Rock’n’Roll Suislide

Q. Each face of a convex polyhedron can serve as a base when the solid is placed on a horizontal plane. The center of gravity of a regular polyhedron is at the center, therefore it is stable on any face. Irregular polyhedrons are easily constructed that are unstable on certain faces; that is, when placed on a table with an unstable face as the base, they topple over. Is it possible to make a model of an irregular convex polyhedron that is unstable on every face?

Portrait of Luca Pacioli (1495)

Portrait of Luca Pacioli (1495)


A. No. If a convex polyhedron were unstable on every face, a perpetual motion machine could be built. Each time the solid toppled over onto a new base it would be unstable and would topple over again.

 — From “Ridiculous Questions” in Martin Gardner’s Mathematical Magical Show (1965), chapter 10.

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Bestia Bestialissima

Auberon Waugh called himself a “practitioner of the vituperative arts”. Perhaps it was a Catholic thing. And unless you know Latin, you won’t understand. Or you won’t understand as much as you might. I don’t know Latin well, but I can appreciate some of the wonderful vituperation in a book of Latin exorcisms I’ve found scanned at Google Books. The title alone is good: Flagellum Daemonum: Exorcismos Terribiles, Potentissimos et Efficaces, which means (I think) The Flail of Demons: Exorcisms Terrible, Most Potent and Effective. Or is the title Fustis Daemonum: Adiurationes Formidabiles, Potentissimas et Efficaces, meaning The Cudgel of Demons: Adjurations Formidable, Most Potent and Effective?

Vituperation from the Flagellum Daemonum (1644)

Vituperation from the Flagellum Daemonum (1644)


Either way, one of the exorcisms contains a good list of curses directed at the Devil. He’s called Bestia Omnium Bestiarum Bestialissima, meaning “Beast of All Beasts the Most Beastly”. Beside that, there are Dux Hæreticorum and Lupus Rapacissimus, “Duke of Heretics” and “Most Rapacious Wolf”. There’s an odd Sus Macra, Famelica, et Immundissima, which means something like “Scrawny, Famished and Most Filthy Hog”. Lovecraft would have liked Nefandissimus Susurrator, “Most Unspeakable Whisperer”, and Draco Iniquissimus, “Most Iniquitous Dragon”.

Pessimus Dux Tenebrarum is “Most Evil Duke of Darkness” and Janua et Vorago Inferni is “Door and Abyss of Hell”. Seminator Zizaniarum, meaning “Sower of Tares”, refers to Matthew xiii, 25: “But while men slept, his enemy came and sowed tares among the wheat, and went his way.” And those are only a few of the curses poured on the Devil’s head. I’ve turned the full list into plain text. As it says in the book that originally led me to the Flagellum Daemonum, “The following is a specimen of one of these vituperative addresses”:

Audi igitur insensate, false, reprobe, et iniquissime Spiritus. Inimice fidei. Adversarie generis humani. Mortis adductor. Vitæ raptor. Justitiæ declinator. Malorum radix. Fomes vitiorum. Seductor hominum. Proditor gentium. Incitator invidiæ. Origo aravitiæ. Causa discordiæ. Excitator malorum. Dæmonum magister. Miserrima Creature. Tentator Homininum. Deceptor malorum Angelorum. Fallax animarum. Dux Hæreticorum. Pater Mendacii. Fatue Bestialis. Tui creatoris Inimicus. Insipiens ebriose. Inique et iniquorum caput. Prædo infernalis. Serpens iniquissime. Lupe rapacissime. Sus macra, famelica, et immundissima. Bestia eruginosa. Bestia scabiosa. Bestia truculentissima. Bestia crudelis. Bestia cruenta. Bestia omnium Bestiarum Bestialissima. Ejecte de Paradise. De gratiâ Dei. De Cœli fastigio. De loco inerrabili. De Societate et consortia Angelorum. Immundissime Spiritus Initium omnium malorum. Trangressor bonæ vitæ. Veritatis et Justitiæ persecutor. Auctor fornicationum. Seminator zizaniarum. Dissipator pacis. Latro discordiæ. Pessime dux tenebrarum. Mortis inventor. Janua et vorago Inferni. Crudelis devorator animarum omniumque malorum causa. Malignissime Dæmon. Spurcissime Spiritus. Nefandissime susurrator. Nequissima Creatura. Vilissime apostata. Scelestissima latro. Impiissima bestia infernalis. Superbissime et ingratissime Spiritus. Iniquissime refuga. Tyranne, Omni bono vacue. Plene omni dolo et fallaciâ. Hominum exterminator. Derisio totius Angelicæ Naturæ. Maledicte Satana a Deo. Excommunicate a totâ cœlesti curiâ. Blaspheme Dei et omnium Sanctorum. Damnate a Deo atque Damnande. Spiritus Acherontine. Spiritus Tartaree. Fili Perditionis. Fili maledictionis æternæ. Rebellis Dei et totius cœlestis curiæ. Serpens crudelissime. Draco iniquissime. Creatura damnata, reprobata et maledicta a Deo in æternum ob superbiam nequitiam tuam.

The first line, Audi igitur insensate, false, reprobe, et iniquissime Spiritus means something like “Hear, then, Senseless, False, Reprobate and Most Iniquitous Spirit”. Then the Devil is called Inimicus Fidei, “Enemy of the Faith”, Adversarius Generis Humani, “Adversary of the Human Race”, Mortis Adductor, “Dragger to Death”, and Vitæ Raptor, “Snatcher of Life”. Then the vituperation really begins.

Fragic Carpet

Maths is like a jungle: rich, teeming and full of surprises. A waterfall here, a glade of butterflies there, a bank of orchids yonder. There is always something new to see and a different route to try. But sometimes a different route will take you to the same place. I’ve already found two ways to reach this fractal (see Fingering the Frigit and Performativizing the Polygonic):

carpet2x2

Fractal Carpet


Now I’ve found a third way. You could call it the rep-tile route. Divide a square into four smaller squares:

square2x2

Add an extra square over the centre:

square2x2_1

Then keep dividing the squares in the same way:

carpet2x2_anim_1

Animated carpet (with coloured blocks)


carpet2x2_anim_2

Animated carpet (with empty blocks)


The colours of the fractal appear when the same pixel is covered repeatedly: first it’s red, then green, yellow, blue, purple, and so on. Because the colours and their order are arbitrary, you can use different colour schemes:

carpet2x2_col1

Colour scheme #1


carpet2x2_col2

Colour scheme #2


carpet2x2_col3

Colour scheme #3


Here are more colour-schemes in an animated gif:

carpet2x2_col

Various colour-schemes


Now try dividing the square into nine and sixteen, with an extra square over the centre:

carpet3x3

3×3 square + central square


carpet3x3_anim

3×3 square + central square (animated)


carpet4x4

4×4 square + central square


carpet4x4_anim

4×4 square + central square (animated)


You can also adjust the size of the square added to the 2×2 subdivision:

carpet2x2_1_2

2×2 square + 1/2-sized central square


carpet2x2_3_4

2×2 square + 3/4-sized central square


Elsewhere Other-Posted:

Fingering the Frigit
Performativizing the Polygonic