Warning! To study for an exam, simply doing problems from sample exams is not enough. Not every type of problem can be given on an exam. The exam you take may have a problem of a type not on one of the samples. You still need to review the material in the text and be sure you are familiar with all types of problems in the homework and problem sets.
Fall 2010
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, level curves and surfaces, differentiability, gradients.
Final Exam
Fall 2009
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, level curves and surfaces, differentiability, gradients.
Exam 2 -- Vector fields and flows, differential operators (grad, div, curl, Laplacian), max/min.
Final Exam
Fall 2007
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, level curves and surfaces, limits, differentiability, gradients, coordinate vectors.
Exam 2 -- Differentiability, directional derivatives, vector fields, differential operators (grad, div, curl, Laplacian), max/min, change of coordinates.
Final ExamFall 2006
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, level curves and surfaces, limits.
Exam 2 -- Differentiability, directional derivatives, vector fields, differential operators (grad, div, curl, Laplacian), max/min.
Final ExamFall 2005
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, level curves and surfaces, limits, differentiability, gradients.
Exam 2 -- Differentiability, directional derivatives, vector fields, differential operators (grad, div, curl, Laplacian), max/min.
Final Exam
Fall 2004
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, limits, differentiability, gradients, directional derivatives.
Exam 2 -- Implicit function theorem, geometry of curves, mostly multiple integrals.
Final ExamFall 2002
Exam 1 -- Applications of vectors to two and three-dimensional geometry, geometry of curves, limits, parameterized surfaces.