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Non Right Angled Triangles Non Right Angled Triangles Curriculum Ready www.mathletics.com Non Right Angled Triangles NON RIGHT ANGLED TRIANGLES sin i , cos i and tan i are also useful in non-right angled triangles. This unit will show you how to use these trigonometric ratios to find the sizes of angles and length of sides. Try to answer these questions now, before working through the chapter. I used to think: How are sides labeled in relation to the labeling angles of a non right angled triangle? Draw and label a triangle. The "cosine rule" is used when two sides of the triangle and the angle between them is given What is this rule? Answer these questions after you have worked through the chapter. But now I think: How are sides labeled in relation to the labeling angles of a non right angled triangle? Draw and label a triangle. The "cosine rule" is used when two sides of the triangle and the angle between them is given What is this rule? What do I know now that I didn’t know before? 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 1 Non Right Angled Triangles Basics Labeling Triangles Everyone labels triangles the same way. Each angle is labeled with a capital letter, and their opposite sides are labeled with the same letter, but non-capital. For TABC A Opposite to C B Opposite to B b c C a Opposite to A For TLMN Opposite to m Opposite to n l M N n m L Opposite to l 2 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles Questions Basics 1. Label the sides in the following triangles. a b c C X A J Y B H K W 2. Label the angles in the following the triangles. a b c m a c q p f g b r 3. Complete the labeling of the following triangles. a T b c M k u L s B a C 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 3 Non Right Angled Triangles Knowing More So far we've used trigonometry in right-angled triangles, but we can actually use it to find sides and angles in any triangle! The Area Rule TABC is not right-angled. The perpendicular height, ℎ, is drawn in. Area = 1 # base # height 2 1 Area = # a # h 2 A c We can see: h = sin C b ` h = b sin C b h B C a ` Area = 1 # a # b sin C 2 ` Area = 1 ab sin C 2 So the area is half the product of two sides and the sine of their interior angle. Any two sides and their interior angle will work: Area = 1 ab sin C 2 Area = 1 bc sin A 2 or or Area = 1 ac sin B 2 Find the area of TDEF to 1 decimal place d and f are given, so we will use Area = 1 df sin E 2 Area TDEF = 1 df sin E 2 1 = ^4h^10h sin 100c 2 F 4 cm 100c D 10 cm = 19.696f . 19.7cm2 ^1 decimal placeh E Find the area of TABC to 1 decimal place a and b are given, so we will use Area = 1 ab sin C 2 A 83.6c +C = 180c - 83.6c - 45.6c = 38c 18 B 4 45.6c 21 K 18 SERIES TOPIC C (write this in TABC ) Area TABC = 1 ab sin C 2 1 = ^21h^18h sin 38c 2 = 116.36.. . 116.4 cm2 (1 decimal place) 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles Questions Knowing More 1. Find the area of the following triangles to 1 decimal place. a b A 44c 14.3 cm 17 cm A 35c B 10 cm 16.4 cm 78c B C C 2. TABC has +B = 103.3c, +C = 33.7c, b = 21.4 cm and c = 12.2 cm. a Draw the triangle. b Find +A to nearest degree. c Find the area of the triangle to 1 decimal place. 