Card collections

Achievement objectives

NA1-5: Generalise that the next counting number gives the result of adding one object to a set and that counting the number of objects in a set tells how many.

Required materials

• playing cards or counters

See Materials that come with this resource to download:

• Card collections activity (.pdf)

Activity

Ari, Ben, Cam, Dan and Eva are counting their card collections.

Ari has 21 cards. Cam has 2 more than Ari. Ben has 3 fewer than Cam and 1 more than Dan who has 3 fewer than Eva.

• How many cards does Eva have? 

Put the children’s names in order from the person with the fewest cards to the person with the most.

Note to teacher: This activity requires materials for illustration. Playing cards could be used,  or could be represented by counting materials such as counters.

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

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 strategies will be useful to solve a problem like this? (Acting out, drawing a diagram, making a physical model, and writing equations are all possible strategies.)
• Do I have some idea of the number of cards each person will have? How?
• What numbers and operations will I use? How might I record those operations?
• What tools (digital or physical) could help my investigation? 

Make sense

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

• Do I understand what I need to do? (Find the number of cards each person has.)
• Do I understand the meaning of the words? (Students will need support with words like "more", "fewer", and "order".)
• What maths will be useful to solve this problem?
• What will an answer look like? (The answer will be the number of cards that each person has. It will also include clear working to show how the answer was found.)

Take action

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

• Is my strategy working or do I need to change what I am doing?
• Can I be more efficient? Do I need to use physical objects or will number work?
• Have I shown my workings in a step-by-step way?
• Is the working clear so I keep track of where I am up to? 
• How can I express my solution using diagrams, numbers, and words?
• Have I use all the information or has some information been missed?

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.

• Is my working clear for someone else to follow?
• Did others get the same answer? Did they use the same strategies as me?
• How would I convince someone else I am correct?
• Is my solution expressed in a mathematical way, such as with numbers and equations?
• Can I come up with a general strategy that works on these kinds of problems?