1. Joan Ridgway

2. If the question concerns lengths or angles in a triangle, you may need the sine rule or the cosine rule. First, decide if the triangle is right-angled. Then, decide whether an angle is involved at all. If it is a right-angled triangle, and there are angles involved, you will need straightforward Trigonometry, using Sin, Cos and Tan. If the triangle is not right-angled, you may need the Sine Rule or the Cosine Rule If it is a right-angled triangle, and there are no angles involved, you will need Pythagoras’ Theorem

3. In any triangle ABC The Sine Rule: AB C a b c or Not right-angled!

4. You do not have to learn the Sine Rule or the Cosine Rule! They are always given to you at the front of the Exam Paper. You just have to know when and how to use them!

5. The Sine Rule: AB C a b c You can only use the Sine Rule if you have a “matching pair”. You have to know one angle, and the side opposite it.

6. The Sine Rule: AB C a b c You can only use the Sine Rule if you have a “matching pair”. You have to know one angle, and the side opposite it. Then if you have just one other side or angle, you can use the Sine Rule to find any of the other angles or sides.

7. 10cm x 65° Finding the missing side: Is it a right-angled triangle? Is there a matching pair? No Yes 40° Not to scale

8. 10cm 65° Finding the missing side: Is it a right-angled triangle? Is there a matching pair? No Yes Label the sides and angles. A B C a b c 40° x Use the Sine Rule Not to scale

9. 10cm 65° Finding the missing side: A B C a b c 40° x We don’t need the “C” bit of the formula. Because we are trying to find a missing length of a side, the little letters are on top Not to scale

10. 10cm 65° Finding the missing side: A B C a b c 40° x Fill in the bits you know. Because we are trying to find a missing length of a side, the little letters are on top Not to scale

11. 10cm 65° Finding the missing side: A B C a b c 40° x Fill in the bits you know. Not to scale

12. 10cm 65° Finding the missing side: A B C a b c 40° x cm Not to scale

13. 10cm 7.1cm 65° Finding the missing angle: Is it a right-angled triangle? Is there a matching pair? No Yes θ°θ° Not to scale

14. Finding the missing angle: Is it a right-angled triangle? Is there a matching pair? No Yes Label the sides and angles. A B C a b c Use the Sine Rule 10cm 7.1cm 65° θ°θ° Not to scale

15. Finding the missing angle: We don’t need the “C” bit of the formula. A B C a b c 10cm 7.1cm 65° θ°θ° Because we are trying to find a missing angle, the formula is the other way up. Not to scale

16. Finding the missing angle: Fill in the bits you know. Because we are trying to find a missing angle, the formula is the other way up. A B C a b c 10cm 7.1cm 65° θ°θ° Not to scale

17. Finding the missing angle: Fill in the bits you know. A B C a b c 10cm 7.1cm 65° θ°θ° Not to scale

18. Finding the missing angle: A B C a b c 10cm 7.1cm 72° θ°θ° Shift Sin = Not to scale

19. If the triangle is not right-angled, and there is not a matching pair, you will need then Cosine Rule. The Cosine Rule: AB C a b c In any triangle ABC

20. Finding the missing side: Is it a right-angled triangle? Is there a matching pair? No 9km 12cm 20° A C B x Use the Cosine Rule Label the sides and angles, calling the given angle “A” and the missing side “a”. a b c Not to scale

21. Finding the missing side: 9km 12cm 20° A C B x a b c Fill in the bits you know. x = 4.69cm Not to scale

22. Finding the missing side: Is it a right-angled triangle? Is there a matching pair? No 8km 5km 130° A man starts at the village of Chartham and walks 5 km due South to Aylesham. Then he walks another 8 km on a bearing of 130° to Barham. What is the direct distance between Chartham and Barham, in a straight line? A C B First, draw a sketch. Use the Cosine Rule Not to scale

23. Finding the missing side: a 8km 5km 130° A man starts at the village of Chartham and walks 5 km due South to Aylesham. Then he walks another 8 km to on a bearing of 130° to Barham. What is the direct distance between Chartham and Barham, in a straight line? A C B Call the missing length you want to find “ a ” Label the other sides b c a ² = 5² + 8² - 2 x 5 x 8 x cos130° a ² = 25 + 64 - 80cos130° a ² = 140.42 a = 11.85 11.85km Not to scale

24. Is it a right-angled triangle? Is there a matching pair? No Use the Cosine Rule a 9cm6cm A C B b c 10cm θ°θ° Label the sides and angles, calling the missing angle “A” Finding the missing angle θ: Not to scale

25. Finding the missing angle θ: a 9cm6cm A C B b c 10cm θ°θ° Shift Cos = Not to scale