Bible Numbers 2.0

Prophecy Of Josiah & Religious Revival

Josiah's purge of Canaanite religion was prophesied centuries before his birth. It was also a prophecy that came with a miraculous sign as confirmation (Deuteronomy 18:19-22). When the prophecy in 1 Kings 13:1-5 is put together with its fulfillment in 2 Kings 23:20-25, numeric features following the principle of complementary opposites (Revelation 1:8) similar to those in The Proclamation are proof the prophecy happened exactly as predicted. This is God showing He is the one and only supreme God. No other being could predict and fulfill prophecy centuries apart. No other religious literature has such proof.

1 And behold, a man of God came out of Judah by the word of the LORD to Bethel. Jeroboam was standing by the altar to burn incense. 2 And the man cried against the altar by the word of the LORD, and said, "O altar, altar, thus says the LORD: `Behold, a son shall be born to the house of David, Josiah by name; and he shall sacrifice upon you the priests of the high places who burn incense upon you, and men's bones shall be burned upon you.'" 3 And he gave a sign the same day, saying, "This is the sign that the LORD has spoken: `Behold, the altar shall be torn down, and the ashes that are upon it shall be poured out.'" 4 And when the king heard the saying of the man of God, which he cried against the altar at Bethel, Jeroboam stretched out his hand from the altar, saying, "Lay hold of him." And his hand, which he stretched out against him, dried up, so that he could not draw it back to himself. 5 The altar also was torn down, and the ashes poured out from the altar, according to the sign which the man of God had given by the word of the LORD. (1 Kings 13:1-5)¹

In rebelling against Rehoboam, Jeroboam took the final step in also rebelling against God. He created his own religious system of priests. This was in violation of the covenant that only Levites be priests (Joshua 18:7). And because the covenant was violated, here in 1 Kings 13:1, a man of God comes by the word of the LORD. –the word of the LORD is an integral part of the covenant. The word or message is that Josiah will destroy everything Jeroboam did.

Malachi 3:1 indicates the messenger of the covenant will be coming after Jesus. As seen in Revelation 19:13, he is also known as the Word of God. He too will destroy and purge false religion.

These 5 verses have 104 words (2² x 13), 402 letters and a numeric total of 23673. (23673 = 3 x 13 x 607. SF: 623 = 7 x 89.) The fact that it is 1 Kings chapter 13, with 104 words and the numeric total being a multiple of 13 is a sign of God’s hand in the prophecy. 13 is the imperial number related to the value of God’s name in Hebrew. There are severe consequences for breaking God’s covenant.

The prophecy is paired with its fulfillment in 2 Kings 23:20-25.

20 And he slew all the priests of the high places who were there, upon the altars, and burned the bones of men upon them. Then he returned to Jerusalem. 21 And the king commanded all the people, "Keep the passover to the LORD your God, as it is written in this book of the covenant." 22 For no such passover had been kept since the days of the judges who judged Israel, or during all the days of the kings of Israel or of the kings of Judah; 23 but in the eighteenth year of King Josiah this passover was kept to the LORD in Jerusalem. 24 Moreover Josiah put away the mediums and the wizards and the teraphim and the idols and all the abominations that were seen in the land of Judah and in Jerusalem, that he might establish the words of the law which were written in the book that Hilkiah the priest found in the house of the LORD. 25 Before him there was no king like him, who turned to the LORD with all his heart and with all his soul and with all his might, according to all the law of Moses; nor did any like him arise after him. (2 Kings 23:20-25)

We can be sure when the man known as The Word of God comes in Revelation 19:11, like Josiah, he will demand an accounting of the covenant, purge out the rebels (Ezekiel 20:33-38), and destroy all false religions.

This section has 115 words, 441 letters (3² x 7²), and a numeric total of 29485. The numeric total is not a multiple of 7 or 13. This section is incomplete without the prophecy before it. When the both passages are put together, everything changes.

Primary Features

(Derived from Revelation 1:8 and grouped for easy reference.)

I Am (Present tense - living through it) Add up everything.

A.1Numeric total: 53158 = 2 x 7 x 3797. (See feature 1.)

Is, Was, Is To Come (Second present tense - skipping sequentially through it) Add up every other occurrance.

B.3Every other word (odd): 26642 = 2 x 7 x 11 x 173. (See feature 2.2.1.)

B.3.2Every other word (even): 26516 = 2² x 7 x 947. (See feature 2.2.2.)

B.4Every other letter (odd): 26299 = 7 x 13 x 17 x 17. (See feature 7.2.1.)

B.4.2Every other letter (even): 26859 = 3 x 7 x 1279. (See feature 7.2.2.)

Alpha & Omega (The first and last) Add up the first item with the last item.

C.2First and last verses: 6045 = 3 x 5 x 13 x 31. (See feature 1.1.)

C.3.2First and last letter of each word: 26740 = 2² x 5 x 7 x 191. (See feature 3.)

Alpha (The first) Add up the first item.

D.3.3First letter of each word: 6342 = 2 x 3 x 7 x 151. (See feature 4.)

Omega (The last) Add up the last item.

E.3.3Last letter of each word: 20398 = 2 x 7 x 31 x 47. (See feature 5.)

The Verses

The numeric totals of the five verses from 1 Kings and the six verses from 2 Kings are listed below.

List of verse totals:
2202 5721 4628 7524 3598 5138 3252 3946 3089 10217 3843
╚═══════════╦══════════╝ ╚══════════════╦═════════════╝
     1 Kings 13:1-5             2 Kings 23:20-25

1There are 11 verses. Their total: 53158 = 2 x 7 x 3797. (Eleven is not a multiple of 7 or 13, but it is a numeric representation of the one God who is beginning and end.)

1.1Revelation 1:8 draws attention to the first and last verses: 6045 = 3 x 5 x 13 x 31. SF: 52 = 2² x 13.

1.2The complementary opposite of what is not first or last would be what is in the middle. Providentially, the middle verse is a multiple of 7: 5138 = 2 x 7 x 367.

1.3The five verses before the middle verse: 23673 = 3 x 13 x 607. SF: 623 = 7 x 89. (The sum of the factors would be 96. This is not a multiple of 7 or 13, but the sum of its factors does lead to 13.) There is no feature with the five verses after the middle verse. This is because the prophecy is about a man, not God or Jesus.

1.4The third and fourth verses from the beginning, and the third and fourth verses from the end, are the only two sets that individually and together are multiples of 7.

a) 3rd & 4th from the beginning: 4628 7524
b) 3rd & 4th from the end:       3946 3089

1.4.1Sets a) and b) together: 19187 = 7 x 2741.

1.4.2Set a) 12152 = 2³ x 7² x 31.

1.4.3Set b) 7035 = 3 x 5 x 7 x 67.

1.4.4Providentially, it is the 3rd and 4th verses because 3 + 4 = 7.

1.5Exactly 7 verses are even valued.

1.6Divide the verses into two groups depending on whether its position is a prime number or not.

1.6.1Verses in prime positions:

Position: 2    3    5    7    11
Verse:    5721 4628 3598 3252 3843

Total of the verses: 21042 = 2 x 3² x 7 x 167. SF: 182 = 2 x 7 x 13.

1.6.2Verses not in prime positions:

Position: 1    4    6    8    9    10
Verse:    2202 7524 5138 3946 3089 10217

Total of the verses: 32116 = 2² x 7 x 31 x 37.

1.6.3The difference between 1.6.1 and 1.6.2: 11074 = 2 x 7² x 113.

1.7The eleven verses follow a very simple alternating pattern. The first verse is lower than the second verse. The second verse is higher than the third. The third verse is lower than the fourth verse. This continues right through all eleven verses. Although it is just a 50-50 chance each time, this occurred ten times, making the entire set up a one in 1024 chance.

The Words

2.1There are 219 words. When the letter values of God’s name in Hebrew (10-5-6-5) are applied 9 times this will count through all 219 words, and overshoot the passage on the last three letters of the name.

a) 10 5   6   5  10  5   6  5   10 5   6   5  10 5   6   5   10  5
b) 10 15  21  26 36  41  47 52  62 67  73  78 88 93  99  104 114 119
c) 10 15  21  26 36  41  47 52  62 67  73  78 88 93  99  104 114 119
d) 31 354 257 26 401 612 17 501 31 311 414 20 37 420 501 26  596 318

a) 6   5   10  5   6   5   10  5   6   5   10  5   6   5   10  5   6
b) 125 130 140 145 151 156 166 171 177 182 192 197 203 208 218 223 10
c) 125 130 140 145 151 156 166 171 177 182 192 197 203 208 218 4   10
d) 115 106 17  401 106 575 401 735 501 272 501 26  501 40  140 3   31

a) 5    (Letter from the Name.)
b) 15   (Count.)
c) 15   (Count adjusted to 219.)
d) 354  (Word found.)

Total of the words found: 9698 = 2 x 13 x 373. (If the count stopped at the 218th word before overshooting, the total would be 9310. 9310 = 2 x 5 x 7² x 19.

2.1.1The first and last words found: 385 = 5 x 7 x 11.

2.1.2The results from feature 2.1 (line D) point to 36 other words. (Where the result in line D is greater than the number of words 219, the result is subtracted by 219 until it is less than the number of words. In essence, the search wraps around to the beginning.)

a) 31  354  257  26  401  612  17   501  31  311  414  20  37  420  501
b) 31  135  38   26  182  174  17   63   31  92   195  20  37  201  63
c) 14  17   453  26  272  407  100  430  14  68   80   26  85  176  430

a) 26  596  318  115  106  17   401  106  575  401  735  501  272  501
b) 26  158  99   115  106  17   182  106  137  182  78   63   53   63
c) 26  120  501  401  401  100  272  401  31   272  20   430  206  430

a) 26  501  40   140  3   31  354  (Line D from 2.1.)
b) 26  63   40   140  3   31  135  (Adjusted to 219 words.)
c) 26  430  130  17   86  14  17   (New word found.)

Total of the new words found: 6929 = 13² x 41.

2.2Divide the words into two groups by taking every other word.

