Folding boxes

Achievement objectives

GM3-2: Find areas of rectangles and volumes of cuboids by applying multiplication.

Required materials

See Materials that come with this resource to download:

• Folding boxes activity (.pdf)

Activity

An origami box is folded from the biggest square that can be cut from a sheet of A4 paper and just fits a Post-it note in its base.

The height of that box is half a post-it note. Use an unfolded origami box to work out how many Post-it notes fit within the biggest square of a sheet of A4 paper.

See Origami-Instructions.com.

The following prompts illustrate how this activity can be structured around the phases of the Mathematics Investigation Cycle.

Make sense

Introduce the problem. Allow students time to read it and discuss in pairs or small groups.

• Do I understand the situation and the words? (Student might benefit from watching a video of an origami box being folded.)
• Can I say the problem in my own words? (The goal is to work the number of Post-it note that are equal to the area of the large square made from A4 paper.)
• What maths is involved in this problem? Can I describe area?

Plan approach

Discuss ideas about how to solve the problem. Emphasise that, in the planning phase, you want students to say how they would solve the problem, not to actually solve it.

• How might I use the pictures to solve the problem? What other strategies might I use?
• What shape will make a good unit of area? Why?
• What are the maths skills I need to work this out? How do I work out the areas of rectangles usually?
• What shapes are important in this problem? How will I use the shapes?
• What calculations will I need to do?
• How will I record my calculations?
• What tools (digital or physical) could help my investigation?

Take action

Allow students time to work through their strategy and find a solution to the problem.

• Is my strategy working? Should I try something else?
• Is my recording helping me to find an answer? Is my recording clear to others?
• Am I able to measure area with the shapes in the picture? Which shapes am I using to do that?
• How could I make sure that I haven’t missed anything?
• Are there any patterns with the shapes?
• How might I describe the patterns? 
• Does the pattern help me to answer the question?
• Does my answer seem correct? Is it close to what I expected? 

Convince yourself and others

Allow students time to check their answers and then either have them pair share with other groups or ask for volunteers to share their solution with the class.

• What is the solution? 
• Is my working clear for someone else to follow?
• How would I convince someone else I am correct?
• Could I have solved the problem in a more efficient way? Is my strategy the most efficient way? What could I try differently next time?
• What connections can I see to other situations, why would this be? Have I used connecting shapes elsewhere?
• Which ideas or tools worked well in my investigation?