User:Lériendil/On the primes: Difference between revisions
From Xenharmonic Reference
| (6 intermediate revisions by 2 users not shown) | |||
| Line 41: | Line 41: | ||
| 5 | | 5 | ||
| H, U, T* | | H, U, T* | ||
| style="background-color: #BFD7FF;"| 2×3 | | style="background-color: #BFD7FF; color: #000000;"| 2×3 | ||
| style="background-color: #FFFFFF;"| 2×2 | | style="background-color: #FFFFFF; color: #000000;"| 2×2 | ||
| style="background-color: #BFD7FF;"| 2.3 | | style="background-color: #BFD7FF; color: #000000;"| 2.3 | ||
| style="background-color: #BFD7FF;"| S<sub>1</sub>2: [[3/2]] | | style="background-color: #BFD7FF; color: #000000;"| S<sub>1</sub>2: [[3/2]] | ||
|- | |- | ||
| 7 | | 7 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: #BFD7FF;"| 2×3 | | style="background-color: #BFD7FF; color: #000000;"| 2×3 | ||
| style="background-color: #FFFFFF;"| 2×2<sup>2</sup> | | style="background-color: #FFFFFF; color: #000000;"| 2×2<sup>2</sup> | ||
| style="background-color: #BFD7FF;"| 2.3 | | style="background-color: #BFD7FF; color: #000000;"| 2.3 | ||
| style="background-color: #BFD7FF;"| S2: [[4/3]] | | style="background-color: #BFD7FF; color: #000000;"| S2: [[4/3]] | ||
|- | |- | ||
| 11 | | 11 | ||
| H, L, T | | H, L, T | ||
| style="background-color: #BFD7FF;"| 2×3×2 | | style="background-color: #BFD7FF; color: #000000;"| 2×3×2 | ||
| style="background-color: #FFBFEF;"| 2×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 2×'''5''' | ||
| style="background-color: #FFBFEF;"| 2.3'''.5''' | | style="background-color: #FFBFEF; color: #000000;"| 2.3'''.5''' | ||
| style="background-color: #FFBFEF;"| S<sub>1</sub>3: [[6/5]] | | style="background-color: #FFBFEF; color: #000000;"| S<sub>1</sub>3: [[6/5]] | ||
|- | |- | ||
| 13 | | 13 | ||
| C, U, Th | | C, U, Th | ||
| style="background-color: #BFD7FF;"| 2×3×2 | | style="background-color: #BFD7FF; color: #000000;"| 2×3×2 | ||
| style="background-color: #C7BFDF;"| 2×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 2×'''7''' | ||
| style="background-color: #C7BFDF;"| 2.3'''.7''' | | style="background-color: #C7BFDF; color: #000000;"| 2.3'''.7''' | ||
| style="background-color: #C7BFDF;"| | | style="background-color: #C7BFDF; color: #000000;"| | ||
|- | |- | ||
| 17 | | 17 | ||
| H, U, Th | | H, U, Th | ||
| style="background-color: #BFD7FF;"| 2×3×'''3''' | | style="background-color: #BFD7FF; color: #000000;"| 2×3×'''3''' | ||
| style="background-color: #FFFFFF;"| 2×2<sup>3</sup> | | style="background-color: #FFFFFF; color: #000000;"| 2×2<sup>3</sup> | ||
| style="background-color: #BFD7FF;"| 2.3 | | style="background-color: #BFD7FF; color: #000000;"| 2.3 | ||
| style="background-color: #BFD7FF;"| S3: [[9/8]] | | style="background-color: #BFD7FF; color: #000000;"| S3: [[9/8]] | ||
|- | |- | ||
| 19 | | 19 | ||
| C, L, T | | C, L, T | ||
| style="background-color: #BFD7FF;"| 2×3×'''3''' | | style="background-color: #BFD7FF; color: #000000;"| 2×3×'''3''' | ||
| style="background-color: #FFBFEF;"| 2×2×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 2×2×'''5''' | ||
| style="background-color: #FFBFEF;"| 2.3'''.5''' | | style="background-color: #FFBFEF; color: #000000;"| 2.3'''.5''' | ||
| style="background-color: #FFBFEF;"| S<sub>1</sub>4: [[10/9]] | | style="background-color: #FFBFEF; color: #000000;"| S<sub>1</sub>4: [[10/9]] | ||
|- | |- | ||
| 23 | | 23 | ||
| H, L, Th | | H, L, Th | ||