2.2.1The odd positioned words:

66 86 70 26 412 328 100 354 100 208 257 57 241 60 90 14 346 130 85 404 612 596 506 17 271 531 206 60 420 359 116 430 401 311 501 100 414 354 401 140 271 718 501 116 60 47 420 359 62 501 311 208 33 50 453 340 468 401 45 318 112 401 115 376 56 448 340 17 31 168 100 501 401 56 100 106 30 397 355 332 153 56 49 414 189 735 118 50 501 293 594 332 155 216 477 345 131 80 26 31 176 501 31 52 58 58 70 345 31 71

Total: 26642 = 2 x 7 x 11 x 173.

2.2.1.1The odd positioned words are used as word positions like feature 2.1.2:

a) 66   86   70   26  412  328  100  354  100  208  257  57   241  60
b) 66   86   70   26  193  109  100  135  100  208  38   57   22   60
c) 206  338  301  26  131  453  500  17   500  40   453  420  57   501

a) 90   14  346  130  85   404  612  596  506  17   271  531  206  60
b) 90   14  127  130  85   185  174  158  68   17   52   93   206  60
c) 352  62  376  106  501  155  407  120  91   100  501  420  26   501

a) 420  359  116  430  401  311  501  100  414  354  401  140  271  718
b) 201  140  116  211  182  92   63   100  195  135  182  140  52   61
c) 176  17   606  58   272  68   430  500  80   17   272  17   501  116

a) 501  116  60   47  420  359  62  501  311  208  33   50  453  340
b) 63   116  60   47  201  140  62  63   92   208  33   50  15   121
c) 430  606  501  17  176  17   31  430  68   40   346  12  354  112

a) 468  401  45   318  112  401  115  376  56  448  340  17   31  168
b) 30   182  45   99   112  182  115  157  56  10   121  17   31  168
c) 442  272  506  501  100  272  401  355  62  31   112  100  14  407

a) 100  501  401  56  100  106  30   397  355  332  153  56  49   414
b) 100  63   182  56  100  106  30   178  136  113  153  56  49   195
c) 500  430  272  62  500  401  442  257  30   468  30   62  271  80

a) 189  735  118  50  501  293  594  332  155  216  477  345  131  80
b) 189  78   118  50  63   74   156  113  155  216  39   126  131  80
c) 477  20   155  12  430  31   575  468  397  231  404  271  448  62

a) 26  31  176  501  31  52   58   58   70   345  31  71
b) 26  31  176  63   31  52   58   58   70   126  31  71
c) 26  14  545  430  14  501  456  456  301  271  14  100

a) Odd positioned word.
b) Adjusted as a word position.
c) New word found.

Total of new words found: 28420 = 2² x 5 x 7² x 29. SF: 52 = 2² x 13.

2.2.2The even positioned words:

311 3 208 31 31 114 62 317 62 26 57 25 26 52 442 332 23 401 453 130 45 130 58 526 12 501 26 62 456 501 31 95 206 91 301 62 31 322 20 62 791 20 338 37 352 68 416 90 546 500 91 26 401 85 501 100 596 606 155 586 95 50 271 148 106 100 617 30 425 17 444 395 541 60 541 30 41 575 120 425 17 588 401 407 407 407 407 545 257 30 272 190 401 616 100 501 159 412 77 20 90 302 26 40 436 51 1006 231 140

Total: 26516 = 2² x 7 x 947. (There is no matching feature like 2.2.1.1.)

2.2.3Similar to dividing the words by their positions, one could also divide them by their values into groups of odd or even valued words. The odd valued words total 26130 (2 x 3 x 5 x 13 x 67). While there is no corresponding feature with the total of the even valued words, the total of their positions is 12810. (2 x 3 x 5 x 7 x 61. SF: 78 = 2 x 3 x 13.)

2.2.3.1The odd valued words count through the words.

a) 311  3    31   31   317  257  57   57   25   241  23   401  85   453
b) 311  95   126  157  474  293  131  188  213  454  39   440  87   540
c) 92   95   126  157  36   74   131  188  213  16   39   2    87   102
d) 68   359  271  355  401  31   448  616  70   317  404  311  116  91

a) 45   17   271  531  501  359  501  31   95   401  311  91   501  301
b) 147  164  435  747  591  512  575  168  263  445  318  190  691  335
c) 147  164  216  90   153  74   137  168  44   7    99   190  34   116
d) 56   588  231  352  30   31   31   407  130  26   501  100  23   606

a) 31   401  271  791  501  37   47   359  501  311  91   33   401  85
b) 147  548  381  953  578  177  224  364  646  519  172  205  606  253
c) 147  110  162  77   140  177  5    145  208  81   172  205  168  34
d) 56   501  17   401  17   501  70   401  40   271  407  31   407  23

a) 453  501  401  45   155  95   401  115  271  617  17   31   425  17
b) 487  550  513  120  275  151  552  229  281  679  39   70   495  74
c) 49   112  75   120  56   151  114  10   62   22   39   70   57   74
d) 271  100  354  586  62   106  596  31   31   57   404  301  420  31

a) 501  395  401  541  541  41   397  575  355  425  153  17   49   401
b) 575  532  495  598  701  85   482  619  536  523  238  36   85   486
c) 137  94   57   160  44   85   44   181  98   85   19   36   85   48
d) 31   416  420  425  130  501  130  594  546  501  208  401  501  526

a) 407  189  407  735  407  407  545  501  257  293  155  401  477  345
b) 455  206  613  910  441  410  736  580  399  473  190  591  630  537
c) 17   206  175  34   3    191  79   142  180  35   190  153  192  99
d) 100  26   50   23   86   345  140  444  30   130  100  30   501  501

a) 501  131  159  77  31   501  31   51   345  231  31   71
b) 600  293  233  91  122  623  216  267  393  405  217  288
c) 162  74   14   91  122  185  216  48   174  186  217  69
d) 17   31   62   47  95   155  231  526  407  401  31   501

a) Odd valued word.
b) Count.
c) Count adjusted to 219.
d) New word found.

Total of the words found: 23803 = 13 x 1831.

2.2.3.2The results from 2.2.3.1 are again used to count through the words.

a) 68  359  271  355  401  31   448  616  70   317  404  311  116  91
b) 68  427  479  396  578  171  619  797  210  527  493  366  263  135
c) 68  208  41   177  140  171  181  140  210  89   55   147  44   135
d) 91  40   612  501  17   735  594  17   436  60   60   56   130  17

a) 56   588  231  352  30  31   31   407  130  26  501  100  23   606
b) 191  779  353  486  78  109  140  547  239  46  547  209  232  619
c) 191  122  134  48   78  109  140  109  20   46  109  209  13   181
d) 345  95   617  526  20  453  17   453  26   58  453  58   100  594

a) 56   501  17   401  17  501  70   401  40    271  407  31  407  23
b) 237  519  98   499  78  579  211  612  214   485  454  47  454  39
c) 18   81   98   61   78  141  211  174  214   47   16   47  16   39
d) 62   271  546  116  20  100  58   407  1006  17   317  17  317  404

a) 271  100  354  586  62   106  596  31   31   57   404  301  420  31
b) 310  191  545  693  98   204  800  174  205  262  447  310  511  104
c) 91   191  107  36   98   204  143  174  205  43   9    91   73   104
d) 47   345  50   401  546  302  501  407  31   596  412  47   414  26

a) 31   416  420  425  130  501  130  594  546  501  208  401  501  526
b) 135  551  533  520  212  713  186  780  669  513  283  465  528  616
c) 135  113  95   82   212  56   186  123  12   75   64   27   90   178
d) 17   468  359  791  51   62   401  401  114  354  95   60   352  257

a) 100  26   50   23   86   345  140  444  30   130  100  30   501  501
b) 278  85   135  158  244  370  291  516  108  238  119  149  650  713
c) 59   85   135  158  25   151  72   78   108  19   119  149  212  56
d) 359  501  17   120  241  106  62   20   85   208  318  100  51   62

a) 17   31   62   47   95   155  231  526  407  401  31  501
b) 73   104  166  213  308  244  256  563  532  495  88  589
c) 73   104  166  213  89   25   37   125  94   57   88  151
d) 414  26   401  70   60   241  85   115  416  420  37  106

a) Result from 2.2.3.1
b) Count
c) Count adjusted to 219.
d) New word found.

Total of the new words: 23387 = 7 x 13 x 257.

2.3.1Whether one begins with the first word, and takes every Nth word after, or just takes every Nth word, six values of N work both ways in producing totals divisible by 7: 2 36 48 82 84 105. The total of these N values: 357 = 3 x 7 x 17.

2.3.2Whether one begins with the first word, and takes every Nth word after, or just takes every Nth word, three values of N work both ways in producing totals divisible by 13: 43 58 74. The total of these N values: 175 = 5² x 7.

2.4Divide the words into four groups depending on whether they are odd or even valued in their position and value. (Providentially, similar features are found in the first and last letters of each word, and in the letters themselves.)

2.4.1Words that are in odd positions and are odd valued:

a) 21  23  25  37  47  49  51  59  65  67  69  77  81  85  91  95
b) 257 57  241 85  17  271 531 359 401 311 501 401 271 501 47  359

a) 99  101 105 109 115 117 123 125 135 137 143 145 155 157 161 165
b) 501 311 33  453 401 45  401 115 17  31  501 401 397 355 153 49

a) 169 171 177 179 185 189 191 193 199 203 205 215 217 219
b) 189 735 501 293 155 477 345 131 31  501 31  345 31  71

a) Word position.
b) Word value.

Total of positions: 5746 = 2 x 13² x 17. Total: 12610 = 2 x 5 x 13 x 97. SF: 117 = 3² x 13.

2.4.2Words that are in odd positions and are even valued:

a) 1   3   5   7   9   11  13  15  17  19  27  29  31  33  35  39
b) 66  86  70  26  412 328 100 354 100 208 60  90  14  346 130 404

a) 41  43  45  53  55  57  61  63  71  73  75  79  83  87  89  93
b) 612 596 506 206 60  420 116 430 100 414 354 140 718 116 60  420

a) 97  103 107 111 113 119 121 127 129 131 133 139 141 147 149 151
b) 62  208 50  340 468 318 112 376 56  448 340 168 100 56  100 106

a) 153 159 163 167 173 175 181 183 187 195 197 201 207 209 211 213
b) 30  332 56  414 118 50  594 332 216 80  26  176 52  58  58  70

a) Word position.
b) Word value.

