem The sum of the measure of the angles in a triangle is Conclusions Justification Third Angle Theorem If two angles in one triangle are to two angles in another triangle,
More informationNAME: Date Target Assignment Done! F a/c 6.1 Day 1 Worksheet. M b 6.1 Take Home Quiz. T a 6.2a Worksheet
Unit 6 Triangle Congruence Target 6.1: Demonstrate knowledge of triangle facts 6.1 a Classify triangles by sides and angles 6.1b Properties of isosceles triangles and equilateral triangles 6.1c Construction
More information1. Identify the different parts of a triangle 2. Classify triangles by their angle measures 3. Classify triangles by their side lengths
Lesson 8 Lesson 8, page 1 of 6 Glencoe Geometry Chapter 4.1, 4.2 Classifying Triangles & Angle Measure By the end of this lesson, you should be able to 1. Identify the different parts of a triangle 2.
More informationALGEBRA For each triangle, find x and the measure of each side. 1. LMN is an isosceles triangle, with LM = LN, LM = 3x 2, LN = 2x + 1, and MN = 5x 2.
Find each measure ALGEBRA For each triangle, find x and the measure of each side 4 1 LMN is an isosceles triangle, with LM = LN, LM = 3x 2, LN = 2x + 1, and MN = 5x 2 a x = 1; LM = 1, LN = 3, MN = 4 b
More information4-1. Classifying Triangles. Lesson 4-1. What You ll Learn. Active Vocabulary
4-1 Classifying Triangles What You ll Learn Scan Lesson 4-1. Predict two things that you expect to learn based on the headings and the Key Concept box. 1. Active Vocabulary 2. New Vocabulary Label the
More informationPOTENTIAL REASONS: Definition of Congruence:
Sec 1.6 CC Geometry Triangle Proofs Name: POTENTIAL REASONS: Definition of Congruence: Having the exact same size and shape and there by having the exact same measures. Definition of Midpoint: The point
More informationUnit 4 Congruent Triangles.notebook. Geometry. Congruent Triangles. AAS Congruence. Review of Triangle Congruence Proofs.
Geometry Congruent Triangles AAS Congruence Review of Triangle Congruence Proofs Return to Table 1 Side opposite Side Side the sides of triangles Adjacent Sides - two sides sharing a common vertex leg
More informationThere are three ways to classify triangles based on sides
Unit 4 Notes: Triangles 4-1 Triangle ngle-sum Theorem ngle review, label each angle with the correct classification: Triangle a polygon with three sides. There are two ways to classify triangles: by angles
More informationUnit 2. Properties of Triangles. Unit Bundle
Unit 2 Properties of Triangles Unit Bundle Math 2 Spring 2017 1 Day Topic Homework Monday 2/6 Triangle Angle Sum Tuesday 2/7 Wednesday 2/8 Thursday 2/9 Friday 2/10 (Early Release) Monday 2/13 Tuesday 2/14
More informationChapter 4 Triangles Overview
Chapter 4 Triangles Overview Ohio State Standards for Mathematics: G.CO.7 Use the definition of congruence in terms of rigid motions to show that two triangles are congruent if and only if corresponding
More informationUnit 3 Syllabus: Congruent Triangles
Date Period Unit 3 Syllabus: Congruent Triangles Day Topic 1 4.1 Congruent Figures 4.2 Triangle Congruence SSS and SAS 2 4.3 Triangle Congruence ASA and AAS 3 4.4 Using Congruent Triangles CPCTC 4 Quiz
More informationType of Triangle Definition Drawing. Name the triangles below, and list the # of congruent sides and angles:
Name: Triangles Test Type of Triangle Definition Drawing Right Obtuse Acute Scalene Isosceles Equilateral Number of congruent angles = Congruent sides are of the congruent angles Name the triangles below,
More informationPractice Test - Chapter 4. Classify each triangle as acute, equiangular, obtuse, or right.