| style="background-color: #BFD7FF;"| 2×3×2<sup>2</sup> | | style="background-color: #BFD7FF; color: #000000;"| 2×3×2<sup>2</sup> | ||
| style="background-color: #F7C7BF;"| 2×'''11''' | | style="background-color: #F7C7BF; color: #000000;"| 2×'''11''' | ||
| style="background-color: #F7C7BF;"| 2.3'''.11''' | | style="background-color: #F7C7BF; color: #000000;"| 2.3'''.11''' | ||
| style="background-color: #F7C7BF;"| | | style="background-color: #F7C7BF; color: #000000;"| | ||
|- | |- | ||
| 29 | | 29 | ||
| H, U, T | | H, U, T | ||
| style="background-color: #FFBFEF;"| 2×3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 2×3×'''5''' | ||
| style="background-color: #C7BFDF;"| 2×2×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 2×2×'''7''' | ||
| style="background-color: #C7BFDF;"| 2.3'''.5.7''' | | style="background-color: #C7BFDF; color: #000000;"| 2.3'''.5.7''' | ||
| style="background-color: #C7BFDF;"| S<sub>1</sub>5: [[15/14]] | | style="background-color: #C7BFDF; color: #000000;"| S<sub>1</sub>5: [[15/14]] | ||
|- | |- | ||
| 31 | | 31 | ||
| C, L, T | | C, L, T | ||
| style="background-color: #FFBFEF;"| 2×3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 2×3×'''5''' | ||
| style="background-color: #FFFFFF;"| 2×2<sup>4</sup> | | style="background-color: #FFFFFF; color: #000000;"| 2×2<sup>4</sup> | ||
| style="background-color: #FFBFEF;"| 2.3'''.5''' | | style="background-color: #FFBFEF; color: #000000;"| 2.3'''.5''' | ||
| style="background-color: #FFBFEF;"| S4: [[16/15]] | | style="background-color: #FFBFEF; color: #000000;"| S4: [[16/15]] | ||
|- | |- | ||
| 37 | | 37 | ||
| C, U, Th | | C, U, Th | ||
| style="background-color: #BFD7FF;"| 2×3×2×'''3''' | | style="background-color: #BFD7FF; color: #000000;"| 2×3×2×'''3''' | ||
| style="background-color: #DFD7BF;"| 2×'''19''' | | style="background-color: #DFD7BF; color: #000000;"| 2×'''19''' | ||
| style="background-color: #DFD7BF;"| 2.3'''.19''' | | style="background-color: #DFD7BF; color: #000000;"| 2.3'''.19''' | ||
| style="background-color: #DFD7BF;"| | | style="background-color: #DFD7BF; color: #000000;"| | ||
|- | |- | ||
| 41 | | 41 | ||
| H, U, T | | H, U, T | ||
| style="background-color: #C7BFDF;"| 2×3×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 2×3×'''7''' | ||
| style="background-color: #FFBFEF;"| 2×2<sup>2</sup>×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 2×2<sup>2</sup>×'''5''' | ||
| style="background-color: #C7BFDF;"| 2.3'''.5.7''' | | style="background-color: #C7BFDF; color: #000000;"| 2.3'''.5.7''' | ||
| style="background-color: #C7BFDF;"| S<sub>1</sub>6: [[21/20]] | | style="background-color: #C7BFDF; color: #000000;"| S<sub>1</sub>6: [[21/20]] | ||
|- | |- | ||
| 43 | | 43 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: #C7BFDF;"| 2×3×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 2×3×'''7''' | ||
| style="background-color: #F7C7BF;"| 2×2×'''11''' | | style="background-color: #F7C7BF; color: #000000;"| 2×2×'''11''' | ||
| style="background-color: #F7C7BF;"| 2.3'''.7.11''' | | style="background-color: #F7C7BF; color: #000000;"| 2.3'''.7.11''' | ||
| style="background-color: #F7C7BF;"| | | style="background-color: #F7C7BF; color: #000000;"| | ||
|- | |- | ||
| 47 | | 47 | ||
| H, L, Th | | H, L, Th | ||
| style="background-color: #BFD7FF;"| 2×3×2<sup>3</sup> | | style="background-color: #BFD7FF; color: #000000;"| 2×3×2<sup>3</sup> | ||
| style="background-color: #FFDFBF;"| 2×'''23''' | | style="background-color: #FFDFBF; color: #000000;"| 2×'''23''' | ||
