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Berikut ini pemetaan (mapping) formasi angka Tujuh (7) kedalam piramida data dari diagram berupa konsep, detil bagan dan modul² yang dipakai sebagai dasar pemrograman.
tujuh (7) {6}
7P:(142857)
14 x 2 = 28
28 x 2 + 1 = 28 + 29 = 57
Angka 71 juga akan merupakan angka yang akan kita gunakan untuk membangun algoritma dari pemrograman yang dibangun dari formasi 1-5-7.
142857 × 74 = 342999657
342 + 999657 = 999999
![](https://user-images.githubusercontent.com/36441664/74087101-db7d8e80-4abb-11ea-964d-edbb3e950777.png)
Berdasarkan formasi dasar maka kita akan mendapatkan konfigurasi dari Project Mapping dengan titik awal di kotak-1 dan titik akhir di kotak-13 pada Sub 2:4:9 Eksternal:
1:1:0 - Bagan ... 329 (Attribute)
1:2:1 -- Skema 7:√ ... 7:Primes(142857)
1:2:2 --- Pola • ... 139
1:3:3 --- Node ΔΔ ... 285
1:3:4 -- Konsep 8:Φ ... 8:Primes(157248)
1:3:5 --- Logics ΦΦΦ ... 114
1:4:6 --- Pattern Φ ... 248
1:4:7 -- Korelasi 6:Δ ... 6:Primes(124875)
1:4:8 --- Delivery ¤¤ ... 618 <---------- ¤
┌ 1:4:9 --- Realisasi ΦΦ ... 786 |
| |
| 2:1:0 - Diagram ... 289 (Artifacts) |
| 2:2:1 -- Struktur ... 67:Δ |
| 2:2:2 --- Model ΔΔΔΔ ... 139 (Flowchart) |
| 2:3:3 --- Hirarki ΦΦ ... 285 (Sequence) |
| 2:3:4 -- Metode ... 78:π |
| 2:3:5 --- Proses • ... 114 (Grammar) |
| 2:4:6 --- Matriks ΔΔ ... 248 (Channel) |
| 2:4:7 -- Interaksi ... 86:Δ |
| 2:4:8 --- Internal ΔΔ ... 157 (Route) |
| 2:4:9 --- Eksternal ... 618 (Tree) ------ ¤
|
| 3:1:0 - Mapping ... 168 (Method)
| 3:2:1 -- Target 6:Δ ... 147 (Model)
| 3:2:2 --- Susunan • ... 329
| 3:3:3 --- Resolusi ΔΔ ... 285
| 3:3:4 -- Validasi 5:√ ... 258 (Track)
| 3:3:5 --- Regenerasi ΦΦΦ ... 285
| 3:4:6 --- Assessment Φ ... 289
| 3:4:7 -- Algoritma 6:Δ ... 369 (Trace)
└> 3:4:8 --- Penelusuran ΦΦ ... 618
3:4:9 --- Implementasi ¤¤¤¤ ... 943
Untuk identifikasi faktor percabangan kita ambil konfigurasi dari formasi-29 berikut ini:
- 139 + 67 = 206
6 + 6 = 12
7 + 7 = 14
12 x 14 = 168
67 + 78 + 86 = 231
7 x 13 x 19 = 1729
329
|
---------------------+-----+-----+-----+
7 --------- 1,2:1| 1 | 30 | 40 | 71 (2,3) ‹-------------------
| +-----+-----+-----+-----+ |
| 8 ‹------ 3:2| 1 | 30 | 40 | 90 | 161 (7) ‹--- |
| | +-----+-----+-----+-----+ | |
| | 6 ‹-- 4,6:3| 1 | 30 | 200 | 231 (10,11,12) ‹--|--- |
| | | +-----+-----+-----+-----+ | | |
--|--|-----» 7:4| 1 | 30 | 40 | 200 | 271 (13) --› | 5x |
| | +-----+-----+-----+-----+ | |
--|---› 8,9:5| 1 | 30 | 200 | 231 (14,15) ---------› |
168 | +-----+-----+-----+-----+-----+ |
| ----› 10:6| 20 | 5 | 10 | 70 | 90 | 195 (19) --› Φ | 6x
--------------------+-----+-----+-----+-----+-----+ |
78 --------› 11:7| 5 | 9 | 14 (20) --------› Δ |
| +-----+-----+-----+ |
| 86 ‹----- 12:8| 9 | 60 | 40 | 109 (26) «------------ |
| | +-----+-----+-----+ | |
| | 67 ‹-- 13:9| 60 | 9 | 69 (27) «--- ¤ | 2x |
| | | +-----+-----+-----+ | |
| | ---› 14:10| 9 | 60 | 40 | 109 (28) ------------- |
| | +-----+-----+-----+ |
| ---› 15,18:11| 1 | 30 | 40 | 71 (29,30,31,32) ------------
289 | +-----+-----+-----+
| ‹--------- 19:12| 60 | 10 | 70 (36) ‹--------------------- Φ
-------------------+-----+-----+
786 ‹------- 20:13| 90 | 90 (38) ‹-------------- Δ
| +-----+-----+
| 618 ‹- 21,22:14| 40 | 8 | 48 (40,41) ‹----------------------
| | +-----+-----+-----+-----+-----+ |
| | 943 ‹- 23:15| 8 | 40 | 70 | 60 | 100 | 278 (42) «-- | 6x
| | | +-----+-----+-----+-----+-----+ | |
--|--|-»24,27:16| 40 | 8 | 48 (43,44,45,46) ------------|----
| | +-----+-----+ |
--|---› 28:17| 100 | 100 (50) --------------------------»
| +-----+
1729 -› 29:18| 50 | 50 (68)
----------------------+-----+
Note:
« & » = 4 pairs {+}
‹ & › = 5 pairs {-}
