3 Congruent Triangles
Transcription
3 Congruent Triangles
NSM Enhanced 10 5.1–5.2 Chapter Focus Congruent Triangles 3 In this chapter students are encouraged to use deductive geometry to construct proofs of geometrical relationships involving congruent triangles, and to prove properties of special triangles and quadrilaterals. Learning Outcomes SGS5.2.2 Develops and applies results for proving that triangles are congruent or similar. Chapter Contents ge s Be careful dear– it could be a scam! pa 3:01 Congruent triangles SGS5·2·2 3:02 Applying the congruency tests SGS5·2·2 Fun Spot: What do you call a man with a shovel? 3:03 Using congruent triangles to find sides and angles SGS5·2·2 3:04 Deducing properties of the special triangles SGS5·2·2 3:05 Deducing properties of the special quadrilaterals SGS5·2·2 Maths Terms, Diagnostic Test, Revision Assignment, Working Mathematically Learning Outcomes SGS5·2·2 Develops and applies results for proving that triangles are congruent or similar. Sa m pl e Working Mathematically Stages 5·2·1–5 1 Questioning, 2 Applying Strategies, 3 Communicating, 4 Reasoning, 5 Reflecting 62 Vocabulary Preview congruent triangles deducing definition matching angles proof quadrilateral triangle 62 New Signpost Mathematics Enhanced 10 5.1–5.2 ``TEACHER EDITION Chapter 3 3:01 Congruent Triangles Learning Outcomes Outcome SGS5·2·2 SGS5.2.2 Develops and applies results for • Congruent figures are the same shape and size. When one is superimposed on the other, they coincide exactly. • Congruent figures are produced by translations, reflections and rotations. • When congruent figures are placed on top of each other so that they coincide exactly, the matching sides and angles are obviously equal. The word corresponding is often used instead of matching. proving that triangles are congruent or similar. Knowledge and Skills Students learn about: Prep Quiz 3:01 A • B C determining what information is needed to show that two triangles are congruent: − If three sides of one triangle are respectively equal to three sides of another triangle, then the two triangles are congruent (SSS). − If two sides and the included angle of one triangle are respectively equal to two sides and the included angle of another triangle, then the two triangles are congruent (SAS). D 1 Which figure is congruent to figure A? 2 Which figure is congruent to figure B? C O M N The figures to the left are congruent. 5 Name the angle that matches ∠B. 6 Name the side that matches AB. 7 Name the angle that matches ∠N. O E D P B N L C M Are the following pairs of triangles congruent? 9 8 ge B A P D pa E The figures to the left are congruent. 3 Name the angle that matches ∠A. 4 Name the side that matches FE. Q s L F A Congruent triangles Sa m pl • In geometry, we are often asked to show that two sides or two angles are equal. A common way of doing this is by showing that they are the matching sides or angles of congruent triangles. • To check that two triangles are congruent, we would normally need to compare six pieces of information (three sides and three angles). • In the next exercise we will investigate the minimum conditions for congruent triangles. A minimum condition is the smallest amount of information that we need to know about two triangles before we can say they are congruent. Answers Chapter 3 Congruent Triangles Technology Prep Quiz 3:01 1 4 7 10 figure C QP ∠C no 2 figure D 5 ∠O 8 no If two angles and one side of one triangle are respectively equal to two angles and the matching side of another triangle, then the two triangles are congruent (AAS). − If the hypotenuse and a second side of one right-angled triangle are respectively equal to the hypotenuse and a second side of another rightangled triangle, then the two triangles are congruent (RHS). e 10 − 3 6 9 ∠L PO no • 63 applying congruent triangle results to establish properties of isosceles and equilateral