| style="background-color: #FFDFBF;"| 2.3'''.23''' | | style="background-color: #FFDFBF; color: #000000;"| 2.3'''.23''' | ||
| style="background-color: #FFDFBF;"| | | style="background-color: #FFDFBF; color: #000000;"| | ||
|- | |- | ||
| 53 | | 53 | ||
| H, U, Th | | H, U, Th | ||
| style="background-color: #BFD7FF;"| 2×3×'''3<sup>2</sup>''' | | style="background-color: #BFD7FF; color: #000000;"| 2×3×'''3<sup>2</sup>''' | ||
| style="background-color: #D7BFEF;"| 2×2×'''13''' | | style="background-color: #D7BFEF; color: #000000;"| 2×2×'''13''' | ||
| style="background-color: #D7BFEF;"| 2.3'''.13''' | | style="background-color: #D7BFEF; color: #000000;"| 2.3'''.13''' | ||
| style="background-color: #D7BFEF;"| | | style="background-color: #D7BFEF;"| | ||
| Line 157: | Line 157: | ||
{| class="wikitable center-all" | {| class="wikitable center-all" | ||
! colspan="2" |Prime | ! colspan="2" |Prime | ||
! colspan="3" | | ! colspan="3" |2-adjacent integers | ||
|- | |- | ||
! Value | ! Value | ||
| Line 167: | Line 167: | ||
| 5 | | 5 | ||
| H, U, T* | | H, U, T* | ||
| style="background-color: #BFD7FF;"| 3 | | style="background-color: #BFD7FF; color: #000000;"| 3 | ||
| style="background-color: #FFFFFF;"| '''7''' | | style="background-color: #FFFFFF; color: #000000;"| '''7''' | ||
| style="background-color: #BFD7FF;"| 3.7 | | style="background-color: #BFD7FF; color: #000000;"| 3.7 | ||
|- | |- | ||
| 7 | | 7 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: #BFD7FF;"| 3×3 | | style="background-color: #BFD7FF; color: #000000;"| 3×3 | ||
| style="background-color: #FFFFFF;"| '''5''' | | style="background-color: #FFFFFF; color: #000000;"| '''5''' | ||
| style="background-color: #BFD7FF;"| 3.5 | | style="background-color: #BFD7FF; color: #000000;"| 3.5 | ||
|- | |- | ||
| 11 | | 11 | ||
| H, L, T | | H, L, T | ||
| style="background-color: #BFD7FF;"| 3×3 | | style="background-color: #BFD7FF; color: #000000;"| 3×3 | ||
| style="background-color: #FFFFFF;"| '''13''' | | style="background-color: #FFFFFF; color: #000000;"| '''13''' | ||
| style="background-color: #BFD7FF;"| 3.13 | | style="background-color: #BFD7FF; color: #000000;"| 3.13 | ||
|- | |- | ||
| 13 | | 13 | ||
| C, U, Th | | C, U, Th | ||
| style="background-color: #FFBFEF;"| 3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 3×'''5''' | ||
| style="background-color: #FFFFFF;"| '''11''' | | style="background-color: #FFFFFF; color: #000000;"| '''11''' | ||
| style="background-color: #FFBFEF;"| 3.'''5'''.11 | | style="background-color: #FFBFEF; color: #000000;"| 3.'''5'''.11 | ||
|- | |- | ||
| 17 | | 17 | ||
| H, U, Th | | H, U, Th | ||
| style="background-color: #FFBFEF;"| 3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 3×'''5''' | ||
| style="background-color: #FFFFFF;"| '''19''' | | style="background-color: #FFFFFF; color: #000000;"| '''19''' | ||
| style="background-color: #FFBFEF;"| 3.'''5'''.19 | | style="background-color: #FFBFEF; color: #000000;"| 3.'''5'''.19 | ||
|- | |- | ||
| 19 | | 19 | ||
| C, L, T | | C, L, T | ||
| style="background-color: #C7BFDF;"| 3×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 3×'''7''' | ||
| style="background-color: #FFFFFF;"| '''17''' | | style="background-color: #FFFFFF; color: #000000;"| '''17''' | ||
| style="background-color: #C7BFDF;"| 3.'''7'''.17 | | style="background-color: #C7BFDF; color: #000000;"| 3.'''7'''.17 | ||
|- | |- | ||
| '''23''' | | '''23''' | ||
