Famous Mathematical Proofs
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Famous Mathematical Proofs by Paul F Kisak
In mathematics, a proof is a deductive argument for a mathematical statement. In the argument, other previously established statements, such as theorems, can be used. In principle, a proof can be traced back to self-evident or assumed statements, known as axioms. Proofs are examples of deductive reasoning and are distinguished from inductive or empirical arguments; a proof must demonstrate that a statement is always true (occasionally by listing all possible cases and showing that it holds in each), rather than enumerate many confirmatory cases. An unproved proposition that is believed true is known as a conjecture.Proofs employ logic but usually include some amount of natural language which usually admits some ambiguity. In fact, the vast majority of proofs in written mathematics can be considered as applications of rigorous informal logic. Purely formal proofs, written in symbolic language instead of natural language, are considered in proof theory.This book contains 'solutions' to some of the most noteworthy mathematical proofs (QED) and is designed to be a reference and provide an overview of the topic and give the reader a structured knowledge to familiarize yourself with the topic at the most affordable price possible.The accuracy and knowledge is of an international viewpoint as the edited articles represent the inputs of many knowledgeable individuals and some of the most current knowledge on the topic, based on the date of publication.| SKU | Unavailable |
| ISBN 13 | 9781519464330 |
| ISBN 10 | 1519464339 |
| Title | Famous Mathematical Proofs |
| Author | Paul F Kisak |
| Condition | Unavailable |
| Binding Type | Paperback |
| Publisher | Createspace Independent Publishing Platform |
| Year published | 2015-11-20 |
| Number of pages | 258 |
| Cover note | Book picture is for illustrative purposes only, actual binding, cover or edition may vary. |
| Note | Unavailable |