MATH3101 - Algebraic Structures with Computer Applications
Course: MATH3101 (Algebraic Structures with Computer Applications) in MATH department at Carleton University.
Credit Hours: 0.5 • Academic Level: year 0 undergraduate course
Course Requirements: Requires 4 prerequisite courses
Prerequisite Chain Depth: 3 levels of foundational courses required
Future Opportunities: Unlocks 12 advanced courses for further study
Interdisciplinary Requirements: Prerequisites span 2 different departments
Course Type: Core pathway course - critical for degree progression
Part of the MATH curriculum at Carleton University, helping students progress through degree requirements.
Courses unlocked by MATH3101
- MATH3206 - Plane Projective Geometry
- MATH3210 - Euclidean and Non-Euclidean Geometry
- MATH3355 - Number Theory and Applications (Honours)
- MATH3106 - Introduction to Group Theory (Honours)
- MATH4109 - Fields and Coding Theory (Honours)
- COMP3805 - Discrete Structures and Applications (Honours)
- MATH3158 - Rings and Fields (Honours)
- MATH3306 - Elements of Set Theory (Honours)
- MATH3809 - Introduction to Number Theory and Cryptography
- MATH3819 - Modern Computer Algebra
- MATH3825 - Discrete Structures and Applications
- MATH3855 - Discrete Structures and Applications (Honours)
Academic Planning at Carleton University
Students planning MATH3101 at Carleton University should complete 4 prerequisites before enrollment.
Course Sequence: This course requires a 3-level prerequisite chain, requiring careful multi-semester planning for optimal progression.
Future Pathways: Completing MATH3101 enables enrollment in 12 advanced courses, opening specialization opportunities in the MATH program.
This year 0 course at Carleton University integrates into structured degree pathways for MATH programs, supporting timely graduation and academic progression.