Splash Screen.

Slides:



Advertisements
Similar presentations
Chapter 1.2 Using Segments and Congruence
Advertisements

Lesson 1-2 Linear Measure and Precision. Ohio Content Standards:
1.2 Key Concepts. Postulate A rule that is accepted without proof. Sometimes called an Axiom.
Definitions and Postulates
Lesson 1-2 Linear Measure and Precision. Ohio Content Standards:
Linear Measure and Precision
1-2 Linear Measure You identified and modeled points, lines, and planes. Measure segments. Calculate with measures.
LESSON You identified and modeled points, lines, and planes. Measure segments. Calculate with measures.
Over Lesson 1–2 5-Minute Check 1 What is the value of x and AB if B is between A and C, AB = 3x + 2, BC = 7, and AC = 8x – 1? A.x = 2, AB = 8 B.x = 1,
Splash Screen. Lesson Menu Five-Minute Check (over Lesson 1–1) CCSS Then/Now New Vocabulary Example 1:Length in Metric Units Example 2:Length in Standard.
Lesson 2-6 Algebraic Proof. 5-Minute Check on Lesson 2-5 Transparency 2-6 In the figure shown, A, C, and DH lie in plane R, and B is on AC. State the.
5-Minute Check 1 A.A, B, Q B.B, Q, T C.A, B, T D.T, A, Q Name three collinear points.
Using Segments and Congruence Midpoint Formula
Splash Screen. Over Lesson 1–1 5-Minute Check 1 A.A, B, Q B.B, Q, T C.A, B, T D.T, A, Q Name three collinear points.
Bell Ringer on Lesson questions In your notes, then do p , 58, 61 and 63.
Splash Screen. Lesson Menu Five-Minute Check (over Lesson 1–1) CCSS Then/Now New Vocabulary Example 1:Length in Metric Units Example 2:Length in Standard.
Splash Screen. Lesson Menu Five-Minute Check (over Lesson 1–1) CCSS Then/Now New Vocabulary Example 1:Length in Metric Units Example 2:Length in Standard.
Welcome to Interactive Chalkboard Glencoe Geometry Interactive Chalkboard Copyright © by The McGraw-Hill Companies, Inc. Developed by FSCreations, Inc.,
Splash Screen. Then/Now Solve equations by using addition and subtraction. Solve equations by using multiplication and division.
Lesson 1.2, For use with pages Solve 3x x – 4 = 36. ANSWER 7 2. Find three cities on this map that appear to be collinear. Chicago, Bloomington,
Geometry Lesson 1 – 2 Linear Measure Objective: Measure segments. Calculate with measures.
Geometry CH 1-3 Measuring angles and Segments End of Lecture / Start of Lecture mark.
Splash Screen. Lesson Menu Five-Minute Check (over Lesson 1–1) Then/Now New Vocabulary Example 1:Length in Metric Units Example 2:Length in Standard Units.
Chapter 1.2 Linear Measure. Length in Metric Units A. Find the length of AB using the ruler. The ruler is marked in millimeters. Point B is closer to.
Splash Screen. Over Lesson 1–1 5-Minute Check 1 A.A, B, Q B.B, Q, T C.A, B, T D.T, A, Q Name three collinear points.
Lesson 1-5 Segments and Their Measures 1. Objectives Measure segments. Add segment lengths.
1-3 Segments, Rays, and Distance
Five-Minute Check (over Lesson 2–3) Mathematical Practices Then/Now
Splash Screen.
Name three points, two lines, and a Ray. Also, find a point that
Splash Screen.
Geometry Advice from former students: “Do your homework. If you don’t you won’t know what you need help on.” Today: Homework Questions 1.2 Instruction.
Splash Screen.
Splash Screen.
Name the intersection of plane Q and plane R.
A. A line contains at least two points.
Splash Screen.
Line Segments and Distance
Splash Screen.
Splash Screen.
1-2 Measuring and Constructing Segments Warm Up Lesson Presentation
Measure Line Segments Unlike a line, a line segment, or segment, can be measured because it has two endpoints. A segment with endpoints A and B can be.
Students will be able to measure segments
Name three collinear points.
WARM UP.
Splash Screen.
Name three collinear points.
Calculate with measures.
Chapter 1: Tools of Geometry
A. x = 2, AB = 8 B. x = 1, AB = 5 C. D. x = –2, AB = –4
Name three collinear points.
Splash Screen.
Splash Screen.
Splash Screen.
Splash Screen.
Splash Screen.
Splash Screen.
Objective - To measure length in metric units.
Splash Screen.
Splash Screen.
Splash Screen.
Splash Screen.
Line Segments and Distance
Splash Screen.
1-2 Measuring and Constructing Segments Warm Up Lesson Presentation
undefined term definition defined term space point line plane
1.2 Linear Measure Learning Goals:
Splash Screen.
Splash Screen.
Five-Minute Check (over Chapter 9) Mathematical Practices Then/Now
Presentation transcript:

