6.1 Warm Up The diagram includes a pair of congruent triangles. Use the congruent triangles to find the value of x in the diagram.

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1 6.1 Warm Up The diagram includes a pair of congruent triangles. Use the congruent triangles to find the value of x in the diagram Write a proof. 3. Given: P is the midpoint of MN and TQ. Prove: MQP NTP

2 Geometry 6.1 Perpendicular and Angle Bisectors

3 6.1 Essential Question What conjectures can you make about a point on the perpendicular bisector of a segment and a point on the bisector of an angle? January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 3

4 Goals Know what a perpendicular bisector is. Use the Perpendicular Bisector Theorem. Measure the distance to a line. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 4

5 6.1 Perpendicular and angle bisectors January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 5

6 The perpendicular bisector of a segment can be a segment. R A B RS is a bisector of AB. S January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 6

7 The perpendicular bisector of a segment can be a line. R A B RS is a bisector of AB. S January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 7

8 The perpendicular bisector of a segment can be a ray. A R B S RS is a bisector of AB. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 8

9 The perpendicular bisector of a segment can be a plane. K A B K is a bisector of AB. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 9

10 Equidistant Points A point is equidistant from two points if its distance to each point is the same. A R B R is equidistant from A and B. S is also equidistant from A and B. S January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 10

11 How to use Geogebra The tool bar at the top will have various tools listed. Today s exploration has the following tool bar This tool allows you to drag or select objects. This tool allows you to find the distance between two points or the length of a segment. This allows you to move the entire picture. Use these to zoom in or out as needed. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 11

12 Exploration 1 Work with a partner. Open the 6.1 Exploration 1 from the ebook. Given AB with point C on the perpendicular bisector of AB. Use the tool box to measure AC and BC. Move points A, B, and C around. Q1: What do you notice about the distances from C to both A and B? Q2: What can you say about the distances from any point on the perpendicular bisector of a segment to the endpoints of the segment?

13 Theorem 6.1 (Perpendicular Bisector Theorem) AR BR If a point is on the perpendicular bisector of a segment, then it is equidistant from the endpoints of the segment. A R S B AS BS January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 13

14 Theorem 6.1 Proof 1. The two right triangles are congruent by SAS. 2. This means AR = BR by CPCTC. A R B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 14

15 Theorem 6.2 (Converse of Perpendicular Bisector Thm.) If a point is equidistant from the endpoints of a segment, then it is on the perpendicular bisector of the segment. A R B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 15

16 Example 1 Find RB. R 14 14? A B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 16

17 Example 2 R A S B Is RS the perpendicular bisector of AB? No, RA RB. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 17

18 Example 3 Find AD. From the figure, BD is the perpendicular bisector of AC. AD = CD Perpendicular Bisector Theorem 5x = 3x + 14 Substitute. x = 7 Solve for x. So, AD = 5x = 5(7) AD = 35 January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 18

19 Distance from a point to a line. Defined as the length of the perpendicular segment between the point and the line. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 19

20 Distance from a point to a line. Defined as the length of the perpendicular segment between the point and the line. This is the distance from the point to the line. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 20

21 Equidistant from two lines. Point J is equidistant from lines m and n. m J n January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 21

22 Exploration 2 Work with a partner. Open the 6.1 Exploration 2 from the ebook. Given BAC with point D on the bisector of BAC. Use the tool box to measure DE and DF. Move points B, C and D around. Q1: What do you notice about the distances from D to both E and F? Q2: What can you say about the distances from any point on the angle bisector to the sides of the angles? Q3: Why did we used DE and DF instead of using DB and DC?

23 Theorem 6.3 (Angle Bisector Theorem) If a point is on the bisector of an angle, then it is equidistant from the two sides of the angle. A D C B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 23

24 Theorem 6.4 (Converse of Angle Bisector Theorem) If a point is equidistant from the two sides of the angle, then it is on the bisector of an angle. A D C B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 24

25 Example 4 If AD = 15, then DC =. 15 A D C B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 25

26 Example 5 Is D on the bisector of the angle?yes 4 D 4 January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 26

27 Example 6 Is E on the bisector of the angle?no! The length of the segment from E to each is not the length of a perpendicular segment. E 5 5 January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 27

28 Example 7 BD bisects ABC, AD = 3z + 7, and CD = 2z Find CD. AD = CD Angle Bisector Theorem 3z + 7 = 2z + 11 Substitute. z = 4 Solve for z. So, CD = 2z + 11 = 2(4) + 11 CD = 19 January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 28

29 Summary AR BR A point on the perpendicular bisector of a segment is R equidistant from the endpoints of the segment. A B S AS BS January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 29

30 Summary A point on the bisector of an angle is equidistant from the sides of the angle. A D C B January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 30

31 Summary The distance from a point to a line is the measure of the perpendicular segment. January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 31

32 Homework January 13, 2016 Geometry 5.1 Perpendiculars and Bisectors 32

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