Total of the positions: 6354 = 2 x 3² x 353. Total: 14032 = 2⁴ x 877.

2.4.3Words that are in even positions and are odd valued:

a) 2   4   8   10  16  22  24  34  36  38  42  52  60  62  64  68  70
b) 311 3   31  31  317 57  25  23  401 453 45  501 501 31  95  91  301

a) 74  82  88  102 106 108 110 118 122 126 134 138 140 144 146 150 154
b) 31  791 37  91  401 85  501 155 95  271 617 425 17  395 541 541 41

a) 156 160 162 166 168 170 172 174 176 178 186 192 194 198 212 216
b) 575 425 17  401 407 407 407 407 545 257 401 501 159 77  51  231

a) Word position.
b) Word value.

Total of the positions: 5534 = 2 x 2767. Total: 13520 = 2⁴ x 5 x 13² SF: 39 = 3 x 13.

2.4.4Words in even positions and are even valued:

a) 6   12  14  18  20  26  28  30  32  40  44  46  48   50
b) 208 114 62  62  26  26  52  442 332 130 130 58  526  12

a) 56  58  66  72  76  78  80  84  86  90  92  94  96   98
b) 62  456 206 62  322 20  62  20  338 352 68  416 90   546

a) 104 112 114 116 120 124 128 130 132 136 142 148 152  158
b) 26  100 596 606 586 50  148 106 100 30  444 60  30   120

a) 180 182 184 188 190 196 200 202 204 206 208 210 214  218
b) 30  272 190 616 100 412 20  90  302 26  40  436 1006 140

a) Word position.
b) Word value.

Total of the positions: 6456 = 2³ x 3 x 269. Total: 12996 = 2² x 3² x 19².

2.4.5Two of the four categories (2.4.1 and 2.4.3) have word totals that are multiples of 13. The odds would have suggested at most only one. Feature 2.4.1 even has its positions adding to a number divisible by 13. This would be a one in 169 chance.

2.4.6Of the four categories, 2.4.1 and 2.4.4 are odd in position and value, or even in position and value. They could be considered purely odd, or purely even. This leads to putting the totals of their words together: 12610 + 12996 = 25606 (2 x 7 x 31 x 59).

2.4.7Categories 2.4.2 and 2.4.3 are mixed in position and value (odd in one and even in the other). The totals of the words in these mixed categories are put together: 14032 + 13520 = 27552 (2⁵ x 3 x 7 x 41).

2.4.8Providentially, adding the word totals from 2.4.1 and 2.4.2 also produce a multiple of 7: 12610 + 14032 = 26642 (2 x 7 x 11 x 173).

2.4.9The previous feature means adding the word totals from 2.4.3 and 2.4.4 also produce a multiple of 7: 13520 + 12996 = 26516 (2² x 7 x 947). All this seems to imply some sort of order built into the text of the prophecy. It is only visible when Revelation 1:8's principle of complementary opposites is applied.

2.5.1Exactly 26 words are multiples of 7.

a) 5  31 57  68 70  76  79  82  93  98  102 121 129 131 139 147 163 164
b) 70 14 420 91 301 322 140 791 420 546 91  112 56  448 168 56  56  588

a) 165 169 171 188 198 213 216 218 (Word position.)
b) 49  189 735 616 77  70  231 140 (Word value.)

The total of the positions (a) is not a multiple of 7 or 13, but the sum of its factors is a multiple of 7: 3293 = 37 x 89. SF: 126 = 2 x 3² x 7.

2.5.2Twenty-two words are multiples of 13:

a) 6   7  19  20 26 28 30  35  40  44  54 68 86  94  98  102 103 104
b) 208 26 208 26 26 52 442 130 130 130 26 91 338 416 546 91  208 26

a) 113 197 206 207 (Word position.)
b) 468 26  26  52  (Word value.)

Total of the positions (a): 1687 = 7 x 241.

2.5.331 words are in positions divisible by 7:

26 62 257 52 130 45 271 62 430 301 401 20 47 546 33 100 318 271 340 17 56 41 153 407 50 272 477 412 501 436 31

Total of these words: 6565 = 5 x 13 x 101. SF: 119 = 7 x 17.

2.6The middle N-number of words is a multiple of 7 when N is one of the following:

215 193 187 179 141 133 115 107 105 99 97 63 55 53 37 13

Total of the N values: 1792 = 2⁸ x 7.

2.6.1Take every other N value from feature 2.6 (odd positioned):

215 187 141 115 105 97 55 37

Total: 952 = 2³ x 7 x 17.

2.6.2Take the even positioned from feature 2.6:

193 179 133 107 99 63 53 13

Total: 840 = 2³ x 3 x 5 x 7. SF: 21 = 3 x 7.

2.7Add up the words one by one keeping track of the word position, word value and the accumulated total. There are 24 times when all three numbers will be an odd value. There are exactly 28 times when all three numbers will be an even value.

Where all numbers are odd valued.    Where all numbers are even.

a)  b)  c)      a)  b)  c)           a)  b)   c)     a)  b)   c)
37  85  5553    143 501 33779        6   208  744    90  352  20028
49  271 9301    145 401 34575        12  114  1686   96  90   21428
67  311 14025   155 397 36477        14  62   1848   98  546  22036
69  501 14617   157 355 37407        26  26   3578   112 100  25636
81  271 17095   161 153 38437        28  52   3690   114 596  26700
85  501 19125   165 49  39147        30  442  4222   142 444  33278
91  47  20075   185 155 45851        32  332  4568   148 60   35232
99  501 22537   189 477 47561        40  130  6540   164 588  39098
109 453 24695   199 31  49423        48  526  9030   180 30   44308
115 401 27101   205 31  50543        66  206  13714  182 272  45174
123 401 29419   215 345 52685        72  62   15080  184 190  45696
135 17  32063   217 31  52947        78  20   16622  188 616  47084
80  62   16824  204 302  50512
84  20   18624  214 1006 52340

a) Word position.   b) Word value.   c) Accumulated total.

The total of the words where this happens (b): 14140 = 2² x 5 x 7 x 101. SF: 117 = 3² x 13.

2.8Divide the 219 words into groups of 3 and add each group. Separate the groups by their totals into odd and even valued groups.

2.8.1Odd valued groups of three:

66  311 86    301 100 62    60  100 541
3   70  208   414 31  354   41  397 575
26  31  412   322 401 20    355 120 332
31  328 114   140 62  271   425 153 17
317 100 62    791 718 20    56  588 49
208 26  257   501 338 116   189 407 735
57  57  25    37  60  352   216 616 477
241 26  60    47  68  420   412 26  77
130 612 45    416 359 90    31  20  176
58  17  526   62  546 501   90  501 302
501 206 26    208 26  33    31  26  52
116 31  430   155 318 586   58  51  70
311 91  501   168 17  100

Total: 24626 = 2 x 7 x 1759. SF: 1768 = 2 x 2 x 2 x 13 x 17.

2.8.2Even valued groups of 3:

100  62  354   453  501 340   401  414 407
52   90  442   100  468 596   407  118 407
14   332 346   401  606 45    50   545 501
23   130 401   112  95  401   257  293 30
85   453 404   50   115 271   594  272 332
596  130 506   376  148 56    190  155 401
271  12  531   106  448 100   100  345 501
60   62  420   340  617 17    131  159 80
456  359 501   30   31  425   40   58  436
95   401 206   444  501 395   1006 345 231
500  311 91    401  541 56    31   140 71
401  50  85    106  30  30

Total: 28532 = 2² x 7 x 1019.

2.9Divide the 219 words into alternating groups of M and N-number of words where M and N are multiples of 7 or 13.

2.9.1Alternating groups of 21 and 52.

2.9.1.1Groups of 21:

66 311 86 3 70 208 26 31 412 31 328 114 100 62 354 317 100 62 208 26 257 31 354 322 401 20 140 62 271 791 718 20 501 338 116 37 60 352 47 68 420 416 56 60 100 541 106 30 30 41 397 575 355 120 332 425 153 17 56 588 49 401 414

Total: 13503 = 3 x 7 x 643.

2.9.1.2Groups of 52:

57 57 25 241 26 60 52 90 442 14 332 346 23 130 401 85 453 404 130 612 45 596 130 506 58 17 526 271 12 531 501 206 26 60 62 420 456 359 501 116 31 430 95 401 206 311 91 501 301 100 62 414 359 90 62 546 501 500 311 91 208 26 33 401 50 85 453 501 340 100 468 596 401 606 45 155 318 586 112 95 401 50 115 271 376 148 56 106 448 100 340 617 17 30 31 425 168 17 100 444 501 395 401 541 407 189 407 735 407 118 407 50 545 501 257 293 30 594 272 332 190 155 401 216 616 477 100 345 501 131 159 80 412 26 77 31 20 176 90 501 302 31 26 52 40 58 436 58 51 70 1006 345 231 31 140 71

Total: 39655 = 5 x 7 x 11 x 103. SF: 126 = 2 x 3 x 3 x 7.

2.9.2Divide the words into alternating groups of 78 and 63.

2.9.2.1Groups of 78:

66 311 86 3 70 208 26 31 412 31 328 114 100 62 354 317 100 62 208 26 257 57 57 25 241 26 60 52 90 442 14 332 346 23 130 401 85 453 404 130 612 45 596 130 506 58 17 526 271 12 531 501 206 26 60 62 420 456 359 501 116 31 430 95 401 206 311 91 501 301 100 62 414 31 354 322 401 20 444 501 395 401 541 56 60 100 541 106 30 30 41 397 575 355 120 332 425 153 17 56 588 49 401 414 407 189 407 735 407 118 407 50 545 501 257 293 30 594 272 332 190 155 401 216 616 477 100 345 501 131 159 80 412 26 77 31 20 176 90 501 302 31 26 52 40 58 436 58 51 70 1006 345 231 31 140 71

Total: 36946 = 2 x 7 x 7 x 13 x 29.

