# Winter 2020 Calculus III - Vector Calculus

The Winter 2020 Calculus III via Distance Calculus @ Roger Williams University is best described as: the first semester course of Differential and Integral Calculus to functions of many variables. Please look at the additional links below for further information, and/or explore the menu links to the left to investigate each course and questions you may have about this educational program.- Calculus III Online Course FAST
- Calculus III Online Course For Credit, Start Immediately
- Calculus III Online Course For Credit Start Today, Finish Quickly
- Calculus III Online Course For Credit, Start Immediately, Finish Quick
- Calculus III Accredited Online Course
- Calculus III winter 2020 Online Course
- Calculus III Online Accredited

## Distance Calculus - Student Reviews

*Date Posted: Jun 21, 2020*

Review by: Abdul J.

Courses Completed: Applied Calculus

Review: This was the best class! So much more interesting doing the computer math than a boring lecture class. Diane was so responsive and helpful. I recommend this course.

Transferred Credits to: Villanova University

*Date Posted: Jan 12, 2020*

Review by: Mark Neiberg

Courses Completed: Calculus I, Calculus II, Multivariable Calculus

Review: Curriculum was high quality and allowed student to experiment with concepts which resulted in an enjoyable experience. Assignment Feedback was timely and meaningful.

*Date Posted: Jan 12, 2020*

Review by:

Courses Completed: Calculus I, Calculus II

Review: I needed to brush up on my high school calculus and finally take Calc II before starting a graduate program that needed them as prereqs. This was perfect choice to fit in that summer. Got done at fast pace that I wanted and needed. Also had added bonus of one on one feedback and help when needed. Video lessons were better than many on campus instructors in large lecture settings. Recommend for anyone needing to satisfy prereqs at home institution.

Transferred Credits to: University of Michigan

## Distance Calculus - Curriculum Exploration

### VC.06 - Sources

- V6: VC.06 - Sources:
- V6.1: VC.06 - Sources - Basics
- V6.1.a: VC.06.B1: Using a 2D integral to measure flow across closed curves
- V6.1.b: VC.06.B2: Sources, sinks, and the divergence of a vector field
- V6.1.c: VC.06.B3: Flow-across-the-curve measurements in the presence of singularities
- V6.2: VC.06 - Sources - Tutorials
- V6.2.a: VC.06.T1: The pleasure of calculating path integrals when mixed partials equation = 0
- V6.2.b: VC.06.T2: Using a 2D integral to measure flow along closed curves
- V6.2.c: VC.06.T3: Rotation (swirl) of a vector field
- V6.2.d: VC.06.T4: Summary of main ideas.
- V6.3: VC.06 - Sources - Give It a Try
- V6.3.a: VC.06.G1: Sources, sinks and swirls
- V6.3.b: VC.06.G2: Singularity sources, sinks and swirls
- V6.3.c: VC.06.G3: Agree or disagree
- V6.3.d: VC.06.G4: Flow calculations in the presence of singularities
- V6.3.e: VC.06.G5: 2D electric fields, dipole fields, and Gauss's law in physics
- V6.3.f: VC.06.G6: The Laplacian and steady-state heat
- V6.3.g: VC.06.G7: Calculating path integrals in the presence of singularities
- V6.3.h: VC.06.G8: Water and electricity
- V6.3.i: VC.06.G9: Is parallel flow always irrotational?
- V6.3.j: VC.06.G10: Spin fields
- V6.4: VC.06 - Sources - Literacy