User:Dummy index/Bimetallic MOS: Difference between revisions
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LLsLsLLsLsLs LLsLsLs (from 2nd: 7L 5s, from 3rd: 4L 3s) | LLsLsLLsLsLs LLsLsLs (from 2nd: 7L 5s, from 3rd: 4L 3s) | ||
</pre> | </pre> | ||
More intense pattern. First, Imagine <math>L = 2\sqrt{2}+2</math> and <math>s = 1</math> and divide L into | |||
<math>\qquad L_1:s_1 = 2\sqrt{2}+1:1 = [3; 1, 4, 1, 4, ...]</math>. | |||
OK, now <math>L_1 = 2\sqrt{2}+1</math> and <math>s_1 = s = 1</math>. Next, divide L<sub>1</sub> into | |||
<math>\qquad L_2:s_2 = 2\sqrt{2}:1 = [2; 1, 4, 1, 4, ...]</math>. | |||
OK, now <math>L_2 = 2\sqrt{2}</math> and <math>s_2 = s = 1</math>. Next, divide L<sub>2</sub> into | |||
<math>\qquad L_3:s_3 = 2\sqrt{2}-1:1 = [1; 1, 4, 1, 4, ...]</math>. | |||
OK, now <math>L_3 = 2\sqrt{2}-1</math> and <math>s_3 = s = 1</math>. Next, divide L<sub>3</sub> into | |||
<math>\qquad L_4:s_4 = 2\sqrt{2}-2:1 = [0; 1, 4, 1, 4, ...]</math>. | |||
No, <math>L_4 < s_4</math>. Let <math>s_5 := L_4</math> and <math>L_5 := s_4</math>. (Rotate the rectangle 90°) | |||
OK, now <math>L_5 = 1</math> and <math>s_5 = 2\sqrt{2}-2</math> and <math>L_5:s_5 = (\sqrt{2}+1) / 2 = [1; 4, 1, 4, 1, ...]</math>. Next, divide L<sub>5</sub> into | |||
<math>\qquad L_6:s_6 = (\sqrt{2}-1)/2:1 = [0; 4, 1, 4, 1, ...]</math>. | |||
No, <math>L_6 < s_6</math>. Let new <math>s := L_6</math> and new <math>L := s_6</math>. (Rotate the rectangle 90°) | |||
OK, now <math>L = 2\sqrt{2}-2</math> and <math>s = 3-2\sqrt{2}</math> and <math>L:s = 2\sqrt{2}+2 = [4; 1, 4, 1, 4, ...]</math>. | |||
Loop. | |||
In this case, we actually can choose from five entry points. | |||
== Generator size == | == Generator size == | ||
{| class="wikitable" | {| class="wikitable" | ||
! !! Dividing ratio !! Generator size !! Remarks | ! !! Dividing ratio !! Generator size !! Remarks | ||
|- | |- | ||
| Golden || <math>L_1:s_1 = φ-1:1</math> || 458.36 | | Golden || <math>L_1:s_1 = φ-1:1</math> || g = 458.36 ¢, p = 1200 ¢ || logarithmic phi | ||
|- | |- | ||
| Silver 1st isotope || <math>L_1:s_1 = δ_s-1:1</math> || 702.94 | | Silver 1st isotope || <math>L_1:s_1 = δ_s-1:1</math> || g = 702.94 ¢, p = 1200 ¢ || argent fifth | ||
|- | |- | ||
| Silver || <math>L_2:s_2 = δ_s-2:1</math> || 351.47 | | Silver || <math>L_2:s_2 = δ_s-2:1</math> || g = 351.47 ¢, p = 1200 ¢|| Imaginary, argent neutral third | ||
|- | |- | ||
| Bimetallic ( | | Bimetallic (unnamed A-1) || <math>L_1:s_1 = \sqrt{3}:1</math> || g = 760.77 ¢, p = 1200 ¢ || | ||
|- | |- | ||
| Bimetallic ( | | Bimetallic (unnamed A-2) || <math>L_2:s_2 = \sqrt{3}-1:1</math> || g = 507.18 ¢, p = 1200 ¢ || Flattone | ||
|- | |- | ||
| Bimetallic ( | | Bimetallic (unnamed A-3) || <math>L_4:s_4 = (\sqrt{3}-1)/2:1</math> || g = 321.54 ¢, p = 1200 ¢ || Superkleismic | ||
|- | |||
| Bimetallic (unnamed B-1) || <math>L_1:s_1 = 2\sqrt{2}+1:1</math> || g = 951.47 ¢, p = 1200 ¢ || Semaphore | |||
|- | |||
| Bimetallic (unnamed B-2) || <math>L_2:s_2 = 2\sqrt{2}:1</math> || g = 886.56 ¢, p = 1200 ¢ || Hanson | |||
|- | |||
| Bimetallic (unnamed B-3) || <math>L_3:s_3 = 2\sqrt{2}-1:1</math> || g = 775.74 ¢, p = 1200 ¢ || Squares | |||
|- | |||
| Bimetallic (unnamed B-4) || <math>L_4:s_4 = 2\sqrt{2}-2:1</math> || g = 543.70 ¢, p = 1200 ¢ || | |||
|- | |||
| Bimetallic (unnamed B-5) || <math>L_6:s_6 = (\sqrt{2}-1)/2:1</math> || g = 205.89 ¢, p = 1200 ¢ || | |||
|} | |} | ||