GM5-10: Apply trigonometric ratios and Pythagoras' theorem in two dimensions.

• Construct two intersecting circles where the radius of the second circle is on the circumference of the first.
• Use Pythagoras’ theorem to find the area of a rhombus.
• Devise and use problem solving strategies to explore situations mathematically (be systematic, draw a diagram, use a model).

• Measure lengths and angles accurately.
• Find the height of objects using trigonometry.

• Know some of the history behind Pythagoras’ theorem.
• Understand and apply Pythagoras theorem and trigonometry ratios in mathematical and real world contexts, and to practical problems.
• Demonstrate understanding of sin, cos and tan.
• Write Pythagoras or trigonometry problems.
• Calculate angles given two300

• Find lengths of objects using Pythagoras’ Theorem.
• Understand how similar triangles can be used to prove Pythagoras’ Theorem.
• Understand that Pythagoras’ Theorem can be thought of in terms of areas on the sides of the triangle.

• Measure the lengths of the sides of sets of similar right angled triangles and find the ratio of sides.
• Investigate the relationship between these ratios and the angle size.
• Use calculators or tables to find the sine, cosine and tangent of angles.
• Apply the known ratios of unit triangles (hypotenuse =300

• Use cos to solve problems involving right-angled triangles.
• Solve equations of the form cos(θ) = a, for a between –180 and 360 degrees.
• State the value of cos(θ) in special cases.
• Graph y = cos(θ)

• Use sin to solve problems involving right-angled triangles.
• Solve equations of the form sin(θ) = a, for θ between –180º and 360º
• State the value of sin(θ) in special cases.
• Graph y = sin(θ)
• Describe some of the ways in which the sine, cosine and tangent functions are related.

• Use tan to solve problems involving right-angled triangles.
• Solve equations of the form tan(θ) = a, for a between –180º and 360º degrees.
• State the value of tan(θ) in special cases.
• Graph y = tan(θ)

solve problems using trigonometry

solve problesm using Pythagoras

• Find connections between numbers in a table.
• Use Pythagoras’ theorem in a general algebraic form.
• Measure accurately from a scale drawing.
• devise and use problem solving strategies to explore situations mathematically (be systematic, draw a diagram).

explore Pythagoras' theorem

• Evaluate the square and square roots of number.
• Apply the inverse relationship between squaring and finding the square root.
• State and explain Pythagoras’ theorem.
• Use Pythagoras’ theorem to find unknown sides of right-angled triangles.
• Recognise opportunities to apply Pythagoras’ Theorem to realistic300

• State and explain Pythagoras’ theorem.
• Use Pythagoras’ theorem to find unknown sides of right angled triangles.

• Use Pythagoras’ theorem to find the area of a rhombus.
• Use rulers and compasses to make a construction requiring perpendicular bisectors.
• Devise and use problem solving strategies to explore situations mathematically (be systematic, draw diagram).

• apply measurement sense
• use problem solving methods to find unknown lengths and angles
• find angles of elevation and apply these to problem solving
• find gradients and apply these to problem solving
• find and apply angles of elevation
• compare and use gradients to find unknown lengths
• use maps, measuring300

• Describe and demonstrate how trigonometry can be used to find the height of a tall building or tree.
• Describe and demonstrate how trigonometry can be used to find the height of a high hill, or other high object where one cannot stand directly beneath the highest part.
• Describe in broad terms how300

• Label right angled triangles with respect to a given angle.
• Use trigonometric ratios to calculate the length of opposite and adjacent sides, and the hypotenuse in right angled triangles.
• Use trigonometric ratios to calculate the size of angles in right angled triangles.

Maths skills required from other300