**The Mylar Balloon Revisited**

by Ivaïlo M. Mladenov and John Oprea

mladenov@bgcict.acad.bg, oprea@math.csuohio.edu

An explicit parametrization in terms of elliptic functions for the Mylar balloon is found, which then is used to calculate various geometric quantities as well as to study various kinds of geodesics on this surface.

**Tetrahedron ABCD of Width 1 with Minimum AB+BC+CD**

by K. S. Sarkaria

sarkaria_2000@yahoo.com

A woodborer, freshly hatched at a random point within a slab of timber of unit thickness, wants to tunnel its way out by making at most two changes in its randomly chosen initial direction, in such a way that the worst case distance is minimized. What strategy does it adopt? We present the solution of this problem, also partial results about the analogous higher-dimensional problems.

**Bell’s Theorem and the Demise of Local Reality**

by Stephen McAdam

mcadam@math.utexas.edu

Einstein believed that the behavior of entangled particles could be explained only by the existence of local variables that determined their behavior. John Bell devised a clever argument showing that the reverse was true: the behavior of entangled particles proved that local variables cannot exist. We present an explanation of Bell's insight that stresses a mathematical point of view.

**The Mathematics of Survival: From Antiquity to the Playground**

by Chris Groër

cgroer@math.uga.edu

Nearly two thousand years ago, the historian Flavius Josephus allegedly saved his own life by quickly solving a combinatorics problem now named in his honor. The "Josephus Problem" involves arranging n people around a circle and then "counting out" every qth person until only one remains. In this article, we consider a variation on this classic problem where our n people are instead arranged in a line and then systematically removed via a back and forth procedure---sort of like the old playground rhyme "One Potato, Two Potato." We present a solution to this problem in a particular case and explore several surprising properties of this variation. We show a relationship between this new problem and fractal-like images and explore some properties of an unusual function related to these images. After presenting the reader with anecdotal proof that the number thirteen is truly unlucky, we conclude with a historical assessment of the somewhat dubious association between Josephus and mathematics

**Problems and Solutions**

**Notes**

**Two Proofs of Graves’s Theorem**

by Kamal Poorrezaei

kamalporeza@mehr.sharif.edu

**A Characterization of the Unit Sphere**

by Jeongseon Baek, Dong-Soo Kim, and Young Ho Kim

jsbaek@chonnam.chonnam.ac.kr, dosokim@chonnam.chonnam.ac.kr, yhkim@knu.ac.kr

**An Elementary Proof of Lebesgue’s Differentiation Theorem**

by Michael W. Botsko

mike.botsko@email.stvincent.edu

**Almost Every Number Has a Continuum of ?-Expansions**

by Nikita Sidorov

Nikita.A.Sidorov@umist.ac.uk

**Reviews**

**A New Kind of Science. **

by Stephen Wolfram

Reviewed by Rudy Rucker

rucker@cs.sjsu.edu

**Ramanujan: Essays and Surveys. **

Edited by Bruce C. Berndt and Robert A. Rankin

Reviewed by Krishnaswami Alladi

alladi@math.ufl.edu

**Telegraphic Reviews**