Cents Table for Kellner 1/5th Comma Well-Temperament
| C# | Eb | F# | G# | Bb |
| 90 | 294 | 588 | 792 | 996 |
| 0 | 194.4 | 388.8 | 498 | 697.2 | 891.6 | 1090.8 | 1200 |
| C | D | E | F | G | A | B | C |
Size of 3rds
(Pure 3rd = 386 cents)
CE = 388.8 cents
DF#,FA,GB = 393.6
AC#,BbD = 398.4
(Equal tempered 3rd = 400 cents)
EbG,EG#,BD# = 403.2 cents
C#E#,F#A#,AbC = 408 cents
(Pythagorean 3rd = 408 cents)
Beats per second and frequencys for Kellner 1/5th Comma
Well-Temperament
at A=440 hz
| These are approximate. | F4 | 350.4912 | |||||||
| Lower Note | 3rd above | 4th above | 5th above | You may get different | E4 | 329.1068 | |||
| Eb4 | numbers on your calculator. | Eb4 | 311.5487 | ||||||
| D4 | 6.32 | D4 | 294.1294 | ||||||
| C#4 | C#4 | 276.9323 | |||||||
| C4 | 2.0807 | middle C >>>>>> | C4 | 262.8693 | |||||
| B3 | 0 | B3 | 246.8301 | ||||||
| Bb3 | The difference will | Bb3 | 233.6616 | ||||||
| A3 | 2.3882 | 1.7864 | usually be somewhere in | A3 | 220 | ||||
| G#3/Ab3 | the decimal and will not | G#3/Ab3 | 207.6986 | ||||||
| G3 | 4.2284 | 2.1343 | 1.5964 | effect figuring out beats | G3 | 196.6184 | |||
| F#3 | 2.0043 | per second since these | F#3 | 184.6215 | |||||
| F3 | 3.772 | 0 | are rounded off anyway. | F3 | 175.2456 |
F - C 1/5 G 1/5 D 1/5 A 1/5 E - B 1/5 F# - C# - G#/Ab - Eb - Bb - F
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