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 5 Non Right Angled Triangles Questions 3. Can you find the areas of the following shapes to the nearest square cm? a E 10 cm A 31c 6 cm C D 13 cm B b Hint: Draw in Diagonal AC D 43.2c 23 cm C 19.5 cm 12 cm A 6 K 18 SERIES TOPIC 93c 10 cm B 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Knowing More Non Right Angled Triangles Questions Knowing More 4. Luke wants to make a kite in the shape below. How many square cm of material will he need? B 90 cm C 84c 68c 48c A 160 cm 44c D 5. The area of the triangle TPQR is 38.6 cm2. Find +Q . (Hint: Find +P first) Q 10 cm P 60.4c 8 cm R 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 7 Non Right Angled Triangles Using Our Knowledge The Sine Rule C In any triangle TABC we have the formulas: a b A sin A = sin B = sin C a b c a = b = c sin A sin B sin C or B c The proof is different depending on whether the triangle is acute or obtuse. If TABC is an acute triangle If TABC is an obtuse triangle C b C a h A h 180c - A B D a b D c In TACD: h = sin A b ` h = b sin A In TBCD: In TBCD: h = sin B a ` h = a sin B In TACD: A h = sin ^180c - Ah b ` h = b sin ^180c - Ah ` h = b sin A Remember sin ^180c -θ h = sin θ sin A = sin B a b ` b sin A = a sin B (Both equal h) ` If we drew the altitude from B to AC then we could show sin A = sin B a b If we drew the altitude from B to AC then we could show sin A = sin C a c sin A = sin C a c 8 K 18 SERIES TOPIC B h = sin B a ` h = a sin B ` b sin A = a sin B (Both equal h) ` c 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles Using Our Knowledge Find the value of a in TABC to 2 decimal places Using the Sine Rule: A 7 cm 28c 81c B ` 10 cm a = b sin A sin B a = 10 sin 28c sin 81c ` a = 10 sin 28c sin 81c 10^0.469fh a= = 4.753f . 4.75 cm (2 decimal places) 0.987f a C Find the value of +E in TDEF to the nearest degree E Using the Sine Rule: 11 cm 36c 36c sin E = sin D e d ` sin E = sin 36c 13 11 F ` sin E = 13 sin 36c = 0.694f 11 13 cm ` E = sin-1 ^0.694fh = 43.999fc . 44c (nearest degree) D Use the diagram below to answer these questions a L sin +LPN = sin +LNP LN LP sin LPN sin 55 + c ` = 10 9 ` sin +LPN = 10 sin 55c = 0.910... 9 10 cm 32c N 55c Find +LPN to the nearest degree. 9 cm P 7 cm M b ` +LPN = sin-1 (0.910...) = 65.52...c . 66c (nearest degree) Find the length of LM to the nearest cm. First, find +LPM +LPM = 180c - +LPN = 180c - 66c = 114c Now, use the sine rule LM PM = sin +LPM sin +PLM ` LM = 7 sin 114c sin 32c ` LM = 7 sin 114c = 12.067... . 12 cm (nearest cm) sin 32c 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 9 Non Right Angled Triangles Questions Using Our Knowledge The Sine Rule 1. Find the length y in the triangles below to 1 decimal place. a b y 37c 19 cm 61c 12 cm y 102c 42c 2. Find the size of angle a in the following triangles: a b 29 cm a 45c 35 cm 120c a 46 cm 10 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning 62 cm Non Right Angled Triangles Questions Using Our Knowledge 3. A ship has sails as drawn in the diagram below: A D 60c 45c 25c B a Find the length of AC. b Find the lengths of DC and AD. 85c 20 m C 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 11 Non Right Angled Triangles Using Our Knowledge The Cosine Rule In any triangle TABC we have the formulas C a2 = b2 + c2 - 2bc cos A or a b b2 = a2 + c2 - 2ac cos B or A B c c2 = a2 + b2 - 2ab cos C The proof is different depending on if the triangle is acute or obtuse. If TABC is an acute triangle If TABC is an obtuse triangle C C a b h h A B D x b a D B 12 h2 + x2 = b2 (Pythagoras) cos A = x b ` x = b cos A In TACD : and Subsitute Subsitute In TCBD : a2 = h2 + ^ x - ch2 (Pythagoras) 2 2 2 = h + x + c - 2cx Subsitute Subsitute (Pythagoras) In TCBD : a2 = h2 + ^c - xh2 2 2 2 = h + x + c - 2cx and A x c In TACD : c (x - c) (c-x) h2 + x2 = b2 (Pythagoras) cos A = x b ` x = b cos A a2 = b2 + c2 - 2cb cos A a2 = b2 + c2 - 2cb cos A If the ℎ is drawn from other corners we can show If the ℎ is drawn from other corners we can show b2 = a2 + c2 - 2ac cos B b2 = a2 + c2 - 2ac cos B or or c2 = a2 + b2 - 2ab cos C c2 = a2 + b2 - 2ab cos C K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles Using Our Knowledge Find the value of b in TABC to 2 decimal places Using the Cosine Rule: 8 cm A 30c b B b2 = a2 + c2 - 2ac cos B ` b2 = 52 + 82 - 2^5 h^8 h cos 30c 5 cm ` b2 = 25 + 64 - 80^0.866fh ` b2 = 19.717f C ` b = 19.717... = 4.440.. . 