triangles eg − If two sides of a triangle are equal, then the angles opposite the equal sides are equal. Conversely, if two angles of a triangle are equal, then the sides opposite those angles are equal. − If three sides of a triangle are equal then each interior angle is 60º. Chapter Link Exercise 1:04 Geometry can be used as a Pre-Topic Test for this chapter. Class Tutorial: Congruency Interactive: Congruent triangles Chapter 3 Congruent Triangles 63 NSM Enhanced 10 5.1–5.2 Exercise 3:01 5 cm 3 m 3c cm 60° 50° 4 cm 50° 60° What is the least I need to know? 60° ge 3 cm s 3 cm Use the diagrams above to answer questions 1 and 2. 2 Are two triangles congruent if they: a have only one side equal? c have only two sides equal? e have one side and one angle equal? b have only one angle equal? d have two angles equal? pa 1 Can we be sure that two triangles are congruent if we can compare only two pieces of information on each one? m pl e To compare three pieces of information we could compare: • three sides • two sides and one angle • one side and two angles • three angles Sa 3 64 a When a photograph is enlarged, are: i the angles in the photo and enlargement the same? ii the photo and the enlargement congruent? b If two triangles have their three angles equal, does it mean they are congruent? New Signpost Mathematics Enhanced 10 5.1–5.2 Answers Exercise 3:01 Teacher’s notes 1 No in all cases. 2 We cannot say that the triangles are definitely congruent. 3 a b 4 a b c 5 a b 6 a 64 i yes ii no no yes They are congruent. yes They are congruent. ∠A and ∠E, ∠B and ∠D, ∠C and ∠F yes b no New Signpost Mathematics Enhanced 10 5.1–5.2 ``TEACHER EDITION Chapter 3 4 Teaching Strategies and Ideas Copy one of the following triangles onto paper and cut it out. C F Exercise 3:01 can be used to develop the four tests for congruent triangles. A D B E • Questions 4 and 5 show that two triangles are congruent if three sides of one triangle are equal to three sides of the other (SSS). • Questions 6 to 9 show that two triangles are congruent if two sides and the included angle of one triangle are equal to two sides and the included angle of the other (SAS). • Questions 10 and 11 show that two triangles are congruent if two angles and a side of one triangle are equal to two angles and the matching side of the other (AAS) a Do the triangles have their sides equal in length? b By superimposing the cut-out triangle over the other triangle, see if the triangles are congruent. c Do the triangles have the same sized angles? 5 Construct or trace one of the triangles below and cut it out. F A 5 cm B 6 cm 4 cm 6 cm C D 4 cm E 5 cm s a By placing the cut-out triangle over the other triangle, find out if the two triangles are congruent. b Name the pairs of matching (or corresponding) angles. ge • pa In questions 4 and 5, the triangles with matching sides of equal length were congruent. We say that three pairs of sides equal is a minimum condition for congruent triangles. It is abbreviated to SSS. 6 60° 3 cm Questions 12 and 13 show that two right-angled triangles are congruent if the hypotenuse and one other side are equal to the hypotenuse and one side of the other triangle (RHS). 3 cm 4 cm 4 cm e 60° Sa m pl a Do the triangles above have two sides and one angle equal? b Are the triangles congruent? (Check by measuring the third side.) Chapter 3 Congruent Triangles 65 Teacher’s notes Chapter 3 Congruent Triangles 65 NSM Enhanced 10 5.1–5.2 The diagram shows a triangle with sides AB and AC of given lengths. The angle CAB is allowed to vary in size so that C moves on a circle, radius AC, centre A. a What happens to the length of BC as ∠BAC C gets bigger? C b If you fix ∠BAC at a certain size (say 30°) is it possible to get two different lengths for BC? C cm 3 cm 3c I see! The angle size determines the length of BC. m A Here is a game for students: Student A constructs a triangle labelling