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- https://math.libretexts.org/Bookshelves/Combinatorics_and_Discrete_Mathematics/Discrete_Mathematics_for_Computer_Science_(Fitch)/01%3A_Basics/1.01%3A_TerminologyThis page discusses the structure of mathematics, emphasizing the importance of proofs and fundamental categories like undefined terms, defined terms, axioms, and theorems. Undefined terms prevent inf...This page discusses the structure of mathematics, emphasizing the importance of proofs and fundamental categories like undefined terms, defined terms, axioms, and theorems. Undefined terms prevent infinite definitions, while defined terms rely on these and established definitions. Axioms are unproven statements serving as a foundation for deriving new statements. Mastering these concepts is essential for solving mathematical problems.
- https://math.libretexts.org/Courses/Los_Angeles_City_College/MATH_261%3A_Calculus_I/zz%3A_Back_MatterThis page details a method for creating glossary entries, including fields for words, definitions, images, captions, links, and sources. It features an example entry for "Genetic" and includes a scrip...This page details a method for creating glossary entries, including fields for words, definitions, images, captions, links, and sources. It features an example entry for "Genetic" and includes a script for improving the presentation of glossary tables on websites, serving as a guideline for compiling and formatting glossary content effectively.
- https://math.libretexts.org/Bookshelves/Combinatorics_and_Discrete_Mathematics/Discrete_Mathematics_for_Computer_Science_(Fitch)/05%3A_Graph_Theory/5.01%3A_Discovering_GraphsThis page explains how to define graphs through various properties, using examples and checkpoints to distinguish valid graph formations from invalid ones. It employs set notation and prompts readers ...This page explains how to define graphs through various properties, using examples and checkpoints to distinguish valid graph formations from invalid ones. It employs set notation and prompts readers to analyze necessary and forbidden properties of graphs, facilitating a translation between set forms and diagrams.
- https://math.libretexts.org/Bookshelves/PreAlgebra/Fundamentals_of_Mathematics_(Burzynski_and_Ellis)/09%3A_Measurement_and_Geometry/9.04%3A_Perimeter_and_Circumference_of_Geometric_Figures\(\begin{array} {rcll} {\text{Perimeter}} & = & {\text{2.0 cm}} & {} \\ {} & & {\text{5.1 cm}} & {} \\ {} & & {\text{2.0 cm}} & {} \\ {} & & {\text{5.1 cm}} & {} \\ {} & & {(0.5) \cdot (2) \cdot (3.14...\(\begin{array} {rcll} {\text{Perimeter}} & = & {\text{2.0 cm}} & {} \\ {} & & {\text{5.1 cm}} & {} \\ {} & & {\text{2.0 cm}} & {} \\ {} & & {\text{5.1 cm}} & {} \\ {} & & {(0.5) \cdot (2) \cdot (3.14) \cdot \text{(6.2 com)}} & {\text{Circumference of outer semicircle.}} \\ {} & \ \ + & {\underline{(0.5) \cdot (2) \cdot (3.14) \cdot \text{(4.2 com)}}} & {\text{Circumference of inner semicircle.}} \\ {} & & {} & {\text{6.2 cm - 2.0 cm = 4.2 cm}} \\ {} & & {} & {\text{The 0.5 appears because we w…