| '''H, L, Th''' | | '''H, L, Th''' | ||
| style="background-color: #C7BFDF;"| 3×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| 3×'''7''' | ||
| style="background-color: #FFBFEF;"| '''5'''<sup>2</sup> | | style="background-color: #FFBFEF; color: #000000;"| '''5'''<sup>2</sup> | ||
| style="background-color: #C7BFDF;"| 3.'''5.7''' | | style="background-color: #C7BFDF; color: #000000;"| 3.'''5.7''' | ||
|- | |- | ||
| 29 | | 29 | ||
| H, U, T | | H, U, T | ||
| style="background-color: #BFD7FF;"| 3×3<sup>2</sup> | | style="background-color: #BFD7FF; color: #000000;"| 3×3<sup>2</sup> | ||
| style="background-color: #FFFFFF;"| '''31''' | | style="background-color: #FFFFFF; color: #000000;"| '''31''' | ||
| style="background-color: #BFD7FF;"| 3.31 | | style="background-color: #BFD7FF; color: #000000;"| 3.31 | ||
|- | |- | ||
| 31 | | 31 | ||
| C, L, T | | C, L, T | ||
| style="background-color: #F7C7BF;"| 3×'''11''' | | style="background-color: #F7C7BF; color: #000000;"| 3×'''11''' | ||
| style="background-color: #FFFFFF;"| '''29''' | | style="background-color: #FFFFFF; color: #000000;"| '''29''' | ||
| style="background-color: #F7C7BF;"| 3.'''11'''.29 | | style="background-color: #F7C7BF; color: #000000;"| 3.'''11'''.29 | ||
|- | |- | ||
| '''37''' | | '''37''' | ||
| '''C, U, Th''' | | '''C, U, Th''' | ||
| style="background-color: #D7BFEF;"| 3×'''13''' | | style="background-color: #D7BFEF; color: #000000;"| 3×'''13''' | ||
| style="background-color: #C7BFDF;"| '''5'''×'''7''' | | style="background-color: #C7BFDF; color: #000000;"| '''5'''×'''7''' | ||
| style="background-color: #D7BFEF;"| 3.'''5.7.13''' | | style="background-color: #D7BFEF; color: #000000;"| 3.'''5.7.13''' | ||
|- | |- | ||
| 41 | | 41 | ||
| H, U, T | | H, U, T | ||
| style="background-color: #D7BFEF;"| 3×'''13''' | | style="background-color: #D7BFEF; color: #000000;"| 3×'''13''' | ||
| style="background-color: #FFFFFF;"| '''43''' | | style="background-color: #FFFFFF; color: #000000;"| '''43''' | ||
| style="background-color: #D7BFEF;"| 3.'''13'''.43 | | style="background-color: #D7BFEF; color: #000000;"| 3.'''13'''.43 | ||
|- | |- | ||
| 43 | | 43 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: #FFBFEF;"| 3×3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 3×3×'''5''' | ||
| style="background-color: #FFFFFF;"| '''41''' | | style="background-color: #FFFFFF; color: #000000;"| '''41''' | ||
| style="background-color: #FFBFEF;"| 3.'''5'''.41 | | style="background-color: #FFBFEF; color: #000000;"| 3.'''5'''.41 | ||
|- | |- | ||
| '''47''' | | '''47''' | ||
| '''H, L, Th''' | | '''H, L, Th''' | ||
| style="background-color: #FFBFEF;"| 3×3×'''5''' | | style="background-color: #FFBFEF; color: #000000;"| 3×3×'''5''' | ||
| style="background-color: #C7BFDF;"| '''7<sup>2</sup>''' | | style="background-color: #C7BFDF; color: #000000;"| '''7<sup>2</sup>''' | ||
| style="background-color: #C7BFDF;"| 3.'''5.7''' | | style="background-color: #C7BFDF; color: #000000;"| 3.'''5.7''' | ||
|- | |- | ||
| '''53''' | | '''53''' | ||
| '''H, U, Th''' | | '''H, U, Th''' | ||
| style="background-color: #F7F7BF;"| 3×'''17''' | | style="background-color: #F7F7BF; color: #000000;"| 3×'''17''' | ||
| style="background-color: #F7C7BF;"| '''5'''×'''11''' | | style="background-color: #F7C7BF; color: #000000;"| '''5'''×'''11''' | ||
| style="background-color: #F7F7BF;"| 3.'''5.11.17''' | | style="background-color: #F7F7BF; color: #000000;"| 3.'''5.11.17''' | ||
