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Revision as of 11:08, 23 July 2020
Foundations of Mathematics (3-0) 3 Credit Hours
Contents
Course Catalog
MAT 3013. Foundations of Mathematics. (3-0) 3 Credit Hours.
Prerequisite: MAT1214. Development of theoretical tools for rigorous mathematics. Topics may include mathematical logic, propositional and predicate calculus, set theory, functions and relations, cardinal and ordinal numbers, Boolean algebras, and construction of the natural numbers, integers, and rational numbers. Emphasis on theorem proving. (Formerly MAT2243. Credit cannot be earned for MAT3013 and MAT2243.) Generally offered: Fall, Spring, Summer. Differential Tuition: $150.
Description
Foundations of Mathematics is a pivotal course for mathematics majors. It serves as the first major step towards modern mathematics of rigorous proofs and a true pre-requisite to real analysis and abstract algebra. Up to this point students are asked to do few proofs (notably geometry and perhaps some epsilon-delta in calculus). The course particularly emphasizes set-theoretical constructions, such as functions, composition, inversion, forward and inverse images, relations, equivalence relations, partial orders, quotient sets and products and unions of sets, vital to further work in mathematics.
Evaluation
- No makeup exams are offered.
- An absence may be excused if sufficient evidence of extenuating circumstances is provided. In this case, the final exam grade
could be used as the grade for the missed exam.
- Students will have access to several past exams for practice.
Text
D. Smith, M. Eggen, R. St. Andre, A Transition to Advanced Mathematics (7e), Brooks/Cole
Topics List A
| Date | Sections | Topics | Prerequisite Skills | Student Learning Outcomes |
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| 1.0 |
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Topics List B
| Week | Session | Topics | Section | Prerequisite skills | Learning outcomes | Examples |
|---|---|---|---|---|---|---|
| 1 | Introduction |
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1.1 |
mathematics from a historical perspective
and why this course is going | ||
| 2 | Propositional logic |
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1.2-3 | Gain the prerequisites for
writing and evaluating proofs. |
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| 3 | Proof methods | Methods for proofs | 1.4-6 | Propositional logic | Start proving elementary results. |
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| 4 | Set theory |
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2.1-3 | Basic concepts of set theory | How to start working with sets |
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| 5 | Induction and counting |
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2.4-6 | Natural numbers |
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| 6 |
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| 7 | Relations 1 |
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3.1-3 | Set theory | Gain basic concepts about relations. |
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| 8 | Relations 2 |
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3.4-5 | Relations 1 |
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partial ordering of the power set under inclusion |
| 9 | Functions 1 |
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4.1-2 |
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Gain basic rigorous knowledge of functions. |
functional composition |
| 10 | Functions 2 |
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4.3-4 | Functions 1 |
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| 11 | Functions 3 |
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4.5-6 | Functions 2 | Find images and preimages of subsets under functions, with proofs. |
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| 13 | Cardinality 1 |
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5.1-2 | Sets and functions |
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| 14 | Cardinality 2 | Countable and uncountable sets | 5.3-5 | Cardinality 1 | Learn properties of countable sets. | |
| 15 |
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