London ; ; Philadelphia, : Whurr, 2003

1-283-85857-6

0-470-69909-4

0-470-69852-7

1 online resource (471 p.)

371.914447

Mathematics - Study and teaching

Dyslexia

Apraxia

Dyslexic children - Education

Electronic books.

Inglese

Description based upon print version of record.

Includes bibliographical references and index.

Dyslexia, Dyspraxia and Mathematics; Contents; Foreword; Preface; Part I: Definitions and Premises; Chapter 1. Background information; Chapter 2. Teaching premises; Part II: Basic Counting and the Early Stages of Addition and Subtraction; Chapter 3. Counting; Chapter 4. Counting in basic calculation; Part III: The Number System; Chapter 5. Defining the difficulties; Chapter 6. An understanding-based approach to teaching the number structures; Part IV: More Addition and Subtraction: Working with Larger Numbers; Chapter 7. To twenty; Chapter 8. Two-digit addition and subtraction

Chapter 9. More on two-digit addition and subtractionPart V: Multiplication and Division; Chapter 10. The theoretical debates; Chapter 11. An understanding-based approach to multiplication and division for dyslexic and dyspraxic children; Chapter 12. More multiplication and division: working with larger numbers; Appendix; References; Index

Written by a teacher with many years' experience of teaching mathematics to primary school dyslexic and dyspraxic children with a

wide range of abilities, this book is designed to be a practical teaching guide. It offers detailed guidance and specific teaching suggestions to all specialist teachers, support teachers, classroom teachers and parents who either directly teach mathematics to dyslexic and dyspraxic children or who support the mathematics teaching programmes of dyslexic or dyspraxic children. Although the book has grown out of teaching experience it is also informed by widely ackn

Cham : , : Springer Nature Switzerland : , : Imprint : Springer, , 2025

3-031-74252-4

1 online resource (X, 454 p. 257 illus., 1 illus. in color.)

Mathematics and Statistics Series

511.5

Graph theory

Discrete mathematics

Probabilities

Graph Theory

Discrete Mathematics

Probability Theory

Graph Theory in Probability

Anàlisi combinatòria

Matemàtica discreta

Teoria de grafs

Probabilitats

Processos estocàstics

Llibres electrònics

Inglese

Basics of Counting -- Induction and Pigeon Hole Principle -- Binomial Theorem and Binomial Identities Partitions -- Permutations --

Combinations and Cycles -- Generating Functions -- Recurrence Relations -- Inclusion Exclusion Principle -- Partial Order and Lattices -- Polya’s Theory -- More on Counting -- Discrete Probability -- Basic Concepts -- Paths Connectedness -- Trees -- Connectivity -- Eulerian and Hamiltonian Graphs -- Planar Graphs -- Independent Sets -- Coverings and Matchings -- Graph Coloring -- Ramsey Numbers and Ramsey Graphs -- Spectral Properties of Graphs -- Directed Graphs and Graph Algorithms.

The book covers all the basics of both the topics. The topics are sequenced in such a manner that there is a flow in understanding the advances. The first and second chapters cover all the basic methods and tools for counting. Chapter 3 is on binomial theorem and binomial identities. Topics such as partitions, permutations on multisets, generating functions, recurrence relation, principle of inclusion exclusion, repeated counting, partially ordered sets and Mobius inversion, Polya's counting are covered in different chapters. Some basic chapters have some worked-out exercise. Information on Catalan numbers, Eulerian Numbers, Narayana Numbers, and Schroder Number are given in a chapter. The topic on "discrete probability" covers the connection between counting techniques and probability theory. There second part of the book covers topics in graph theory such as basics of graphs, trees,bipartite graphs, matching , planar graphs, Euler and Hamilton graphs, graph coloring, Ramsey theory, spectral properties, and some graph algorithms.Adequate exercise and examples are provided so as to enhance the reader's interest and understanding. Some interesting concepts like high hamiltonicity, power of graphs, domination, and matrix tree theorem are introduced.