# New Course Information - Distance Calculus @ Roger Williams University Enroll Today, Finish Quickly - Calculus Academic Credits

Distance Calculus New Courses course via Distance Calculus @ Roger Williams University starts whenever you are ready! Enroll today, start your course today, finish your course as quickly as your academic skills allow.For many students with strong academic skills and backgrounds, some courses can be finished in as quickly as a few weeks!

Or, take a more relaxed approach - you can take up to 1 year to finish your course.

Why stress out with due dates and course structures that are incompatable with your life and work schedule? Why force yourself to attend classroom lectures on a weekly basis when you can take your calculus course online on your timeline!

Here is a video about how FAST you can potentially complete your Calculus course from Distance Calculus @ Roger Williams University:

## Distance Calculus - Student Reviews

*Date Posted: Sep 20, 2020*

Review by: Genevieve P.

Courses Completed: Applied Calculus

Review: I found out from my grad school after being accepted that I needed a Calculus course before starting their MBA program. I had less than 6 weeks to do it (and as a non-STEM undergrad no less). The video lectures were informative, the pre-calc refresher was great to get re-conditioned, and the asynchronous format worked so well as I did this at night/weekends after work. I completed it in 4 weeks. Professor Curtis was extremely responsive, graded assignments quickly, and a supportive guide providing constructive feedback to me to excel at the assignments. I highly recommend this course for those who need a pre-req in a hurry or like learning on their own schedule. Thanks, Distance Calculus and Professor Curtis!

Transferred Credits to: Massachusetts Institute of Technology (MIT)

*Date Posted: Dec 9, 2019*

Review by: Louisa A.

Courses Completed: Calculus I

Review: My microeconomics class required college-level calculus as a prerequisite, and I didn't want to wait until next year to take the class. So, I took DC's Calculus I class over the summer, so I could register for econ when I got back to school this fall. I actually think I got more help taking the class online than I would have in the huge lecture classes here. Prof. Curtis was really clear in explaining concepts and talking me through the topics that I was having trouble with. It took me about 10 weeks to finish the class, which didn't seem too long and didn't feel rushed. My friends who are in calculus now, trying to finish the prereq, are pretty jealous!

*Date Posted: Jun 6, 2020*

Review by: Douglas Z.

Courses Completed: Multivariable Calculus, Differential Equations, Linear Algebra, Probability Theory

Review: I loved these courses. So in depth and comprehensive. The mix of software and math curriculum was tremendously helpful to my future studies and career in engineering. I highly recommend these courses if you are bored of textbook courses.

Transferred Credits to: University of Massachusetts, Amherst

## Distance Calculus - Curriculum Exploration

### 1.07: Races

- M7: 1.07: Races:
- M7.1: 1.07 - Basics
- M7.1.a: 1.07.B1: The Race Track Principle
- M7.1.b: 1.07.B2: The Race Track Principle and differential equations
- M7.1.c: 1.07.B3: The Race Track Principle and Euler's method of faking the plot of the solution of a differential equation
- M7.1.d: 1.07.B4: Tangent lines and the Race Track Principle
- M7.2: 1.07 - Tutorials
- M7.2.a: 1.07.T1: Using Euler's method to fake the plot of f(x) given f ' (x) and one value of f(x)
- M7.2.b: 1.07.T2: Using the Race Track Principle to help to estimate roundoff error
- M7.2.c: 1.07.T3: If f''(x) is always positive then tangent lines run below the curve
- M7.3: 1.07 - Give It a Try
- M7.3.a: 1.07.G1: Versions of the Race Track Principle
- M7.3.b: 1.07.G2: Running Euler's faker
- M7.3.c: 1.07.G3: The Race Track Principle and differential equations
- M7.3.d: 1.07.G4: The error function Erf(x)
- M7.3.e: 1.07.G5: Round off
- M7.3.f: 1.07.G6: Calculating accurate values of ln(x)
- M7.3.g: 1.07.G7: Calculating accurate values of e^x
- M7.3.h: 1.07.G8: Euler's faker and the second derivative
- M7.3.i: 1.07.G9: Inequalities
- M7.3.j: 1.07.G10: The Law of the Mean
- M7.3.k: 1.07.G11: If f''(x) is never positive then tangent lines run above the curve; At points of inflection, the tangent line crosses the curve
- M7.4: 1.07 - Literacy