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Catalog of Works	Main Menu Deutsch current age of composition: 7 years, 4 months, 24 days
Biography	Sequence A026272 no. 3 B117 September 8, 2004 Collection: I place of composition: Leipzig, Germany duration: 7.476 seconds instrumentation: Csound channels: 2 temperament: phi^6 + 1 phi = (sqrt(5) - 1)/2 frequency orientation: descending OEIS/sequence number: A026272 score: B117 csd file Csound file 0.016 MB jpg files page 1 0.672 MB page 2 1.073 MB mp3 file 320 kbps 0.301 MB wav file 24-bit 96kHz 4.306 MB
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Previous Entry\|Next Entry Enter a catalog number into the box below (A1-A35, B1-B1328) to show that composition. other pieces in series no. 1 no. 2 no. 4 no. 5 no. 6 no. 7 no. 8 no. 9 no. 10 no. 11 no. 12 no. 13 no. 14 no. 15 no. 16 no. 17 no. 18 no. 19 no. 20 no. 21 no. 22 no. 23 no. 24 no. 25 no. 26 no. 27 no. 28 no. 29 no. 30 no. 31 no. 32 no. 33 also in this temperament Φ Signature Sequence no. 7 Φ Signature Sequence no. 14 Φ Signature Sequence no. 17 φ Signature Sequence no. 3 φ Signature Sequence no. 13 φ Signature Sequence no. 18 φ Signature Sequence no. 24 φ Signature Sequence no. 25 φ Signature Sequence no. 29 φ Signature Sequence no. 30 φ Signature Sequence no. 33 φ Signature Sequence no. 37 Beatty Sequence no. 1 Beatty Sequence no. 1 Beatty Sequence no. 2 Beatty Sequence no. 2 Beatty Sequence no. 3 Beatty Sequence no. 3 Complementary Beatty Sequences no. 8 EFC Stolarsky Array Horizontal no. 2 Fibonacci Sequence no. 5 Fibonacci Sequence no. 12 Fibonacci Stolarsky Horizontal no. 7 Fibonacci Stolarsky Horizontal no. 13 Fibonacci Stolarsky Horizontal no. 23 Fibonacci Stolarsky Horizontal no. 25 Fibonacci Stolarsky Horizontal no. 31 Fibonacci Stolarsky Horizontal no. 34 Fibonacci Stolarsky Vertical no. 8 Fibonacci Stolarsky Vertical no. 39 Fibonacci Transform A no. 1 Generalized Fibonacci Sequence no. 4 Generalized Fibonacci Sequence no. 7 Harmonic Portrayal of Two Complementary Beatty Sequences Horizontal Para-Fibonacci Sequence no. 11 Horizontal Para-Fibonacci Sequence no. 21 Horizontal Para-Fibonacci Sequence no. 34 Horizontal Para-Fibonacci Sequence no. 35 Lucas Sequence no. 3 Lucas Sequence no. 8 Max Binary Fibonacci Rep 0s Density no. 8 Max Binary Fibonacci Rep 0s Density no. 9 Max Binary Lucas Reps Density no. 5 Max Fibbit Running no. 9 Max Fibbit Running no. 11 Max Fibbit Running no. 12 Max Lucas Rep Runs no. 6 Max Phibit 0s Density no. 1 Max Phibit 0s Density no. 3 Max Phibit 0s Density no. 5 Max Phibit Density no. 5 Max Phibit Density no. 6 Max Phibit Running no. 1 Max Phibit Running no. 2 Max Phibit Running no. 3 MAX0501 no. 1 Min Binary Lucas Rep 0s Density no. 4 Min Binary Lucas Rep 0s Density no. 9 Min Binary Lucas Rep 0s Density no. 11 Min Binary Lucas Reps Density no. 1 Min Fibbit Running no. 11 Min Fibbit Running no. 12 Min Fibbit Running no. 14 Min Fibbit Running no. 19 Min Fibbit Running no. 29 Min Fibbit Running no. 32 Min Lucas Rep Runs no. 11 Min Lucas Rep Runs no. 12 Min Lucas Rep Runs no. 13 Min Phibit 0s Density no. 2 Min Phibit 0s Density no. 4 Min Phibit 0s Density no. 5 Min Phibit Density no. 10 Min Phibit Running no. 2 Min Phibit Running no. 5 Min Phibit Running no. 6 Min Phibit Running no. 8 Min Phibit Running no. 11 MIN0103 no. 2 MIN0401 no. 1 Minimum Phinary no. 3 Non-Fibonacci Numbers no. 1 Q(n) and R(n) Rep Sequences no. 2 Q(n) Rep Sequence no. 9 Q(n) Rep Sequence no. 12 Q(n) Rep Sequence no. 18 Q(n) Rep Sequence no. 19 Q(n) Rep Sequence no. 21 R(n) and V(n) Rep Sequences no. 1 R(n) Rep Sequence no. 8 R(n) Rep Sequence no. 10 R(n) Rep Sequence no. 12 R(n) Rep Sequence no. 16 S(n) Rep Sequence no. 9 S(n) Rep Sequence no. 10 S(n) Rep Sequence no. 18 Sequence A026242 no. 1 Sequence A026272 no. 27 Stolarsky and Wythoff Horizontal no. 2 Stolarsky and Wythoff Horizontal no. 3 Stolarsky Rep 0s and 1s Density no. 1 T(n) Rep Sequence no. 11 T(n) Rep Sequence no. 12 T(n) Rep Sequence no. 20 U(n) Rep Sequence no. 6 U(n) Rep Sequence no. 10 U(n) Rep Sequence no. 12 U(n) Rep Sequence no. 15 Unique Residues no. 3 Unique Residues no. 4 V(n) Rep Sequence no. 3 V(n) Rep Sequence no. 6 V(n) Rep Sequence no. 7 V(n) Rep Sequence no. 12 V(n) Rep Sequence no. 16 Vertical Para-Fibonacci Sequence no. 8 W(n) Rep Sequence no. 1 W(n) Rep Sequence no. 7 W(n) Rep Sequence no. 10 Wythoff Rep 0s Density no. 1 Wythoff Rep 0s Density no. 2 X(n) Rep Sequence no. 8 X(n) Rep Sequence no. 11 X(n) Rep Sequence no. 12 Y(n) Rep Sequence no. 18 Y(n) Rep Sequence no. 20 Z(n) Rep Sequence no. 12 Z(n) Rep Sequence no. 13 Z(n) Rep Sequence no. 15 Zeckendorf Representations no. 6 Zeckendorf Representations no. 14 Zeckendorf Representations no. 19 Back to Index

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