2.9.2.2Group of 63:

140 62 271 791 718 20 501 338 116 37 60 352 47 68 420 416 359 90 62 546 501 500 311 91 208 26 33 401 50 85 453 501 340 100 468 596 401 606 45 155 318 586 112 95 401 50 115 271 376 148 56 106 448 100 340 617 17 30 31 425 168 17 100

Total: 16212 = 2 x 2 x 3 x 7 x 193.

2.10Ten words have the unique ability of dividing the rest of the words into two opposing groups of what is between their Nth and Nth last occurrences, and what is not between those occurrences.

2.10.1The sum of the ten words (first column of table):

26 31 100 62 57 52 401 45 30 407

Total: 1211 = 7 x 173.

2.10.2These are the word positions of the Nth last occurrences:

104 217 149 72 23 207 186 117 153 172

Total of the positions: 1400 = 2³ x 5² x 7. (Sadly there is no matching feature with the positions of the Nth occurrences. However, as Josiah is only a man, this should not be expected.)

First And Last

God said He is Alpha and Omega (Revelation 1:8). This leads to examining the first and last letters of each word.

3The grand total of these numbers: 26740 = 2² x 5 x 7 x 191.

3.1From the list, 7 pairs of totals positioned Nth and Nth last, can be found that together are multiples of 13.

a) Position of Nth:      7   32  36  39  54  107 108
b) Value:                15  16  401 45  15  50  30
c) Position of Nth last: 213 188 184 181 166 113 112
d) Value:                50  10  80  46  401 405 100
e) Sum:                  65  26  481 91  416 455 130

Sum of positions (a + c): 1540 = 2² x 5 x 7 x 11.

3.234 paired groups of totals, positioned Nth and Nth last, are together and individually multiples of 13.

a) 1     1     2    4    5    11    13   15    18    18    19   19
b) 48    91    41   31   6    104   45   75    92    101   54   103
c) 10725 21099 8788 5551 1092 21983 6864 14612 17654 19877 9880 20202

a) 23   25   28    30    30    31   37   40   48    49    50   52   54
b) 28   35   86    79    109   65   71   73   87    91    88   89   83
c) 1079 2327 15470 12909 21021 9139 8853 8580 10933 10374 9919 9113 6422

a) 55    56  58   59   60   64   68   80   93
b) 103   62  74   70   93   98   82   109  101
c) 10322 728 3107 2379 7527 8073 3406 8112 2223

a) Start of first group from the beginning, and also start of second
   group from the end.
b) End of first group from the beginning, and also end of second group
   from the end.
c) Total of both groups.

Total of the positions (a + b): 3783 = 3 x 13 x 97.

3.3Following Revelation 1:8's statement of is, was and is to come, where the present tense is out of order, take every other total from the list in feature 3.

3.3.1The odd positioned totals:

a) 1  3  5  7  9   11 13  15  17  19  21  23 25  27 29 31 33  35 37 39
b) 11 41 45 15 402 46 100 230 100 202 206 48 201 10 54 8  306 90 30 45

a) 41  43 45 47 49  51  53  55 57  59 61 63 65  67  69  71  73  75 77
b) 406 16 56 6  230 405 204 10 120 55 76 90 401 301 201 100 402 14 401

a) 79 81  83  85  87 89 91 93  95 97 99  101 103 105 107 109 111 113
b) 70 230 306 201 76 40 7  120 55 13 201 301 202 14  50  405 340 405

a) 115 117 119 121 123 125 127 129 131 133 135 137 139 141 143 145 147
b) 401 41  8   12  401 45  76  35  22  260 10  31  28  50  201 401 36

a) 149 151 153 155 157 159 161 163 165 167 169 171 173 175 177 179 181
b) 50  16  30  7   305 16  13  35  46  405 45  45  45  50  201 92  46

a) 183 185 187 189 191 193 195 197 199 201 203 205 207 209 211 213 215
b) 16  45  14  45  205 41  55  15  31  36  201 31  32  36  36  50  45

a) 217 219  (Position in list.)
b) 31  26   (Total.)

Sum of the odd positioned totals: 13216 = 2⁵ x 7 x 59.

3.3.2The even positioned totals:

a) 2   4 6   8  10 12 14 16 18 20 22 24 26 28 30  32 34 36  38  40 42
b) 301 3 202 31 31 74 13 7  13 15 48 25 15 52 430 16 14 401 405 90 41

a) 44 46 48  50 52  54 56 58 60  62 64 66  68 70  72 74 76 78 80 82
b) 90 42 440 12 201 15 13 26 201 16 25 204 45 101 13 31 50 16 13 406

a) 84 86  88 90 92 94 96 98  100 102 104 106 108 110 112 114 116 118
b) 16 308 7  35 14 26 90 420 100 45  15  401 30  201 100 86  470 110

a) 120 122 124 126 128 130 132 134 136 138 140 142 144 146 148 150 152
b) 50  25  50  230 88  41  100 405 30  55  10  45  306 40  20  40  15

a) 154 156 158 160 162 164 166 168 170 172 174 176 178 180 182 184 186
b) 41  75  50  55  10  42  401 406 406 406 406 45  56  15  202 80  401

a) 188 190 192 194 196 198 200 202 204 206 208 210 212 214 216 218
b) 10  100 201 14  402 12  10  60  302 15  36  56  46  800 12  140

a) Position in the list.
b) Total.

Sum of the totals: 13524 = 2² x 3 x 7² x 23.

3.4Taking every other number isn't the only method that produces multiples of 7. One could take every other Nth number. As seen in the previous feature, one could begin with the first number and take every Nth, or just take every Nth. Five values of N work both ways.

2 18 42 67 105

Total of the N values that work both ways: 234 = 2 x 3² x 13. SF: 21 = 3 x 7.

3.4.1Taking every Nth, 16 values of N produce multiples of 7.

2 6 8 18 36 42 60 65 67 78 82 83 86 103 105 108

Total of the N values: 949 = 13 x 73.

3.4.2Begin with the first number in feature 3, and take every Nth after. The following values of N produce sums divisible by 13.

8 29 33 34 36 39 72 73 76 85 96

Total of the N values: 581 = 7 x 83.

3.4.3Rather than beginning with the first number, just take every Nth. These N values also produce multiples of 13.

18 20 61 68 71 73 76 77 78 88

Total of the N values: 630 = 2 x 3² x 5 x 7.

3.5The principle of taking every other number can also be extended into taking alternating groups of numbers, and re-applied on those results several times.

There are just over 70 sub-features.

3.6Divide the list in feature 3 into four groups: 1) odd positioned and odd valued, 2) odd positioned and even valued, 3) even position and odd valued, and 4) even positioned and even valued. (Two other features are similar: 2.4 and 7.4

3.6.1Odd position and odd valued:

a) 99  101 109 113 115 117 123 125 129 137 143 145 155 157 161 163
b) 201 301 405 405 401 41  401 45  35  31  201 401 7   305 13  35

a) 167 169 171 173 177 185 189 191 193 195 197 199 203 205 215 217
b) 405 45  45  45  201 45  45  205 41  55  15  31  201 31  45  31

a) Position in the list.
b) First and last total.

Sum of the totals (b): 7112 = 2³ x 7 x 127. SF: 140 = 2² x 5 x 7.

3.6.2Odd position and even valued:

a) 9   11  13  15  17  19  21  23  27  29  31  33  35  37  41  43
b) 402 46  100 230 100 202 206 48  10  54  8   306 90  30  406 16

a) 45  47  49  53  55  57  61  63  71  73  75  79  81  83  87  89
b) 56  6   230 204 10  120 76  90  100 402 14  70  230 306 76  40

a) 93  103 105 107 111 119 121 127 131 133 135 139 141 147 149 151
b) 120 202 14  50  340 8   12  76  22  260 10  28  50  36  50  16

a) 153 159 165 175 179 181 183 187 201 207 209 211 213 219
b) 30  16  46  50  92  46  16  14  36  32  36  36  50  26

a) Position in the list.
b) First and last total.

Sum of the totals (b): 6104 = 2³ x 7 x 109.

3.6.3Even position and odd valued:

a) 2   4   8   10  14  16  18  20  24  26  36  38  42  52  54  56
b) 301 3   31  31  13  7   13  15  25  15  401 405 41  201 15  13

a) 60  64  68  70  72  74  80  88  90  102 104 106 110 122 130 134
b) 201 25  45  101 13  31  13  7   35  45  15  401 201 25  41  405

a) 138 142 152 154 156 160 166 176 180 186 192 206
b) 55  45  15  41  75  55  401 45  15  401 201 15

a) Position in the list.
b) First and last total.

Sum of the totals (b): 4498 = 2 x 13 x 173.

3.6.4Even position and even valued:

a) 6   12  22  28  30  32  34  40  44  46  48  50  58  62  66  76  78
b) 202 74  48  52  430 16  14  90  90  42  440 12  26  16  204 50  16

a) 82  84  86  92  94  96  98  100 108 112 114 116 118 120 124 126 128
b) 406 16  308 14  26  90  420 100 30  100 86  470 110 50  50  230 88

a) 132 136 140 144 146 148 150 158 162 164 168 170 172 174 178 182 184
b) 100 30  10  306 40  20  40  50  10  42  406 406 406 406 56  202 80

a) 188 190 194 196 198 200 202 204 208 210 212 214 216 218
b) 10  100 14  402 12  10  60  302 36  56  46  800 12  140

a) Position in the list.
b) First and last total.

Sum of the totals (b): 9026 (2 x 4513). SF: 4515 = 3 x 5 x 7 x 43. Of the four categories, this is the only one that does not immediately yield a feature. Nevertheless, there is a multiple of 7 in the sum of the factors. If this was all by chance, one would not expect organizing the totals into four categories would produce anything.

3.7Applying Revelation 1:8's statement of Alpha and Omega, and is, was and is to come led to examining the first and last, and going through the list. The middle has been neglected. There are 109 ways of looking at the middle N-number of totals in feature 3. The odds would suggest only 8 or 9 of the middle N-number of totals would add up to something divisible by 13. The odds are wrong because, providentially, precisely 13 yield sums divisible by 13.

189 177 169 153 125 117 105 101 71 45 41 33 25

And once again, providentially, the total of these numbers is a multiple of 7: 1351 = 7 x 193.