Total = 9 pairs {3,6,9}
Formasi angka tujuh (7) mengacu ke angka satu (1) sebagai titik awal. Direfleksikan mirror ke angka sebelas (11) pada angka tujuhbelas (17) dan faktor refleksi tujuh puluh satu (71):
1 & 7 » 17
17 & 71 » 1771
+-----+-----+-----+-----+-----+-----+-----+
| 1 | 2 | 3 | 4 | 5 | 6 | 7 |
+-----+-----+-----+-----+-----+-----+-----+
| 1771 |
+-----+-----+-----+-----+-----+-----+-----+
+-----+-----+-----+-----+-----+-----+-----+
| 1 | 2 | 3 | 4 | 5 | 6 | 7 |
+-----+-----+-----+-----+-----+-----+-----+
17 | 71 - 17
+-----+-----+-----+-----+-----+-----+-----+
| 1 | 2 | 3 | 4 | 5 | 6 | 7 |
+-----+-----+-----+-----+-----+-----+-----+
17 | 11 | 71 - 17 - 11
Formasi didominasi angka enam (6) secara hexagon pada index {2,3,29,30,31,32} berujung di formasi angka enampuluh tujuh (67) yang memiliki titik sentral pada angka tigabelas (13):
- 7 + 11 + 13 + 17 + 19 = 67
+-----+-----+-----+-----+-----+-----+-----+
| 1 | 2 | 3 | 4 | 5 | 6 | 7 |
+-----+-----+-----+-----+-----+-----+-----+
| 13 | 9 | 139
+-----+-----+-----+-----+-----+-----+-----+
11 + 12 = 23
└── 67 + 11 = 78
└── 78 + 12 = 86
└── 67 + 78 + 86 = 231
786 | 102 66 329 289
-----+-----+-----+-----+-----+
103 | 3 | 4 | 6 | 6 | 19
-----+-----+-----+-----+-----+
86 | 5 | 3 | 2 | 7 | 17
+-----+-----+-----+-----+
78 | 6 | 6 | 12 (M dan F)
+-----+-----+-----+
67 | 3 | 3 | 5 | 11
-----+-----+-----+-----+-----+
168 | 4 | 4 | 5 | 6 | 19
+-----+-----+-----+-----+
618 | 5 | 5 | 8 | 18
+-----+-----+-----+-----+-----+-----+-----+-----+-----+
943 | 3 | 5 | 5 | 5 | 3 | 7 | 5 | 3 | 7 | 43 (C1 dan C2)
-----+-----+-----+-----+-----+-----+-----+-----+-----+-----+
1729 | 1 2 3 4 5 6 7 8 9
empatbelas (14) {90}
1 x 142857 = 142857
3 x 142857 = 428571
2 x 142857 = 285714
6 x 142857 = 857142
4 x 142857 = 571428
5 x 142857 = 714285
6 × 142857 = 857142
7 × 142857 = 999999
![](https://user-images.githubusercontent.com/36441664/72731176-b89b4100-3bc5-11ea-8a94-a4a620489166.gif)
1 + 6 = 7 1 + 8 = 9
3 + 4 = 7 4 + 5 = 9
2 + 5 = 7 2 + 7 = 9
tujuhbelas (17) {9}
duapuluh tujuh (27) {142857}
empatpuluh tiga (43) {943}
Angka ini adalah penjumlahan tujuh (7) bilangan prima < 37
143 = 11 + 13 + 17 + 19 + 23 + 29 + 31
![](https://user-images.githubusercontent.com/36441664/72732089-93a7cd80-3bc7-11ea-96ac-36025857cb15.jpg)
limapuluh tujuh (57) {142857}
After ignoring 000000 and 999999 as usual, the large equals odd rule allows us to ignore all the other sequences except 124875 and 363636. The latter fails for the same reason that 36 did when n=2. But 142857 , the lone survivor, gives us a complicated derived graph containing many hamiltonian paths, every one of which is a solution to the problem:
Setelah mengabaikan 000000 dan 999999 seperti biasa, aturan besar sama dengan aneh memungkinkan kita untuk mengabaikan semua urutan lainnya kecuali 124875 dan 363636. Yang terakhir gagal karena alasan yang sama seperti yang dilakukan 36 ketika n = 2. Tetapi 142857, satu-satunya yang selamat, memberi kita grafik turunan rumit yang mengandung banyak jalur hamilton, yang masing-masing merupakan solusi untuk masalah tersebut:
8/7=1,142857...
14 * 2 = 28
28 * 2 = 56 + 1 = 57
57 * 2 = 114
42 * 2 = 84 + 1 = 85
85 * 2 = 170 + 1 = 171
71 * 2 = 142
15 * 3 = 45 + 1 = 46
46 * 3 = 138
38 * 3 = 114 + 1 = 115
142857/999999=1/7
![](https://user-images.githubusercontent.com/36441664/72683874-1ec48d00-3b0e-11ea-905e-89539630f51e.png)
seratus tiga (103) {14}
125874 x 2 = 251748
142857 x 2 = 285714
formasi-139 {3,30,10,40}
formasi-157 {57,12,169,99}
formasi-248 {57}
This documentation is mapped under Mapping and licensed under Apache License, Version 2.0.
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