Abstract Mathematical Systems: Part 3 of Elementary Concepts of Modern Mathematics

Abstract Mathematical Systems: Part 3 of Elementary Concepts of Modern Mathematics

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Condition: SECONDHAND

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This is a secondhand book. The jacket image is a photograph of the exact copy we have in stock. This image shows the condition of this book. Further condition remarks are below.

Author: Flora Dinkines
Binding: Paperback
Published: Appleton-Century-Crofts, 1964

Condition:
Book: Fair
Jacket: No dust jacket
Pages: Tanning and foxing
Markings: No markings
Condition remarks: Condition as shown in image. Creased cover. Cut on FEP. Clean text.

Flora Dinkines’ Abstract Mathematical Systems, the third installment in her foundational series Elementary Concepts of Modern Mathematics, presents a rigorous introduction to the formal structures underpinning modern mathematical thought. Dinkines constructs a clear progression from set theory and symbolic logic to the axiomatic frameworks that define groups, rings, and fields. She argues for the necessity of abstraction in advancing mathematical precision and coherence, illustrating how these systems unify disparate branches of mathematics under consistent logical principles. The text instructs readers in the formulation and validation of mathematical systems, emphasizing structure, consistency, and deductive reasoning.

Vendor: Secondhand Stock
SKU: 2025100010504-SECONDHAND
Categories: All Best Sellers - Individual titles General Science Mathematics Only One Copy Science & Mathematics Second-hand Books
Tags: Mathematics Paperback Science Secondhand September-2025
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Description

Author: Flora Dinkines
Binding: Paperback
Published: Appleton-Century-Crofts, 1964

Condition:
Book: Fair
Jacket: No dust jacket
Pages: Tanning and foxing
Markings: No markings
Condition remarks: Condition as shown in image. Creased cover. Cut on FEP. Clean text.

Flora Dinkines’ Abstract Mathematical Systems, the third installment in her foundational series Elementary Concepts of Modern Mathematics, presents a rigorous introduction to the formal structures underpinning modern mathematical thought. Dinkines constructs a clear progression from set theory and symbolic logic to the axiomatic frameworks that define groups, rings, and fields. She argues for the necessity of abstraction in advancing mathematical precision and coherence, illustrating how these systems unify disparate branches of mathematics under consistent logical principles. The text instructs readers in the formulation and validation of mathematical systems, emphasizing structure, consistency, and deductive reasoning.