Download presentation
Presentation is loading. Please wait.
Published byAdam Ellis Modified over 8 years ago
1
Bell Work A regular hexagon has a total perimeter of 120 inches. Find the measure of each side of the polygon. A hexagon has 6 sides. Since it’s a regular hexagon all of the sides are equal in length. 120 ÷ 6 = 20 inches Each side measures 20 inches.
3
Identifying congruent figures Two geometric figures are congruent if they have exactly the same size and shape. CONGRUENT NOT CONGRUENT
4
Congruency When two figures are congruent, there is a correspondence between their angles and sides such that corresponding angles are congruent and corresponding sides are congruent. What does congruent mean? What does the symbol look like? Congruent means that they are the same or equal ≅
5
Triangles Corresponding angles A ≅ P B ≅ Q C ≅ R Corresponding Sides AB ≅ PQ BC ≅ QR CA ≅ RP A B C Q P R
6
How do you write a congruence statement? There is more than one way to write a congruence statement, but it is important to list the corresponding angles in the same order. Normally you would write ∆ABC ≅ ∆PQR, but you can also write that ∆BCA ≅ ∆QRP
7
Ex. 1 Naming congruent parts Write a congruence statement. Identify all parts of congruent corresponding parts. ∆DEF ≅ ∆RST Angles: D≅ R, E ≅ S, F ≅ T Sides DE ≅ RS, EF ≅ ST, FD ≅ TR
8
Ex. 2 In the diagram NPLM ≅ EFGH Find the value of y Hint: You know that N ≅ E. So, m N = m E. 8 m 110 ° 87 ° 10 m 72 ° (7y+9) ° (2x - 3) m (7y + 9)° = 72° 7y = 63 y = 9
9
Third Angle Theorem If any two angles of one triangle are congruent to two angles of another triangle, then the third angles are also congruent to one another. If A ≅ D and B ≅ E, then C ≅ F. Why does that work?
10
Ex. 3 Try this challenge! Find the value of x. In the diagram, N ≅ R and L ≅ S. From the Third Angles Theorem, you know that M ≅ T. So m M = m T. (2x + 30) ° 55 ° 65 ° From the Triangle Sum Theorem, m M=180 ° - 55° - 65° = 60° m M = m T (2x + 30)° = 60° 2x = 30 x = 15
11
Practice
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.