Classify each triangle as acute, equiangular, obtuse, or right. 1. Since has three congruent sides, it has three congruent angles. Therefore it is equiangular (and equilateral). 2. is a right triangle,
More informationGeometry Review for Test 3 January 13, 2016
Homework #7 Due Thursday, 14 January Ch 7 Review, pp. 292 295 #1 53 Test #3 Thurs, 14 Jan Emphasis on Ch 7 except Midsegment Theorem, plus review Betweenness of Rays Theorem Whole is Greater than Part
More informationGEOMETRY. Chapter 4: Triangles. Name: Teacher: Pd:
GEOMETRY Chapter 4: Triangles Name: Teacher: Pd: Table of Contents DAY 1: (Ch. 4-1 & 4-2) Pgs: 1-5 Pgs: 6-7 SWBAT: Classify triangles by their angle measures and side lengths. Use triangle classification
More informationGeometry Notes Chapter 4: Triangles
Geometry Notes Chapter 4: Triangles Name Date Assignment Questions I have Day 1 Section 4.1: Triangle Sum, Exterior Angles, and Classifying Triangles Day 2 Assign: Finish Ch. 3 Review Sheet, WS 4.1 Section
More informationCh 4 Review Problems pp #7 36, 48,51,52 due MONDAY 12/12
Geometry 4.4 4.6 ongruence Proofs ecember 08, 2016 h 4 Review Problems pp.176 180 #7 36, 48,51,52 due MONY 12/12 h 5 Review Problems pp. 206 209 #15 50 h 6 Review Problems pp. 250 254 #9 19, 33 53 4.2
More informationTheorems, Postulates, and Properties for Use in Proofs
CP1 Math 2 Name Unit 1: Deductive Geometry: Day 21-22 Unit 1 Test Review Students should be able to: Understand and use geometric vocabulary and geometric symbols (,,, etc) Write proofs using accurate
More informationTriangle Sum Theorem The sum of the measures of the three angles of a triangle is 180º.
Triangle Sum Theorem The sum of the measures of the three angles of a triangle is 180º. Triangle Sum Theorem The sum of the measures of the three angles of a triangle is 180º. No-Choice Theorem If two
More informationAn Approach to Geometry (stolen in part from Moise and Downs: Geometry)
An Approach to Geometry (stolen in part from Moise and Downs: Geometry) Undefined terms: point, line, plane The rules, axioms, theorems, etc. of elementary algebra are assumed as prior knowledge, and apply
More informationLife is what you make it. Mr. H s dad
Life is what you make it. Mr. H s dad You can classify triangles by if their sides are congruent. Scalene Triangle This triangle has no congruent sides. Isosceles Triangle This triangle has at least 2
More informationChapter 4 Triangles: Congruency & Similarity
1 Chapter 4 Triangles: Congruency & Similarity Concepts & Skills Quilting is a great American pastime especially in the heartland of the United States. Quilts can be simple in nature or as in the photo
More informationGeometry Ch 4 Practice Exam
Name: Class: Date: Geometry Ch 4 Practice Exam Multiple Choice Identify the choice that best completes the statement or answers the question. 1. If BCDE is congruent to OPQR, then BC is congruent to?.
More informationUNIT 5 SIMILARITY AND CONGRUENCE
UNIT 5 SIMILARITY AND CONGRUENCE M2 Ch. 2, 3, 4, 6 and M1 Ch. 13 5.1 Parallel Lines Objective When parallel lines are cut by a transversal, I will be able to identify angle relationships, determine whether
More informationGeometry CP. Unit 4 (Congruency of Triangles) Notes
Geometry CP Unit 4 (Congruency of Triangles) Notes S 4.1 Congruent Polygons S Remember from previous lessons that is something is congruent, that it has the same size and same shape. S Another way to look
More informationThe SAS Postulate requires the same information as the LL Theorem, so it can be used to prove two right triangles congruent.
State whether each sentence is or false. If false, replace the underlined word or phrase to make a sentence. 1. The vertex angles of an isosceles triangle are false; The base angles of an isosceles triangle
More information4 Triangles and Congruence
www.ck12.org CHAPTER 4 Triangles and Congruence Chapter Outline 4.1 TRIANGLE SUMS 4.2 CONGRUENT FIGURES 4.3 TRIANGLE CONGRUENCE USING SSS AND SAS 4.4 TRIANGLE CONGRUENCE USING ASA, AAS, AND HL 4.5 ISOSCELES
More informationFGCU Invitational Geometry Individual 2014
All numbers are assumed to be real. Diagrams are not drawn to scale. For all questions, NOTA represents none of the above answers is correct. For problems 1 and 2, refer to the figure in which AC BC and
More informationGeometry Ch 7 Quadrilaterals January 06, 2016
Theorem 17: Equal corresponding angles mean that lines are parallel. Corollary 1: Equal alternate interior angles mean that lines are parallel. Corollary 2: Supplementary interior angles on the same side
More informationThe SAS Postulate requires the same information as the LL Theorem, so it can be used to prove two right triangles congruent.
