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Properties of Congruent Triangles
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Figures having the same shape and size are called congruent figures. Are the following pairs of figures the same? Congruence They are the same!
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If two triangles have the same shape and size, they are called congruent triangles. Congruent Triangles and their Properties A X B Y CZ For the congruent triangles △ ABC and △ XYZ above, A = X, B = Y, C = Z AB = XY,BC = YZ,CA = ZX
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A and X, B and Y, C and Z are called AB and XY, BC and YZ, CA and ZX are called A and X, B and Y, C and Z are called AX B Y C Z corresponding vertices. corresponding sides. corresponding angles.
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is congruent to △XYZ△XYZ △ABC△ABC The corresponding vertices of congruent triangles should be written in the same order. In the above example, we can also write △ BAC △ YXZ, but NOT △ CBA △ XYZ. A X B Y CZ The properties of congruent triangles are as follows: AB = XY, BC = YZ, A = X, B = Y, C = Z CA = ZX (ii)All their corresponding sides are equal. (i)All their corresponding angles are equal,
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If △ ABC △ XYZ … X Y Z 4 cm A B C 4.5 cm 40° According to the properties of congruent triangles, AB = 4.5 cm AC =4 cm B = 40° △ △ A B C XYZ XY XZ Y == =
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In the figure, △ ABC △ PQR. Find the unknowns. Follow-up question 1 A B C 130° 30° x cm 4 cm 7 cm P Q R y 9 cm z cm According to the properties of congruent triangles, AC PR CBy 180 30130180 20 4 z BCQR 9 xAP
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Example 1 In the figure, AB = 5 cm, AC = 4 cm and BC = 7 cm. If △ ABC △ DFE, find DE, EF and DF. Solution
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Example 2 In the figure, AB = 7 cm, ∠ A = 50° and ∠ B = 30°. If △ ABC △ PRQ, find PR, ∠ P and ∠ R. Solution
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Conditions for Congruent Triangles
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Yes, because AB = XY, BC = YZ, CA = ZX, ∠ A = ∠ X, ∠ B = ∠ Y, ∠ C = ∠ Z. But, can we say that two triangles are congruent when only some of the properties of congruence are satisfied? Are these two triangles congruent? A C B X Y Z Yes… let’s see the following 5 conditions for congruent triangles first.
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Condition ISSS In △ ABC and △ XYZ, if AB = XY, BC = YZ and CA = ZX, then △ ABC △ XYZ. [Abbreviation: SSS] C A B Z X Y
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For example, T U V 2 cm 4 cm 5 cm D E F 2 cm 5 cm 4 cm TU = FE,UV = ED, TV = FD △ TUV △ FED (SSS)
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In △ ABC and △ XYZ, if AB = XY, AC = XZ and A = X, then △ ABC △ XYZ. [Abbreviation: SAS] Condition IISAS C A B Z X Y Note that ∠ A and ∠ X are the included angles of the 2 given sides.
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For example, UV = FE,TV = DE, V = E △ TUV △ DFE (SAS) T U V 120° 2 cm 2.5 cm D E F 2 cm 120°
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Follow-up question 2 Determine whether each of the following pairs of triangles are congruent and give the reason. (a) A B C E G F 3 cm 3.2 cm 3 cm 3.2 cm 2.5 cm △ ABC △ EGF (SSS) ◄ AB = EG, BC = GF, AC = EF
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(b) I J K 2 cm 2.5 cm 50° N M L 2 cm 2.5 cm 50° △ IJK △ MNL (SAS) ◄ IJ = MN, ∠ J = ∠ N, JK = NL
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Example 3 Are △ MNP and △ YZX in the figure congruent? If they are, give the reason. Yes, △ MNP △ YZX. (SSS) Solution
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Example 4 In the figure, WX = WY and ZX = ZY. Are △ WXZ and △ WYZ congruent? If they are, give the reason. Solution Yes, △ WXZ △ WYZ. (SSS)
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Example 5 Which two of the following triangles are congruent? Give the reason. Solution △ PQR △ WUV (SAS)
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Example 6 In the figure, AB = CD = 8 cm and ∠ ABD = ∠ CDB = 30°. Are △ ABD and △ CDB congruent? If they are, give the reason. Yes, △ ABD △ CDB. (SAS) Solution
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Example 7 Which two of the following triangles are congruent? Give the reason. Solution △ DEF △ ZYX (ASA)
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In △ ABC and △ XYZ, if A = X, B = Y and AB = XY, then △ ABC △ XYZ. [Abbreviation: ASA] Condition IIIASA C A B Z X Y Note that AB and XY are the included sides of the 2 given angles.
