C Varsavsky
4 points · 26 lectures and 13 practice classes · First semester · Caulfield
Objectives At the completion of this subject, students will have gained a basic understanding of the concepts and principles of differential and integral calculus and how to apply these principles to a variety of problems.
Synopsis Functions and their graphs. Differentiation: derivatives of polynomials, trigonometric functions, exponential and natural logarithmic functions; product, quotient and chain rules; applications. Integration: antiderivatives of polynomials, trigonometric functions, exponential functions, and rational functions; definite integrals; applications. Differential equations: solution by direct integration, separable variables. Applications.
Assessment Examination (2 hours): 70% ·Assignments: 30%
Prescribed texts
Tomastik C Brief Calculus: Applications and technology Saunders, 1996
Back to the 1999 Engineering Handbook