jsiehler @jsiehler@mathstodon.xyz
Joined Jan 2019
A design for coloring, if you're in to that sort of thing. Based on the orbit of a single point under the action of two rotation groups with different centers.
(*) By a theorem of Richard Savage (1994), if the numbers from 1-24 are partitioned into three sets of eight numbers like this, then at least one of the winning probabilities (R>G, G>B, or B>R) must be less than (√5-1)/2. Thus, if all three are to be equal, then 39/64 is the highest possible common value, and this partition achieves it.
A partition the numbers 1-24 into an optimal(*) symmetric, nontransitive set of three octahedral dice:
red = {4,5,6,7,9,22,23,24}
green = {8,10,11,12,13,14,15,17}
blue = {1,18,3,20,2,16,19,21}.
Red beats green, green beats blue, and blue beats red with probability 39/64.
If you're interested in the game of Hex, Matthew Seymour's online strategy book is the best one-stop guide to practical play that I know of (and it's not too easy to stumble across):
http://www.mseymour.ca/hex_book/hexstrat.html
HopeSort algorithm.
while (list is not sorted) {
do nothing;
hope things sort themselves
}
jsiehler
boosted
@joshmillard wouldn't you say there's a set
a set that has... everything?
How do you handle the punctuation collision at the end of sentences like "How many zeroes are at the end of 20!?"gracefully?
TeX ignores everything following \bye, and so, since 2008, my TeX files have ended with \bye bye beautiful.
Snap Cube Puzzle: Snap cubes have a post on one side, and holes (into which a post can fit) on the other five sides. How many ways to build a 2x2x2 cube out of eight snap cubes such that (1) the entire structure is connected, and (2) all the posts are in the interior – no posts sticking out of the surface? (All the different structures look the same from the outside; the difference is in the orientation of the eight posts internally.)
jsiehler
boosted
@jsiehler Okay, that blog entry as promised: http://tpfto.wordpress.com/2019/04/24/on-constructing-an-elliptic-function-from-its-zeroes-and-poles/
What's the "most scalene" right triangle – that is, how should the edges be proportioned so that the minimum difference over all pairs of sides is as large as possible? Let's assume we've normalized so that the hypotenuse is 1 unit.
(If you enjoy the answer for right triangles, also try the problem for triangles with a 120-degree angle.)
Silly arithmetic amusement:
\(8^2-4^2\)
\(848^2-484^2\)
\(84848^2-48484^2\), etc.
(I constructed this problem myself, but I still don't know a really *nice* way to solve it. I hope somebody finds a pretty solution.)
O is an interior point in the triangle 10, 26, and 36 units away from the three vertices respectively. Determine the side lengths a, b, and c, given that they are integers.
Forty-seven problems in Peg Solitaire (not that the web needed another peg solitaire page, but anyway...)
Divide the small, yet verdant state of Moosylvania (green, in the map below) into two congruent regions.
Only Connect: What have the words
hair, lamb, height, yclept, handmaid, neurosis, proficient
in common?
Insert the symbols +, +, +, x, = (in some order) into the string 0123456 to make a true equation.
Joined Jan 2019
