Here are two other vector calculus sources you might find helpful. Lovric, Vector Calculus, Wiley, 2007Ī change of perspective is sometimes helpful to clear up confusion. A final exam (25%) Our exam is scheduled for Monday, May 5.Particular on February 14, March 6, and April 10. These will be closed-book,Ĭalculator-free exams, though you will be allowed to bring one piece (Also, computers and calculators will not be allowed on theĮxams, so it's best not to get too dependent on them.) "by Mathematica" is not anĪcceptable justification for deriving one equation fromĪnother. Refer to it directly in the solution, e.g. On the HW for experimentation and to check your answers, but may not However, you must write up your solutions individuallyĪnd understand them completely. Homework grade will be dropped so you are effectively allowed one No late homework will be accepted however, your lowest Homework will beĪssigned during each lecture and due at the beginning of classĮach Tuesday.
Stokes, and Gauss, which relate seemingly disparate types of integrals The highlight of the course will be theorems of Green, Geometric objects such as vector fields, curves, and surfaces inģ-space and study how these relate to differentiation and Like continuity, derivatives, and integrals, as well as theirĪpplications (like finding minimal and maxima). In this broader context, we will revisit notions
Of several variables and functions whose values are vectors rather The focus of this course is vector calculus, which concerns functions
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