Solve problems using sine and cosine rule- Higher - Trigonometry - Edexcel - GCSE Maths Revision - Edexcel

Solving problems using the sine and cosine rule - Higher

Explore updated revision resources for GCSE Maths: Solving problems using the sine and cosine rules, with step-by-step slideshows, quizzes, practice exam questions, and more!

To solve problems involving non-right-angled triangles, the correct rule must first be chosen.

The cosine rule can be used in any triangle to calculate:

a side when two sides and the angle in between them are known
an angle when three sides are known

The sine rule can be used in any triangle to calculate:

a side when two angles and an opposite side are known
an angle when two sides and an opposite angle are known

Example

Ship A leaves port P and travels on a of 200°. A second ship B leaves the same port P and travels on a bearing of 165°. After half an hour ship A has travelled 5.2 km and ship B has travelled 5.8 km. How far apart are the ships after half an hour? Give the answer to three significant figures.

Diagram showing positions of 2 yachts compared to a lighthouse

Remember a bearing is an angle measured clockwise from north. The angle APB = \(200 - 165 = 35^\circ\).

Two sides and the angle in between are known. Calculate the length AB.

Use the cosine rule.

\(a^2 = b^2 + c^2 - 2bc \cos{A}\)

\(\text{AB}^2 = 5.2^2 + 5.8^2-2 \times 5.2 \times 5.8 \cos{35}\)

\(\text{AB}^2 = 11.26874869\)

AB = 3.36 km

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Trigonometry - EdexcelSolve problems using sine and cosine rule- Higher

Solving problems using the sine and cosine rule - Higher

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