Courses:

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This page includes a course calendar.

This course develops and applies scaling laws and the methods of continuum mechanics to biomechanical phenomena over a range of length scales, from molecular to cellular to tissue or organ level. It is intended for undergraduate students who have taken a course in differential equations (18.03), an introductory course in molecular biology, and a course in transport, fluid mechanics, or electrical phenomena in cells (e.g. 6.021, 2.005, or 20.320).

• Conservation of momentum
• Inviscid and viscous flows
• Convective transport
• Dimensional analysis

• Maxwell's equations
• Ion transport
• E and B field in biological systems
• Electroquasistatics
• Poisson's and Laplace's equation

• Conservation of mass
• Diffusion
• Steady and unsteady diffusion
• Diffusion with chemical reactions

• Debye layer
• Zeta potential
• Electroosmosis
• Electrophoresis
• Application of electrokinetics
• Dielectrophoresis
• Debye layer repulsion forces

Truskey, G. A., F. Yuan, and D. F. Katz. Transport Phenomena in Biological Systems. East Rutherford, NJ: Prentice Hall, 2003. ISBN: 9780130422040.

Haus, H. A., and J. R. Melcher. Electromagnetic Fields and Energy. Upper Saddle River, NJ: Prentice Hall, 1989. ISBN: 9780132490207. (A free online textbook.)

Probstein, R. F. Physicochemical Hydrodynamics: An Introduction. New York, NY: Wiley-Interscience, 2003. ISBN: 9780471458302.

Jones, T. B. Electromechanics of Particles. 2nd ed. New York, NY: Cambridge University Press, 2005. ISBN: 9780521019101.

Bird, R. B., E. N. Lightfoot, and W. E. Stewart. Transport Phenomena. New York, NY: Wiley, 2006. ISBN: 9780470115398.

Weiss, T. F. Cellular Biophysics - Volume 1: Transport. Cambridge, MA: MIT Press, 1996. ISBN: 9780262231831.

Morgan, H., and H. Green. AC Electrokinetics: Colloids and Nanoparticles. Baldock, UK: Research Studies Press, 2002. ISBN: 9780863802553.

Hiemenz, P. C., and R. Rajagopalan. Principles of Colloid and Surface Chemistry. New York, NY: Marcel Dekker, 1997. ISBN: 9780824793975.

Dill, K., and S. Bromberg. Molecular Driving Forces. New York: Garland Press, 2002. ISBN: 9780815320517.

20.330/2.793/6.023 will be taught in lecture format (3 hours/week), but with liberal use of class examples to link the course material with various biological issues. Readings will be drawn from a variety of primary and text sources as indicated in the lecture schedule.

Optional tutorials will also be scheduled to review mathematical concepts and other tools (Comsol FEMLAB) needed in this course.

Weekly homework problem sets will be assigned each week to be handed in and graded.

Office hours by the TA will be scheduled to help you in exams and homeworks.

There will be two in-class midterm quizzes (1 hour long), and a comprehensive final exam (3 hours long) at the end of the term.

The term grade will be a weighted average of exams, term paper and homework grades. The weighting distribution will be:

Homework is intended to show you how well you are progressing in learning the course material. You are encouraged to seek advice from TAs and collaborate with other students to work through homework problems. However, the work that is turned in must be your own. It is a good practice to note the collaborator in your work if there has been any.

Homework is due at the end of the lecture (11 am), on the stated due date. Solutions will be provided on-line after the due date and time.

We will not accept late homework for any reason. Instead, we will not use 2 lowest homework grades (out of 9 total) for the calculation of the term homework grade (30%). Students are encouraged to use this to their benefit, to accommodate special situations such as interview travel/illness.

There are two in-class (1 hour) closed-book midterm quizzes scheduled for the term. Please note the schedule for the exam dates. There will also be a closed-book, three-hour-long, comprehensive final exam during the finals week. The final exam will cover the whole course content.

Exam problems will be similar (in terms of difficulty) to homework problems, and if one can work all the homework problems without looking at notes one should be able to solve the exam problems as well.

Make-up exams will only be allowed for excused absence (by Dean's office) and if arranged at least 2 weeks in advance. Students must sign an honor statement to take a make-up exam. Exams missed due to an excused illness and other reasons excusable by Dean's office will be dropped and the term grade will be calculated based on the remaining exams and homework.

The table below provides information on the course's lecture (L) and tutorials (T) sessions.