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Reflect, Expect, Check, Explain: Sequences and behaviour to enable mathematical thinking in the classroom [Mīkstie vāki]

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  • Formāts: Paperback / softback, 550 pages, height x width x depth: 208x148x34 mm, weight: 710 g
  • Izdošanas datums: 28-Feb-2020
  • Izdevniecība: John Catt Educational Ltd
  • ISBN-10: 1912906341
  • ISBN-13: 9781912906345
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  • Mīkstie vāki
  • Cena: 28,71 €
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Reflect, Expect, Check, Explain: Sequences and behaviour to enable mathematical thinking in the classroomPalielināt
  • Formāts: Paperback / softback, 550 pages, height x width x depth: 208x148x34 mm, weight: 710 g
  • Izdošanas datums: 28-Feb-2020
  • Izdevniecība: John Catt Educational Ltd
  • ISBN-10: 1912906341
  • ISBN-13: 9781912906345
Citas grāmatas par šo tēmu:
Permanent link: https://www.kriso.lv/db/9781912906345.html
Keywords:
Craig Barton, maths teacher and best-selling author of 'How I Wish I'd Taught Maths', offers an approach to help all our students think mathematically. It requires the careful sequencing of questions and examples, the role of the teacher, and the mathematical behaviour of our students. It has transformed his teaching.

Some students think mathematically. They have the curiosity to notice relationships, the confidence to ask why, and the knowledge to understand the answer. They are the lucky ones. Many others just “do” maths. They look at a question, think about how to answer it, answer it, and then move on.

In this book, Craig Barton, maths teacher and best-selling author of How I wish I’d taught maths, offers an approach to help all our students think mathematically. It requires the careful sequencing of questions and examples, the role of the teacher, and the mathematical behaviour of our students. It has transformed his teaching.

Drawing upon research into the Self-Explanation Effect, the Hypercorrection Effect and Variation Theory, together with two years of developing this approach with teachers and students around the world, Craig describes exactly what this looks like in the classroom. But be warned: not everyone agrees. Indeed, it is this very approach that led to Craig being labelled as “the most dangerous and clueless man in maths education.”

If that is not a recommendation to keep reading, we don’t know what is.



Barton offers an approach to help all our students think mathematically, requiring the careful sequencing of questions and examples and the role of the teacher.

Recenzijas

'This is another game-changer of a book from the formidable Mr Barton.' -- Jo Morgan, author of A COMPENDIUM OF MATHEMATICAL METHODS

