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Download Geometry Fall 2016 Lesson 025 _Base Angles of an Isosceles
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1 Lesson Plan #025 Class: Geometry Date: Monday November 14th, 2016 Topic: Base angles of an isosceles triangle Aim: What is the relationship between the base angles of an isosceles triangle? HW #025: Note: Postulate – A whole is greater than any of its parts. Objectives: 1) Students will be able to use the theorem that states that the base angles of a triangle are congruent. Do Now: 1) How would you classify the triangle at the right? Why? 2) What relationship exists between the sides opposite the congruent sides? 3) Based on the observations from above, we can conclude that if two sides of a triangle are congruent, then the angles opposite those sides are congruent. Do our observations and conclusion demonstrate deductive reasoning or inductive reasoning? Why? PROCEDURE: Write the Aim and Do Now Get students working! Take attendance Give Back HW Collect HW Go over the Do Now 2 Assignment #1: 1) Using a compass and straight edge to construct the angle bisector from vertex B intersecting at D. B 2) How many angle bisectors can you draw from B? Postulate: Every angle has one and only one angle bisector Given: ABC with Prove: 1. 2. Statements be the bisector of vertex , being the point at which the bisector intersects . Let (s s) 3. 4. ( a. a.) ( s. s.) 5. 6. Reasons 1. Every angle has one and only one angle bisector. C A 2. 3. 4. 5. What theorem have we just proven about the base angles of an isosceles triangle? Theorem: If two sides of a triangle are congruent, the angles opposite those sides are congruent or the base angles of an isosceles triangle are congruent. What other parts are congruent? Definition: A corollary is a theorem that can easily be deduced from another theorem. Since bisector of the vertex angle of an isosceles triangle bisects the base. Corollary: The bisector of the vertex angle of an isosceles triangle bisects the base. Corollary: The bisector of the vertex angle of an isosceles triangle is perpendicular to the base. Corollary: Every equilateral triangle is equiangular Note: Differentiate between the definition of a midpoint and the Midpoint Theorem. Definition of a midpoint – A point on a line segment that divides the segment into two congruent segments. Midpoint Theorem - A midpoint divides a line segment into two segments, each ½ the length of the original segment. Similarly distinguish between the definition of an angle bisector and the Angle Bisector Theorem. Assignment #1: , we deduce that the 3 Assignment #2: (Engagement) Complete the proofs below in your groups. 4 Assignment #3: 10. 5 If enough time: 1) 2) 3) 4) 5) 6)
