Course Overview
This course provides the foundation in the calculus needed to solve problems involving integration and differentiation. Building on the concepts developed in the Technical Mathematics for Industrial Network Cybersecurity course in term one, this course prepares students for the Process Measurement and Control Fundaments for Industrial Network Cybersecurity course in term three. The concepts being developed in this course are closely related to the concepts being developed concurrently in the Industrial Systems and Engineering Fundamentals for Industrial Network Cybersecurity courses. Topics include: the differentiation and integration of common algebraic and transcendental functions; first and second order differential equations; negative feedback; and the proportional, integral and derivative (PID) control algorithm.
Prerequisite(s)
- 50% in MATH 1600
Credits
4.0
- Not offered this term
- This course is not offered this term. Notify me to receive email notifications when the course opens for registration next term.
Learning Outcomes
Upon successful completion of this course, the student will be able to:
- Solve problems involving derivatives and partial derivatives of functions and equations. (4)
- Solve problems involving integrals and integration by parts of functions and equations. (4)
- Decompose a periodic function into its Fourier series. (3)
- Solve problems involving 1st and 2nd order differential equations. (4)
- Solve problems involving negative feedback. (4)
- Solve problems involving the PID control algorithm. (4)
Effective as of Winter 2020
Related Programs
Calculus for Industrial Network Cybersecurity (MATH 2601) is offered as a part of the following programs:
- Indicates programs accepting international students.
- Indicates programs eligible for students to apply for Post-graduation Work Permit (PGWP).
School of Energy
- Industrial Network Cybersecurity
Diploma Full-time
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