Foreword 9(2)
Glossary 11(10)
Introduction 21(12)
Warm-up 33(2)
Chapter 1 Intelligent Practice
35(98)
1.1 What I used to do
35(20)
1.2 What I do now
55(2)
1.3 A shared vocabulary
57(1)
1.4 What do I mean by `Intelligent Practice'?
58(1)
1.5 The three elements needed to support mathematical thinking
59(5)
1.6 What does this look like in the classroom?
64(1)
1.7 Model the First Relationship
65(11)
Take a Break #1 Subtracting decimals
76(4)
1.8 The Self-Explanation Effect
80(4)
1.9 Student prompt cards
84(5)
1.10 Writing it down
89(4)
1.11 Silent Practice
93(4)
1.12 Paired Discussion
97(4)
1.13 The 4-2 approach
101(1)
1.14 What I do whilst my students are working on the sequence of questions
102(3)
1.15 Relationships
105(4)
1.16 Discuss Relationships
109(3)
1.17 Prompts for Delving Deeper
112(8)
1.18 Differentiation revisited
120(5)
1.19 Is structured practice even needed?
125(3)
Take a Break #2 Rounding to 1 decimal place
128(5)
Chapter 2 Where does Intelligent Practice fit in?
133(172)
2.1 How I Wish I'd Taught Maths: Two years on
134(1)
2.2 A Learning Episode
135(3)
2.3 What do I mean by `method'?
138(1)
2.4 Introduction
139(12)
2.5 Atomisation
151(19)
2.6 Example-Problem Pair
170(42)
2.7 Example-Problem Pair: Questions and concerns
212(12)
2.8 Fluency Practice
224(5)
2.9 Intelligent Practice
229(1)
2.10 The Example-Problem-Pair-Practice Cycle
230(1)
2.11 Method Selection
231(10)
Take a Break #3 Reading scales -- Decimals
241(3)
2.12 The `why'
244(2)
2.13 The Four Ingredients of Problem Solving
246(17)
2.14 The Four Ingredients of Retrieval
263(24)
2.15 Formative Assessment
287(8)
2.16 Other elements in the Learning Episode
295(8)
2.17 Want to know more?
303(2)
Chapter 3 Different features of Intelligent Practice sequences
305(48)
3.1 Confronting the `unusual'
306(8)
3.2 Confronting the `obvious'
314(4)
3.3 Interleaving high-value concepts
318(4)
3.4 Atomisation
322(10)
3.5 Providing a purpose
332(8)
3.6 Fill in the Gaps
340(4)
3.7 Student-generated sequences
344(3)
Take a Break #4 Carrying out rotations
347(6)
Chapter 4 Intelligent Practice FAQs
353(44)
4.1 FAQs: Student behaviour
354(19)
Take a Break #5 Sharing in a ratio
373(3)
4.2 FAQs: Teacher behaviour
376(9)
4.3 FAQs: General concerns
385(9)
Take a Break #6 Equation of a tangent to a circle
394(3)
Chapter 5 Rule
397(26)
5.1 What I used to do
397(1)
5.2 What I do now
398(14)
5.3 What are Rule sequences?
412(1)
5.4 Where do Rule sequences fit in?
413(1)
5.5 Assessing understanding
414(4)
5.6 Rule: Frequently asked questions
418(5)
Chapter 6 Different uses of Rule
423(34)
6.1 Definitions
424(10)
6.2 Decisions
434(8)
6.3 Depth
442(5)
6.4 Recap
447(2)
6.5 `How' before `why'
449(6)
Take a Break #7 Averages and range from a list of data: Increase, decrease, same?
455(2)
Chapter 7 Pattern
457(30)
7.1 What I used to do
457(2)
7.2 `With the grain' versus `across the grain'
459(2)
7.3 What I do now
461(7)
7.4 What are Pattern sequences?
468(1)
7.5 Where do Pattern sequences fit in?
468(3)
7.6 Patterns and Structured Variation Grids
471(3)
7.7 Pattern purpose 1: To establish new ideas
474(4)
7.8 Pattern purpose 2: To consider Boundary Examples
478(3)
7.9 A potential Pattern problem
481(3)
Take a Break #8 Constructions
484(3)
Chapter 8 Demonstration
487(30)
8.1 What I used to do
487(3)
8.2 What I do now
490(2)
8.3 Straight line graphs
492(11)
8.4 Angle at the centre
503(9)
8.5 Area of a triangle
512(2)
8.6 What are Demonstration sequences?
514(1)
8.7 Where do Demonstration sequences fit in?
515(1)
8.8 Whole class versus individual
515(2)
Chapter 9 Summary table
517(2)
Chapter 10 Writing your own sequences
519(14)
10.1 Why reinvent the wheel?
519(3)
10.2 Why write sequences of questions and examples?
522(1)
10.3 A structure for collaboration?
523(4)
10.4 Tips for making this process work
527(1)
10.5 Tips for writing sequences of questions and examples
528(3)
10.6 Sharing is caring
531(2)
Chapter 11 Making this work
533(2)
Conclusion 535(10)
Acknowledgements 545(4)
References 549
Craig Barton has been teaching maths for 15 years. He is the Head of Education at Eedi, the TES Maths Adviser, the author of the best-selling How I wish Id taught maths, the host of the Mr Barton Maths Podcast, and the creator of mrbartonmaths.com, diagnosticquestions.com, variationtheory.com, ssddproblems.com and mathsvenns.com. His two proudest achievements are convincing Kate to marry him, and being the father to our wonderful baby boy, Isaac.