A4 cylinders

The purpose of this activity is for students to create open cylinders and calculate their volume. In doing so, students consider the relative effects of increasing and decreasing height and radius on the volume.

Four children are playing with two large dice.

About this resource

This activity assumes the students have experience in the following areas:

Metric units of length, area, and volume.
Conversions between common metric units for volume.
Connections between the radius, diameter, and circumference of a circle, including π.
Calculation of volumes of prisms and cylinders as a limiting case.
Solving systems of algebraic equations with one or two unknowns (variables).

The problem is sufficiently open-ended to allow the students freedom of choice in their approach. It may be scaffolded with guidance that leads to a solution, and/or the students might be given the opportunity to solve the problem independently.

The example responses at the end of the resource give an indication of the kind of response to expect from students who approach the problem in particular ways.

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A4 cylinders

Achievement objectives

GM5-4: Find the perimeters and areas of circles and composite shapes and the volumes of prisms, including cylinders.

Required materials

See Materials that come with this resource to download:

A4 cylinders activity (.pdf)

Activity

By rolling A4-sized rectangles of paper, you can make two different "open" cylinders, like this:

A diagram showing how rolling an A4-sized rectangle paper makes two different "open" cylinders.

Which of the two cylinders has the greatest volume?
What size rectangle of paper will produce cylinders with the same volume when rolled in this way?

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 it in pairs or small groups.

Can I rephrase the problem in my own words?
Can I imagine (visualise) what the numbers or shapes look like?
Does this look or sound like a problem I have worked on before? (Has the student solved other problems with volume? What is meant by volume?)
Where else in my life or the world can I see this happen? (Cylinders are common in real life, e.g., cans.)
What information has been given?
Is all this information needed?
Is there anything missing?

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.

What are the maths skills I need to work this out? (Students will need to know or find out how to find the volume of a cylinder.)
What could the solution be? What is a sensible estimate? (Volumes need to be expressed using units of volume, e.g., cm³, m³. Which units will be useful in this problem?)
What strategies can I use to get started? (Practically making the cylinders from A4 paper is a productive strategy.)
What will I need to record as I work?
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.

Have I shown my workings in a step-by-step way?
How can we share the mahi in our group to get the best result?
Does my answer seem correct when I compare the cylinders to the volume of 1 litre (1000 cm³) cube? Is it close to my estimation?
Is the result what I expected? Why or why not?
Is there another possible answer or way to solve it? (Could using other units be more efficient?)

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?
Can others see how I worked it out?
Will one cylinder have more volume than the other as I alter the dimensions of the paper?
What connections can I see to other situations, and why would this be? (How might this relate to finding volumes of cones?)
How will I convince others that my findings answer the investigation question?

Examples of work

Work sample 1

The student makes each cylinder and calculates the volumes using measurements.

A handwritten workings of calculating volumes of a short and tall cylinder using measurements.

Work sample 2

The student applies relationships among the radius, diameter, and circumference of a circle, between side lengths of standard paper sizes, and conversions between units of volume.

Cylinder 1

Cylinder 2

radius

= 297 ÷ π ÷ 2

= 47.23mm

radius

= 210 ÷ π ÷ 2

= 33.42mm

height

= 210mm

height

= 297mm

volume

= π (47.23)²x 210

= 1 471 651mm³

volume

= π (33.42)²x 297

= 1 042 123.56mm³

Cylinder 1 is about 1.5 times bigger by volume.

Cubic millimetres are awkward units for volume, so students may convert the measures to cubic centimetres.

volume

= 1 471 651

= 1471.65cm³

volume

= 1 042 123mm³

= 1042.12cm³

Algebra can also be used to prove that for the volumes of cylinders to be equal, the length and width of the rectangle must be equal; that is, the rectangle is a square.

A hand-drawn rectangle with x width and y height accompanied by an algebraic equation proving that for volumes of cylinders, the length and width of the rectangle must be equal.

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A4 cylinders

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About this resource

A4 cylinders

Achievement objectives

Required materials

Activity

Make sense

Plan approach

Take action

Convince yourself and others

Examples of work