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Lesson 1.3 Collinearity, Betweenness, and Assumptions Objective: Recognize collinear, and non-collinear points, recognize when a point is between two others, recognize that each side of a triangle is shorter than the sum of the other two sides, and correctly interpret geometric diagrams Definitions… Def. Points that lie on the same line are called collinear. Def. Points that do not lie on the same line are called noncollinear. P U A H S N Collinear Noncollinear Example #1 Name as many sets of points as you can that are collinear and noncollinear O R S M X Y P T Definitions… In order for us to say that a point is between two other points, all three points MUST be collinear. U A P H S N A is between N and U P is NOT between H and S Triangle Inequality For any 3 points there are only 2 possibilities: 1. They are collinear (one point is between the other two and two of the distances add up to the 3rd) A C B 5.5 12.5 18 2. They are noncollinear (the 3 points determine a B triangle) 14 11 A 24 C Triangle Inequality Notice in this triangle, 14 + 11 > 24. This is extra super important! “The sum of the lengths of any 2 sides of a triangle is always greater than the length of the third” B 14 11 A 24 C Assumptions When given a diagram, sometimes we need to assume certain information, but you know what they say about assuming…. There are do’s and don’ts! You should Assume *Straight lines and angles *Collinearity of points *Betweenness of points *Relative positions of points You should NOT Assume *Right angles *Congruent segments *Congruent angles *Relative sizes of segments and angles Homework Lesson 1.3 Worksheet Lesson 1.4 Beginning Proofs Objective: Write simple two-column proofs Introducing… The Two-Column Proof! The two-column proof is the major type of proof we use throughout our studies. Def. A theorem is a mathematical statement that can be proved. Theorem Procedure… 1. We present a theorem(s). 2. We prove the theorem(s). 3. We use the theorems to help prove sample problems. 4. You use the theorems to prove homework problems. Note: The sooner you learn the theorems, the easier your homework will be! Theorem 1 If two angles are right angles, then they are congruent. Given: <A is a right <. B <B is a right <. A Prove: A B Statement Reason 1. 2. 3. 4. <A is a right < m<A = 90° <B is a right < m<B = 90° 1. 2. 3. 4. 5. A B 5. If 2 <‘s have the same measure then they are congruent. Given If an < is a right < then its measure is 90° Given If an < is a right < then its measure is 90° Theorem 2 If two angles are straight angles, then they are congruent. U A Given: <NAU is a straight <. <PHS is a straight <. Prove: NAU PHS Statement Reason N P H S Practice Makes Perfect… Now that we know the two theorems (and have proved them), we apply what we know to sample problems. about what we can and cannot assume from a diagram! This is important with proofs! Example #1 Given: <RST = 50° <TSV = 40° <X is a right angle Prove: R T RSV X X S Statement Reason V Example #2 Y X Given: <ABD = 30° D A <ABC = 90° E <EFY = 50° 20’ B <XFY = 9° 40’ Prove: DBC XFE Statement Reason C F Homework Lesson 1.4 Worksheet Lesson 1.5 Division of Segments and Angles Objective: Identify midpoints and bisectors of segments, trisection points and trisectors of segments, angle bisectors and trisectors. Definitions Def. A point (or segment, ray, or line) that divides a segment into two congruent segments bisects the segment. The bisection point is called the midpoint of the segment. Y A M Note: Only segments have midpoints! B X Why can’t a ray or line have a midpoint? X X is not a midpoint Y Y is not a midpoint Example If D is the midpoint of segment FE, what conclusions can we draw? G F Conclusions: FD DE Point D bisects FE DG bisects FE D E Definitions A segment divided into three congruent parts is said to be trisected. Def. Two points (or segments, rays, or lines) that divides a segment into 3 congruent segments trisect the segment. The 2 points at which the segment is divided are called trisections points. Note: One again, only segments have trisection points! Examples If AR RS SC , what conclusions can we draw? C S R A If E and F are trisection points of segment DG, what conclusions can we draw? H D E F G Definitions Like a segment, angles can also be bisected and trisected. Def. A ray that divides an angle into 2 congruent angles bisects the angle. The dividing ray is called the angle bisector. Def. Two ray that divide an angle into 3 congruent angles trisects the angle. The 2 dividing rays are called angle trisectors. Examples If ABC DBC , then BD is the bisector of ABC A D 40° 40° B C If ABC CBD DBE , then BC and BD trisect ABE C A 35° B 35° 35° D E Example #1 Does M bisect segment OP? 2x - 6 x+8 O M 44 P Example #2 A Given: B is a midpoint of AC Prove: AB BC B C Statement Reason D Example #3 Segment EH is divided by F and G in the ratio 5:3:2 from left to right. If EH = 30, find FG and name the midpoint of segment EH. E F G H Classwork 1.1-1.3 Review Worksheet Homework Lesson 1.5 Worksheet