- 28-Oct-2011 --- Original version.

**LRC circuit problem.**This is very similar to the damped, periodically driven harmonic oscillator problem from the last problem set. The only essential difference is the actual form of the driving force, which was*f(t)*there and is now the half-rectified sine wave*EMF(t)*. Again, the first step is to analyze*EMF(t)*as an exponential Fourier series (why exponential?). Then the coefficients for*Q(t)*(which are simply related to the voltage across the capacitor) follow algebraically.**Delta sequences.**You will have to make some assumptions about the function*f(x)*(extended to*f(z)*) when checking whether the "sifting property" of the delta function is provided by the delta sequence in the*n*goes to infinity limit. First make the simplest assumption, that*f(z)*is analytic, and solve the relevant integral by contour integration. Then look at your solution and determine whether it is possible to add singularities somewhere in the complex plane and not change the result.**Density of uniform rod with delta functions.**- Use both delta functions and theta functions to write
the mass density with an overall constant. Determine the
constant by integrating the density over the volume, which should be
equal to the total mass
*M*, but also equal to the constant times the length*l*. - Similar, but now you have to simplify the delta functions as in the example from class (using the properties of a delta function).
- Again, the same, but more work to do simplifying because spherical coordinates.

- Use both delta functions and theta functions to write
the mass density with an overall constant. Determine the
constant by integrating the density over the volume, which should be
equal to the total mass
**Delta functions of functions.**These are straightforward applications of the formula. Find the zeros and plug in.**Impulse on string.**A string problem like in the last problem set, but with a different initial condition. Solve with a Fourier series. Use Example 6.3 in Lea as a guide.**Convergence of Fourier series.****Fourier representation of δ functions.**- The Fourier series for a step function in
*(-L,L)*can be found in Lea Chapter 4. - Calculate the coefficients of the Fourier series as usual. The delta sequence functions are even about the origin, so do you expect cosines or sines in the expansion?
- Even if your results look different, check whether they might be the same (Mathematica is a good place to start!).

- The Fourier series for a step function in
**Laplace equation with delta function in cylindrical coordinates.**Use section 6.5 in Lea as a guide to proving Equation (2) and then Poisson's equation that relates the Laplacian of a potential to a given charge density.

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Last modified: 07:24 am, November 03, 2011.

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