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U T V 130° 20° 4 cm D E F 130° 20° 4 cm For example, U = F, UV = FD, V = D △ TUV △ EFD (ASA)
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Condition IVAAS In △ ABC and △ XYZ, if A = X, B = Y and AC = XZ, then △ ABC △ XYZ. [Abbreviation: AAS] C A B Z X Y Note that AC and XZ are the non-included sides of the 2 given angles.
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T U V D E F 130° 20° 7 cm For example, U = F, TV = ED V = D, △ TUV △ EFD (AAS) 130°
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Follow-up question 3 In each of the following, name a pair of congruent triangles and give the reason. (a) A B C E F G 45° 40° 45° 5.25 cm △ ABC △ FEG (ASA) ◄ ∠ B = ∠ E, BC = EG, ∠ C = ∠ G
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(b) △ IJK △ MNL (AAS) K I L J M N 100° 20° 100° 12 cm B A C 100° 12 cm 20° ◄ ∠ J = ∠ N, ∠ K = ∠ L, IK = ML
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Example 8 In the figure, ∠ BAD = ∠ CAD and AD ⊥ BC. Are △ ABD and △ ACD congruent? If they are, give the reason. Solution Yes, △ ABD △ ACD. (ASA)
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Example 9 Which two of the following triangles are congruent? Give the reason. Solution △ PQR △ ZYX (AAS)
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Example 10 In the figure, ∠ ABC = ∠ CDA and ∠ ACB = ∠ CAD. Are △ ABC and △ CDA congruent? If they are, give the reason. Solution Yes, △ ABC △ CDA. (AAS)
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In △ ABC and △ XYZ, if C = Z = 90°, AB = XY and BC = YZ (or AC = XZ), then △ ABC △ XYZ. [Abbreviation: RHS] Condition VRHS A B C X Y Z
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For example, 2 cm 5 cm T U V D E F U = F = 90°, TV = ED,TU = EF △ TUV △ EFD (RHS)
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Are there any congruent triangles? Give the reason. Follow-up question 4 A B C D 6 cm Yes, △ ABC △ ADC. (RHS) ◄ ∠ B = ∠ D = 90°, AC = AC, BC = DC
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C A B Z X Y 1. SSS C A B Z X Y 2. SAS C A B Z X Y 3. ASA C A B Z X Y 4. AAS A BC X YZ 5. RHS To sum up, two triangles are said to be congruent if any ONE of the following FIVE conditions is satisfied.
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Example 11 Are △ ABC, △ RPQ and △ XYZ in the figure congruent? If they are, give the reasons. Solution △ ABC △ RPQ (RHS) △ XYZ △ RPQ (SAS) ∴△ ABC, △ RPQ and △ XYZ are congruent.
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Example 12 In the figure, AB ⊥ BC, DC ⊥ BC and AC = DB. Are △ ABC and △ DCB congruent? If they are, give the reason. Solution Yes, △ ABC △ DCB. (RHS)
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Properties of Similar Triangles
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Similar figures have the same shape but not necessarily the same size. The following pairs of figures have the same shape, they are called similar figures. Similarity
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Similar Triangles and their Properties If two triangles have the same shape, they are called similar triangles. For the similar figures △ ABC and △ XYZ above, A = X, B = Y, C = Z ABXYABXY = BCYZBCYZ CAZXCAZX = A X B Y C Z
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A X B Y C Z A and X, B and Y, C and Z are called AB and XY, BC and YZ, CA and ZX are called A and X, B and Y, C and Z are calledcorresponding vertices. corresponding sides. corresponding angles.
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A X B Y C Z The properties of similar triangles are as follows: A = X, B = Y, C = Z ABXYABXY = BCYZBCYZ CAZXCAZX = (ii)All their corresponding sides are proportional. (i)All their corresponding angles are equal, ~is similar to △XYZ△XYZ △ABC△ABC Note: The corresponding vertices of congruent triangles should be written in the same order.
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If △ ABC ~ △ XYZ... 4 cm A B C 4.5 cm 40° X Y Z 2 cm According to the properties of similar triangles, B Y 40 AC XZ AB XY cm 4 2 5.4 XY cm 25.2 △ ~ △ A BCXYZ ◄ XZ and AC are corresponding sides.
