MULTIVARIABLE CALCULUS

Vectors. Vector functions. Multivariable functions. Derivatives and applications. Multiple integrals. Line and surface integrals. The integral theorems of vector calculus.

Math 21a: Multivariable Calculus, by O. Knill, 2019, Harvard University.

3rd Semester Calculus, by S. Angenent, 2018, University of Winsconsin-Madison.

18.022 Calculus of Several Variables, taught by J. McKernan, 2010, Massachusetts Institute of Technology.

Multivariable Calculus, by O. Knill, 2020, Harvard University.

Calculus III and Calculus IV, by T. Bazett, 2020, University of Victoria.

18.02 Multivariable Calculus, by D. Auroux, 2007, Massachusetts Institute of Technology.

Calculus 3, by B. Leonard, 2016, Merced College.

Multivariable Calculus, by Khan Academy.

Calculus, Vol. 3, by G. Strang, E. Herman, et al, 2021, Massachusetts Institute of Technology, University of Wisconsin-Stevens Point, OpenStax.

Single and Multivariable Calculus, by D. Guichard, 2021, Whitman College.

Calculus III, by P. Dawkins, 2018, Lamar University.

Calculus, by G. Strang, 2nd ed., 1991, Massachusetts Institute of Technology, Wellesley-Cambridge Press.

Calculus, Vol. 2, by T. Apostol, 2nd ed., 1991, Wiley.

Calculus: Early Transcendentals, by J. Stewart, 8th ed., 2015, Cengage Learning.

Calculus, by R. Larson and B. H. Edwards, 10th ed., 2013, Cengage Learning.

Thomas’ Calculus: Early Transcendentals, by J. Hass, C. Heil, and M. Weir, 14th ed., 2017, Pearson.

Calculus: Early Transcendentals, by W. Briggs, L. Cochran, B. Gillett, and E. Schulz, 3rd ed., 2018, Pearson.

Vector Calculus, by J. Marsden and A. Tromba, 6th ed., 2012, Macmillan Learning.

Schaum’s Outline of Calculus, by F. Ayres and E. Mendelson, 6th ed., 2012, McGraw Hill.

Schaum’s Outline of Advanced Calculus, by R. Wrede and M. Spiegel, 3rd ed., 2010, McGraw Hill.