State whether each sentence is or false. If false, replace the underlined word or phrase to make a sentence. 1. The vertex angles of an isosceles triangle are false; The base angles of an isosceles triangle
More informationIf B is the If two angles are
If If B is between A and C, then 1 2 If P is in the interior of RST, then If B is the If two angles are midpoint of AC, vertical, then then 3 4 If angles are adjacent, then If angles are a linear pair,
More informationLesson 1.9.1: Proving the Interior Angle Sum Theorem Warm-Up 1.9.1
NME: SIMILRITY, CONGRUENCE, ND PROOFS Lesson 9: Proving Theorems bout Triangles Lesson 1.9.1: Proving the Interior ngle Sum Theorem Warm-Up 1.9.1 When a beam of light is reflected from a flat surface,
More informationName Period Date. Adjacent angles have a common vertex and a common side, but no common interior points. Example 2: < 1 and < 2, < 1 and < 4
Reteaching 7-1 Pairs of Angles Vertical angles are pairs of opposite angles formed by two intersecting lines. They are congruent. Example 1: < 1 and < 3, < 4 and < 2 Adjacent angles have a common vertex
More informationMath-2A. Lesson 8-3 Triangle Congruence
Math-2A Lesson 8-3 Triangle Congruence Naming Triangles Triangles are named using a small triangle symbol and the three vertices of the triangles. The order of the vertices does not matter for NAMING a
More informationChapter 2 QUIZ. Section 2.1 The Parallel Postulate and Special Angles
Chapter 2 QUIZ Section 2.1 The Parallel Postulate and Special Angles (1.) How many lines can be drawn through point P that are parallel to line? (2.) Lines and m are cut by transversal t. Which angle corresponds
More informationMath-2 Lesson 8-6 Unit 5 review -midpoint, -distance, -angles, -Parallel lines, -triangle congruence -triangle similarity -properties of
Math- Lesson 8-6 Unit 5 review -midpoint, -distance, -angles, -Parallel lines, -triangle congruence -triangle similarity -properties of parallelograms -properties of Isosceles triangles The distance between
More informationLesson 3.6 Overlapping Triangles
Lesson 3.6 Overlapping Triangles Getting Ready: Each division in the given triangle is 1 unit long. Hence, the side of the largest triangle is 4- unit long. Figure 3.6.1. Something to think about How many
More informationChapter 1-2 Points, Lines, and Planes
Chapter 1-2 Points, Lines, and Planes Undefined Terms: A point has no size but is often represented by a dot and usually named by a capital letter.. A A line extends in two directions without ending. Lines
More informationTerm: Definition: Picture:
10R Unit 7 Triangle Relationships CW 7.8 HW: Finish this CW 7.8 Review for Test Answers: See Teacher s Website Theorem/Definition Study Sheet! Term: Definition: Picture: Exterior Angle Theorem: Triangle
More informationSemester Test Topic Review. Correct Version
Semester Test Topic Review Correct Version List of Questions Questions to answer: What does the perpendicular bisector theorem say? What is true about the slopes of parallel lines? What is true about the
More informationCP Geometry Quarter 2 Exam
CP Geometry Quarter 2 Exam Geometric Relationships and Properties, Similarity Name: Block: Date: Section Points Earned Points Possible I 60 II 20 III 20 Total 100 I. Multiple Choice 3 points each Identify
More informationNovember 21, Angles of Triangles
Geometry Essential Question How are the angle measures of a triangle related? Goals Day 1 Classify triangles by their sides Classify triangles by their angles Identify parts of triangles. Find angle measures
More informationMath-2. Lesson 5-2. Triangle Congruence
Math-2 Lesson 5-2 Triangle Congruence Naming Triangles Triangles are named using a small triangle symbol and the three vertices of the triangles. The order of the vertices does not matter for NAMING a
More informationno triangle can have more than one right angle or obtuse angle.
