So I don't really even need to know what the solutions are? All I need to do is some sort of "proof" that the sum of the two solutions to the linear P.D.E. is also a solution?
If that is the case, do you think you could help me get started with working that out?
Homework Statement
Assume that \psi_{1}(x,t) and \psi_{2}(x,t) are solutions of the one-dimensional time-dependent Schrodinger's wave equations.
(a) Show that \psi_{1} + \psi_{2} is a solution.
(b) Is \psi_{1} \cdot \psi_{2} a solution of the Schrodinger's equation in general...
1. The solution to Schrodinger's wave equation for a particular situation is given by \psi(x) = \sqrt{\frac{2}{a_{0}}} \cdot e^{\frac{-x}{a_{0}}} . Determine the probability of finding the particle between the limits 0 \leq x \leq a_{0}
2. Homework Equations
\int_{-...
Everytime I use BitTorrent it downloads stuff slower than when I download stuff with P2P programs, such as BearShare. I thought that BitTorrent was supposed to allow users to download stuff faster than P2P. What is the deal?
How do I know how many eigenvalues there will be. In other words, if I could see that [1,1,1] is an eigenvector just by inspection, then how do I know if there are any other eigenvectors?
Would someone please explain to me how I can find eigenvalues and eigenvectors by inpection of simple symmetric matrices? I just can't figure it out.
He is an example:
By looking at A=\left(\begin{matrix}2&-1&-1\\-1&2&-1\\-1&-1&2\end{matrix}\right)
I should be able to guess...
Ya, I forgot to mention that.
I also forgot to mention that I am asking this question since I recently started smoking cigars (I am sure most of you realized that already from the way the post was written). But I don't inhale. And yes, I know it is still bad. They are both bad; we can...