Spirolateral
390° (4 cycles) |
3108° (5 cycles) |
990° ccw spiral |
990° (4 cycles) |
100120° spiral |
100120° (4 cycles) |
In
A spirolateral which completes in one
Spirolaterals were invented and named by Frank C. Odds as a teenager in 1962, as square spirolaterals with 90° angles, drawn on graph paper. In 1970, Odds discovered triangular and hexagonal spirolateral, with 60° and 120° angles, can be drawn on isometric[3] (triangular) graph paper.[4] Odds wrote to Martin Gardner who encouraged him to publish the results in Mathematics Teacher[5] in 1973.[3]
The process can be represented in turtle graphics, alternating turn angle and move forward instructions, but limiting the turn to a fixed rational angle.[2]
The smallest golygon is a spirolateral, 790°4, made with 7 right angles, and length 4 follow concave turns. Golygons are different in that they must close with a single sequence 1,2,3,..n, while a spirolateral will repeat that sequence until it closes.
Classifications
A simple spirolateral has turns all the same direction. of 360°. Sequential edge lengths can be expressed explicitly as (1,2,...,n)θ.
Note: The angle θ can be confusing because it represents the internal angle, while the supplementary
This defines an
A
A general spirolateral can turn left or right.
An unexpected closed spiralateral returns to the first vertex on a single cycle. Only general spirolaterals may not close. A golygon is a regular unexpected closed spiralateral that closes from the expected direction. An irregular unexpected closed spiralateral is one that returns to the first point but from the wrong direction. For example 790°4. It takes 4 cycles to return to the start in the correct direction.[2]
A modern spirolateral, also called a loop-de-loops[7] by Educator Anna Weltman, is denoted by (i1,...,in)θ, allowing any sequence of integers as the edge lengths, i1 to in.[8] For example, (2,3,4)90° has edge lengths 2,3,4 repeating. Opposite direction turns can be given a negative integer edge length. For example, a crossed rectangle can be given as (1,2,−1,−2)θ.
An open spirolateral never closes. A simple spirolateral, nθ, never closes if nθ is a multiple of 360°, gcd(p,n) = p. A general spirolateral can also be open if half of the angles are positive, half negative.
Closure
The number of cycles it takes to close a spirolateral, nθ, with k opposite turns, p/q=360/(180-θ) can be computed. Reduce fraction (p-2q)(n-2k)/2p = a/b. The figure repeats after b cycles, and complete a total
Explicitly, the number of cycles is 2p/d, where d=gcd((p-2q)(n-2k),2p). If d=2p, it closes on 1 cycle or never.
The number of cycles can be seen as the rotational symmetry order of the spirolateral.
- n90°
-
190°, 4 cycle, 1 turn
-
290°, 2 cycle, 1 turn
-
390°, 4 cycle, 3 turn
-
490°, never closes
-
590°, 4 cycle, 5 turn
-
690°, 2 cycle, 3 turn
-
790°, 4 cycle, 6 turns
-
890°, never closes
-
990°, 4 cycle, 9 turn
-
1090°, 2 cycle, 5 turn
- n60°
-
160°, 3 cycle, 1 turn
-
260°, 3 cycle, 2 turn
-
360°, never closes
-
460°, 3 cycle, 4 turn
-
560°, 3 cycle, 5 turn
-
660°, never closes
-
760°, 3 cycle, 7 turn
-
860°, 3 cycle, 8 turn
-
960°, never closes
-
1060°, 3 cycle, 10 turn
Small simple spirolaterals
Spirolaterals can be constructed from any rational divisor of 360°. The first table's columns sample angles from small regular polygons and second table from star polygons, with examples up to n = 6.
An equiangular polygon <p/q> has p vertices and q density. <np/nq> can be reduced by d = gcd(n,p).
- Small whole divisor angles
θ | 60° | 90° | 108° | 120° | 128 4/7° | 135° | 140° | 144° | 147 3/11° | 150° |
---|---|---|---|---|---|---|---|---|---|---|
180-θ Turn angle |
120° | 90° | 72° | 60° | 51 3/7° | 45° | 40° | 36° | 32 8/11° | 30° |
nθ \ p | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 |
1θ Regular {p} |
160° {3} |
190° {4} |
{5}
|
{6}
|
{7}
|
{8}
|
{9}
|
{10}
|
{11}
|
{12}
|
2θ Isogonal <2p/2> |
260° <6/2> |
290° <8/2> → <4> |
2108° <10/2> |
2120° <12/2> → <6> |
2128.57° <14/2> |
2135° <16/2> → <8> |
2140° <18/2> |
2144° <20/2> → <10> |
2147° <22/2> |
2150° <24/2> → <12> |
3θ 2-isogonal <3p/3> |
360° open |
390° <12/3> |
3108° <15/3> |
3120° <18/3> → <6> |
3128.57° <21/3> |
3135° <24/3> |
3140° <27/3> → <9> |
3144° <30/3> |
3147° <33/3> |
3150° <36/3> → <12> |
