2.2 pd 3 September 12, Chapter 2 - Openers and notes Resources (1) Theorem/postulate packet

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1 Describe how to find the shortest distance from a point to a line?

1 Chapter 2: Basic Concepts and Proof Chapter 2 - Openers and notes Resources (1) Theorem/postulate packet 2.1 perpendicularity (2) Vocabulary - download from website (3) Answer key to chapter 2 Review exercises (4) Homework 2.1 Describe how to find the shortest distance from a point to a line? In algebra you studied relationships between points when you graphed on a coordinate system. How are the axes related on the coordinate plane? In the diagram, name the right angles G E H F

2 A E C D F B Angles 1,2,3 and 4 are in the ratio of 2:1:1:2, find the measure of <EBC

3 C GIVEN: <ACB=90, A B Prove: <C <D D

4 Chapter 2: Basic Concepts and Proof 2.1 perpendicularity Find the area of rectangle ABCD Find coordinates of D If the coordinates of B are not given, could you answer the first two questions?

5 Explain perpendicularity: What would be a good definition? What does the word oblique mean?

7 GIven: a b Prove: < 1 < 2 τ

8 A ( 3, 2) Where is A ' if it is a result of rotating A 90 degrees about the origin? WHat is the result of rotating B 90 degrees about the origin if B is at (0, -3)?

9 LIne a is perpendicular to line b. The angle formed by their intersection is trisected. One of the new angles then is also trisected. One of these newer angles is bisected. How large is the smallest angle?

10 What is the relationship algebraically between perpendicular lines? B(7, 5) Can you find the equation of the perpendicular line through B to side AC? A(1, 1) C(9, 3)

12 2.2 Complementary and Supplementary Angles A (-2,8) (1,8) B what are the coordinates of D? x C (-2,-3) y (, ) D What is the area and perimeter of the rectangle

13 If two angles are complementary then If two angles are supplementary then

14 Find the complement and the supplement of The supplement of an angle is five times the complement of the angle. Find the measures of the original angle, the complement and the supplement: let x be the angle x is the supplement? is the complement. Now translate the problem into an equation

15 C S A T given: <CAS and <TAS are complementary Prove:

17 2.3 Drawing Conclusions It is important as a student of Geometry to analyze and hypothesize and draw conclusions based on your observations, theorems, postulates and definitions. Be CAREFUL to not ASSUME! Can you draw a conclusion based on the information? given: <1 <2 conclusion:

18 Given: M is the midpoint of GH Conclusion: G Q M P H Given: <1 <2 <3 Conclusion:

20 Our task is to solve the problem, but before we just jump in...let us analyze. We can use definitions, theorems & postulates and then draw conclusions.

21 Once again, can we draw conclusions based on the information given? Let's proceed...

22 E What type of 'assumptions' or conclusions can we make? A C M

23 2.4 Congruent Supplements and congruent Complements suppose <1 is supplementary to <2 and also suppose that <2 is supplementary to <3, what conclusion can you draw?

24 Now suppose that <1 is supplementary to <2 an <3 is supplementary to <4 and also that <2 <4, what conclusion can you draw?

25 suppose that <1 is complementary to <2 and that <3 is complementary to <2, what conclusion can be drawn? Suppose that <1 is complementary to <2 <3 is complementary to <4 and also that <1 <3 What conclusion can be drawn?

26 theorems: If two angles are supplementary to the same angle then they are congruent If two angles are supplementary to congruent angles then they are congruent If two angles are complementary to the same angle then they are congruent If two angles are complementary to congruent angles then they are congruent

27 Given: diagram as shown Prove <1 <3

28 2.5 Addition and Subtraction Properties A B C M Let AB =CM, can you draw any conclusions? W N S T Let <WIN <SIT, can you draw any conclusions? I

29 E S Can you conclude anything about <SNL and <SLN? N L

30 Addition Properties for segments and angles theorems 8-11 Subtraction Properties for segments and angles theorems 12-13

31 A Given <BAD <CAE Prove: <BAC <FAD, AD bisects <FAE B C D E F

32 2.6 Multiplication and Division Properties M N O P Q R S T Let the points N and O be trisection points AND R and S be trisection points. ALSO, MN=QR. can you conclude anything?

33 A Y E P W T X Z Ray XY and Ray ZW are angle bisectors, if <1 = <3, what can be said of <AXE and <PZT? Multiplication and Division Theorems 14 and 15 Using the theorems 14 & 15 1) Look for double use of the words bisect or trisect of midpoint 2) use the Mult. Prop. if segments or angles are greater in the prove statement 3) use the Div Prop. if the segments or angles are smaller in the prove statement.

34 2.7 transitive and Substitution properties If <A =<B and <B = <C, is <A = <C? Does this sound like a familiar property? Theorems 16 & 17

35 Q P R G: Q and R are midpoints and PS=PT P: QS = RT S T

36 2.8 Vertical Angles Name the vertical angle pairs G H E D B J K A C Which angle is a vertical angle to <GBK? to <EBA? to <ABG?

37 G: GD bisects <CBE P: <1 <2

38 If a pair of vertical angles are complementary, what are their measures? If a pair of vertical angles are supplementary, what are their measures?

Geometry-Chapter 2 Notes

2.1 Perpendicularity Geometry-Chapter 2 Notes Vocabulary: perpendicular symbol parallel symbol Definition #16 Lines, rays or segments that intersect at right angles are perpendicular. Examples and label