George Polya\u27s seminal work How to Solve it describes general methods for approaching and solving mathematical problems. The book begins with Polya\u27s four principles for solving a problem: understand the problem, make a plan, carry out the plan, and look back. Much of the remainder of the book is devoted to an encyclopedic listing of different heuristics for use in mathematical problem solving. Polya\u27s work can also be applied in problem solving settings outside of mathematics. For example, to clarify the role of his four principles in tackling a new problem, Polya explores the following non-mathematical question: what single English word can be formed by rearranging all the letters in dry ox tail in rear ? In a similar vein, th...
Thesis (PhD (Science, Mathematics and Technology Education))--University of Pretoria, 2023.This stud...
Word problems are among the most difficult kinds of problems that mathematics learners encounter. Pe...
Four students with learning disabilities, whose all performance on mixed sets of addition and sub-pr...
A perennial bestseller by eminent mathematician G. Polya, How to Solve It will show anyone in any fi...
A perennial bestseller by eminent mathematician G. Polya, How to Solve It will show anyone in any fi...
George Polya’s book, How to solve it (1945), is likely to have been one of the first books to focus ...
Mathematical games are problems that involve algorithmic solutions. The solutions require recognitio...
The so-called ’Pólya’s method’ is now the canonical way of teaching mathematical problem solving. We...
Problem solving is fundamental not only to the learning and application of mathematics, but to all w...
Polya claims that true problem solving is accompanied by the cognitive activities of mobilization, o...
Abstract : Problem solving has been investigated in mathematics education for more than 60 years ago...
English Language Learners (ELLs) are required to achieve the same scores on high-stakes mathematics ...
The theoretical part of the master's thesis, titled Geometric Problem-Solving Strategies on Sequenc...
Using the "How to Solve It " list developed by Polya as a vehicle of comparison, research ...
This thesis aims to contribute to a deeper understanding of the relationship between problem-solving...
Thesis (PhD (Science, Mathematics and Technology Education))--University of Pretoria, 2023.This stud...
Word problems are among the most difficult kinds of problems that mathematics learners encounter. Pe...
Four students with learning disabilities, whose all performance on mixed sets of addition and sub-pr...
A perennial bestseller by eminent mathematician G. Polya, How to Solve It will show anyone in any fi...
A perennial bestseller by eminent mathematician G. Polya, How to Solve It will show anyone in any fi...
George Polya’s book, How to solve it (1945), is likely to have been one of the first books to focus ...
Mathematical games are problems that involve algorithmic solutions. The solutions require recognitio...
The so-called ’Pólya’s method’ is now the canonical way of teaching mathematical problem solving. We...
Problem solving is fundamental not only to the learning and application of mathematics, but to all w...
Polya claims that true problem solving is accompanied by the cognitive activities of mobilization, o...
Abstract : Problem solving has been investigated in mathematics education for more than 60 years ago...
English Language Learners (ELLs) are required to achieve the same scores on high-stakes mathematics ...
The theoretical part of the master's thesis, titled Geometric Problem-Solving Strategies on Sequenc...
Using the "How to Solve It " list developed by Polya as a vehicle of comparison, research ...
This thesis aims to contribute to a deeper understanding of the relationship between problem-solving...
Thesis (PhD (Science, Mathematics and Technology Education))--University of Pretoria, 2023.This stud...
Word problems are among the most difficult kinds of problems that mathematics learners encounter. Pe...
Four students with learning disabilities, whose all performance on mixed sets of addition and sub-pr...