4θ 3-isogonal <4p/4> |
460° <12/4> |
490° open |
4108° <20/4> |
4120° <24/4> → <12/2> |
4128.57° <28/4> |
4135° <32/4> → <8> |
4140° <36/4> |
4144° <40/4> → <20/2> |
4147° <44/4> |
4150° <48/4> → <12> |
5θ 4-isogonal <5p/5> |
560° <15/5> |
590° <20/5> |
5108° open |
5120° <30/5> |
5128.57° <35/5> |
5135° <40/5> |
5140° <45/5> |
5144° <50/5> → <10> |
5147° <55/5> |
5150° <60/5> |
6θ 5-isogonal <6p/6> |
660° Open |
690° <24/6> → <12/3> |
6108° <30/6> |
6120° Open |
6128.57° <42/6> |
6135° <48/6> → <24/3> |
6140° <54/6> → <18/2> |
6144° <60/6> → <30/3> |
6147° <66/6> |
6150° <72/6> → <12> |
- Small rational divisor angles
θ | 15° | 16 4/11° | 20° | 25 5/7° | 30° | 36° | 45° | 49 1/11° | 72° | 77 1/7° | 81 9/11° | 100° | 114 6/11° |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|
180-θ Turn angle |
165° | 163 7/11° | 160° | 154 2/7° | 150° | 144° | 135° | 130 10/11° | 108° | 102 6/7° | 98 2/11° | 80° | 65 5/11° |
nθ \ p/q | 24/11 | 11/5 | 9/4 | 7/3 | 12/5 | 5/2 | 8/3 | 11/4 | 10/3 | 7/2 | 11/3 | 9/2 | 11/2 |
1θ Regular {p/q} |
{24/11}
|
116.36° {11/5} |
120° {9/4} |
125.71° {7/3} |
130° {12/5} |
136° {5/2} |
145° {8/3} |
149.10° {11/4} |
172° {10/3} |
177.14° {7/2} |
181.82° {11/3} |
1100° {9/2} |
1114.55° {11/2} |
2θ Isogonal <2p/2q> |
215° <48/22> → <24/11> |
216.36° <22/10> |
220° <18/8> |
225.71° <14/6> |
230° <24/10> → <12/5> |
236° <10/4> |
245° <16/6> → <8/3> |
249.10° <22/8> |
272° <20/6> → <10/3> |
277.14° <14/4> |
281.82° <22/6> |
2100° <18/4> |
2114.55° <22/4> |
3θ 2-isogonal <3p/3q> |
315° <72/33> → <24/11> |
316.36° <33/15> |
320° <27/12> → <9/4> |
325.71° <21/9> |
330° <36/15> → <12/5> |
336° <15/6> |
345° <24/9> |
349.10° <33/12> |
372° <30/9> |
377.14° <21/6> |
381.82° <33/9> |
3100° <27/6> → <9/2> |
3114.55° <33/6> |
4θ 3-isogonal <4p/4q> |
415° <96/44> → <24/11> |
416.36° <44/20> |
420° <36/12> |
425.71° <28/4> |
430° <48/40> → <12/5> |
436° <20/8> |
445° <32/12> → <8/3> |
449.10° <44/16> |
472° <40/12> → <20/6> |
477.14° <28/8> |
481.82° <44/12> |
4100° <36/8> |
4114.55° <44/8> |
5θ 4-isogonal <5p/5q> |
515° <120/55> |
516.36° <55/25> |
520° <45/20> |
525.71° <35/15> |
530° <60/25> |
536° open |
545° <40/15> |
549.10° <55/20> |
572° <50/15> → <10/3> |
577.14° <35/10> |
581.82° <55/15> |
5100° <45/10> |
5114.55° <55/10> |
6θ 5-isogonal <6p/6q> |
615° <144/66> → <24/11> |
616.36° <66/30> |
620° <54/24> → <18/8> |
625.71° <42/18> |
630° <72/30> → <12/5> |
636° <30/12> |
645° <48/18> → <24/9> |
649.10° <66/24> |
672° <60/18> → <30/9> |
677.14° <42/12> |
681.82° <66/18> |
6100° <54/12> → <18/4> |
6114.55° <66/12> |
See also
- Turtle graphics represent a computer language that defines an open or close path as move lengths and turn angles.
References
- ^ a b Gardner, M. Worm Paths Ch. 17 Knotted Doughnuts and Other Mathematical Entertainments New York: W. H. Freeman, pp. 205-221, 1986. [1]
- ^ a b c d e Abelson, Harold, diSessa, Andera, 1980, Turtle Geometry, MIT Press, pp.37-39, 120-122
- ^ a b Focus on...Spirolaterals Secondary Magazine Issue 78
- ^ [2] Frank Odds, British biochemist, 8/29/1945-7/7/2020
- ^ Odds, Frank C. Spirolaterals, Mathematics Teacher, Feb 1973, Volume 66: Issue 2, pp. 121–124 DOI
- ^ Weisstein, Eric W. "Spirolateral". MathWorld.
- ^ Anna Weltman, This is Not a Math Book A Graphic Activity Book, Kane Miller; Act Csm edition, 2017
- ^ "Practice Multiplication with Simple Spirolateral Math Art". 23 July 2015.
- Alice Kaseberg Schwandt Spirolaterals: An advanced Investignation from an Elementary Standpoint, Mathematical Teacher, Vol 72, 1979, 166-169 [3]
- Margaret Kenney and Stanley Bezuszka, Square Spirolaterals Mathematics Teaching, Vol 95, 1981, pp. 22–27 [4]
- Gascoigne, Serafim Turtle Fun LOGO for the Spectrum 48K pp 42-46 | Spirolaterals 1985
- Wells, D. The Penguin Dictionary of Curious and Interesting Geometry London: Penguin, pp. 239–241, 1991.
- Krawczyk, Robert, "Hilbert's Building Blocks", Mathematics & Design, The University of the Basque Country, pp. 281–288, 1998.
- Krawczyk, Robert, Spirolaterals, Complexity from Simplicity, International Society of Arts, Mathematics and Architecture 99, The University of the Basque Country, pp. 293–299, 1999. [5]
- Krawczyk, Robert J. The Art of Spirolateral reversals [6]
External links
- Spirolaterals Javascript App