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6 Oct 2015 9:50 - 11:20 Geometry Agenda Binder check - triangle / street sheet,+ Unit 2 pages Angles of a Triangle Practice problems Congruent Triangles (SAS Postulate) worksheet Homework 10/6/2015 Angles of a Triangle As you probably know, the sum of the interior angles of a triangle is 180°. We could use a protractor and look at several triangles to reinforce that, but several examples do not (necessarily) make something true. How can we prove that all triangles have interior angles that add up to 180°? That is what we will try to do below. To the right we have triangle ABC, where we do not know the exact measure of B any of the angles. A C A B C To make our proof easier, extend line segment BC into line BC. Also create line DE parallel to line BC so that A is in between D and E and point A lies on line DE. A D B E C To make our proof easier, extend line segment BC into line BC. Also create line DE parallel to line BC so that A is in between D and E and point A lies on line DE. A D B E C After having made some changes to our picture, have we changed any of the properties of the angles in triangle ABC? A D B E C After having made some changes to our picture, have we changed any of the properties of the angles in triangle ABC? No. A D B m angle DAB + m angle BAC + m angle CAE = angle ABC is congruent to angle ______ angle ACB is congruent to angle______ E C A D E B m angle DAB + m angle BAC + m angle CAE = 180° angle ABC is congruent to angle DAB angle ACB is congruent to angle CAE C A D B E C Use the space below and the information above, to prove the sum of the interior angles for triangle ABC is 180 degrees. Be specific in how you know what you do. Another person should be able to follow your reasoning. Paragraph Proof (do on white board) On the previous page we did a paragraph proof. Some students and teachers prefer to do two column proofs. Let’s look at a two column proof of the same idea. Correct diagram. A D B E C Example 2 Column Proof Given: line DE is parallel to line BC Prove: m(angleABC) + m(angleBAC) + m(angle ACB) = 180 degrees Statement Reason 1. 1. line DE is parallel to line BC Given. 2. m(angle DAB) + m(angleBAC) + m (angle EAC) = 180 degrees 2. A group of 3 angles adding up to a line. 3. angle DAB is congruent to angle ABC; angle EAC is congruent to angle ACB 3. For parallel lines cut by a transversal, alternate interior angles are congruent 4. m(angleABC) + m(angle BAC) + m (angle ACB) = 180 degrees 4. By the definition of congruent angles and line 3. and then substitution of values from line 3 into line 2. Let’s try another proof about triangles. In this case we are proving a theorem. The measure of an exterior angle of a triangle equals the sum of the measure of the two X interior angles. 1 2 Y 3 4 Z X 1 2 Y Two Column Proof 3 4 Z Paragraph Proof Given triangle XYZ we can say that the measures of angles 1, 2 and 3 will add up to 180 degrees. X 1 2 Y 3 4 Z Paragraph Proof Given triangle XYZ we can say that the measures of angles 1, 2 and 3 will add up to 180 degrees. We also know that angles 3 and 4 are a linear pair, so the sum of their measures is 180 degrees. X 1 2 Y 3 4 Z So we can write m∠4 + m∠3 = m∠1 + m∠2 + m∠3 and by the subtraction property of equality and substitution this can be simplified to m∠4 = m∠1 + m∠2 , which is what we were asked to prove. X 1 2 Y Two Column Proof Statement Reason 1 1 2 2 3 3 4 4 5 5 3 4 Z Paragraph Proof Given triangle XYZ we can say that the measures of angles 1, 2 and 3 will add up to 180 degrees. X 1 2 3 4 Y Z Two Column Proof Statement Reason 1 Triangle XYZ 1 Given 2 m∠1 + m∠2 + m∠3 = 180° 3 m∠3 + m∠4 = 180° 4 2 The sum of the internal angles of a triangle (theorem) 3 Linear angle pair 4 Two Column Proof Statement Reason 1 Triangle XYZ 1 Given 2 m∠1 + m∠2 + m∠3 = 180° 3 m∠3 + m∠4 = 180° m∠1 + m∠2 + m∠3 = m∠3 + m∠4 4 5 m∠1 + m∠2 = m∠4 2 The sum of the internal angles of a triangle (theorem) 3 Linear angle pair 4 Substitute line 3 into line 2 since both equations equal 180 degrees 5 By the subtraction property of equality and substitution property of equality. Angles of a Triangle page 3 Practice Problems Find the values of x and y for the problems below. Show your work in the space below each diagram as well as marking up the diagram as needed. Congruent Triangles (SAS Postulate) Work through the steps in the worksheet to see how the SAS postulate works. Homework Angles of a Triangle Homework (Unit 2 Lesson 1) 1 - 4 - all parts. Draw diagrams out again on separate paper if not enough room to show what you need to do to find the values. Geometry Dictionary Project - due Nov 18 email Mrs. D-B re partner or individual.