Congruence Theorems in Action Isosceles Triangle Theorems.3 Learning Goals In this lesson, you will: Prove the Isosceles Triangle Base Theorem. Prove the Isosceles Triangle Vertex Angle Theorem. Prove
More informationPicture: Picture: Picture:
Postulate - Side-Side-Side (SSS) Congruence: If three sides of one triangle are congruent to three sides of a second triangle, then the triangles are congruent. Picture: Postulate - Side-Angle-Side (SAS)
More informationMth 97 Fall 2013 Chapter 4
4.1 Reasoning and Proof in Geometry Direct reasoning or reasoning is used to draw a conclusion from a series of statements. Conditional statements, if p, then q, play a central role in deductive reasoning.
More informationUnit 4 Day by Day. Day Sections and Objectives Homework. Monday October and 4.9 Packet Pages 1-3
Unit 4 ay by ay ay Sections and Objectives Homework Monday October 26 U41 4.2 and 4.9 Packet Pages 1-3 Types of triangles, isosceles and equilateral triangles Page 228 (23-31, 35-37) Page 288 (5-10, 17-20,
More informationtheorems & postulates & stuff (mr. ko)
theorems & postulates & stuff (mr. ko) postulates 1 ruler postulate The points on a line can be matched one to one with the real numbers. The real number that corresponds to a point is the coordinate of
More information1) Draw line m that contains the points A and B. Name two other ways to name this line.
1) Draw line m that contains the points A and B. Name two other ways to name this line. 2) Find the next 3 terms in the sequence and describe the pattern in words. 1, 5, 9, 13,,, 3) Find the next 3 terms
More informationTest for the unit is 8/21 Name:
Angles, Triangles, Transformations and Proofs Packet 1 Notes and some practice are included Homework will be assigned on a daily basis Topics Covered: Vocabulary Angle relationships Parallel Lines & Transversals
More informationAssumption High School. Bell Work. Academic institution promoting High expectations resulting in Successful students
Bell Work Geometry 2016 2017 Day 36 Topic: Chapter 4 Congruent Figures Chapter 6 Polygons & Quads Chapter 4 Big Ideas Visualization Visualization can help you connect properties of real objects with two-dimensional
More informationProof: Given ABC XYZ, with A X, B Y, and Our strategy is to show C Z and apply ASA. So, WLOG, we assume for contradiction that m C > m Z.
Theorem: AAS Congruence. If under some correspondence, two angles and a side opposite one of the angles of one triangle are congruent, respectively, to the corresponding two angles and side of a second
More informationUnit 2 Triangles Part 1
Graded Learning Targets LT 2.1 I can Unit 2 Triangles Part 1 Supporting Learning Targets I can justify, using a formal proof, that the three angles in a triangle add up to 180. I can justify whether or
More informationUnit 2: Triangles and Polygons
Unit 2: Triangles and Polygons Background for Standard G.CO.9: Prove theorems about lines and angles. Objective: By the end of class, I should Using the diagram below, answer the following questions. Line
More informationTeacher: Mr. Samuels. Name: 1. 2
Teacher: Mr. Samuels Name: 1. 2 As shown in the diagram below of ΔABC, a compass is used to find points D and E, equidistant from point A. Next, the compass is used to find point F, equidistant from points
More informationMth 97 Winter 2013 Sections 4.3 and 4.4
Section 4.3 Problem Solving Using Triangle Congruence Isosceles Triangles Theorem 4.5 In an isosceles triangle, the angles opposite the congruent sides are congruent. A Given: ABC with AB AC Prove: B C
More informationGeometry/Trigonometry Unit 5: Polygon Notes Period:
Geometry/Trigonometry Unit 5: Polygon Notes Name: Date: Period: # (1) Page 270 271 #8 14 Even, #15 20, #27-32 (2) Page 276 1 10, #11 25 Odd (3) Page 276 277 #12 30 Even (4) Page 283 #1-14 All (5) Page
More information10) the plane in two different ways Plane M or DCA (3 non-collinear points) Use the figure to name each of the following:
Name: Period Date Pre-AP Geometry Fall 2015 Semester Exam REVIEW *Chapter 1.1 Points Lines Planes Use the figure to name each of the following: 1) three non-collinear points (A, C, B) or (A, C, D) or any
More informationReteach. Congruence and Transformations
Congruence and Transformations TYPES OF TRANSFORMATIONS (centered at (0, 0)) Translation (slide): (x, y) (x a, y b) Reflection y-axis: (x, y) ( x, y) x-axis: (x, y) (x, y) Rotation 90 clockwise: (x, y)
More informationLessons 4.1 and 4.2 Triangle Sum Properties & Properties of Isosceles Triangles -Classify triangles and find measures of their angles.
