If something has survived this far, how much longer is it expected to survive? That’s the question answered by mean residual time. For a positive random variable X, the mean residual time for X is a function eX(t) given by…
Blog Archives
Negative damping
An earlier post looked at the effect of damping on free vibrations. We looked at the equation m u” + γ u’ + k u = 0 where the coefficients m, γ, and k were all positive. But what if…
Pulp science fiction and vibrations
This morning I ran across Pulp-o-mizer and decided my series of posts on mechanical vibrations could use a little sensational promotion. The posts are Part I: Introduction and free, undamped vibrations. Part II: Free, damped vibrations (under-damping, critical damping, over-damping)…
Damped, driven oscillations
This is the final post in a four-part series on vibrating systems. The first three parts were free, undamped vibrations free, damped vibrations driven, undamped vibrations and now we consider driven, damped vibrations. We are looking at the equation m…
Undamped forced vibrations
This is the third in a series of four blog posts on mechanical vibrations. The first two posts were Part I: Introduction and free undamped vibrations Part II: Free undamped vibrations
Free damped vibrations
This is the second post in a series on vibrations determine by the equation m u” + γ u’ + k u = F cos ωt The first post in the series looked at the simplest case, γ = 0…
Fourier series before Fourier
I always thought that Fourier was the first to come up with the idea of expressing general functions as infinite sums of sines and cosines. Apparently this isn’t true. The idea that various functions can be described in terms of…
Mechanical vibrations
My favorite topic in an introductory differential equations course is mechanical and electrical vibrations. I enjoyed learning about it as a student and I enjoyed teaching it later. (Or more accurately, I enjoyed being exposed to it as a student…
Differential Equations and the City
This afternoon I got a review copy of X and the City: Modeling Aspects of Urban Life by John A. Adam. It’s a book about mathematical model, taking all its examples from urban life: public transportation, growth, pollution, etc. I’ve only…
Castles and quantum mechanics
How are castles and quantum mechanics related? One connection is rook polynomials. The rook is the chess piece that looks like a castle, and used to be called a castle. It can move vertically or horizontally, any number of spaces.…
Easiest and hardest classes to teach
I’ve taught a variety of math classes, and statistics has been the hardest to teach. The thing I find most challenging is coming up with homework problems. Most exercises are either blatantly artificial or extremely tedious. It’s hard to find…
Tagged with: Differential equations, Education, Probability and Statistics
Posted in Math, Statistics
Posted in Math, Statistics
Boundary conditions are the hard part
What we call “differential equations” are usually not just differential equations. They also have associated initial conditions or boundary conditions. With ordinary differential equations (ODEs), the initial conditions are often an afterthought. First you find a full set of solutions,…
Nonlinear is not a hypothesis
I studied nonlinear PDEs in grad school. My advisor, Ralph Showalter, would remind us occasionally what ‘nonlinear’ means. “Nonlinear” is not a hypothesis but the lack of a hypothesis. He meant a couple things by this. First, when people say…
Compound complexity
I’ve started to read through Michael Fogus’ list of recommended technical papers and ran across this gem from Out of the Tar Pit: Complexity breeds complexity. There are a whole set of secondary causes of complexity. This covers all complexity…
Three views of differential equations
The most common view of differential equations may be sheer terror, but those who get past terror may have one of the following perspectives. Naive view: All differential equations can be solved in closed form by applying one of the…
