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Transcript
Chapter 5 Lesson 5 Objective: To use inequalities involving angles and sides of triangles. Comparison Property of Inequality If a = b + c and c > 0, then a > b. Corollary to the Triangle Exterior Angle Theorem The measure of an exterior angle of a triangle is greater than the measure of each of its remote interior angles. m1 m2 and m1 m3 3 2 1 Example 1: Applying the Corollary In the diagram, m 2 = m 1 by the Isosceles Triangle Theorem. Explain why m 2 > m 3. By the corollary to the Exterior Angle Theorem, m 1 > m 3. So, m 2 > m3 by substitution. Theorem 5-10 If two sides of a triangle are not congruent, then the larger angle lies Y opposite the longer side. If XZ > XY, then mY mZ X Z Theorem 5-11 If two angles of a triangle are not congruent, then the longer side lies opposite the larger angle. B If mA mB ,then BC > AC. C A Example 2: Using Theorem 5-11 In ∆TUV, which side is shortest? By the Triangle Angle-Sum Theorem, m T = 60. The smallest angle in ∆TUV is U. U It follows, by Theorem 5-11, that the shortest side isTV . T V Theorem 5-12 Triangle Inequality Theorem The sum of the lengths of any two sides of a triangle is greater than the length of the third side. XY + YZ > XZ YZ + ZX > YX ZX + XY > ZY Example 3: Using the Triangle Inequality Theorem Can a triangle have sides with the given lengths? Explain. (a.) 3 3 8 3 ft., 7ft. 8ft. + 7 > 8 + 7 > 3 + 8 > 7 Yes; the sum of any two length is greater than the third length. (b.) 3 cm, 6 cm, 10 cm 3 + 6 > 10 No; the sum of 3 and 6 is not greater than 10. Example 4: Finding Possible Side Lengths A triangle has sides of lengths 8 cm and 10 cm. Describe the lengths possible for the third side. Let x represent the length of the third side. By the Triangle Inequality Theorem, The third side must be longer than 2 cm and shorter than 18 cm. Assignment Page 276 – 277 #1 - 27