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From Counting to Computing - by Sergei Abramovich
About this item
Highlights
- From Counting to Computing demonstrates the powerful integration of formal mathematical reasoning, hands-on educational experiments, and digital computation to solve problems.
- About the Author: Sergei Abramovich (PhD, Mathematics) has over 30 years of experience teaching more than 4,000 prospective K-12 mathematics teachers and has published 13 books and around 250 journal articles, book chapters, and conference proceedings on mathematics education and mathematics.
- 276 Pages
- Education, Administration
Description
About the Book
From Counting to Computing demonstrates the powerful integration of formal mathematical reasoning, hands-on educational experiments and digital computation to solve problems. Focusing on numeric tables shaped as squares, equilateral & isosceles triangles, offering many opportunities for algebraic generalization in the digital age.
Book Synopsis
From Counting to Computing demonstrates the powerful integration of formal mathematical reasoning, hands-on educational experiments, and digital computation to solve problems. It focuses on numeric tables shaped as squares, equilateral and isosceles triangles, offering ample opportunities for algebraic generalization in the digital age. Activities are grounded in addition and multiplication tables, polygonal numbers, and Pascal's triangle. Based on the idea that counting objects arranged in geometric shapes leads to the development of numeric patterns, this book extends this concept to digital computing. Using technology-immune/technology-enabled didactical framework, it blends formal reasoning with digital computation in problem solving and provides a conceptual shortcut to achieving mathematically significant computational outcomes.
From Counting to Computing covers classic topics from arithmetic, number theory, combinatorics, and probability theory. Many historical and cultural origins of mathematical concepts are highlighted, featuring figures like Pythagoras, Aristotle, Heron of Alexandria, Theon, Fibonacci, Gersonides, Pacioli, Cardano, Galilei, Kepler, Descartes, Fermat, Pascal, Spinoza, Leibniz, Jacob Bernoulli, Binet, de Moivre, Lamé, and Lucas.
The final chapter includes problems on the proof of divisibility of integer variable polynomials, motivated by digital computations. Ideal for mathematics teacher education programs and discrete mathematics courses, this book showcases the use of simple algorithms and tools like spreadsheets, Wolfram Alpha, Maple, and Graphing Calculator to achieve sophisticated computational results.
About the Author
Sergei Abramovich (PhD, Mathematics) has over 30 years of experience teaching more than 4,000 prospective K-12 mathematics teachers and has published 13 books and around 250 journal articles, book chapters, and conference proceedings on mathematics education and mathematics.