3.8When the numbers in feature 3 are added one by one, 15 times the accumulated total will be divisible by 13. The positions where this happens is listed below.

2 23 34 42 48 76 91 107 138 157 164 179 187 199 212

The total of these positions: 1659 = 3 x 7 x 79.

3.9In feature 3, some of the numbers appear more than once. There are 69 unique numbers.

3 6 7 8 10 11 12 13 14 15 16 20 22 25 26 28 30 31 32 35 36 40 41 42 45 46 48 50 52 54 55 56 60 70 74 75 76 80 86 88 90 92 100 101 110 120 140 201 202 204 205 206 230 260 301 302 305 306 308 340 401 402 405 406 420 430 440 470 800

Total of the unique values: 9835 = 5 x 7 x 281.

3.9.1The odd valued unique numbers from feature 6.9:

3 7 11 13 15 25 31 35 41 45 55 75 101 201 205 301 305 401 405

Total: 2275 = 5² x 7 x 13.

3.9.2The even valued numbers from feature 6.9:

6 8 10 12 14 16 20 22 26 28 30 32 36 40 42 46 48 50 52 54 56 60 70 74 76 80 86 88 90 92 100 110 120 140 202 204 206 230 260 302 306 308 340 402 406 420 430 440 470 800

Total: 7560 = 2³ x 3³ x 5 x 7.

3.9.3Four of the unique values occurred 7 times.

10 31 13 100

Total of the four that occurred 7 times: 154 = 2 x 7 x 11.

3.10The first number in feature 3 is 11. Search for the next number that is lower. From that point, search for the next number that is higher. Continue searching, alternating between high and low until all the numbers are covered. 121 numbers will be selected.

a) 1   4   5   7   8   10  11  14  15  16  17  18  19  20  21  22
b) 11  3   45  15  31  31  46  13  230 7   100 13  202 15  206 48

a) 23  24  25  26  28  31  32  34  35  37  38  39  40  42  44  45
b) 48  25  201 15  52  8   16  14  90  30  405 45  90  41  90  56

a) 48  49  51  52  53  54  57  58  59  62  63  64  65  66  67  68
b) 440 230 405 201 204 15  120 26  55  16  90  25  401 204 301 45

a) 69  70  73  74  76  78  79  80  81  84  85  87  93  94  95  97
b) 201 101 402 31  50  16  70  13  230 16  201 76  120 26  55  13

a) 98  99  101 102 103 104 106 107 109 110 111 112 113 114 115 117
b) 420 201 301 45  202 15  401 50  405 201 340 100 405 86  401 41

a) 118 119 120 121 122 131 132 135 136 139 141 142 143 146 149 150
b) 110 8   50  12  25  22  100 10  30  28  50  45  201 40  50  40

a) 154 155 156 158 160 161 163 180 181 183 184 185 186 187 189 193
b) 41  7   75  50  55  13  35  15  46  16  80  45  401 14  45  41

a) 195 197 199 200 201 205 207 216 217 (Word position.)
b) 55  15  31  10  36  31  32  12  31  (Total of the first & last.)

Total of the positions (a): 11479 = 13 x 883. SF: 896 = 2⁷ x 7. SF: 21 = 3 x 7.
Total of the numbers (b): 12334 = 2 x 7 x 881.

The First Letter Of Each Word

4Total of the first letter of each word: 6342 = 2 x 3 x 7 x 151.

4.1Take every Nth letter from feature 4. The following values of N produce totals divisible by 7.

3 5 11 12 17 21 22 37 39 40 47 60 65 79 81 83 85 99 105 107 109

Total of the N values: 1127 = 7² x 23.

4.1.1The first and last N value from feature 4.1: 112 = 2⁴ x 7.

4.1.212 of the N values have a first digit that is odd valued:

3 5 11 12 17 37 39 79 99 105 107 109

Total: 623 = 7 x 89.

4.1.39 of the N values have an even valued first digit:

21 22 40 47 60 65 81 83 85

Total: 504 = 2³ x 3² x 7.

4.1.4Take every 39th of the first letters:

5 10 1 70 5

Total of these letters: 91 = 7 x 13.

4.2.1Exactly 140 of the first letters begin with a first digit that is odd valued:

1 1 10 1 1 70 70 5 30 70 5 10 1 10 5 50 30 10 300 70 1 5 5 70 1 10 70 5 30 7 5 1 10 5 5 50 5 1 70 5 1 1 5 1 100 70 5 1 10 1 10 5 30 10 1 300 70 10 30 1 50 5 5 1 50 1 5 10 1 5 1 300 70 5 1 70 1 70 10 5 1 5 30 70 30 1 70 5 5 30 50 5 5 1 300 1 10 10 10 10 1 70 300 30 10 50 5 5 30 1 5 5 5 5 5 1 50 10 10 30 5 1 5 5 70 5 1 5 10 30 5 30 1 300 1 10 30 50 30 100

Total: 4410 = 2 x 3² x 5 x 7².

4.2.279 of the first letters begin with a first digit that is even valued:

6 2 40 2 2 6 6 2 6 40 40 20 2 4 6 20 6 6 2 40 4 6 6 20 4 2 6 40 400 6 6 6 6 40 20 2 6 20 20 6 6 6 20 80 20 60 20 20 40 6 40 6 20 2 2 6 6 6 6 6 20 2 6 2 4 40 8 2 6 40 2 6 6 40 20 400 40 6 20

Total: 1932 = 2² x 3 x 7 x 23.

4.317 of the first letters are multiples of 7:

List position: 12 13 17 35 40 44 50 61 71 87 112 116 118 127 132 156 190
First letters: 70 70 70 70 70 70 7  70 70 70 70  70  70  70  70  70  70

The total has an extra multiple of 7: 1127 = 7² x 23.

4.4Divide the first letters into groups of three and add up each group. Divide the groups into two categories: odd valued and even valued.

4.4.1Odd valued groups of 3:

10  1   2        1   6   50
1   6   70       6   5   40
70  5   30       1   20  20
6   70  5        70  5   6
6   70  1        20  5   30
70  6   1        1   20  70
2   5   40       20  5   40
1   4   10       1   10  6
1   5   1        1   2   70
100 70  5        6   5   6
2   1   6        40  8   5
10  1   10       30  5   30
40  5   30       40  1   300
1   300 70       1   10  2

Total of the odd valued groups: 2170 = 2 x 5 x 7 x 31.

4.4.2Even valued groups of 3:

6   1   1       5   20  1       1   5   6
2   40  2       50  1   5       5   6   5
2   10  6       2   10  6       20  5   1
40  40  20      5   1   300     50  2   10
1   10  5       1   70  1       6   2   10
2   50  30      70  6   10      30  5   1
4   10  300     6   5   1       4   5   5
20  5   5       70  80  30      70  5   1
10  70  6       60  5   5       2   10  6
30  7   5       20  30  50      30  6   50
5   5   50      5   1   300     6   40  20
6   5   1       10  40  10      400 40  6
70  6   20      6   10  20      30  100 20
5   1   4       300 30  10
400 6   10      50  5   5
6   10  30      30  2   6

Total of the even valued groups of three: 4172 = 2² x 7 x 149.

4.4.3The difference between the odd and even valued groups of three is a very symmetrical number: 2002 = 2 x 7 x 11 x 13.

4.5The first letters also form two groups of different sizes where the number of letters in each group is a multiple of 7 or 13. Divide the letters into alternating groups of 78 and 63 letters.

4.5.1Groups of 78:

6 1 1 2 40 2 10 1 2 1 6 70 70 5 30 6 70 5 2 10 6 40 40 20 1 10 5 2 50 30 4 10 300 6 70 1 20 5 5 70 6 1 10 70 6 2 5 40 30 7 5 1 4 10 5 5 50 6 5 1 70 6 20 5 1 4 1 5 1 100 70 5 2 1 6 10 1 10 5 1 300 1 10 6 10 40 10 6 10 20 1 2 70 300 30 10 50 5 5 30 2 6 1 5 6 5 6 5 6 5 6 20 5 1 50 2 10 6 2 10 30 5 1 4 5 5 70 5 1 40 8 5 2 10 6 30 5 30 40 1 300 1 10 2 30 6 50 6 40 20 400 40 6 30 100 20

Total: 4067 = 7² x 83.

4.5.2Group of 63:

40 5 30 400 6 10 1 300 70 6 10 30 1 6 50 6 5 40 5 20 1 50 1 5 2 10 6 1 20 20 5 1 300 70 5 6 1 70 1 70 6 10 6 5 1 20 5 30 70 80 30 1 20 70 60 5 5 20 30 50 20 5 40

Total: 2275 = 5² x 7 x 13.

4.615 of the first letters divide the rest of the list into what is between their Nth and Nth last occurrences, and what is not between.

4.6.1The sum of the Nth (or Nth last) occurrences in the second column of the table: 84 = 2² x 3 x 7. SF: 14 = 2 x 7.

4.6.2The letter 1 (first letter of the alphabet) occurs three times in the table. Its Nth occurrences are 3, 6 and 12. The sum of these numbers: 21 = 3 x 7.

4.6.3Precisely 7 unique letters are in the table:

6 1 70 5 20 50 4

Total of the unique values: 156 = 2² x 3 x 13.

4.6.4From the first column of the table, take the letters from the odd positioned rows.

6 6 1 70 70 5 20 4

Total: 182 = 2 x 7 x 13.

4.6.5It is the seventh row where letter 70 first appears. It is also the seventh last row where the letter 70 last appears.

4.6.6Letters 70 and 4 are the only two where it is their first and last occurrences that divide the rest of the list. The first and last occurrences of the letter 70 are at positions 12 and 190 of the list. The first and last occurrences of the letter 4 are at positions 31 and 187. The total of these four positions: 420 = 2² x 3 x 5 x 7.

