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GCSE: Non-Right Angled Triangles
Dr J Frost Last modified: 31st August 2015
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RECAP: Right-Angled Triangles
Weβve previously been able to deal with right-angled triangles, to find the area, or missing sides and angles. 5 6 3 4 Area = 15 ? 30.96Β° ? 5 5 3 ? Using Pythagoras: π₯= β =3 Using π¨= π π ππ: π΄πππ= 1 2 Γ6Γ =15 Using trigonometry: tan π = 3 5 π= tan β =30.96Β°
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Labelling Sides of Non-Right Angle Triangles
Right-Angled Triangles: Non-Right-Angled Triangles: π β πΆ ? π π π΅ ? ? π΄ π π We label the sides π, π, π and their corresponding OPPOSITE angles π΄, π΅, πΆ
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OVERVIEW: Finding missing sides and angles
You have You want Use #1: Two angle-side opposite pairs Missing angle or side in one pair Sine rule #2 Two sides known and a missing side opposite a known angle Remaining side Cosine rule #3 All three sides An angle #4 Two sides known and a missing side not opposite known angle Sine rule twice
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The Sine Rule 5.02 10 9.10 ! Sine Rule: π sin π΄ = π sin π΅ = π sin πΆ ?
c C b B a A For this triangle, try calculating each side divided by the sin of its opposite angle. What do you notice in all three cases? 65Β° 5.02 10 85Β° ! Sine Rule: π sin π΄ = π sin π΅ = π sin πΆ ? 30Β° 9.10 You have You want Use #1: Two angle-side opposite pairs Missing angle or side in one pair Sine rule
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Examples 8 Q2 Q1 8 50Β° 85Β° 100Β° 15.76 ? 45Β° 30Β° 11.27 ? π π¬π’π§ ππ = π π¬π’π§ ππ π= π π¬π’π§ ππ π¬π’π§ ππ =ππ.ππ π π¬π’π§ πππ = π π¬π’π§ ππ π= π π¬π’π§ πππ π¬π’π§ ππ =ππ.ππ You have You want Use #1: Two angle-side opposite pairs Missing angle or side in one pair Sine rule
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Examples When you have a missing angle, itβs better to βflipβ your formula to get π¬π’π§ π¨ π = π¬π’π§ π© π i.e. in general put the missing value in the numerator. 5 Q3 Q4 8 126Β° 85Β° 40.33Β° ? 10 ? 56.11Β° 6 sin π 5 = sin sin π = 5 sin π= sin β sin =56.11Β° sin π 8 = sin 126Β° sin π = 8 sin π= sin β sin =40.33Β°
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Test Your Understanding
π 82Β° π 20Β° 10π π 85Β° 5ππ 12π π
Determine the angle π. sin π½ ππ = sin ππ ππ π½=ππ π βπ ππ sin ππ ππ =ππ.πΒ° Determine the length ππ
. π·πΉ π¬π’π§ ππ = π π¬π’π§ ππ π·πΉ= π π¬π’π§ ππ π¬π’π§ ππ =π.ππππ ? ?
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Exercise 1 Find the missing angle or side. Please copy the diagram first! Give answers to 3sf. Q1 Q2 Q3 15 10 16 85Β° 12 π¦ 30Β° π₯ 30Β° 40Β° π₯ 20 π₯=53.1Β° ? π¦=56.4Β° ? π₯=23.2 ? π₯ Q4 Q6 Q5 70Β° 35Β° 10 40Β° 5 10 πΌ 20 πΌ=16.7Β° ? π₯=5.32 ? π₯ π₯=6.84 ?
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Cosine Rule How are sides labelled ? Calculation? Cosine Rule: 15
The sine rule could be used whenever we had two pairs of sides and opposite angles involved. However, sometimes there may only be one angle involved. We then use something called the cosine rule. π π΄ π π Cosine Rule: π 2 = π 2 + π 2 β2ππ cos π΄ 15 The only angle in formula is π΄, so label angle in diagram π΄, label opposite side π, and so on (π and π can go either way). π₯ 2 = β 2Γ15Γ12Γ cos π₯ 2 = β¦ π₯=22.83 How are sides labelled ? 115Β° π₯ Calculation? 12
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Sin or Cosine Rule? οΌ Sine ο ο» Cosine ο ο» Sine Cosine οΌ ο ο» Sine Cosine οΌ
If you were given these exam questions, which would you use? π₯ 10 π₯ 10 70Β° 70Β° 15 15 οΌ Sine ο ο» Cosine ο ο» Sine Cosine οΌ 10 10 πΌ 7 πΌ 70Β° 15 12 ο ο» Sine Cosine οΌ Sine οΌ Cosine ο ο»
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Test Your Understanding
e.g. 1 e.g. 2 π₯ π₯ 4 7 8 47Β° 106.4Β° 7 π₯=6.05 ? π₯=8.99 ? You have You want Use Two sides known and a missing side opposite a known angle Remaining side Cosine rule
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Exercise 2 Use the cosine rule to determine the missing angle/side. Quickly copy out the diagram first. Q1 Q2 Q3 135Β° 58 5 5 8 π₯ 100Β° 60Β° 70 π₯ 7 π¦ π₯=6.24 ? π¦=10.14 ? π₯=50.22 ? Q6 Q5 π₯ Q4 6 4 5 75Β° π₯ 10 43Β° 65Β° 8 6 3 π₯=4.398 ? π₯ 3 π₯=9.513 ? π₯=6.2966 ?
