Abstract Algebra (MAT3702)
University of South Africa (Unisa)
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MAT3702 Assignment 02 SOLUTIONS 2026
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--7April 20262025/2026Available in bundle
- MAT3702 Assignment 02 SOLUTIONS 2026 
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MAT3702 Assignment 1 SOLUTIONS 2026
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--7April 20262025/2026Available in bundle
- MAT3702 Assignment 1 SOLUTIONS 2026 
0-7-9-3-2-2-6-4-2-7 
WE HELP IN ALL maths and physics. reach us for more 
DUE: 13 MAY 2026
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Abstract Algebra MAT3702, University of South Africa (UNISA), 2018 — Assignment 01 Complete Solutions
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---39March 20262025/2026
- This document contains detailed solutions to Assignment 01 for the Abstract Algebra course MAT3702 at the University of South Africa (UNISA). It covers key topics such as functions and compositions, equivalence relations, permutations, subgroup proofs, homomorphisms, abelian groups, and group properties. The material follows the assignment structure and demonstrates step-by-step reasoning for each problem, making it useful for exam preparation and conceptual understanding
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PSMokwena
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Exam (elaborations)
MAT3702 Assignment 2 Memo | Due 19 August 2026
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--13February 20262025/2026A+Available in bundle
- MAT3702 Assignment 2 Memo | Due 19 August 2026. All questions fully solved. 1. Prove that b | a if and only if (−b) | a. 
2. If a | b and b | c, then prove that a | c. 
3. Let R,S be rings and consider the following subsets of R × S
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Aimark94
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Exam (elaborations)
MAT3702 Assignment 1 Memo | Due 13 May 2026
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--8February 20262025/2026A+Available in bundle
- MAT3702 Assignment 1 Memo | Due 13 May 2026. All questions fully solved. 1. Let A,B,C be sets and show that A ∪ (B ∩ C) = (A ∪ B) ∩ (A ∪ C). 
2. Let G be a finite group with x, y ∈ G and prove that xy and yx have the same order.
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Aimark94