Splash Screen

A B C D Name three collinear points. A. A, B, Q B. B, Q, T C. A, B, T D. T, A, Q A B C D 5-Minute Check 1

A B C D What is another name for AB? A. AA B. AT C. BQ D. QB 5-Minute Check 2

A B C D Name a line in plane Z. A. AT B. AW C. AQ D. BQ 5-Minute Check 3

A B C D Name the intersection of planes Z and W. A. BZ B. AW C. AB D. BQ A B C D 5-Minute Check 4

A B C D How many lines are in plane Z? A. 2 B. 4 C. 6 D. infinitely many A B C D 5-Minute Check 5

A B C D Which of the following statements is always false? A. The intersection of a line and a plane is a point. B. There is only one plane perpendicular to a given plane. C. Collinear points are also coplanar. D. A plane contains an infinite number of points. A B C D 5-Minute Check 6

You identified and modeled points, lines, and planes. (Lesson 1–1) Measure segments. Calculate with measures. Then/Now

line segment betweenness of points between congruent segments construction Vocabulary

A. Find the length of AB using the ruler. Length in Metric Units A. Find the length of AB using the ruler. The ruler is marked in millimeters. Point B is closer to the 42 mm mark. Answer: AB is about 42 millimeters long. Example 1

B. Find the length of AB using the ruler. Length in Metric Units B. Find the length of AB using the ruler. Each centimeter is divided into fourths. Point B is closer to the 4.5 cm mark. Answer: AB is about 4.5 centimeters long. Example 1

A B C D A. 2 mm B. 1.8 mm C. 18 mm D. 20 mm Example 1a

B. A B C D A. 1 cm B. 2 cm C. 2.5 cm D. 3 cm Example 1b

Length in Standard Units Each inch is divided into sixteenths. Point E is closer to the 3-inch mark. Example 2

Length in Standard Units B. Example 2

A. A. B. C. D. A B C D Example 2a

B. A. B. C. D. A B C D Example 2a

Concept

Find XZ. Assume that the figure is not drawn to scale. Find Measurements by Adding Find XZ. Assume that the figure is not drawn to scale. XZ is the measure of XZ. Point Y is between X and Z. XZ can be found by adding XY and YZ. ___ Example 3

Find Measurements by Adding Example 3

A B C D Find BD. Assume that the figure is not drawn to scale. 16.8 mm 50.4 mm Find BD. Assume that the figure is not drawn to scale. A. 16.8 mm B. 57.4 mm C. 67.2 mm D. 84 mm A B C D Example 3

Find LM. Assume that the figure is not drawn to scale. Find Measurements by Subtracting Find LM. Assume that the figure is not drawn to scale. Point M is between L and N. LM + MN = LN Betweenness of points LM + 2.6 = 4 Substitution LM + 2.6 – 2.6 = 4 – 2.6 Subtract 2.6 from each side. LM = 1.4 Simplify. Example 4

A B C D Find TU. Assume that the figure is not drawn to scale. in. A. V 3 in A. B. C. D. in. A B C D Example 4

Draw a figure to represent this situation. Write and Solve Equations to Find Measurements ALGEBRA Find the value of x and ST if T is between S and U, ST = 7x, SU = 45, and TU = 5x – 3. Draw a figure to represent this situation. ST + TU = SU Betweenness of points 7x + 5x – 3 = 45 Substitute known values. 7x + 5x – 3 + 3 = 45 + 3 Add 3 to each side. 12x = 48 Simplify. Example 5

x = 4 Simplify. Now find ST. ST = 7x Given = 7(4) x = 4 = 28 Multiply. Write and Solve Equations to Find Measurements x = 4 Simplify. Now find ST. ST = 7x Given = 7(4) x = 4 = 28 Multiply. Answer: x = 4, ST = 28 Example 5

ALGEBRA Find the value of n and WX if W is between X and Y, WX = 6n – 10, XY = 17, and WY = 3n. A. n = 3; WX = 8 B. n = 3; WX = 9 C. n = 9; WX = 27 D. n = 9; WX = 44 A B C D Example 5

Concept

Congruent Segments FONTS The Arial font is often used because it is easy to read. Study the word time shown in Arial type. Each letter can be broken into individual segments. The letter T has two segments, a short horizontal segment, and a longer vertical segment. Assume that all segments overlap where they meet. Which segments are congruent? TIME Answer: The five vertical segments in the letters T, I, M, and E are congruent. The four horizontal segments in T and E are congruent. The two diagonal segments in the letter M are congruent. Example 6

LEISURE ACTIVITIES The graph shows the percent of adults who participated in selected activities. Suppose a segment was drawn along the height of each bar. Which categories would have segments that are congruent? A B C D A. barbecuing and beach B. board games and museums C. beach and picnic D. zoo and board games Example 6

End of the Lesson