|} | |} | ||
| Line 269: | Line 269: | ||
{| class="wikitable center-all" | {| class="wikitable center-all" | ||
! colspan="2" |Prime | ! colspan="2" |Prime | ||
! colspan="3" | | ! colspan="3" |3-adjacent integers | ||
|- | |- | ||
! Value | ! Value | ||
| Line 279: | Line 279: | ||
| 5 | | 5 | ||
| H, U, T* | | H, U, T* | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup>×2 | ||
| style="background-color: #FFFFFF;"| | | style="background-color: #FFFFFF; color: #000000;"| 2 | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2 | ||
|- | |- | ||
| 7 | | 7 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup> | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2×'''5''' | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2.'''5''' | ||
|- | |- | ||
| 11 | | 11 | ||
| H, L, T | | H, L, T | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup>×2 | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2×'''7''' | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2.'''7''' | ||
|- | |- | ||
| 13 | | 13 | ||
| C, U, Th | | C, U, Th | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup>×2<sup>2</sup> | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2×'''5''' | ||
| style="background-color: #FFBFEF;"| | | style="background-color: #FFBFEF; color: #000000;"| 2.'''5''' | ||
|- | |- | ||
| 17 | | 17 | ||
| H, U, Th | | H, U, Th | ||
| style="background-color: #FFBFEF;"| | | style="background-color: #FFBFEF; color: #000000;"| 2<sup>2</sup>×'''5''' | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2×'''7''' | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2.'''5.7''' | ||
|- | |- | ||
| 19 | | 19 | ||
| C, L, T | | C, L, T | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup>×2<sup>2</sup> | ||
| style="background-color: # | | style="background-color: #F7C7BF; color: #000000;"| 2×'''11''' | ||
| style="background-color: # | | style="background-color: #F7C7BF; color: #000000;"| 2.'''11''' | ||
|- | |- | ||
| 23 | | 23 | ||
| H, L, Th | | H, L, Th | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2<sup>2</sup>×'''5''' | ||
| style="background-color: # | | style="background-color: #D7BFEF; color: #000000;"| 2×'''13''' | ||
| style="background-color: # | | style="background-color: #D7BFEF; color: #000000;"| 2.'''5.13''' | ||
|- | |- | ||
| 29 | | 29 | ||
| H, U, T | | H, U, T | ||
| style="background-color: # | | style="background-color: #FFFFFF; color: #000000;"| 2<sup>2</sup>×2<sup>3</sup> | ||
| style="background-color: # | | style="background-color: #D7BFEF; color: #000000;"| 2×'''13''' | ||
| style="background-color: # | | style="background-color: #D7BFEF; color: #000000;"| 2.'''13''' | ||
|- | |- | ||
| 31 | | 31 | ||
| C, L, T | | C, L, T | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2<sup>2</sup>×'''7''' | ||
| style="background-color: # | | style="background-color: #F7F7BF; color: #000000;"| 2×'''17''' | ||
| style="background-color: # | | style="background-color: #F7F7BF; color: #000000;"| 2.'''7.17''' | ||
|- | |- | ||
| 37 | | 37 | ||
| C, U, Th | | C, U, Th | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2<sup>2</sup>×2×'''5''' | ||
| style="background-color: # | | style="background-color: #F7F7BF; color: #000000;"| 2×'''17''' | ||
| style="background-color: # | | style="background-color: #F7F7BF; color: #000000;"| 2.'''5.17''' | ||
|- | |- | ||
| 41 | | 41 | ||
| H, U, T | | H, U, T | ||
| style="background-color: # | | style="background-color: #F7C7BF; color: #000000;"| 2<sup>2</sup>×'''11''' | ||