each side and angle. Student A tells student B three pieces of information about their triangle and student B must construct an identical triangle. Students can take turns explaining and reconstructing. Construct or trace the triangle shown on a piece of paper. a Measure BC to the nearest millimetre. b Is it possible to get more than one triangle from this information? c Cut your triangle out and compare it with the triangles of other students in your class. Are they all congruent? Yes, and for each angle size, there is only one corresponding length. C 4 cm A 60° 5 cm B s 8 B 2 cm Construct or trace one of the triangles below and cut it out. ge 9 A 3 cm pa E 5 cm D 120° 3 cm 120° B 5 cm C F e a Is AC = EF? b By superimposing, find if ΔABC is congruent to ΔDEF. In questions 6 to 9, we found that when two sides and the angle between them in one triangle are equal to two sides and the angle between them in the other triangle then the triangles are congruent. m pl • The class can discuss the difference between SAS and RHS, since both involve two sides and an angle being equal. The question could be posed: Isn’t RHS just a special case of SAS? This can be used to reinforce that the angle must be between the sides for SAS. It is important that the angle is included by (ie between) the two sides. This is a minimum condition for congruent triangles, and is abbreviated to SAS. Sa • 7 3 Teaching Strategies and Ideas 66 New Signpost Mathematics Enhanced 10 5.1–5.2 Answers Exercise 3:01 7 a BC gets longer. b no 8 a 4·6 cm b no c yes 9 a yes b The triangles are congruent. 10 a I and V, II and IV, III and VI b The 2.5 cm side is opposite the same sized angle. 11 a i 80° ii 60° Teacher’s notes iii 40° b ΔDEF c The 4 cm side is opposite the 60° angle in both triangles. 66 New Signpost Mathematics Enhanced 10 5.1–5.2 ``TEACHER EDITION Chapter 3 10 Real World Application In each of the following triangles, the angles match, and one side in each has the same length. Construct or copy each triangle and cut it out. 50° 60° 70° I II 50° 60° III 70° 2·5 cm Synchronised swimming is where two swimmers complete the same moves at the same time. The aim is that they appear to be exactly the same; that is, they are congruent with each other. 50° 2·5 cm 70° 60° 2·5 cm The sides opposite equal angles are matching sides. 50° 60° 70° VI IV V 50° 70° 50° 2·5 cm 60° 70° 60° 2·5 cm 2·5 cm a Which triangles are congruent? b For each pair of congruent triangles, how could you describe the position of the 2.5 cm side? Construct or copy each triangle and cut it out. L Identical twins could be called congruent twins if they are the same shape and size. s 40° D A 60° 40° 4 cm C 80° E 40° 4 cm F 80° M a Which angle is the 4 cm side opposite in: i ΔABC? ii ΔDEF? iii ΔLMN? b Which of the triangles shown is congruent to ΔXYZ? c How could you describe the position of the 4 cm side in each of the congruent triangles? pa B ge 60° 80° 60° N 4 cm m pl e X Y 40° 4 cm 60° 80° Z Questions 10 and 11 have shown us that if the angles of one triangle are equal to the angles of another triangle, and a side in one is equal to a side in the same position of the other, then the triangles are congruent. This is the third minimum condition, and is abbreviated to AAS. Sa 11 Teacher’s notes Chapter 3 Congruent Triangles 67 Homework 3:01 Chapter 3 Congruent Triangles 67 NSM Enhanced 10 5.1–5.2 Facts 12 The symbol G was first used to represent congruence by Gottfried Leibniz in the 1679. By the 1800s, the symbol had evolved to H and today we use o. The fourth set of minimum conditions is restricted to right-angled triangles only. Copy one of the triangles below and cut it out. Does your cut-out match both triangles? C The hypotenuse is the longest side. For this reason, Pythagoras’ theorem says: c2 = a2 + b2 D 5 cm 4 cm c b E 4 cm A 5 cm B a Write down the pairs of matching sides. b Are the triangles congruent? 