4.7Place the first letters of each word into a two dimension object (3 x 73). The chart below lists each letter with its coordinates in the object.

a)  b)  c)         a)  b)  c)         a)  b)  c)         a)  b)  c)         a)  b)  c)         a)  b)  c)
6   1   1          10  1   15         1   1   29         70  1   43         5   1   57         6   1   71
1   2   1          70  2   15         300 2   29         80  2   43         6   2   57         40  2   71
1   3   1          6   3   15         70  3   29         30  3   43         5   3   57         20  3   71
2   1   2          2   1   16         6   1   30         1   1   44         6   1   58         400 1   72
40  2   2          5   2   16         10  2   30         20  2   44         5   2   58         40  2   72
2   3   2          40  3   16         30  3   30         70  3   44         6   3   58         6   3   72
10  1   3          30  1   17         1   1   31         60  1   45         20  1   59         30  1   73
1   2   3          7   2   17         6   2   31         5   2   45         5   2   59         100 2   73
2   3   3          5   3   17         50  3   31         5   3   45         1   3   59         20  3   73
1   1   4          1   1   18         6   1   32         20  1   46         50  1   60
6   2   4          4   2   18         5   2   32         30  2   46         2   2   60
70  3   4          10  3   18         40  3   32         50  3   46         10  3   60
70  1   5          5   1   19         5   1   33         20  1   47         6   1   61
5   2   5          5   2   19         20  2   33         5   2   47         2   2   61
30  3   5          50  3   19         1   3   33         40  3   47         10  3   61
6   1   6          6   1   20         50  1   34         5   1   48         30  1   62
70  2   6          5   2   20         1   2   34         1   2   48         5   2   62
5   3   6          1   3   20         5   3   34         300 3   48         1   3   62
2   1   7          70  1   21         2   1   35         1   1   49         4   1   63
10  2   7          6   2   21         10  2   35         10  2   49         5   2   63
6   3   7          20  3   21         6   3   35         6   3   49         5   3   63
40  1   8          5   1   22         1   1   36         10  1   50         70  1   64
40  2   8          1   2   22         20  2   36         40  2   50         5   2   64
20  3   8          4   3   22         20  3   36         10  3   50         1   3   64
1   1   9          1   1   23         5   1   37         6   1   51         40  1   65
10  2   9          5   2   23         1   2   37         10  2   51         8   2   65
5   3   9          1   3   23         300 3   37         20  3   51         5   3   65
2   1   10         100 1   24         70  1   38         1   1   52         2   1   66
50  2   10         70  2   24         5   2   38         2   2   52         10  2   66
30  3   10         5   3   24         6   3   38         70  3   52         6   3   66
4   1   11         2   1   25         1   1   39         300 1   53         30  1   67
10  2   11         1   2   25         70  2   39         30  2   53         5   2   67
300 3   11         6   3   25         1   3   39         10  3   53         30  3   67
6   1   12         10  1   26         70  1   40         50  1   54         40  1   68
70  2   12         1   2   26         6   2   40         5   2   54         1   2   68
1   3   12         10  3   26         10  3   40         5   3   54         300 3   68
20  1   13         40  1   27         6   1   41         30  1   55         1   1   69
5   2   13         5   2   27         5   2   41         2   2   55         10  2   69
5   3   13         30  3   27         1   3   41         6   3   55         2   3   69
70  1   14         400 1   28         20  1   42         1   1   56         30  1   70
6   2   14         6   2   28         5   2   42         5   2   56         6   2   70
1   3   14         10  3   28         30  3   42         6   3   56         50  3   70

a) First letter of a word.     b) First dimension coordinate.
c) Second dimension coordinate.

4.7.1Exactly 63 letters have a second dimension coordinate as a prime number. The total of these letters: 2289 = 3 x 7 x 109. SF: 119 = 7 x 17.

4.7.1.1The list of 63 letters is given below.

2 40 2 10 1 2 70 5 30 2 10 6 4 10 300 20 5 5 30 7 5 5 5 50 1 5 1 1 300 70 1 6 50 5 1 300 6 5 1 70 80 30 20 5 40 300 30 10 20 5 1 6 2 10 30 5 30 6 40 20 30 100 20

Divide it into groups of 7.

4.7.1.2Odd positioned groups of 7:

2 40 2 10 1 2 70 300 20 5 5 30 7 5 300 70 1 6 50 5 1 20 5 40 300 30 10 20 30 6 40 20 30 100 20

Total: 1603 = 7 x 229.

4.7.1.3Even positioned groups of 7 from 2:

5 30 2 10 6 4 10 5 5 50 1 5 1 1 300 6 5 1 70 80 30 5 1 6 2 10 30 5

Total: 686 = 2 x 7³.

4.7.2The remaining letters in coordinates that are not prime numbers would also be a multiple of 7: 4053 = 3 x 7 x 193. SF: 203 = 7 x 29.

4.7.2.1The list of the remaining letters is given below.

6 1 1 1 6 70 6 70 5 40 40 20 1 10 5 2 50 30 6 70 1 70 6 1 10 70 6 2 5 40 1 4 10 6 5 1 70 6 20 5 1 4 100 70 5 2 1 6 10 1 10 40 5 30 400 6 10 6 10 30 6 5 40 5 20 1 50 1 5 2 10 6 1 20 20 70 5 6 1 70 1 70 6 10 20 5 30 1 20 70 60 5 5 20 30 50 5 1 300 1 10 6 10 40 10 6 10 20 1 2 70 50 5 5 30 2 6 1 5 6 5 6 5 6 5 6 50 2 10 30 5 1 4 5 5 70 5 1 40 8 5 2 10 6 40 1 300 1 10 2 30 6 50 400 40 6

Over a hundred sub-features can be found by taking alternating groups from the list and repeating the process on the results over and over.

4.7.3The difference between 4.7.1 and 4.7.2 produces an extra factor of 7: 1764 = 2² x 3² x 7².

The Last Letter Of Each Word

5Total of the last letters: 20398 = 2 x 7 x 31 x 47.

5.1The letters of God’s name in Hebrew (10-5-6-5) can be applied 7 times to count through a good portion of the last letters.

a) 10 5   6   5  10  5   6  5   10 5   6   5  10 5  6   5   10  5   6
b) 10 15  21  26 36  41  47 52  62 67  73  78 88 93 99  104 114 119 125
c) 30 200 200 5  400 400 1  200 10 300 400 6  1  70 200 5   80  2   40

a) 5   10  5   6   5   10  5   6   5   (Value from the Name.)
b) 130 140 145 151 156 166 171 177 182 (Count.)
c) 40  5   400 10  5   400 40  200 200 (Last letter found.)

Total of the last letters found: 3850 = 2 x 5² x 7 x 11.

5.2145 paired groups of the last letters, positioned Nth and Nth last in the list, are together and individually multiples of 7.

a) 1    1     2    3    3    3    4    5     6    6    6    6     6
b) 28   63    30   29   37   49   50   67    26   32   42   56    68
c) 3556 11326 4179 3409 4844 7952 8316 11907 2891 3836 6027 10437 11942

a) 6     6     6     7     8     9     10  10    11   12  12    12
b) 84    89    106   74    82    60    14  92    36   17  70    88
c) 14420 15302 18879 12131 13468 10129 189 14273 3633 546 10976 14063

a) 12    12    13   14   15    16    17   17    18    18    18    18
b) 90    95    39   38   92    73    61   76    70    88    90    95
c) 14140 14553 4249 4109 14084 11151 9289 11662 10430 13517 13594 14007

a) 19   19   19   19    19    19    20   20    22   22    23   23
b) 43   45   48   80    100   105   53   78    44   75    65   109
c) 4452 4592 5873 12103 15183 16618 7952 11844 4095 10941 9135 17577

a) 26   26   26    27  27   27   27   27    27    27    29   30   30
b) 41   51   107   32  42   56   68   84    89    106   63   37   49
c) 3101 5859 16429 945 3136 7546 9051 11529 12411 15988 7770 1435 4543

a) 32   33   33   33   33    33    33    34   35   36   36   38   42
b) 40   42   56   68   84    89    106   58   59   52   55   49   51
c) 1666 2191 6601 8106 10584 11466 15043 6685 6335 5019 6069 3108 2758

a) 42    43   43   43   43   43    44  44   44   44    44    45   46
b) 107   56   68   84   89   106   45  48   80   100   105   75   48
c) 13328 4410 5915 8393 9275 12852 140 1421 7651 10731 12166 6846 1281

a) 46   46    46    47   47   48   48   48    48    49   49   49    52
b) 80   100   105   77   85   64   93   104   108   80   100  105   107
c) 7511 10591 12026 6972 7812 4088 8596 11137 12495 6230 9310 10745 10570

a) 53   54   55   55   57   57   57   57   62   63   65   65   65   66
b) 55   78   72   83   68   84   89   106  76   96   93   104  108  109
c) 1050 3892 1897 4060 1505 3983 4865 8442 2373 4998 4508 7049 8407 8442

a) 69   69   69   70   70   71   71   71   72   73   78  80   80   80
b) 84   89   106  87   91   88   90   95   97   83   85  86   99   101
c) 2478 3360 6937 3087 3206 3087 3164 3577 4025 2163 840 1162 3003 3395

a) 81   81   85  85   87   87   88  89 89  90   91  94   94   100 101
b) 100  105  89  106  99   101  91  90 95  106  95  104  108  101 105
c) 3080 4515 882 4459 1841 2233 119 77 490 3577 413 2541 3899 392 1435

a) 105   (Starting group position, from the beginning and from the end.)
b) 108   (Ending group position, from the beginning and from the end.)
c) 1358  (Total of both groups.)

Total of the positions (a + b): 16991 = 13 x 1307.

5.331 paired groups of the last letters, positioned Nth and Nth last in the list, are together and individually multiples of 13.

a) 1    2    2    4    5     6     7     8    12  12  14   15    16
b) 25   26   50   34   84    85    70    27   17  19  47   106   36
c) 3289 3289 8697 4277 14430 14625 11583 2262 546 780 5577 17589 3250

a) 17    18  23   24    27   32   33    39   42  44   46   53    67
b) 98    19  37   101   50   49   89    74   46  93   71   108   107
c) 15145 234 2574 15041 5408 4069 11466 7345 832 9217 5850 10010 7722

a) 69   77   78   80  96
b) 92   87   94   81  105
c) 3432 2054 1885 221 2639

a) Starting group position, from the beginning and from the end.
b) Ending group position, from the beginning and from the end.
c) Total of both groups.

Total of the positions (a + b): 2996 = 2² x 7 x 107.