| style="background-color: # | | style="background-color: #DFD7BF; color: #000000;"| 2×'''19''' | ||
| style="background-color: # | | style="background-color: #DFD7BF; color: #000000;"| 2.'''11.19''' | ||
|- | |- | ||
| 43 | | 43 | ||
| C, L, Th | | C, L, Th | ||
| style="background-color: #FFBFEF;"| | | style="background-color: #FFBFEF; color: #000000;"| 2<sup>2</sup>×2×'''5''' | ||
| style="background-color: # | | style="background-color: #FFDFBF; color: #000000;"| 2×'''23''' | ||
| style="background-color: # | | style="background-color: #FFDFBF; color: #000000;"| 2.'''23''' | ||
|- | |- | ||
| 47 | | 47 | ||
| H, L, Th | | H, L, Th | ||
| style="background-color: # | | style="background-color: #F7C7BF; color: #000000;"| 2<sup>2</sup>×'''11''' | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2×'''5'''<sup>2</sup> | ||
| style="background-color: # | | style="background-color: #F7C7BF; color: #000000;"| 2.'''5.11''' | ||
|- | |- | ||
| 53 | | 53 | ||
| H, U, Th | | H, U, Th | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2<sup>2</sup>×2×'''7''' | ||
| style="background-color: # | | style="background-color: #FFBFEF; color: #000000;"| 2×'''5'''<sup>2</sup> | ||
| style="background-color: # | | style="background-color: #C7BFDF; color: #000000;"| 2.'''5.7''' | ||
|} | |} | ||
=== Acentral relations === | === Acentral relations === | ||
Latest revision as of 17:28, 10 March 2026
The way each of the primes tends to behave within xenharmony is largely defined by the numbers that neighbor it. Every prime (bar 2) splits some superparticular in half, and that prime's neighbors are twice the numerator and denominator of that superparticular. Other isoharmonic sequences, such as those which differ by 2, 3, or 4, can also be used, but are much less likely to split intervals that belong to significantly lower prime-limits. However, the process of splitting superparticulars in half induces primes 2 and 3 necessarily, and so isoharmonies of deltas 2 and 3 are fundamental to no-twos or no-threes structures.
Modularity classes
Primes belonging to different residue classes modulo 4, 6, and 10 have meaningfully different properties in relation to splitting isoharmonies.
Modulo 4, primes (apart from 2) can be 4k+1 or 4k-1.
- 4k+1 primes (5, 13, 17, ...) we call "upper".
- 4k-1 primes (3, 7, 11, 19, ...) we call "lower".
- Upper × upper = lower × lower = upper. Upper × lower = lower.
Modulo 6, primes (apart from 2 and 3) can be 6k+1 or 6k-1.
- 6k+1 primes (7, 13, 19, ...) we call "cold".
- 6k-1 primes (5, 11, 17, ...) we call "hot".
- 3 is neutral, but can be grouped with the cold primes by convention.
- Cold × cold = hot × hot = cold. Cold × hot = hot.
Modulo 10, primes (apart from 2 and 5) can be 10k+1, 10k+3, 10k-3, or 10k-1.
- 10k±1 primes (11, 19, 29, 31, ...) we call "telluric".
- 10k±3 primes (3, 7, 13, 17, 23, ...) we call "thalassic".
- 5 is neutral, but can be grouped with the telluric primes by convention.
- Telluric × telluric = thalassic × thalassic = telluric. Telluric × thalassic = thalassic.
Table of the primes by neighbor
Central relations
Delta-1
All subgroups to which the prime is added include 2 and 3 as necessary elements. Recorded in this table are only the additional primes beyond 2 and 3 needed to express each prime's neighbors. As every prime bar 2 and 3 neighbors a multiple of six, that neighbor (the "sixfold neighbor") is listed first.
