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Boundary conditions and Fourier superposition: Instructor's Guide

Main Ideas

  1. Fourier Series
  2. Boundary Conditions

Students' Task

Estimated Time: 30 minutes, or as long as you'll let it go

In groups of three, students must decide which harmonics are present in a wave form and decide how the wave form develops in time.

Prerequisite Knowledge

This exercise is similar to one in the Oscillations class, and several homeowrk examples, where Fourier components of a an oscillatory function were found. This activity also repeats tasks from the Initial Conditions activity earlier in this course.

Props/Equipment

Activity: Introduction

Discussion until this point has been about single frequency waves. The solution to the non-dispersive wave equation are valid for any frequency, and nothing specifies a particular frequency. In this example we will see how shapes other than sinusoids are allowed, and how to deconstruct the waveform to find the component harmonic waves. The constraints are:

Activity: Student Conversations

Activity: Wrap-up

It is helpful to perform several mini wrap-ups.

Extensions

This activity describes a 2-component waveform. A more challenging problem is a triangle waveform, which has an infinite number of components. I began with this activity, but realized that when I gave a picture of the triangle waveform, the additional step of recognizing that it must be written in algebraic form (and, surprisingly, how to write it in a piecewise form!) interfered with the Fourier decomposition exercise.

I therefore switched to using the simpler 2-component simpler waveform, presented algebraically, and the students found it just as challenging. One might

In any event, there should be follow-up homework problems. A skewed triangle wave, which is drawn on $\left( \psi ,x \right)$ axes, rather than being written in functional form, is a good one. The students really need practice with translating drawn functions into mathematical form, especially if the function is piecewise, like the skewed triangle form.

Any simple sum of two or three harmonics of the same base sinusoid can be easily disguised by using trigonometric sum formulae. Assign one such for homework.

Once Fourier analysis is mastered, Mathematica can be brought in - at first just to help solve the integrals, and finally, the students will discover the canned functions.