5.4.1Taking every Nth from the list of last letters, 12 values of N produce totals divisible by 13:

11 14 16 29 31 37 40 44 45 54 68 80

Total of the N values: 469 = 7 x 67. (Note: The first and last N values amount to 91, which is a multiple of 7 and 13.)

5.4.2Whether one begins with the first letter in the list and takes every Nth after, or just takes every Nth, only two values of N produce multiples of 13 both ways.

11 54

Total of the N values: 65 = 5 x 13.

5.5Divide the last letters into two groups: odd valued and even valued.

5.5.138 of the last letters are odd valued:

a) 1 4 5 7 16 20 24 26 27 47 50 54 55 70 88 90 104 129 135 137 138 140
b) 5 1 5 5 1  5  5  5  5  1  5  5  5  1  1  5  5   5   5   1   5   5

a) 152 155 156 157 160 162 163 180 188 193 197 199 200 206 215 217
b) 5   5   5   5   5   5   5   5   5   1   5   1   5   5   5   1

a) Word position.
b) Last letter.

Total of the odd valued: 154 = 2 x 7 x 11.

5.5.2181 of the last letters are even valued:

a) 2   3  6   8  9   10 11 12 13 14 15  17 18 19  21  22 23 25  28 29
b) 300 40 200 30 400 30 40 4  30 8  200 30 8  200 200 8  8  200 50 4

a) 30  31 32 33 34 35 36  37 38  39 40 41  42 43 44 45 46 48  49  51
b) 400 4  6  6  8  20 400 10 400 40 20 400 40 6  20 50 40 400 200 400

a) 52  53  56 57 58 59 60  61 62 63 64 65  66  67  68 69  71 72 73  74
b) 200 200 8  70 20 50 200 6  10 70 20 400 200 300 40 200 30 8  400 30

a) 75 76 77  78 79 80 81  82 83  84 85  86 87 89 91 92 93 94 95 96 97
b) 8  40 400 6  30 8  200 6  300 6  200 8  6  30 6  8  70 20 50 50 8

a) 98  99  100 101 102 103 105 106 107 108 109 110 111 112 113 114 115
b) 400 200 50  300 40  200 8   400 30  10  400 200 40  30  400 80  400

a) 116 117 118 119 120 121 122 123 124 125 126 127 128 130 131 132 133
b) 400 40  40  2   40  6   20  400 30  40  200 6   8   40  2   30  200

a) 134 136 139 141 142 143 144 145 146 147 148 149 150 151 153 154 158
b) 400 10  8   10  40  200 6   400 30  30  10  10  30  10  10  40  20

a) 159 161 164 165 166 167 168 169 170 171 172 173 174 175 176 177 178
b) 6   8   40  40  400 400 400 40  400 40  400 40  400 30  40  200 6

a) 179 181 182 183 184 185 186 187 189 190 191 192 194 195 196 198 201
b) 90  40  200 6   50  40  400 10  40  30  200 200 6   50  400 6   6

a) 202 203 204 205 207 208 209 210 211 212 213 214 216 218 219
b) 20  200 2   30  30  6   30  6   30  6   30  400 6   40  6

a) Word position.
b) Last letter of word.

Total of the even valued last letters: 20244 = 2² x 3 x 7 x 241.

5.5.3Odd and even is determined by the last digit of a number. For the last letters, there is even something in the first digit.

5.5.3.186 of the last letters have a first digit that is odd valued.

5 300 1 5 5 30 30 30 1 30 5 5 5 5 50 10 50 1 5 5 5 70 50 10 70 300 1 30 30 30 300 1 30 5 70 50 50 50 300 5 30 10 30 30 5 30 5 10 1 5 5 10 30 30 10 10 30 10 5 10 5 5 5 5 5 5 30 90 5 50 10 5 30 1 50 5 1 5 30 5 30 30 30 30 5 1

Total of these letters: 2814 = 2 x 3 x 7 x 67.

5.5.3.2133 (7 x 19; SF: 26 = 2 x 13) of the last letters have a first digit that is even valued.

40 200 400 40 4 8 200 8 200 200 8 8 200 4 400 4 6 6 8 20 400 400 40 20 400 40 6 20 40 400 200 400 200 200 8 20 200 6 20 400 200 40 200 8 400 8 40 400 6 8 200 6 6 200 8 6 6 8 20 8 400 200 40 200 8 400 400 200 40 400 80 400 400 40 40 2 40 6 20 400 40 200 6 8 40 2 200 400 8 40 200 6 400 40 20 6 8 40 40 400 400 400 40 400 40 400 40 400 40 200 6 40 200 6 40 400 40 200 200 6 400 6 6 20 200 2 6 6 6 400 6 40 6

Total of these letters: 17584 = 2⁴ x 7 x 157.

5.6Divide the list into four categories: A) Odd valued and odd positioned, B) Odd valued and even positioned, C) Even valued and odd positioned, and D) even valued and even positioned.

A) Odd position & odd valued:
5 5 5 5 1 5 5 5 1 5 5 5 1 5 1 5 1

B) Odd position & even valued:
40 400 40 30 200 30 200 200 8 200 4 4 6 20 10 40 400 6 50 200 400 
200 70 50 6 70 400 300 200 30 400 8 400 30 200 300 200 6 30 6 70 
50 8 200 300 200 8 30 400 40 400 400 40 2 6 400 40 6 2 200 8 10 
200 400 30 10 10 10 6 8 40 400 40 40 40 30 200 90 40 6 40 10 40 
200 50 6 200 30 30 30 30 30 6

C) Even position & odd valued:
1 1 5 5 5 5 5 1 1 5 5 5 5 5 5 5 5 5 5 5 5

D) Even position & even valued:
300 200 30 30 4 8 8 8 50 400 6 8 400 400 20 40 20 40 400 200 8 20
200 10 20 200 40 8 30 40 6 8 6 6 8 8 20 50 400 50 40 400 10 200 30 
80 400 40 40 20 30 200 8 40 30 400 10 40 6 30 10 30 40 20 40 400 
400 400 400 400 40 6 200 50 400 30 200 6 400 6 20 2 6 6 6 400 6 40

5.6.117 letters are in category A. 88 letters are in category D. The total of these 105 (3 x 5 x 7) letters that are purely odd or purely even: 9793 = 7 x 1399.

5.6.2This means the two mixed categories (B and C) together are also a multiple of 7: 10605 = 3 x 5 x 7 x 101.

5.7.1From the list of last letters, the middle N-number of letters produces a total divisible by 7 when N is one of the following:

213 211 187 163 151 119 101 97 93 85 67 61 47 31 21 17

Total of the N values: 1664 = 2⁷ x 13.

5.7.2The middle N-number of letters is a multiple of 13 when N is one of the following:

203 195 179 135 105 83 75 43 35

Total of the N values: 1053 = 3⁴ x 13.

5.8The last letters divide perfectly into alternating groups of 39 (3 x 13) and 21 (3 x 7).

5.8.1Groups of 39:

5 300 40 1 5 200 5 30 400 30 40 4 30 8 200 1 30 8 200 5 200 8 8 5 200 5 5 50 4 400 4 6 6 8 20 400 10 400 40 6 10 70 20 400 200 300 40 200 1 30 8 400 30 8 40 400 6 30 8 200 6 300 6 200 8 6 1 30 5 6 8 70 20 50 50 8 400 200 6 20 400 30 40 200 6 8 5 40 2 30 200 400 5 10 1 5 8 5 10 40 200 6 400 30 30 10 10 30 10 5 10 40 5 5 5 20 6 40 200 6 50 40 400 10 5 40 30 200 200 1 6 50 400 5 6 1 5 6 20 200 2 30 5 30 6 30 6 30 6 30 400 5 6 1 40 6

Total: 11949 = 3 x 7 x 569.

5.8.2Groups of 21:

20 400 40 6 20 50 40 1 400 200 5 400 200 200 5 5 8 70 20 50 200 50 300 40 200 5 8 400 30 10 400 200 40 30 400 80 400 400 40 40 2 40 5 8 5 5 40 40 400 400 400 40 400 40 400 40 400 30 40 200 6 90 5

Total: 8449 = 7 x 17 x 71.

5.8.3The difference between 5.8.1 and 5.8.2: 3500 = 2² x 5³ x 7. SF: 26 = 2 x 13.

5.9The very first letter of the last letters is 5. Search for the next letter that is lower in value. From that point, search for another letter that is higher in value. Continue alternating the search until the entire list is covered. This will select 122 letters. The total of these letters: 6656 = 2⁹ x 13.

Letters That Are Not First Or Last

Examining letters that are first or last in a word brings up an opposite category: letters that are not first or last.

Letters not first or last:
5 50 10 30 5 10 10 5 6 4 4 2 5 6 10 10 200 2 70 40 40 7 2 5 100 9 10 10 100 200 40 7 2 4 2 5 6 10 1 40 7 2 7 2 40 5 6 50 6 30 2 10 6 1 300 10 5 40 7 2 30 10 5 50 2 40 6 40 100 9 200 10 30 10 70 90 40 6 4 300 200 80 30 10 50 400 10 6 5 6 6 80 1 40 40 6 80 300 2 5 6 50 40 7 2 100 200 50 300 80 4 300 300 30 10 10 5 300 40 40 30 2 10 1 30 5 10 300 200 40 7 2 2 10 10 300 30 200 2 70 4 70 40 7 2 1 40 80 300 5 400 10 2 4 300 30 30 10 30 20 5 300 10 2 30 10 5 40 7 2 100 200 10 300 80 4 300 40 7 2 40 6 80 300 400 10 1 30 5 10 4 2 5 6 10 7 2 5 50 2 40 6 300 40 7 2 8 6 10 300 200 90 40 6 4 30 10 5 10 300 200 6 300 30 10 90 40 30 70 1 40 300 60 10 5 6 30 5 10 20 20 400 6 80 2 200 10 7 70 300 80 60 7 10 40 300 80 9 10 300 80 9 300 200 1 20 40 30 20 300 200 1 40 30 20 5 6 4 300 40 50 300 200 50 40 30 1 300 10 5 70 300 80 60 7 10 5 6 10 200 6 300 30 3 1 2 6 1 10 4 70 50 10 1 400 200 80 10 1 3 30 30 10 1 300 100 90 10 300 200 1 1 200 5 6 4 2 10 200 6 300 30 70 1 300 10 5 40 70 100 10 2 200 400 6 200 20 400 2 10 60 80 300 90 30 100 10 5 20 5 10 5 6 20 40 5 10 80 50 10 30 300 5 6 20 2 2 2 20 80 300 2 20 1 4 20 6 200 300 1 8 200 10 40 5

6405 letters are not first or last in a word. The total of these letters: 26418 = 2 x 3 x 7 x 17 x 37. (Three of the factors have digits of 7.)