| Prime | Adjacent integers | S-expression of split superparticular | |||
|---|---|---|---|---|---|
| Value | Modularity | Sixfold neighbor's factorization |
Nonsixfold neighbor's factorization |
Subgroup | |
| 5 | H, U, T* | 2×3 | 2×2 | 2.3 | S12: 3/2 |
| 7 | C, L, Th | 2×3 | 2×22 | 2.3 | S2: 4/3 |
| 11 | H, L, T | 2×3×2 | 2×5 | 2.3.5 | S13: 6/5 |
| 13 | C, U, Th | 2×3×2 | 2×7 | 2.3.7 | |
| 17 | H, U, Th | 2×3×3 | 2×23 | 2.3 | S3: 9/8 |
| 19 | C, L, T | 2×3×3 | 2×2×5 | 2.3.5 | S14: 10/9 |
| 23 | H, L, Th | 2×3×22 | 2×11 | 2.3.11 | |
| 29 | H, U, T | 2×3×5 | 2×2×7 | 2.3.5.7 | S15: 15/14 |
| 31 | C, L, T | 2×3×5 | 2×24 | 2.3.5 | S4: 16/15 |
| 37 | C, U, Th | 2×3×2×3 | 2×19 | 2.3.19 | |
| 41 | H, U, T | 2×3×7 | 2×22×5 | 2.3.5.7 | S16: 21/20 |
| 43 | C, L, Th | 2×3×7 | 2×2×11 | 2.3.7.11 | |
| 47 | H, L, Th | 2×3×23 | 2×23 | 2.3.23 | |
| 53 | H, U, Th | 2×3×32 | 2×2×13 | 2.3.13 | |
Delta-2 (no-twos)
All subgroups to which the prime is added include 3 as a necessary element. Additionally, these subgroups include primes' twin counterparts. Twin primes will be excluded from the coloring based on prime-limits here; isolated primes (23, 37, 47, ...) will be specially highlighted in bold.
| Prime | 2-adjacent integers | |||
|---|---|---|---|---|
| Value | Modularity | Threefold neighbor's factorization |
Nonthreefold neighbor's factorization |
Subgroup |
| 5 | H, U, T* | 3 | 7 | 3.7 |
| 7 | C, L, Th | 3×3 | 5 | 3.5 |
| 11 | H, L, T | 3×3 | 13 | 3.13 |
| 13 | C, U, Th | 3×5 | 11 | 3.5.11 |
| 17 | H, U, Th | 3×5 | 19 | 3.5.19 |
| 19 | C, L, T | 3×7 | 17 | 3.7.17 |
| 23 | H, L, Th | 3×7 | 52 | 3.5.7 |
| 29 | H, U, T | 3×32 | 31 | 3.31 |
| 31 | C, L, T | 3×11 | 29 | 3.11.29 |
| 37 | C, U, Th | 3×13 | 5×7 | 3.5.7.13 |
| 41 | H, U, T | 3×13 | 43 | 3.13.43 |
| 43 | C, L, Th | 3×3×5 | 41 | 3.5.41 |
| 47 | H, L, Th | 3×3×5 | 72 | 3.5.7 |
| 53 | H, U, Th | 3×17 | 5×11 | 3.5.11.17 |
Delta-3 (no-threes)
All subgroups to which the prime is added include 2 as a necessary element.
| Prime | 3-adjacent integers | |||
|---|---|---|---|---|
| Value | Modularity | Fourfold neighbor's factorization |
Nonfourfold neighbor's factorization |
Subgroup |
| 5 | H, U, T* | 22×2 | 2 | 2 |
| 7 | C, L, Th | 22 | 2×5 | 2.5 |
| 11 | H, L, T | 22×2 | 2×7 | 2.7 |
| 13 | C, U, Th | 22×22 | 2×5 | 2.5 |
| 17 | H, U, Th | 22×5 | 2×7 | 2.5.7 |
| 19 | C, L, T | 22×22 | 2×11 | 2.11 |
| 23 | H, L, Th | 22×5 | 2×13 | 2.5.13 |
| 29 | H, U, T | 22×23 | 2×13 | 2.13 |
| 31 | C, L, T | 22×7 | 2×17 | 2.7.17 |
| 37 | C, U, Th | 22×2×5 | 2×17 | 2.5.17 |
| 41 | H, U, T | 22×11 | 2×19 | 2.11.19 |
| 43 | C, L, Th | 22×2×5 | 2×23 | 2.23 |
| 47 | H, L, Th | 22×11 | 2×52 | 2.5.11 |
| 53 | H, U, Th | 22×2×7 | 2×52 | 2.5.7 |