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In the figure, △ ABC ~ △ PQR. Find the unknowns. Follow-up question 5 A B C 132° 25° 10 cm 4 cm x cm According to the properties of similar triangles, P Q R y 5 cm z cm 4 cm PR AC PQ AB 5 10 4 x 8 x 2 z AP CBy 180 25132180 23 AC PR BC QR 10 5 4 z
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Example 13 In △ ABC and △ RQP, BC = 1 cm, PQ = 2 cm, QR = 5 cm and PR = 4 cm. If △ ABC ~ △ RQP, find AB and AC.
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Solution
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Example 14 In the figure, AD = 3 cm, AC = 2 cm, CE = 4 cm, ∠ A = 60° and BC ⊥ AE. If △ ABC ~ △ AED, find ∠ E and AB.
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Solution
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Conditions for Similar Triangles
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(i)All their corresponding angles are equal. (ii)All their corresponding sides are proportional. A B C X Y Z We have learnt that if two triangles are similar, then Two triangles are similar if any one of the following three conditions is satisfied.
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In △ ABC and △ XYZ, if A = X, B = Y and C = Z, then △ ABC ~ △ XYZ. [Abbreviation: AAA] Condition IAAA A B C X Y Z
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U = F, T = E, V = D △ TUV ~ △ EFD (AAA) For example, T U V 127° 25° 28° D E F 127° 25° 28°
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Condition II3 sides prop. In △ ABC and △ XYZ, if then △ ABC ~ △ XYZ. [Abbreviation: 3 sides prop.], ZX CA YZ BC XY AB A B C X Y Z
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T U V 4 cm 2 cm 3 cm D E F 1.5 cm 1 cm 2 cm For example, △ TUV ~ △ DFE (3 sides prop.) UV 2 cm FE 1 cm == 2, TV 3 cm DE 1.5 cm == 2, TU 4 cm DF 2 cm == 2
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Condition IIIratio of 2 sides, inc. A B C In △ ABC and △ XYZ, if and B = Y, then △ ABC ~ △ XYZ. [Abbreviation: ratio of 2 sides, inc. ] X Y Z
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For example, D E F 120° 2 cm 1.5 cm V 4 cm U T 120° 3 cm △ TUV ~ △ EFD (ratio of 2 sides, inc. ) UV 4 cm FD 2 cm == 2, UT 3 cm FE 1.5 cm == 2, U = F
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Follow-up question 6 Determine whether each of the following pairs of triangles are similar and give the reason. (a) E G F 2.4 cm 2.8 cm 2 cm A B C 3 cm 3.5 cm 2.5 cm △ ABC ~ △ EGF (3 sides prop.) AB EG BC GF ◄ = AC EF =
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(b) △ ABC ~ △ ZXY (AAA) C A B 95° 40° 45° X Y Z 40° 95° I J K 2.4 cm 3 cm 50° N M L 1.6 cm 2 cm 50° △ IJK ~ △ MNL (ratio of 2 sides, inc. ) (c) ◄ ∠ A = ∠ Z, ∠ B = ∠ X, ∠ C = ∠ Y IJ MN JK NL ◄ =, ∠ J = ∠ N
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Example 15 Are △ ABC and △ XZY in the figure similar? If they are, give the reason. Yes, △ ABC ~ △ XZY. (AAA) Solution
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Example 16 Are △ ABC and △ QRP in the figure similar? If they are, give the reason. Solution
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Example 17 Which two of the following triangles are similar? Give the reason. Solution
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Example 18 In the figure, AB = 15 cm, BC = 12 cm, AC = 9 cm, BD = 20 cm and CD = 16 cm. Are △ ABC and △ BDC similar? If they are, give the reason. Solution
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Example 19 Which two of the following triangles are similar? Give the reason.
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Solution
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Example 20 In the figure, PT = 2.7 cm, TR = 3.3 cm, QR = 3 cm, TS = 4.8 cm, RS = 2.4 cm and ∠ PRQ = ∠ TSR. Are △ PQR and △ TRS similar? If they are, give the reason. Solution
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Example 2 (Extra) In the figure, △ ABC △ EDF and △ FED △ IHG. Find GH, HI and IG. According to the properties of congruent triangles, Solution
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Example 10 (Extra) In the figure, AB = PQ, ∠ ABC = ∠ QRP and ∠ ACB = ∠ PQR. Are △ ABC and △ QRP congruent? If they are, give the reason. Solution Cannot be determined. Since the length of PR may not equal to AB.
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Example 12 (Extra) In the figure, AGE, CGF and BCD are straight lines. (a)Are △ ABC and △ CDE congruent? If they are, give the reason. (b)Are △ FAC and △ FEC congruent? If they are, give the reason. Solution
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Example 20 (Extra)
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Solution
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