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Constructible polygons (with straightedge and compass)
A constructible polygon is a regular polygon that can be constructed with straightedge and compass.
Carl Friedrich Gauss proved the constructibility of the regular 17-gon in 1796. Five years later, he developed the theory of Gaussian periods in his Disquisitiones Arithmeticae. This theory allowed him to formulate a sufficient condition for the constructibility of regular polygons
- A regular -gon can be constructed with straightedge and compass if is the product of a power of 2 and any number of distinct Fermat primes.
Gauss stated without proof that this condition was also necessary, but never published his proof. A full proof of necessity was given by Pierre Wantzel in 1837.
Constructible odd-sided polygons (with straightedge and compass)
Since there are
5 known Fermat primes,
| { F0 , F1 , F2 , F3 , F4 } |
= {3, 5, 17, 257, 65537} (see
A019434), then there are
| () + () + () + () + () + () = 1 + 5 + 10 + 10 + 5 + 1 = 32 = 2 5 |
known constructible odd-sided polygons (actually 31 since a polygon has at least 3 sides).
A004729 Divisors of 2 32 − 1 (polygons with an odd number of sides constructible with ruler and compass).
-
{1, 3, 5, 15, 17, 51, 85, 255, 257, 771, 1285, 3855, 4369, 13107, 21845, 65535, 65537, 196611, 327685, 983055, 1114129, 3342387, 5570645, 16711935, 16843009, 50529027, 84215045, 252645135, 286331153, 858993459, 1431655765, 4294967295}
A045544 Odd values of
for which a regular
-gon can be constructed by compass and straightedge.
-
{3, 5, 15, 17, 51, 85, 255, 257, 771, 1285, 3855, 4369, 13107, 21845, 65535, 65537, 196611, 327685, 983055, 1114129, 3342387, 5570645, 16711935, 16843009, 50529027, 84215045, 252645135, 286331153, 858993459, 1431655765, 4294967295, ?}
If one interprets the rows of Sierpiński’s triangle as a binary number, the first 32 rows give the 32 products of distinct Fermat primes, 1 (empty product) for row 0 and the 31 non-empty products of distinct Fermat primes.
A001317 Sierpiński’s triangle (Pascal’s triangle mod 2) rows converted to decimal.
-
{1, 3, 5, 15, 17, 51, 85, 255, 257, 771, 1285, 3855, 4369, 13107, 21845, 65535, 65537, 196611, 327685, 983055, 1114129, 3342387, 5570645, 16711935, 16843009, 50529027, 84215045, 252645135, 286331153, 858993459, 1431655765, 4294967295, 4294967297, ...}
Sierpiński’s triangle rows
|
|
|
|
Factorization into Fermat numbers
|
| 0
|
1
|
1
|
|
| 1
|
11
|
3
|
(11)2 = 3 = F0
|
| 2
|
101
|
5
|
(101)2 = 5 = F1
|
| 3
|
1111
|
15
|
(11)2 ⋅ (101)2 = 3 ⋅ 5 = F0 F1
|
| 4
|
10001
|
17
|
(10001)2 = 17 = F2
|
| 5
|
110011
|
51
|
(11)2 ⋅ (10001)2 = 3 ⋅ 17 = F0 F2
|
| 6
|
1010101
|
85
|
(101)2 ⋅ (10001)2 = 5 ⋅ 17 = F1 F2
|
| 7
|
11111111
|
255
|
(11)2 ⋅ (101)2 ⋅ (10001)2 = 3 ⋅ 5 ⋅ 17 = F0 F1 F2
|
| 8
|
100000001
|
257
|
(100000001)2 = 257 = F3
|
| 9
|
1100000011
|
771
|
(11)2 ⋅ (100000001)2 = 3 ⋅ 257 = F0 F3
|
| 10
|
10100000101
|
1285
|
(101)2 ⋅ (100000001)2 = 5 ⋅ 257 = F1 F3
|
| 11
|
111100001111
|
3855
|
(11)2 ⋅ (101)2 ⋅ (100000001)2 = 3 ⋅ 5 ⋅ 257 = F0 F1 F3
|
| 12
|
1000100010001
|
4369
|
(10001)2 ⋅ (100000001)2 = 17 ⋅ 257 = F2 F3
|
| 13
|
11001100110011
|
13107
|
(11)2 ⋅ (10001)2 ⋅ (100000001)2 = 3 ⋅ 17 ⋅ 257 = F0 F2 F3
