Synopsis
How do children understand reasoning by mathematical induction? Mathematical induction - Poincare's reasoning by recurrence - is a standard form of inference with two distinctive properties. One is its necessity. The other is its universality or inference from particular to general. This means that mathematical induction is similar to both logical deduction and empirical induction, and yet is different from both. In a major study 40 years ago, Inhelder and Piaget set out two conclusions about the development of this type of reasoning in advance of logical deduction during childhood. This developmental sequence has gone unremarked in research on cognitive development. This study is an adaptation with a sample of 100 hundred children aged five-seven years in school years one and two. It reveals evidence that children can reason by mathematical induction on tasks based on iterative addition and that their inferences were made by necessity. According to the study the main educational implication is clear: young children can carry out iterative actions on actual objects with a view to reasoning about abstract objects such as numbers.
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Reasoning by Mathematical Induction in Children's Arithmetic
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Emerald Group Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
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Reasoning by Mathematical Induction in Children's Arithmetic
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Emerald Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Neuf
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Reasoning by Mathematical Induction in Children's Arithmetic (Advances in Learning and Instruction Series)
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Emerald Publishing Limited, 2002
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ISBN 13 : 9780080441283
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Reasoning by Mathematical Induction in Children's Arithmetic
Edité par
Emerald Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Neuf
Couverture rigide
Vendeur : GreatBookPricesUK, Woodford Green, Royaume-Uni
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Reasoning by Mathematical Induction in Children's Arithmetic
Edité par
Emerald Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
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Reasoning by Mathematical Induction in Children*s Arithmetic (Advances in Learning and Instruction)
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Reasoning by Mathematical Induction in Children's Arithmetic
Edité par
Emerald Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Ancien ou d'occasion
Couverture rigide
Vendeur : GreatBookPrices, Columbia, MD, Etats-Unis
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Reasoning by Mathematical Induction in Children's Arithmetic
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Emerald Publishing Limited, GB, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Neuf
Couverture rigide
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Hardback. Etat : New. How do children understand reasoning by mathematical induction? Mathematical induction - Poincare's reasoning by recurrence - is a standard form of inference with two distinctive properties. One is its necessity. The other is its universality or inference from particular to general. This means that mathematical induction is similar to both logical deduction and empirical induction, and yet is different from both. In a major study 40 years ago, Inhelder and Piaget set out two conclusions about the development of this type of reasoning in advance of logical deduction during childhood. This developmental sequence has gone unremarked in research on cognitive development. This study is an adaptation with a sample of 100 hundred children aged five-seven years in school years one and two. It reveals evidence that children can reason by mathematical induction on tasks based on iterative addition and that their inferences were made by necessity. According to the study the main educational implication is clear: young children can carry out iterative actions on actual objects with a view to reasoning about abstract objects such as numbers. N° de réf. du vendeur LU-9780080441283
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Reasoning by Mathematical Induction in Children's Arithmetic
Edité par
Emerald Publishing Limited, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Neuf
Couverture rigide
Vendeur : THE SAINT BOOKSTORE, Southport, Royaume-Uni
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Reasoning by Mathematical Induction in Children's Arithmetic
Edité par
Emerald Publishing Limited, GB, 2002
ISBN 10 : 0080441289
ISBN 13 : 9780080441283
Neuf
Couverture rigide
Vendeur : Rarewaves USA United, OSWEGO, IL, Etats-Unis
Évaluation du vendeur 5 sur 5 étoiles
Hardback. Etat : New. How do children understand reasoning by mathematical induction? Mathematical induction - Poincare's reasoning by recurrence - is a standard form of inference with two distinctive properties. One is its necessity. The other is its universality or inference from particular to general. This means that mathematical induction is similar to both logical deduction and empirical induction, and yet is different from both. In a major study 40 years ago, Inhelder and Piaget set out two conclusions about the development of this type of reasoning in advance of logical deduction during childhood. This developmental sequence has gone unremarked in research on cognitive development. This study is an adaptation with a sample of 100 hundred children aged five-seven years in school years one and two. It reveals evidence that children can reason by mathematical induction on tasks based on iterative addition and that their inferences were made by necessity. According to the study the main educational implication is clear: young children can carry out iterative actions on actual objects with a view to reasoning about abstract objects such as numbers. N° de réf. du vendeur LU-9780080441283
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