Lessons 4.1 and 4.2 Triangle Sum Properties & Properties of Isosceles Triangles -Classify triangles and find measures of their angles. - Discover the properties of Isosceles Triangles. Classification By
More informationGeometry Level 1 Midterm Review Packet. I. Geometric Reasoning (Units 1 & 2) Circle the best answer.
2015 Midterm Outline (120pts) I. 28 Multiple Choice (28pts) II. 12 True & False (12pts) III. 13 Matching (13pts) IV. 14 Short Answer (49pts) V. 3 Proofs (18pts) VI. 10 Common Assessment (10pts) Geometry
More informationGeometry Notes - Unit 4 Congruence
Geometry Notes - Unit 4 ongruence Triangle is a figure formed by three noncollinear points. lassification of Triangles by Sides Equilateral triangle is a triangle with three congruent sides. Isosceles
More informationProperties of a Triangle Student Activity Sheet 1; use with Overview
Student: Class: Date: Properties of a Triangle Student Activity Sheet 1; use with Overview 1. REEVVI IEEW Suppose points A, B, and C are collinear, where B is between A and C. If AB = 2x + 3, BC = 6x 5,
More informationExamples: Identify the following as equilateral, equiangular or regular. Using Variables: S = 180(n 2)
Ch. 6 Notes 6.1: Polygon Angle-Sum Theorems Examples: Identify the following as equilateral, equiangular or regular. 1) 2) 3) S = 180(n 2) Using Variables: and Examples: Find the sum of the interior angles
More informationFALL SEMESTER EXAM Directions: You must show work for all the problems. Unit 1. Angle. Angle Addition Postulate. Angle Bisector. Length of a segment
Name FALL SEMESTER EXAM Directions: You must show work for all the problems. Unit 1 Period Angle Angle Addition Postulate Angle Bisector Length of a segment Line Midpoint Right Angle Segment Segment Addition
More informationFor all questions, E. NOTA means none of the above answers is correct. Diagrams are NOT drawn to scale.
For all questions, means none of the above answers is correct. Diagrams are NOT drawn to scale.. In the diagram, given m = 57, m = (x+ ), m = (4x 5). Find the degree measure of the smallest angle. 5. The
More informationClassify Triangles. by the Angle Measure &The Side Lengths. Properties a SCALENE Triangle angles 1.Sum of the interior
Classify s by the Angle Measure &The Side Lengths Foldable Resource & Reference Properties a SCALENE angles 1.Sum of the interior equals. 180 2. The measure of each is side length is. different Note: If
More informationSegment Addition Postulate: If B is BETWEEN A and C, then AB + BC = AC. If AB + BC = AC, then B is BETWEEN A and C.
Ruler Postulate: The points on a line can be matched one to one with the REAL numbers. The REAL number that corresponds to a point is the COORDINATE of the point. The DISTANCE between points A and B, written
More informationChapter. Triangles. Copyright Cengage Learning. All rights reserved.
Chapter 3 Triangles Copyright Cengage Learning. All rights reserved. 3.3 Isosceles Triangles Copyright Cengage Learning. All rights reserved. In an isosceles triangle, the two sides of equal length are
More informationGeometry Level 1 Midterm Review Packet
Geometry L1 2017 Midterm Topic List Unit 1: Basics of Geometry 1. Point, Line, Plane 2. Segment Addition Postulate 3. Midpoint Formula, Distance Formula 4. Bisectors 5. Angle Pairs Unit 2: Logical Reasoning
More informationClassify each triangle by its side lengths as equilateral, isosceles, or scalene. (Note: Give two classifications in Exercise 13.)
hapter 4 ongruent Triangles 4.2 and 4.9 lassifying Triangles and Isosceles, and quilateral Triangles. Match the letter of the figure to the correct vocabulary word in xercises 1 4. 1. right triangle 2.