4.44cm (2 decimal places) Find the value of +Q to the nearest degree Using the Cosine Rule: P 15 cm q2 = p2 + r2 - 2pr cos Q ` 62 = 102 + 152 - 2^10h^15h cos Q 6 cm R Q 10 cm Make cos Q the subject 2^10h^15h cos Q = 102 + 152 - 62 300 cos Q = 100 + 225 - 36 = 289 ` cos Q = 289 = 0.963f 300 Solve for +Q +Q = cos-1 ^0.963..h = 15.56fc . 16c (nearest degree) Find +A in the following to 1 decimal place BC2 = DB2 + DC2 - 2 # DB # DC # cos D D BC2 = 252 + 212 - 2^25h^21h cos 49.2c 49.2c 25 cm This is the cosine rule BC2 = 379.908f 21 cm BC = 19.49fcm Write this in the diagram C BC2 = AB2 + AC2 - 2 # AB # AC # cos A B 18 cm 16 cm A ^19.49fh2 = 162 + 182 - 2^16h^18h cos A ` cos A = 162 + 182 - ^19.49fh2 = 0.347f 2^16h^18h ` +A = cos-1 ^0.347fh = 69.67fc . 69.7c 100% Non Right Angled Triangles Mathletics 100% © 3P Learning (1 decimal place) K 18 SERIES TOPIC 13 Non Right Angled Triangles Questions Using Our Knowledge The Cosine Rule 4. Find the length of the missing side x in each of the following to 1 decimal place. a b D P 73c x 5 cm 29 cm x 56c E Q 34c R 15 cm F 35 cm 5. Find the value of the angle b in each of the following to the nearest degree. A a b W 50 cm b C 47 cm b 55 m 39 m 61 cm Y B 14 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning 23 m X Non Right Angled Triangles Questions Using Our Knowledge 6. A canyon has the following dimensions: N 46 m L 40c 62 m M 30c 50 m P To walk around this canyon, would it be shorter to walk along LNM or LPM? Use working to support your answer. 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 15 Non Right Angled Triangles Questions Using Our Knowledge Both Rules 7. Use the sine and cosine rules to find the missing sides and angles in these triangles to 2 decimal places. a A c b 56c B 67c 10 cm C Q b 38 cm 55 cm P 114c R 16 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles Thinking More An Ambiguous Case For The Sine Rule Remember that sini = sin(180c-i ). So when the sine rule is used to find an angle (using sin-1 ) two answers are possible. For example if sini = 0.5 then i = 30c or 150c (180c - 30c). It is our job to determine whether one or both answers are valid. This depends on whether a third angle exists or not. Find +B (to 1 decimal place) in TABC if +C = 50c, c = 14 cm and b = 17.2 cm According to the sine rule sin B = sin C b c ` sin B = sin 50c 17.2 14 17 ` sin B = .2 # sin 50c = 0.9411 14 ` +B = sin-1 ^0.9411h or ` +B = 70.2c +B = 180c - 70.2c = 109.8c Add each answer to the given angle. If this sum is less than 180c then the answer is valid because the third angle exists. The given angle in the question is +C = 50c ` +B + +C = 70.2c + 50c = 120.2c 1 180c +B + +C = 109.8c + 50c = 159.8c 1 180c or ` valid ` valid Both sums are less than 180c, and so both answers for +B are valid. So TABC may look like either of these triangles: A A 14 cm 14 cm 17.2 cm or 17.2 cm B 70.2c 109.8c B 50c 50c C C A case where both answers are valid (like above) is said to be "ambiguous." 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 17 Non Right Angled Triangles Thinking More Determining if Answers are Valid Of the two possible answers, one will always be obtuse (90c to 180c) and the other will always be acute ^0c to 90ch . • So if you know the triangle is acute, then the obtuse angle is invalid. • If you know the missing angle is obtuse, then the acute angle is invalid. • The sum of angles in a triangle is 180c. So if the sum of a possible answer and the given angle is 180c or more it means that the third angle in the triangle is 0c or negative. This is impossible, so the answer would be invalid. Find +L (to 1 decimal place) in TLMN if +N = 80c, n = 48.6 cm and l = 40.5 cm According to the sine rule sin L = sin N l n ` sin L = sin 80c 40.5 48.6 40 ` sin L = .5 # sin 80c = 0.8206f 48.6 ` +L = sin-1 ^0.8206fh ` +L = 55.1522fc . 