13 F a The two right-angled triangles shown have their hypotenuse and one side equal in length. a Write down Pythagoras’ theorem for each triangle. m c b a b By rearranging the formula, show that a = m. c c Are the triangles congruent? b ge s Questions 12 and 13 have shown us that two right-angled triangles are congruent if the hypotenuse and one side of one triangle are equal to the hypotenuse and one side of the other triangle. This is the fourth condition, and is abbreviated to RHS. Sa m pl e pa Summary • Two triangles are congruent if three sides of one triangle are equal to three sides of the other. (SSS) • Two triangles are congruent if two sides and the included angle of one triangle are equal to two sides and the included angle of the other. (SAS) • Two triangles are congruent if two angles and a side of one triangle are equal to two angles and the matching side of the other. (AAS) • Two right-angled triangles are congruent if the hypotenuse and one side of one triangle are equal to the hypotenuse and one side of the other triangle. (RHS) • The symbol ≡ means ‘is congruent to’. Answers 68 New Signpost Mathematics Enhanced 10 5.1–5.2 Teacher’s notes Exercise 3:01 12 a b 13 a b BC and EF, AB and DF, AC and DE yes c2 = a2 + b2; c2 = m2 + b2 a2 = c2 − b2 and m2 = c2 − b2, ∴ a2 = m2, ∴ a = m (as both are positive) c yes 68 New Signpost Mathematics Enhanced 10 5.1–5.2 ``TEACHER EDITION • SSS means ‘side, side, side’. • SAS means ‘side, angle, side’. • AAS means ‘angle, angle, side’. • RHS means ‘right angle, hypotenuse, side’. Chapter 3 Learning Outcomes 3:02 Applying the Congruency Tests Outcome SGS5·2·2 SGS5.2.2 Develops and applies results for proving that triangles are congruent or similar. Prep Quiz 3:02 D A 5 B 5 3 6 C 6 Name the side that corresponds to: 1 AC 2 AB 3 BC Name the angle that corresponds to: 4 ∠A 5 ∠B 6 ∠C Knowledge and Skills Students learn about: E 3 F P L Name the side that corresponds to: 7 LM 8 MN M N Q A x° 60° 70° 50° Z 2 cm B A 8 cm 5 cm C 5 cm F Solutions ■ Note: ≡ means 2 Which of the congruency tests can be used to show that ΔABC is congruent to ΔDBC? ‘is congruent to’. s If ABC is congruent to DEF, we write ABC DEF e D m pl 2 C A B 3 Are these two triangles congruent? Z A B 70° 60° A 4 cm 50° C X 60° 70° Y B Chapter 3 Congruent Triangles applying congruent triangle results to establish some of the properties of special quadrilaterals, including diagonal properties eg the diagonals of a parallelogram bisect each other Working Mathematically Students learn to: • apply the properties of congruent and similar triangles to solve problems, justifying the results (Applying Strategies, Reasoning) • apply simple deductive reasoning in solving numerical and non-numerical problems (Applying Strategies, Reasoning) D The red markings show the equal sides and equal angle. ΔABC and ΔDCB have two sides and an included angle equal. ∴ ΔABC ≡ ΔDCB (SAS) continued ➜➜➜ Sa 4 cm • 1 ΔABC and ΔDEF have all their sides equal. ∴ ΔABC ≡ ΔDEF (SSS) 6 cm D C ge E pa 1 Why is ΔABC congruent to ΔDEF? 8 cm applying congruent triangle results to establish properties of isosceles and equilateral triangles eg − If two sides of a triangle are equal, then the angles opposite the equal sides are equal. Conversely, if two angles of a triangle are equal, then the sides opposite those angles are equal. − If three sides of a triangle are equal then each interior angle is 60º. 50° 60° 2 cm C Worked examples B • 9 Find the value of x. 10 Are the 2-cm sides corresponding? The minimum conditions deduced in the last section are used to prove that two triangles are congruent. Special care must be taken in exercises that involve overlapping triangles. 6 cm applying the congruency tests to justify that two triangles are congruent R X Y • 69 Teacher’s notes Answers Prep Quiz 3:02 1 4 7 10 EF ∠E PQ no 2 ED 5 ∠D 8 QR 3 DF 6 ∠F 9 70 Chapter 3 Congruent Triangles 69