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**Scheme of work: GCSE Foundation: Year 11: Term 2: Trigonometry – Problems with Right-Angled Triangles**

- Express a multiplicative relationship between two quantities
- understand and use proportion as equality of ratios
- know the formulae for: Pythagorasâ€™ theorem, a
^{2}+ b^{2}= c^{2} - apply angle facts, triangle congruence, similarity and properties of quadrilaterals to conjecture and derive results about angles and sides, including Pythagorasâ€™ Theorem and the fact that the
- base angles of an isosceles triangle are equal, and use known results to obtain simple proofs

- know the trigonometric ratios, Sin x = Opp/Hyp, Cos x = Adj/Hyp, Tan x = Opp/Adj.
- apply them to find angles and lengths in right-angled triangles and, where possible, general triangles in two dimensional figures.
- know the exact values of Sin x and Cos Sin x for x = 0°, 30°, 45°, 60°, and 90°; know the exact value of Tan x for 0°, 30°, 45° and 60°.

- Sin, Cos and Tan are trigonometric functions that find lengths and angles in right-angled triangles.
- The hypotenuse is opposite the right angle; the opposite refers to the side opposite the angle in question, and the adjacent side runs adjacent to the angle.
- The inverse operations of sin, cos and tan are pronounced arcos, arcsin and arctan.

- Students often have difficulty knowing which trigonometric ratio to apply. Encourage them to label the sides to identify the correct ratio clearly.
- Use SOHCAHTOA as a memory aid as students often forget the trigonometric ratios.
- When using trigonometric ratios to calculate angles students often forget to use the inverse functions.
- Students often try to apply right-angled formulae to non-right-angled triangles.

March 12, 2024

Planes of Symmetry in 3D Shapes for Key Stage 3/GCSE students.

Use isometric paper for hands-on learning and enhanced understanding.

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Master GCSE Math: Get key SOH-CAH-TOA tips, solve triangles accurately, and tackle area tasks. Ideal for students targeting grades 4-5.

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Explore Regions in the Complex Plane with A-Level Further Maths: inequalities, Argand diagrams, and geometric interpretations.