Presentation is loading. Please wait.

Presentation is loading. Please wait.

Proofs – creating a proof journal.

Published byMarshall York Modified over 5 years ago

Similar presentations

Presentation on theme: "Proofs – creating a proof journal."— Presentation transcript:

1 Proofs – creating a proof journal.

2 Postulates to know Example: If AB = 3x, BC = 2x + 20, and AC = 10x, what is the value of x?

3 Definitions Definition of a midpoint – a point that divides a segment into two congruent segments. Segment bisector – a line, ray, or other figure that passes through the midpoint of a segment. Definition of an angle bisector – a ray (line or segment) that divides an angle into two congruent angles (splits the angle in half)

4 Postulates to know Example: If ∠PQR = 105˚, ∠PQS = 75˚, and ∠SQR = (3x)˚, what is the value of x?

5 Properties of Equality

6 Definitions Complementary Angles – two angles whose measures add up to 90˚ Supplementary Angles – two angles whose measures add up to 180˚ Linear Pair – a pair of adjacent angles whose non-common sides are opposite rays.

7 Theorems to know

8

9 Definitions Definition of Congruence – two figures are congruent if and only if one can be obtained from the other by a sequence of rigid motions (reflections, translations, and/or rotations)

10 Critical Definition Corresponding Parts of Congruent Figures are Congruent – if two figures are congruent, then corresponding sides are congruent and corresponding angles are congruent

11 Properties of Congruence

12

13

14

15 Critical Definition Vertical Angles – if two lines intersect, the angles formed opposite each other are called vertical angles. Additional definitions -Opposite: across from each other -Adjacent: next to

16

17

18

19 Proving Triangle Congruence
Recall the following properties of congruence.

20 Triangle Congruence Theorems

21 Triangle Congruence Theorems

22 Definitions Included Angle – an angle that is in between two sides when discussing triangle congruency statements (such as the angle in SAS triangles). Included Side – a side that is in between two angles when discussing triangle congruency statements (such as the side in ASA triangles). Non-Included Side – a side that is not in between two angles when discussing triangle congruency statements (such as the side in AAS triangles).

23 ASA Triangle Congruence Theorem
Given Reflexive Property of Congruence Given

24 Given ASA Triangle Congruence Theorem Given Vertical Angle Theorem Definition of a Midpoint

25

26

27

28 Do you following proofs from your book in your groups (finish for homework):
Page 238, #7 Page 239, #9 Page 266, #27 Page 231, #13

Download ppt "Proofs – creating a proof journal."

Similar presentations

Sec 2-6 Concept: Proving statements about segments and angles Objective: Given a statement, prove it as measured by a s.g.

Sec 2-6 Concept: Proving statements about segments and angles Objective: Given a statement, prove it as measured by a s.g.
Standard 2.0, 4.0.  Angles formed by opposite rays.

Standard 2.0, 4.0.  Angles formed by opposite rays.
2.6 – Proving Statements about Angles Definition: Theorem A true statement that follows as a result of other true statements.

2.6 – Proving Statements about Angles Definition: Theorem A true statement that follows as a result of other true statements.
Similar Triangle Proofs Page 5-7. A CB HF E Similar Triangle Proof Notes To prove two triangles are similar, you only need to prove that 2 corresponding.

Similar Triangle Proofs Page 5-7. A CB HF E Similar Triangle Proof Notes To prove two triangles are similar, you only need to prove that 2 corresponding.
DEFINITIONS, POSTULATES, AND PROPERTIES Review HEY REMEMBER ME!!!!!!

DEFINITIONS, POSTULATES, AND PROPERTIES Review HEY REMEMBER ME!!!!!!
Proving Triangles Congruent

Proving Triangles Congruent
Special Pairs of Angles

Special Pairs of Angles
Lesson 2.6 p. 109 Proving Statements about Angles Goal: to begin two-column proofs about congruent angles.

Lesson 2.6 p. 109 Proving Statements about Angles Goal: to begin two-column proofs about congruent angles.
Properties from Algebra Section 2-5 p. 113. Properties of Equality Addition Property ◦If a = b and c = d, then a + c = b + d Subtraction Property ◦If.

Properties from Algebra Section 2-5 p Properties of Equality Addition Property ◦If a = b and c = d, then a + c = b + d Subtraction Property ◦If.
Identify the Property which supports each Conclusion.

Identify the Property which supports each Conclusion.
Chapter 1 - Section 3 Special Angles. Supplementary Angles Two or more angles whose sum of their measures is 180 degrees. These angles are also known.

Chapter 1 - Section 3 Special Angles. Supplementary Angles Two or more angles whose sum of their measures is 180 degrees. These angles are also known.
Angle Relationships.

Angle Relationships.
POINTS, LINES AND PLANES Learning Target 5D I can read and write two column proofs involving Triangle Congruence. Geometry 5-3, 5-5 & 5-6 Proving Triangles.

POINTS, LINES AND PLANES Learning Target 5D I can read and write two column proofs involving Triangle Congruence. Geometry 5-3, 5-5 & 5-6 Proving Triangles.
Isosceles Triangle Theorem (Base Angles Theorem)

Isosceles Triangle Theorem (Base Angles Theorem)
Pythagorean Theorem Theorem. a² + b² = c² a b c p. 20.

Pythagorean Theorem Theorem. a² + b² = c² a b c p. 20.
*Supplementary Angles: Two angles that add up to 180 0. *Complementary Angles: Two angles that add up to 90 0. Linear Pair Theorem: If two angles forma.

*Supplementary Angles: Two angles that add up to *Complementary Angles: Two angles that add up to Linear Pair Theorem: If two angles forma.
Using Special Quadrilaterals

Using Special Quadrilaterals
4-4 Using Corresponding Parts of Congruent Triangles I can determine whether corresponding parts of triangles are congruent. I can write a two column proof.

4-4 Using Corresponding Parts of Congruent Triangles I can determine whether corresponding parts of triangles are congruent. I can write a two column proof.
Angle Pair Relationships and Angle Bisectors. If B is between A and C, then + = AC. Segment Addition Postulate AB BC.

Angle Pair Relationships and Angle Bisectors. If B is between A and C, then + = AC. Segment Addition Postulate AB BC.
Do Now.

Do Now.

Similar presentations

Ads by Google