Unit Congruence, 2 Triangles, and Quadrilaterals Unit Overview Essential Questions Properties and characteristics of triangles, quadrilaterals and polygons are the focus of study in this unit. Using ?? How does proving theorems a variety of methods you will prove theorems related to extend your understanding of these fi gures. Geometry? Academic Vocabulary ?? How are patterns, algebra, Add these words to the academic vocabulary portion of and geometry related? your math notebook. altitude of a triangle indirect proof EMBEDDED circumscribe isosceles triangle ASSESSMENTS equiangular regular polygon The three embedded assessments exterior angle in this unit allow you to demonstrate ed. your understanding of the measures v ser of interior and exterior angles of e hts r polygons and your knowledge g All ri of quadrilaterals. By using d. several methods of proof you will ar o demonstrate your ability to present B e g convincing mathematical arguments. e oll C 0 01 Embedded Assessment 1 2 © Angles and Sides of Polygons p. 123 Embedded Assessment 2 Congruence, Triangles, and Proof p. 157 Embedded Assessment 3 Quadrilaterals p. 183 91 009911--009922__SSBB__GGeeoomm__UU22__UUOO__SSEE..iinndddd 9911 22//1199//1100 1122::3333::1144 PPMM UNIT 2 Getting Ready Write your answers on notebook paper. 5. Find the slope of a line that passes through (-2, 5) and (1, 7). 1. Simplify. ___ a. √64 6. Write the equation of a line that contains the ___ b. √98 points (3, 8) and (-4, -6). 2. Solve the following equations. 7. Find the midpoint and length of a line segment a. x2 - 8x + 15 = 0 that has endpoints (3, 5) and (9, -3). b. x2 = 27 8. a. Find the solution of the system of equations: 3. If f (x) = 2x - 5, fi nd x + 3y = 4 a. f (4) 5x - 2y = 3 b. f (-3) b. Explain the method you used to fi nd the solution. 4. Write the equation of the line shown below. y  9 8 7 6 5 4 3 2 1 x –9–8–7–6–5–4–3–2 –1 1 2 3 4 5 6 7 8 9 –2 –3 –4 –5 –6 –7 –8 d. e –9 v er s e s r ht g All ri d. ar o B e g e oll C 0 1 0 2 © 92 SpringBoard®Mathematics with Meaning™ Geometry 009911--009922__SSBB__GGeeoomm__UU22__UUOO__SSEE..iinndddd 9922 11//2211//1100 44::0033::1188 PPMM Interior Angles of Polygons ACTIVITY Plenty of Polygons 2.1 SUGGESTED LEARNING STRATEGIES: Summarize/Paraphrase/ Retell, Activating Prior Knowledge, Think/Pair/Share My Notes It is impossible to measure lengths and angles exactly; however, tools such as rulers and protractors allow you to measure with reasonable accuracy. In the diagram below, the sum of the measures of the fi ve indicated angles should be exactly 360°. 1. Measure the fi ve angles and record each measure in the table below. Th en calculate the sum of the angle measures. 2 3 1 5 4 m ∠ 1 m ∠ 2 m ∠ 3 m ∠ 4 m ∠ 5 Sum d. e v er s e s r ght 2. Compare your sum to the results of other students in your class. Are All ri the results always the same? If not, explain why diff erences can occur d. ar and which answers are reasonably close. o B e g e oll C 0 1 0 2 © Unit 2 • Congruence, Triangles, and Quadrilaterals 93 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9933 11//2211//1100 44::1166::0088 PPMM Interior Angles of Polygons ACTIVITY 2.1 continued PPlleennttyy ooff PPoollyyggoonnss SUGGESTED LEARNING STRATEGIES: Think/Pair/Share, Create Representations, Look for a Pattern, Self/Peer Revision My Notes Your teacher will provide your group with a page containing polygons. 3. Measure, as precisely as possible, each interior angle, and record your results below. Complete the table by calculating the indicated sums. MATH TERMS 1st 2nd 3rd 4th 5th 6th Total A polygon is a closed Angle Angle Angle Angle Angle Angle geometric fi gure with Triangle sides formed by three or more coplanar s egments Quadrilateral that intersect exactly two other segments, one at Pentagon each endpoint. The angles formed inside the polygon Hexagon are interior angles. 4. Compare your results in the table with those of other groups in your class. What similarities do you notice? 5. Write a conjecture about the sum of measures of the interior angles of each of the polygons. d. e Triangle: erv s e s r ht g Quadrilateral: All ri d. ar o B e g e Pentagon: oll C 0 1 0 2 © Hexagon: Knowing that the sum of the measures of the interior angles of a triangle is a constant and that the sum of the measures of non-overlapping angles around a single point is always 360°, you can determine the sum of the measures of any polygon without measuring. 