More informationINSIDE the circle. The angle is MADE BY. The angle EQUALS
ANGLES IN A CIRCLE The VERTEX is located At the CENTER of the circle. ON the circle. INSIDE the circle. OUTSIDE the circle. The angle is MADE BY Two Radii Two Chords, or A Chord and a Tangent, or A Chord
More informationGeometry Fundamentals Midterm Exam Review Name: (Chapter 1, 2, 3, 4, 7, 12)
Geometry Fundamentals Midterm Exam Review Name: (Chapter 1, 2, 3, 4, 7, 12) Date: Mod: Use the figure at the right for #1-4 1. What is another name for plane P? A. plane AE B. plane A C. plane BAD D. plane
More informationMath-Essentials. Lesson 6-2. Triangle Congruence
Math-Essentials Lesson 6-2 Triangle Congruence Naming Triangles Triangles are named using a small triangle symbol and the three vertices of the triangles. The order of the vertices does not matter for
More informationVideos, Constructions, Definitions, Postulates, Theorems, and Properties
Videos, Constructions, Definitions, Postulates, Theorems, and Properties Videos Proof Overview: http://tinyurl.com/riehlproof Modules 9 and 10: http://tinyurl.com/riehlproof2 Module 9 Review: http://tinyurl.com/module9livelesson-recording
More informationGeometry CST Questions (2008)
1 Which of the following best describes deductive reasoning? A using logic to draw conclusions based on accepted statements B accepting the meaning of a term without definition C defining mathematical
More informationM2 GEOMETRY REVIEW FOR MIDTERM EXAM
M2 GEOMETRY REVIEW FOR MIDTERM EXAM #1-11: True or false? If false, replace the underlined word or phrase to make a true sentence. 1. Two lines are perpendicular if they intersect to form a right angle.
More informationChapter 2 Similarity and Congruence
Chapter 2 Similarity and Congruence Definitions Definition AB = CD if and only if AB = CD Remember, mab = AB. Definitions Definition AB = CD if and only if AB = CD Remember, mab = AB. Definition ABC =
More informationCongruent triangles have congruent sides and congruent angles. The parts of congruent triangles that match are called corresponding parts.
Congruent triangles have congruent sides and congruent angles. The parts of congruent triangles that match are called corresponding parts. A ABC DFE D B C E F AB BC DF FE A D B F C E AC DE TO PROVE TRIANGLES
More informationUnit 3: Triangles and Polygons
Unit 3: Triangles and Polygons Background for Standard G.CO.9: Prove theorems about triangles. Objective: By the end of class, I should Example 1: Trapezoid on the coordinate plane below has the following
More informationThe side that is opposite the vertex angle is the base of the isosceles triangle.
Unit 5, Lesson 6. Proving Theorems about Triangles Isosceles triangles can be seen throughout our daily lives in structures, supports, architectural details, and even bicycle frames. Isosceles triangles
More informationPostulates, Theorems, and Corollaries. Chapter 1
Chapter 1 Post. 1-1-1 Through any two points there is exactly one line. Post. 1-1-2 Through any three noncollinear points there is exactly one plane containing them. Post. 1-1-3 If two points lie in a
More informationChapter 4: Congruent Triangles
Name : Date Block # Chapter 4: Congruent Triangles Day Topic ssignment all dates are subject to change 1 1 Triangle ngle-sum Theorem pg 221 # 14-28 even 32-34 2- Congruent Figures pg 228 #5-11,26 2 Quiz
More informationCHAPTER FOUR TRIANGLE CONGRUENCE. Section 4-1: Classifying Triangles
CHAPTER FOUR TRIANGLE CONGRUENCE 1 Name Section 4-1: Classifying Triangles LT 1 I can classify triangles by their side lengths and their angles. LT 2 I will use triangle classification to find angle measures
More information4.1 and 4.2 Notes on Classifying Triangles and Angles Measures Name
. and. Notes on Classifying Triangles and Angles Measures Name Polygon: a closed figure made up of segments that do not cross each other except at endpoints. Triangle: a three sided polygon Classifying
More informationProving Triangles and Quadrilaterals Satisfy Transformational Definitions
Proving Triangles and Quadrilaterals Satisfy Transformational Definitions 1. Definition of Isosceles Triangle: A triangle with one line of symmetry. a. If a triangle has two equal sides, it is isosceles.
More informationTransactions in Euclidean Geometry
Transactions in Euclidean Geometry Volume 207F Issue # 4 Table of Contents Title Author Square Construction Katherine Bertacini, Rachelle Feldmann, & Kaelyn Koontz Squares and Rectangles Rachelle Feldmann
More informationGeometry Review for Semester 1 Final Exam
Name Class Test Date POINTS, LINES & PLANES: Geometry Review for Semester 1 Final Exam Use the diagram at the right for Exercises 1 3. Note that in this diagram ST plane at T. The point S is not contained
More information