Nontransitive Dice: Difference between revisions
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{{NRICH linker 1|page=Nontransitive_Dice|number=7541}} | |||
{{Rinfo | {{Rinfo | ||
|type= Lesson idea | |||
|title= Non-transitive Dice | |title= Non-transitive Dice | ||
|tagline= Alison and Charlie are playing a game. Charlie wants to go first so Alison lets him. Was that such a good idea? | |tagline= Alison and Charlie are playing a game. Charlie wants to go first so Alison lets him. Was that such a good idea? | ||
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|subject=Maths | |subject=Maths | ||
|resourcenumber= M0035 | |resourcenumber= M0035 | ||
|age=Secondary | |age= KS3, Secondary | ||
|Learning Objectives= Thinking strategically | |Learning Objectives= Thinking strategically | ||
|toc= | |toc= | ||
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|other= | |other= | ||
|format= | |format= | ||
|resources= | |resources= {{NRICH linker 2|page=Nontransitive_Dice|number=7541}} | ||
|licence= CC-By, {{NRICH_attribution}} | |licence= CC-By, {{NRICH_attribution}} | ||
|acknowledgement={{NRICH_acknowledgement}} | |acknowledgement={{NRICH_acknowledgement}} | ||
|status=draft | |status=draft | ||
|final= | |final=yes | ||
}} | }} | ||
Latest revision as of 23:05, 4 February 2015
Problem, Clue, Solution, Teachers' note
Teaching approach. This lesson idea is about thinking strategically(ta).
The collection of NRICH activities are designed to develop students capacity to work as a mathematician. Exploring, questioning, working systematically, visualising, conjecturing, explaining, generalising, justifying, proving are all at the heart of mathematical thinking.
This particular resource has been adapted from an original NRICH resource. NRICH promotes the learning of mathematics through problem solving. NRICH provides engaging problems, linked to the curriculum, with support for teachers in the classroom. Working on these problems will introduce students to key mathematical process skills. They offer students an opportunity to learn by exploring, noticing structure and discussing their insights, which in turn can lead to conjecturing, explaining, generalising, convincing and proof.
The Teachers’ Notes provided focus on the pedagogical implications of teaching a curriculum that aims to provoke mathematical thinking. They assume that teachers will aim to do for students only what they cannot yet do for themselves. As a teacher, consider how this particular lesson idea can provoke mathematical thinking. How can you support students' exploration? How can you support conjecturing, explaining, generalising, convincing and proof?. (edit)
| Resource details | |
| Title | Non-transitive Dice |
| Topic | |
| Teaching approach | |
| Learning Objectives | Thinking strategically |
| Format / structure | |
| Subject | |
| Age of students / grade | |
| Table of contents | |
| Additional Resources/material needed | |
| Useful information | |
| Related ORBIT Wiki Resources |
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| Other (e.g. time frame) | |
| Files and resources to view and download | The following parts are available: Problem, Clue, Solution, Teachers' note. The original problem is available on the NRICH website here. |
| Acknowledgement | The NRICH website http://nrich.maths.org publishes free mathematics resources designed to challenge, engage and develop the mathematical thinking of students aged 5 to 19. NRICH also offers support for teachers by publishing Teachers’ Resources for use in the classroom. |
| License | CC-By, with kind permission from NRICH. This resource was adapted from an original NRICH resource. |