94 SpringBoard®Mathematics with Meaning™ Geometry 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9944 11//2211//1100 44::1166::1122 PPMM Interior Angles of Polygons ACTIVITY 2.1 PPlleennttyy ooff PPoollyyggoonnss continued SUGGESTED LEARNING STRATEGIES: Summarize/Paraphrase/ Retell, Think/Pair/Share, Create Representations, Look for a Pattern, Quickwrite My Notes 6. Use auxiliary segments to determine a way to predict and verify the exact sum of the angles of any quadrilateral and any pentagon. MATH TERMS Describe your methods so that another group would be able to To replicate means to duplicate replicate your results for the pentagon. or imitate. Notice the word replica contained within the word. In science, experiments are designed so that they can be replicated by other scientists. 7. Use the method you described in Item 6 to answer the following. a. Explain how to determine the sum of the measures of the interior angles of a hexagon. b. Explain how to determine the sum of the measures of the interior angles for any polygon. 8. Use the method described in your answer to Item 7 to complete the table below. Number of Sum of the Measures Polygon Calculations d. Sides of the Interior Angles e v er s e Triangle 3 s r ht g All ri Quadrilateral 4 d. ar Bo Pentagon 5 e g e Coll Hexagon 0 1 0 2 © Heptagon Octagon Nonagon Decagon Dodecagon n-gon n Unit 2 • Congruence, Triangles, and Quadrilaterals 95 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9955 11//2211//1100 44::1166::1144 PPMM Interior Angles of Polygons ACTIVITY 2.1 continued PPlleennttyy ooff PPoollyyggoonnss SUGGESTED LEARNING STRATEGIES: Think/Pair/Share, Create Representations My Notes 9. Observe in Item 8 that as the number of sides increases by one, the sum of the angle measures also increases by a constant amount. What type of function models this behavior? 10. For the fi rst six polygons in Item 8, plot the ordered pair (number of sides, sum of angle measures) on the axes below. Carefully choose and label your scale on each axis. 11. T he data points you graphed above should appear collinear. Write an equation for the line determined by these points. Write the equation in slope- d. intercept form: ve er s e y = mx + b s r ht g All ri 12. State the numerical value of the slope of the line in Item 11 and ard. o describe what the slope value tells about the relationship between the e B g number of sides and the sum of the measures of the interior angles of olle C a polygon. Use units in your description. 0 1 0 2 © 96 SpringBoard®Mathematics with Meaning™ Geometry 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9966 11//2211//1100 44::1166::1177 PPMM Interior Angles of Polygons ACTIVITY 2.1 PPlleennttyy ooff PPoollyyggoonnss continued SUGGESTED LEARNING STRATEGIES: Think/Pair/Share, Create Representations My Notes 13. If the function S represents the sum of the measures of the interior angles as a function of the number of sides n, write an algebraic rule for S(n). 14. Use S(n) to determine the value of S(7.5). For this value, explain the signifi cance, if any, given that S(n) represents the sum of the angle measures of an n-sided polygon. Linear functions have continuous domains consisting of all real numbers. However, some contexts restrict the domain of linear functions. If the graph of a linear model consists of discrete points, the linear function is said to have a discrete domain. 15. What is the domain of S(n)? 