|
| 14
|
101010101010101
|
21845
|
(101)2 ⋅ (10001)2 ⋅ (100000001)2 = 5 ⋅ 17 ⋅ 257 = F1 F2 F3
|
| 15
|
1111111111111111
|
65535
|
(11)2 ⋅ (101)2 ⋅ (10001)2 ⋅ (100000001)2 = 3 ⋅ 5 ⋅ 17 ⋅ 257 = F0 F1 F2 F3
|
| 16
|
10000000000000001
|
65537
|
(10000000000000001)2 = 65537 = F4
|
| 17
|
110000000000000011
|
196611
|
(11)2 ⋅ (10000000000000001)2 = 3 ⋅ 65537 = F0 F4
|
| 18
|
1010000000000000101
|
327685
|
(101)2 ⋅ (10000000000000001)2 = 5 ⋅ 65537 = F1 F4
|
| 19
|
11110000000000001111
|
983055
|
(11)2 ⋅ (101)2 ⋅ (10000000000000001)2 = 3 ⋅ 5 ⋅ 65537 = F0 F1 F4
|
| 20
|
100010000000000010001
|
1114129
|
(10001)2 ⋅ (10000000000000001)2 = 17 ⋅ 65537 = F2 F4
|
| 21
|
1100110000000000110011
|
3342387
|
(11)2 ⋅ (10001)2 ⋅ (10000000000000001)2 = 3 ⋅ 17 ⋅ 65537 = F0 F2 F4
|
| 22
|
10101010000000001010101
|
5570645
|
(101)2 ⋅ (10001)2 ⋅ (10000000000000001)2 = 5 ⋅ 17 ⋅ 65537 = F1 F2 F4
|
| 23
|
111111110000000011111111
|
16711935
|
(11)2 ⋅ (101)2 ⋅ (10001)2 ⋅ (10000000000000001)2 = 3 ⋅ 5 ⋅ 17 ⋅ 65537 = F0 F1 F2 F4
|
| 24
|
1000000010000000100000001
|
16843009
|
(100000001)2 = (10000000000000001)2 = 257 ⋅ 65537 = F3 F4
|
| 25
|
11000000110000001100000011
|
50529027
|
(11)2 ⋅ (100000001)2 = (10000000000000001)2 = 3 ⋅ 257 ⋅ 65537 = F0 F3 F4
|
| 26
|
101000001010000010100000101
|
84215045
|
(101)2 ⋅ (100000001)2 = (10000000000000001)2 = 5 ⋅ 257 ⋅ 65537 = F1 F3 F4
|
| 27
|
1111000011110000111100001111
|
252645135
|
(11)2 ⋅ (101)2 ⋅ (100000001)2 = (10000000000000001)2 = 3 ⋅ 5 ⋅ 257 ⋅ 65537 = F0 F1 F3 F4
|
| 28
|
10001000100010001000100010001
|
286331153
|
(10001)2 ⋅ (100000001)2 = (10000000000000001)2 = 17 ⋅ 257 ⋅ 65537 = F2 F3 F4
|
| 29
|
110011001100110011001100110011
|
858993459
|
(11)2 ⋅ (10001)2 ⋅ (100000001)2 = (10000000000000001)2 = 3 ⋅ 17 ⋅ 257 ⋅ 65537 = F0 F2 F3 F4
|
| 30
|
1010101010101010101010101010101
|
1431655765
|
(101)2 ⋅ (10001)2 ⋅ (100000001)2 = (10000000000000001)2 = 5 ⋅ 17 ⋅ 257 ⋅ 65537 = F1 F2 F3 F4
|
| 31
|
11111111111111111111111111111111
|
4294967295
|
(11)2 ⋅ (101)2 ⋅ (10001)2 ⋅ (100000001)2 = (10000000000000001)2 = 3 ⋅ 5 ⋅ 17 ⋅ 257 ⋅ 65537 = F0 F1 F2 F3 F4
|
| 32
|
100000000000000000000000000000001
|
4294967297*
|
(100000000000000000000000000000001)2 = 4294967297* = F5
|
* F5 = 4294967297 = 641 ⋅ 6700417 is the first composite Fermat number. From here on no other Fermat number is known to be prime.
Rows
give
, the
th Fermat number.
For
1 to
31, we get all the non-empty products of the
5 known
Fermat primes, giving the number of sides of
constructible odd-sided polygons. If there are no other Fermat primes, there are then no more constructible (with straightedge and compass) odd-sided polygons.
It can easily be proved by induction that the rows of Sierpinski’s triangle interpreted as a binary number are products of distinct Fermat numbers.
Inductive proof:
- Base case: For rows 0 and 1, we get 1 (empty product) and 3 respectively, the products of distinct Fermat numbers in ;
- Inductive hypothesis: Assume all rows from to are products of distinct Fermat numbers in .
If row
is
-
| row (k ) = Fi α i , αi ∈ {0, 1}, |
then by the fractal property of Sierpinski’s triangle, row
| 2 n + k, 0 ≤ k ≤ 2 n − 1, |
is
-
| row (2 n + k ) = row (k ) Fn . |
