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Three in a row

The purpose of this activity is to engage students in using operations on integers to solve a problem.

Four children are playing with two large dice.

Tags

  • AudienceKaiako
  • Curriculum Level5
  • Learning AreaMathematics and Statistics
  • Resource LanguageEnglish
  • Resource typeActivity
  • SeriesRich learning activities

About this resource

This collection of learning activities is designed to provide engaging contexts in which to explore the achievement objectives from The New Zealand Curriculum. The activities themselves do not represent a complete coverage of learning at this level. Rather, they provide an opportunity to apply the mathematics learned in previous lessons. The activities are intended to reflect the range of approaches that make up a differentiated classroom. This activity assumes the students have experience in the following areas:

  • Apply the correct order of operations when calculating.
  • Calculating with integers.
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.
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    Three in a row

    Achievement objectives

    NA5-3: Understand operations on fractions, decimals, percentages, and integers.

    NA5-7: Form and solve linear and simple quadratic equations.

    Activity

    Task: Find three consecutive integers, a, b and c, that give the same value for:

         a+(bc) and a(b+c)

    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.

    • Do I understand all the words, or should I ask for help? (Students will need to know the meaning of consecutive and integer and interpret the algebraic expressions in terms of the operations involved.)
    • How should I record what I find out?

    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 apply four operations to integers.)
    • Can we work as a team to find triads that work? How will we organise our mahi?
    • What part of the problem could I get started with? What is the best way to create triads of integers that work or do not work?
    • Do I expect there will be a way to create triads that work? Why or why not?
    • Could I make the numbers simpler? What numbers does it make sense to try first?
    • Should we make a list/table? Why?
    • 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?
    • Have I tried all the possible cases (triads) in a systematic way?
    • What is in common with the triads that work?
    • Can I describe the relationships within the triads that work?
    • How could I make sure that I haven’t missed anything?
    • Is there another possible way to find more triads?

    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 set?
    • Show and explain how you worked out your solution.
    • Can others see how I worked it out?
    • Do I have a generalisation that is true for all possible cases?
    • How can I express my generalisation? (See Work Sample 3)
    • Which ideas would convince others that my findings answer the investigation question?

    Examples of work

     | 

    The student finds a solution set by exhaustive calculation of all the integers in the range given.

    Student workings with a comment noting the workings as "solutions found by testing all possibilities".

    The student finds a solution set by exhaustive calculation of all the integers in the range given. The student shows understanding that the task is asking for the equation a+(bc)=a(b+c).

    A handwritten set of direction instructions accompanied by a text box depicting the conversation between student and teacher.

    The student shows understanding that the task is asking for the equation a+(bc)=a(b+c) and can use this knowledge to form and solve appropriate equations to solve the problem.

    A handwritten set of direction instructions accompanied by a text box depicting the conversation between student and teacher.

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