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Thomas' Calculus, Multivariable
Joel Hass, Maurice D. Weir, Christopher Heil - ISBN: 9780134606088
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On this page you find summaries, notes, study guides and many more for the textbook Thomas' Calculus, Multivariable, written by Joel Hass, Maurice D. Weir & Christopher Heil. The summaries are written by students themselves, which gives you the best possible insight into what is important to study about this book. Subjects like Vector, Stoke, Multivariable Calculus, Multi, Mathematics, Math, Lagrange & Green will be dealt with.
Popular summaries Thomas' Calculus, Multivariable Notes
Notes come from an Ivy League Brown University student studying math with an A in the course. The main topics are: geometry of three-dimensional space; partial derivatives; Lagrange multipliers; double, surface, and triple integrals; vector analysis; Stokes' theorem and the divergence theorem, with applications to electrostatics and fluid flow.
- Class notes
- • 40 pages •
Notes come from an Ivy League Brown University student studying math with an A in the course. The main topics are: geometry of three-dimensional space; partial derivatives; Lagrange multipliers; double, surface, and triple integrals; vector analysis; Stokes' theorem and the divergence theorem, with applications to electrostatics and fluid flow.
Latest notes & summaries Thomas' Calculus, Multivariable Notes
Notes come from an Ivy League Brown University student studying math with an A in the course. The main topics are: geometry of three-dimensional space; partial derivatives; Lagrange multipliers; double, surface, and triple integrals; vector analysis; Stokes' theorem and the divergence theorem, with applications to electrostatics and fluid flow.
- Class notes
- • 40 pages •
Notes come from an Ivy League Brown University student studying math with an A in the course. The main topics are: geometry of three-dimensional space; partial derivatives; Lagrange multipliers; double, surface, and triple integrals; vector analysis; Stokes' theorem and the divergence theorem, with applications to electrostatics and fluid flow.