16. In a regular polygon, each interior angle has the same angle measure. ACADEMIC VOCABULARY Based upon your results from the table in Item 8, determine the angle A regular polygon is a polygon measure in degrees of each interior angle for each regular polygon below. that is both equiangular, with all angles congruent, and Sum of the Measure of equilateral, with all sides Number Measures of the Each Interior ed. Polygon congruent. v of Sides Interior Angles Angle er s s re (degrees) (degrees) ht g All ri Triangle d. ar Quadrilateral o B e eg Pentagon oll C 10 Hexagon 0 2 © Heptagon Octagon Nonagon Decagon Dodecagon n-gon Unit 2 • Congruence, Triangles, and Quadrilaterals 97 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9977 11//2211//1100 44::1166::2211 PPMM Interior Angles of Polygons ACTIVITY 2.1 continued PPlleennttyy ooff PPoollyyggoonnss SUGGESTED LEARNING STRATEGIES: Create Representations, Look for a Pattern, Quickwrite My Notes 17. For each regular polygon listed in the table in Item 16, plot the ordered pair (number of sides, measure of each interior angle) on the axes below. Carefully choose and label your scale on each axis. e r u s a Mees) or Angle (in degre ri e nt I Number of Sides 18. T he points plotted in Item 17 should not appear collinear. Explain how that conclusion could have been drawn from the data alone. 19. If the function E represents the measure of each interior angle as a function of the number of sides n, write an algebraic rule for E(n). TECHNOLOGY d. e v er s e s r Use the TABLE or GRAPHING ht g ccoalmcuploantoern.t E onft ea r g trhaep ha lignegb raic 20. As n gets very large, what appears to be happening to the measure of d. All ri each angle? What causes this behavior? oar function for E(n) in y to B 1 e g explore the measure of e oll individual angle measures 0 C 1 of a regular polygon as the 20 © number of sides increase. 98 SpringBoard®Mathematics with Meaning™ Geometry 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9988 11//2211//1100 44::1166::2255 PPMM Interior Angles of Polygons ACTIVITY 2.1 PPlleennttyy ooff PPoollyyggoonnss continued SUGGESTED LEARNING STRATEGIES: Think/Pair/Share, Look for a Pattern My Notes 21. Determine the angle measures in the interior of the concave decagon. Th e fi ve acute angles are congruent, and the fi ve refl ex angles are MATH TERMS congruent. A concave polygon is a polygon that has one or more interior angles measuring more than 180°. A convex polygon is a polygon, all of whose angles measure less than 180°. 22. Does your function S(n) in Item 13 apply to this concave decagon? Explain. A concave polygon has sides that appear to cave in. In a concave polygon, like pentagon ABCDE below, it is possible to draw a line segment with endpoints in the interior of the polygon such 23. Does your function E(n) in Item 19 apply to this concave decagon? that the segment contains points Explain. in the exterior of the polygon. A C B d. e v ser E D e s r ht g All ri d. ar o B ge MATH TERMS e Coll A refl ex angle is an angle with a 0 01 measure greater than 180° and 2 © less than 360°. To determine the measure of a refl ex angle, use the fact that there are 360° about a point in the plane. You know how to measure the related angle whose measure is less than 180°. Unit 2 • Congruence, Triangles, and Quadrilaterals 99 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::9999 11//2211//1100 44::1166::2288 PPMM Interior Angles of Polygons ACTIVITY 2.1 continued PPlleennttyy ooff PPoollyyggoonnss CHECK YOUR UNDERSTANDING WWrriittee y yoouur ra nanswsweresr osn o nno nteobteobooko pka ppearp. eSrh.o Swh ow your wor k5.. If the sum of the measures of the interior angles of your work. a polygon is 2700°, how many sides does it have? Determine the missing angle measure for each a. 9 b. 15 polygon. c. 17 d. Not enough information 1. 6. If the measure of each interior angle of a 87° polygon is 150°, how many sides does it have? 108° 140° a. 10 b. 12 100° k c. 15 d. Not enough information 7. Given (cid:2)APT with angle measures as labeled, 2. solve for x and calculate the three angle measures. b 94° P 18° (6x+1)° 3. (5x-17)° (9x-24)° A T Draw polygons to satisfy the given conditions. 8. An equiangular quadrilateral that is not equilateral. 4. 88° 9. An equilateral hexagon that is not equiangular. ed. v er s (13x −3)° 10. A concave pentagon with a refl ex angle s re measuring 200°. ght (7x+15)° 80° All ri 11. A regular polygon with an angle measuring 135°. d. ar o 12. MATHEMATICAL As the number of sides of a e B g REFLECTION regular polygon increases, olle C what happens to the shape of the polygon? 10 0 2 © 100 SpringBoard®Mathematics with Meaning™ Geometry 009933--110000__SSBB__GGeeoomm__22--11__SSEE..iinndddd SSeecc11::110000 11//2211//1100 44::1166::3333 PPMM