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Dealing with Missing Angles
You have You want Use All three sides An angle Cosine rule π π = π π + π π βπππ ππ¨π¬ π¨ 7 πΌ Label sides then substitute into formula. 4 π π = π π + π π β πΓπΓπΓ ππ¨π¬ πΆ ππ=πππβπππ ππ¨π¬ πΆ πππ ππ¨π¬ πΆ =πππβππ ππ¨π¬ πΆ = πππ πππ πΆ= ππ¨π¬ βπ πππ πππ =ππ.πΒ° ? 9 ? Simplify each bit of formula. ? Rearrange (I use βswapsieβ trick to swap thing youβre subtracting and result) ? πΌ=25.2Β° ?
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Test Your Understanding
4ππ 8 7ππ 5 π π 9ππ 7 ? 4 2 = β 2Γ7Γ9Γ cos π 16=130β126 cos π 114=126 cos π cos π = π= cos β =ππ.ππΒ° ? 8 2 = β 2Γ7Γ5Γ cos π 64=74β70 cos π 10=70 cos π cos π = π= cos β =ππ.ππΒ°
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Exercise 3 1 2 3 12 5.2 7 6 π½ π 11 5 π 13.2 6 8 π½=92.5Β° ? π=71.4Β° ? π=111.1Β° ?
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Using sine rule twice ? 4 32Β° 3 π₯
You have You want Use #4 Two sides known and a missing side not opposite known angle Remaining side Sine rule twice Given there is just one angle involved, you might attempt to use the cosine rule: π π = π π + π π β πΓπΓπΓ ππ¨π¬ ππ π= π π +ππβππ ππ¨π¬ ππ 4 ? 32Β° 3 π₯ This is a quadratic equation! Itβs possible to solve this using the quadratic formula (using π=π, π=βπ ππ¨π¬ ππ , π=π). However, this is a bit fiddly and not the primary method expected in the examβ¦
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! Using sine rule twice ? ? ? 4 32Β° 3 π₯
You have You want Use #4 Two sides known and a missing side not opposite known angle Remaining side Sine rule twice ! 2: Which means we would then know this angle. 4 πππβππβππ.ππππ=πππ.ππππ ? 1: We could use the sine rule to find this angle. 32Β° 3 3: Using the sine rule a second time allows us to find π₯ ? sin π΄ 4 = sin 32 3 π΄= Β° π₯ π₯ sin = 3 sin 32 π₯=5.52 π‘π 3π π ?
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Test Your Understanding
9 ? π¦=6.97 π¦ 61Β° 10 4 3 53Β° π¦=5.01 ? π¦
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Where C is the angle wedged between two sides a and b.
Area of Non Right-Angled Triangles 3cm Area = 0.5 x 3 x 7 x sin(59) = 9.00cm2 ? 59Β° 7cm ! Area = 1 2 π π sin πΆ Where C is the angle wedged between two sides a and b.
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5 5 5 Test Your Understanding ? ? π΄= 1 2 Γ6.97Γ10Γπ ππ61 =30.48 9 6.97
π΄= 1 2 Γ6.97Γ10Γπ ππ =30.48 ? 9 6.97 61Β° 10 5 5 π΄= 1 2 Γ5Γ5Γ sin = ? 5
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Harder Examples 6 7 8 ? ? Q1 (Edexcel June 2014) Q2
Finding angle β π΄πΆπ·: sin π· 9 = sin π·= Β° β π΄πΆπ·=180β100β = Β° π΄πππ ππ Ξ= 1 2 Γ9Γ11Γ sin =21.945 Area of π΄π΅πΆπ·=2Γ21.945=43.9 π‘π 3π π ? Using cosine rule to find angle opposite 8: cos π = π= Β° π΄πππ= 1 2 Γ6Γ7Γ sin 75.5β¦=ππ.π
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Exercise 4 Q3 Q1 Q2 Q4 5 3.6 3 1 1 5 100Β° 3.8 75Β° 8 1 5.2 Area = 7.39 ? 70Β° π΄πππ= =0.433 ? Area = 9.04 ? Area = 8.03 ? 2cm Q5 Q7 Q6 110Β° 8.7ππ 3cm Area = 3.11π π 2 ? 49Β° 64Β° Q8 4.2m 3m π΄πππ=29.25π π 2 ? π is the midpoint of π΄π΅ and π the midpoint of π΄πΆ. π΄ππ is a sector of a circle. Find the shaded area. 5.3m ? 1 2 Γ 6 2 Γ sin 60 β 1 6 π =10.9π π 2 Area = 6.29 π 2 ?
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Segment Area π΄ ππ΄π΅ is a sector of a circle, centred at π. Determine the area of the shaded segment. 10ππ π 70Β° π΄πππ ππ π πππ‘ππ= Γ πΓ = π π 2 π΄πππ ππ π‘πππππππ= 1 2 Γ 10 2 Γ sin 70 = π π 2 π΄πππ ππ π ππππππ‘= β =14.1 π‘π 3π π ? ? ? π΅
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Test Your Understanding
π΄=119π2 ? π΄=3πβ9 ?
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Exercise 5 - Mixed Exercises
90π Q4 Q1 Q2 Q3 π§ 27 30Β° 130Β° 11 80Β° 8 π¦ πΌ 60π 40Β° 70Β° 18 π₯ πΌ=17.79Β° π§=26.67 π΄πππ=73.33 ? 10 πππππππ‘ππ =286.5π π₯=41.37 b) π΄πππ=483.63 ? ? π¦=10.45 π΄πππ=37.59 ? ? ? ? ? Q5 4.6 Q7 Q8 15 π 7 5 6ππ 61Β° Q6 52Β° 12 π₯ ππ
=12.6ππ ? π=122.8Β° ? π΄πππ=2.15π π 2 ? π₯=7.89 π΄πππ=17.25 ? ?
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