55.2c or +L = 180c - 55.1522 = 124.8477 . 124.8c or +L + +N = 124.8c + 80c = 204.8c 2 180c ` invalid Add each answer to the given angle ^+N = 80ch . ` +L + +N = 55.2c + 80c = 135.2c 1 180c ` valid So only the first answer is valid and +L = 55.2c. This is not an ambiguous case. +L = 55.2c and TLMN looks like this M 40.5cm 48.6cm 80c 55.2c N 18 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning L Non Right Angled Triangles Questions Thinking More 1. In triangle TABC a = 19 cm, b = 15 cm and +B = 20c. a Find two possible values for +A to the nearest degree. b Check if these answers are valid. Is this an ambiguous case? c Draw a rough sketch of the triangle(s). d Find the third angle in the triangle(s) and add them to the diagram in c . 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 19 Non Right Angled Triangles Questions 2. In TPQR , +R = 40c, p = 20.3 cm and r = 13.9 . a Find the two possible values for +P to the nearest degree. b Is this an ambiguous case (are both angles valid)? c Which answer is valid if TPQR is acute? Which answer is invalid? d Which answer is valid if +P is obtuse? Which answer is invalid? 20 K 18 SERIES TOPIC 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Thinking More Non Right Angled Triangles Questions Thinking More 3. In triangle TJKL, +K = 70c, k = 51.4cm and l = 42cm . a Find the valid size(s) of +L . b Find +J . c Find the length of j. d Draw TJKL . 100% Non Right Angled Triangles Mathletics 100% © 3P Learning K 18 SERIES TOPIC 21 Non Right Angled Triangles Basics: Basics: C 1. a A 3. a b a A b Answers B c w X b c B T b Y C a u S x y s t W U J c M c k k h L l H K j m 2. a K B a Knowing More: c C 1. a Area TABC = 81.5cm2 A b R b q p b Area TABC = 74.2cm2 2. a B 103.3c P r C c f +A = 43c c Area TABC = 89.0cm2 M K 18 SERIES TOPIC 21.4cm b F 22 33.7c G m g 12.2cm Q 100% Non Right Angled Triangles Mathletics 100% © 3P Learning A Non Right Angled Triangles Thinking More: Knowing More: 3. a Total area = 53.563 . 54cm2 b Answers or 1. a +A = 26c Total area = 213cm2 Both answers are valid; therefore this is an ambiguous case. b 4. Total area = 12919cm2 +A = 154c C c 134c 19cm 5. +Q = 44.8c 1. a b 26c 20c B Using Our Knowledge: 15cm A y = 9.2cm 154c 15cm y = 12.7cm 20c 3. a d AC = 13.2m (to 1 d.p.) B 19cm 2. a a = 35.9c a = 40c c 6c C b A c or +C = 134c or 2. a +C = 70c +C = 6c +C = 110c CD . 10.0m and AD . 6.0m b Both answers are valid; therefore this is an ambiguous case. 4. a x = 19.6cm (to 1 d.p.) c b x = 12.5cm (to 1 d.p.) If ∆PQR is acute, the angles are in the range 0c - 90c, + P = 70c is the valid answer and + P = 110c is invalid. d If ∆PQR is obtuse, the angles are in the range 90c - 180c, + P = 110c is the valid answer and + P = 70c is invalid. b 5. a b = 49c (to nearest degree) b b = 21c (to nearest degree) 3. a +L = 50c 6. It would be shorter to walk along LPM than LNM b + J = 60c c j = 47.3cm 7. a c = 10.99cm (to 2 d.p.) d K b = 9.89cm (to 2 d.p.) b 70c 42cm q = 27.20cm (to 2 d.p.) +Q = 26.86c (to 2 d.p.) J +R = 39.14c (to 2 d.p.) 100% Non Right Angled Triangles Mathletics 100% © 3P Learning 47.3cm 60c 50c 51.4cm L K 18 SERIES TOPIC 23 Non Right Angled Triangles 24 K 18 SERIES TOPIC Notes 100% Non Right Angled Triangles Mathletics 100% © 3P Learning Non Right Angled Triangles www.mathletics.com