1.) What’s the perimeter of ABC if X is the midpoint of AB, Y is the midpoint of BC, and Z is the midpoint of AC? 4 cm 6 cm A X Z Y C B 36 cm A 28 cm.

Slides:

Advertisements

Similar presentations

CONGRUENT TRIANGLES.

Advertisements

WARM-UP The vertex angle of an isosceles triangle measures

7/3/ : Midsegments of Triangles 3.7: Midsegments of Triangles and Trapezoids G1.2.2: Construct and justify arguments and solve multistep problems.

Triangle Midsegments.

6.4 The Triangle Midsegment Theorem

VOCABULARY CHECK Prerequisite Skills Give the indicated measure for P. 1. The radius ANSWER 3 2. The diameter ANSWER 6 3. mADB ANSWER 290 °

Points of Concurrency Line Segments Triangle Inequalities.

11.5 Similar Triangles Identifying Corresponding Sides of Similar Triangles By: Shaunta Gibson.

Construction of Triangles 1.Given three sides Example Triangle ABC has sides AB = 6cm, BC = 8cm and AC = 10cm. Construct the triangle ABC and measure and.

The Midsegment Theorem

Angle-Side Relationship  You can list the angles and sides of a triangle from smallest to largest (or vice versa) › The smallest side is opposite.

Unit 2 Test Review Geometry WED 1/22/2014. Pre-Assessment Answer the question on your own paper.

10 pt 15 pt 20 pt 25 pt 5 pt 10 pt 15 pt 20 pt 25 pt 5 pt 10 pt 15 pt 20 pt 25 pt 5 pt 10 pt 15 pt 20 pt 25 pt 5 pt 10 pt 15 pt 20 pt 25 pt 5 pt Midsegments.

 In Chapter 1, you learned the definition of a midpoint of a segment. What do you think a midsegment of a triangle is?  Find the midpoint of AB: o A(-2,

Activity Each table needs to cut out a perfectly straight sided scalene triangle of any size (larger is better) – (use a straight edge and draw the lines.

4-6 Warm Up Lesson Presentation Lesson Quiz Triangle Congruence: CPCTC

Pythagoras Theorem Example For each of the following right angled triangles find the length of the lettered side, giving your answers to 2 decimal places.

5-4 Midsegment Theorem Warm Up Lesson Presentation Lesson Quiz

Holt McDougal Geometry 5-4 The Triangle Midsegment Theorem Warm Up Use the points A(2, 2), B(12, 2) and C(4, 8) for Exercises 1–5. 1. Find X and Y, the.

Refresher…  ABC is isosceles Line CD bisects  C and is a perpendicular bisector to AB If m  A is 50, find m  B, m  ACD, and m  ACB *After notes are.

Lesson 5-4 Prove ∆ Midsegment Theorem Use ∆ Midsegment Theorem.

Do Now Find the missing of the following angles: Hint: Find the angles in the order I wrote them. Make sure you use what you know about sum of interior.

Holt Geometry 5-1 The Triangle Midsegment Theorem 5-1 The Triangle Midsegment Theorem Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation.

Sect. 5.4 Midsegment Theorem

Geometry 5-4 Midsegments

Warm Up Use the points A(2, 2), B(12, 2) and C(4, 8) for Exercises 1–5. 1. Find X and Y, the midpoints of AC and CB. 2. Find the length of XY. 3. Find.

Do Now: 1) x = 8 2) x = 14 3) x = 6, –6 4) x = 9, –6.

7-5: Parts of Similar Triangles

Prerequisite Skills VOCABULARY CHECK Give the indicated measure for P.

In the triangle below work out the value of the area.

Midsegments of Triangles

Similar figures are figures that have the same shape but not necessarily the same size. The symbol ~ means “is similar to.” 1.

Warm Up Lesson Presentation Lesson Quiz.

Theorems Involving Parallel Lines and Triangles

Midsegment Theorem.

Constructing a triangle

8.1 Exploring Ratio and Proportion

Table of Contents Date: 10/17 Topic: Classifying Triangles

Agenda: 4.1 Notes Exit Slip Work on Supplement

Drawing Triangles.

4/20 Triangle Midsegment.

6.5 Parts of Similar Triangles

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

Warm-up 1. How many degrees are in a triangle?

Constructions of Triangles

The General Triangle C B A.

Geometry 6.4 Midsegment Theorem

A midsegment of a triangle is a segment that joins the midpoints of two sides of the triangle. Every triangle has three midsegments, which form the midsegment.

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

Class Greeting.

Perimeter and Area of Similar Figures

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

The General Triangle C B A.

Constructing a triangle

The General Triangle Tuesday, 09 April 2019.

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

Exercise Compare by using >,

Pythagoras Theorem Example

By Angle Measures By Side Lengths

5-4 The Triangle Midsegment Theorem Warm Up Lesson Presentation

The Triangle Midsegment Theorem

5.1 Midsegments of Triangles

Constructing a triangle

Pythagoras theorem statement

Warm-up 1. How many degrees are in a triangle?

4/20 Triangle Midsegment.

Objective Prove and use properties of triangle midsegments.

Presentation transcript:

1.) What’s the perimeter of ABC if X is the midpoint of AB, Y is the midpoint of BC, and Z is the midpoint of AC? 4 cm 6 cm A X Z Y C B 36 cm A 28 cm B 20 cm C 14 cm D

2. ) TUV is the midsegment triangle of LMN 2.) TUV is the midsegment triangle of LMN. Which angle does not necessarily measure 50? 50 L T U V M N VTU A TUL B alt. int. angles Alt. int to VTU Correct corresponding NTV C VMU D

3.) SQ is the midsegment of NOP. What’s the length of OP? 8x + 6 5x - 2 Q S O P N 5 A 14 B Value of x Guess SQ correct 23 C 46 D

4.) What’s the value of d in the triangle below? 54 3d 9 A 18 B 54=2(3d) 54=3d Correct guess 36 C 72 D

5.) XYZ is the midsegment triangle of JKL, XY = 8, YK = 14, and mYKZ = 67. Which of the following measures cannot be determined? Z J X Y L K JY A KL B mLZX C mYZK D

6.) What’s the distance MN in the triangle below? Z N Y X M 46m 39 m A 40 m B a. correct 40.5 m C 70 m D

SPR1) What’s the value of n in the triangle below? 35 n - 9 A: 26.5

SPR2) What’s the largest value of y in the triangle below? y2 – 6y + 3 3y - 16 A: y = 7