The Drag Force on a Sphere

This is an unevaluated Mathematica notebook. If you do not have a copy of Mathematica handy, you may want to also view the evaluated version


By H. Edward Donley
Mathematics Department
Indiana University of Pennsylvania
Indiana, PA 15705
U.S.A.

Adapted from UMAP Module 712, The Drag Force on a Sphere (UMAP Journal, Volume 12, no. 1, Spring 1991, pp. 47-80.), by H. Edward Donley,
Copyright (c) 1991, Consortium for Mathematics and its Applications. All rights reserved.
For more information about their excellent collection of curriculum modules, contact
COMAP, Suite 210, 57 Bedford St., Lexington, MA 02138; (800) 77-COMAP, (800) 772-6627 or (617) 862-7878; fax: (617) 863-1202.

Initialization

1. Introduction

2. The Graph of the Drag Coefficient verses Reynolds Number

3. Two Models for the Drag Force

4. The Differential Equations for a Sphere Moving through a Fluid

5. Solutions of the Differential Equations

6. Applications

Conclusion

Appendix: Table of Physical Constants

Go up to Calculus and Differential Equations Project Description Programs | People | Courses | Facilities | Calendars | Projects | Jobs
IUP Math | Nat Sci & Math | IUP Info | Related Sites

Read this disclaimer.

Maintained by H. Edward Donley <hedonley@grove.iup.edu>
Last Modified on Monday, 13-Aug-2001 16:54:43 EDT