GM5-10: Apply trigonometric ratios and Pythagoras' theorem in two dimensions.
Elaboration on this Achievement Objective
This means that students will apply trigonometric ratios to find the angles and lengths of sides in right-angled triangles. Students need to recognise two features of trigonometric ratios:
- Given similar right angled triangles the ratios of side lengths are the same, for example
For both triangles the ratio of the sides opposite and adjacent to angle A is 6/8 = 0.75. For any similar triangle this is also true. This ratio is the tangent of angle A, so A = 37°.
- The trigonometric ratios can be found using a right-angled triangle with a hypotenuse of one and applied to any other similar right angled triangle by scaling.
The trigonometric ratios are:
- sin θ = side opposite θ/hypotenuse,
- cos θ = side adjacent to θ/hypotenuse,
- tan θ = side opposite θ/side adjacent to θ
These ratios are often remembered using the mnemonic SOH CAH TOA.
Students will use Pythagoras’ theorem (a2 + b2 = c2) to find the lengths of sides of right angle triangles.
Teaching resources for this Achievement Objective
Level Five
Geometry and Measurement
Rich learning activities
The purpose of this activity is to engage students in a task that requires them to apply geometric properties of polygons and right angles triangle techniques in solving for the area of a polygon.
Level Five
Geometry and Measurement
Problem solving activities
This problem solving activity has a measurement focus.
- 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).
Level Five
Geometry and Measurement
Units of Work
In this unit we look at various ways of measuring the height of an inaccessible object. The fundamental piece of mathematics used here is the ratio of corresponding sides of similar right angled triangles. The actual measurements needed relate to (i) an intermediately placed stick and (ii) the...
- Measure lengths and angles accurately.
- Find the height of objects using trigonometry.
Level Five
Geometry and Measurement
Units of Work
This unit supports students to learn and apply Pythagoras’ theorem and trigonometry in an engaging context which leads to the production of an authentic and useful outcome: a resource “Goodnight Stories for Builders and Architects to be…” for other classes to use. This frames Pythagoras and...
- 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
Level Five
Geometry and Measurement
Units of Work
This unit introduces Pythagoras’ Theorem by getting student to see the pattern between the length of the hypotenuse of a right angled triangle, and the lengths of the other two sides. A pplications of the Theorem are considered, and students see that the Theorem only covers triangles that are right...
- 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.
Level Five
Geometry and Measurement
Rich learning activities
The purpose of this activity is to engage students in using deductive steps, including the applications of Pythagoras' theorem to solve a problem.
Level Five
Geometry and Measurement
Units of Work
In this unit students will explore the importance of triangles, particularly right angled triangles, in the real world. Students will use practical measuring skills and calculations to find a pattern linking the ratio of the sides of a triangle with the angles. Trigonometry is introduced through the...
- 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
Level Five
Geometry and Measurement
Units of Work
Here we explore the cosine function, eventually using it to find unknown sides in right angle triangles.
- 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)
Level Five
Geometry and Measurement
Units of Work
In this unit we explore the sine and related functions to find out specific values, relations between them, and applications.
- 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.
Level Five
Geometry and Measurement
Units of Work
In this unit we do a thorough exploration of tan, leading to the students being able to use tan to solve right angletriangles and to solve equations.
- 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)
Level Five
Geometry and Measurement
Figure It Out activities
This is a level 5 geometry activity from the Figure It Out theme series. A PDF of the student activity is included.
solve problems using trigonometry
solve problesm using Pythagoras
Level Five
Integrated
Problem solving activities
This problem solving activity has a geometry focus.
- 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).
Level Five
Geometry and Measurement
Figure It Out activities
This is a level 5 geometry strand activity from the Figure It Out series. A PDF of the student activity is included.
explore Pythagoras' theorem
Level Five
Geometry and Measurement
This unit is an introduction to Pythagoras’ Theorem. It includes application of the theorem in everyday contexts.
- 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
Level Five
Geometry and Measurement
Units of Work
This unit is an introduction to Pythagoras’ Theorem. It includes history, proofs, and practise in the application of the theorem.
- State and explain Pythagoras’ theorem.
- Use Pythagoras’ theorem to find unknown sides of right angled triangles.
Level Five
Geometry and Measurement
Problem solving activities
This problem solving activity has a geometry focus.
- 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).
Level Five
Geometry and Measurement
The purpose of this unit is to engage students in applying their knowledge and skills of measurement to investigate gradients, angles, elevation in a range of practical situations.
- 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
Level Five
Geometry and Measurement
Units of Work
This unit consolidates students' understandings of sine, cosine and tangent through practical experiences that apply trigonometry to a variety of outside-the-classroom situations.
- 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
Level Five
Geometry and Measurement
Units of Work
In this unit, students will explore the use of trigonometry to find unknown sides and angles in right-angled triangles.
- 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