6.1Since there are 405 of these letters, the Nth and Nth last positions of any pair in the list is automatically divisible by 7. (1 + 405 = 406. 406 = 2 x 7 x 29.) Thus, it makes little sense to search for pairs of letters that together are multiples of 7. Pairs of letters divisible by 13 are something else.

a) Nth letter: 5   22  25  37  49  70  86  122
b) Value:      5   7   100 6   6   9   400 2
c) Nth last:   401 384 381 369 357 336 320 284
d) Value:      8   6   30  20  20  4   3   50
e) Sum:        13  13  130 26  26  13  403 52

The sum of the positions in line a): 416 = 2⁵ x 13.

6.1.2The sum of the positions in line c): 2832 = 2⁴ x 3 x 59. The feature is in the sum of the factors: 70 = 2 x 5 x 7. SF: 14 = 2 x 7.

6.1.3The sum of line e) is naturally divisible by 13, but it goes one step further with an extra factor of 13: 676 = 2² x 13². The total is also a symmetrical number with its first two digits and last two digits also adding up to 13.

6.2134 paired groups of letters, positioned Nth and Nth last in the list, are together and individually multiples of 13.

a) 1     1     1     2     5    5    9    9     9     10    11   11
b) 104   127   148   184   21   28   71   111   180   118   30   40
c) 11518 15457 18499 24245 1417 2041 6149 11609 22594 13377 1781 2119

a) 12   13   14   14   15    16   16   16   16    17  17    17    20
b) 53   77   52   82   201   37   51   103  123   20  140   197   202
c) 4082 7059 3848 8125 25103 1599 3120 9932 13442 338 15977 24583 24453

a) 21    21    22  28   30  30  31  32    33 34    34    35    35
b) 140   197   28  83   32  36  40  179   36 157   182   150   154
c) 15639 24245 624 6825 312 351 338 20605 39 17706 20748 16354 16887

a) 35    38   38   38    39   39    45   46   46   46    47   47    47
b) 172   51   103  123   70   151   54   68   106  125   107  120   169
c) 19279 1521 8333 11843 3939 16731 1456 3055 8164 11440 8359 10712 18109

a) 48    50   50    52   52    53   56   58    59  59    60   60    63
b) 189   57   152   103  123   82   115  152   64  149   92   198   156
c) 21541 1352 15483 6812 10322 4277 8320 14131 520 13286 4849 20358 14469

a) 63    64    64    65    68  68    69   69   70   71    72   72
b) 177   162   173   149   76  176   106  125  124  151   111  180
c) 17316 15158 16146 12766 988 16237 5109 8385 8203 12792 5460 16445

a) 74   74   74    75   75    77    79    79    79    81   81    82
b) 80   122  181   97   165   176   174   183   193   122  181   114
c) 1222 7228 16250 3471 14365 15249 14768 15938 17316 6006 15028 4563

a) 86    88   89   90   93    94    96   98    99   101  101   102  104
b) 164   112  134  144  198   168   139  165   121  128  196   155  123
c) 12363 3198 6448 8216 15509 11284 6591 10894 3393 4680 14859 9009 3510

a) 105  105  106 107  108  108  112   114  114  121  123  128  129
b) 127  148  109 125  120  169  180   146  160  169  181  148  196
c) 3939 6981 871 3276 2353 9750 10985 5122 7566 7397 9022 3042 10179

a) 131  134  136  137  137  139 141  144  147  151 151  155  157  158
b) 141  170  142  143  187  145 197  187  160  154 172  172  177  182
c) 1339 5681 1287 1027 8242 845 8606 7215 2444 533 2925 2392 2847 3042

a) 160  163 175  175  184  187
b) 166  173 183  193  193  192
c) 1105 988 1170 2548 1378 117

a) Start of groups, from the beginning and from the end.
b) End of groups, from the beginning and from the end.
c) Total of both groups.

Sum of the start and end positions (a + b): 27279 = 3² x 7 x 433.

6.3Take every other letter from the list in feature 6.

6.3.1The odd positioned: 12663 = 3³ x 7 x 67.

6.3.2The even positioned: 13755 = 3 x 5 x 7 x 131.

6.3.3The difference between the odd and even positioned letters: 1092 = 2² x 3 x 7 x 13.

6.4Take every Nth letter from the list in feature 6. The following values of N all produce totals divisible by 7:

2 9 22 30 40 72 73 77 85 104 111 116 120 122 130 133 135 136 143 145 146 151 158 161 162 177 187 188 193

Total of the N values: 3328 = 2⁸ x 13.

6.4.1The first and last N values that succeeded in feature 6.4: 2 + 193 = 195. (3 x 5 x 13. SF: 21 = 3 x 7.)

6.4.2Providentially, the N value in the middle of the results in feature 6.4 is 130 (2 x 5 x 13).

6.4.3Everything from the beginning of the list in feature 6.4, up to and including the middle N value is a multiple of 7.

2 9 22 30 40 72 73 77 85 104 111 116 120 122 130

Total: 1113 = 3 x 7 x 53.

6.4.4Everything from the middle of the list in feature 6.4 to the end of the list is again a multiple of 7.

130 133 135 136 143 145 146 151 158 161 162 177 187 188 193

Total: 2345 = 5 x 7 x 67.

6.4.5The difference between 6.4.3 and 6.4.4: 1232 = 2⁴ x 7 x 11. SF: 26 = 2 x 13.

6.5Over 350 sub-features can be gleaned from these letters by taking alternating groups of letters and repeating the procedure on the results multiple times.

6.6.1When the letters in feature 6 are added one by one, 55 times the total will be divisible by 7.

a)  b)  c)      a)  b)  c)      a)  b)  c)      a)  b)  c)
35  2   1022    143 40  7280    242 400 14077   341 300 22022
38  10  1043    144 7   7287    263 300 16037   360 10  23898
50  30  1239    153 2   8127    272 1   16849   362 80  24038
56  10  1568    157 30  8491    274 30  16919   365 30  24458
61  30  1652    168 40  8953    278 4   16954   370 5   24598
71  200 2114    169 7   8960    285 40  17934   373 6   24619
76  90  2324    178 40  9996    302 300 19334   381 30  24864
80  300 2674    179 7   10003   307 6   19376   389 20  25221
82  80  2954    181 40  10045   315 400 19922   396 20  25648
86  400 3444    203 300 11326   317 80  20202   405 5   26418
89  5   3465    206 2   11375   320 3   20216
94  40  3598    208 6   11389   323 10  20286
97  80  3724    222 6   12600   325 300 20587
125 30  5978    237 30  13622   330 200 21287
128 300 6293    240 20  13657   336 4   21504

a) Letter position in feature 6 list.
b) Letter that is not first or last.
c) Accumulated total divisible by 7.

Total of the positions (a) where this happened: 12187 = 7 x 1741.

6.6.2When the letters are added one by one, 39 times the result will be a prime number.

a)  b)  c)      a)  b)  c)      a)  b)  c)
1   5   5       103 40  4127    262 9   15737
9   6   131     155 300 8431    273 40  16889
11  4   139     156 30  8461    295 7   18797
26  9   647     158 10  8501    309 10  19387
30  200 967     185 400 10831   310 4   19391
37  6   1033    191 4   10891   324 1   20287
41  7   1091    207 8   11383   344 1   22123
42  2   1093    209 10  11399   346 10  22433
47  6   1153    210 300 11699   369 20  24593
58  40  1613    230 1   13171   383 5   25169
63  5   1667    238 5   13627   390 80  25301
66  40  1759    243 6   14083   391 300 25601
92  80  3557    257 80  15329   392 2   25603
a) Position in feature 6 list.
b) Letter not first/last.
c) Prime number accumulated total.

Total of the letters (b): 2093 = 7 x 13 x 23.

6.6.3366 times the accumulated total will not be a prime number. The total of the letters in this case: 24325 = 5² x 7 x 139. SF: 156 = 2² x 3 x 13.

6.7The list of 405 letters form alternating groups of M and N-number of letters where M and N are multiples of 7 or 13.

6.7.1Alternating groups of 42 and 39.

6.7.1.1Groups of 42: 14798 = 2 x 7² x 151.

6.7.1.2Groups of 39: 11620 = 2² x 5 x 7 x 83.

6.7.2Alternating groups of 65 and 105.

6.7.2.1Groups of 65: 11039 = 7 x 19 x 83.

6.7.2.2Groups of 105: 15379 = 7 x 13³.

6.8The Nth and Nth last occurrences of 25 letters in feature 6 divide the rest of the list into what is between them, and what is not between them.

6.8.1The odd valued letters from the table above:

5 5 1 1 1

Total: 13.

6.8.2The even valued letters from the table above:

10 10 10 30 30 6 6 4 200 200 40 40 40 40 300 300 300 300 80

Total: 1946 = 2 x 7 x 139.

6.8.2.1The letters in the previous feature are listed below along with the actual positions of their Nth and Nth last occurrences in the list of feature 6.

a) 10  10  10  30  30  6   6   4   200 200 40  40  40  40  300 300 300 300 80
b) 135 152 186 61  156 53  67  141 107 138 21  68  95  130 149 155 184 220 82
c) 239 234 195 342 237 335 307 191 339 330 375 255 213 178 292 288 263 250 390

a) Letter from the table.
b) Nth position in the list from feature 6.
c) Nth last position in the list from feature 6.

Total of the Nth and Nth last positions (b + c): 7553 = 7 x 13 x 83.

6.8.3The lowest valued letter in the table is 1. The highest is 300. Lowest and highest: 301 (7 x 43).

6.8.3.1The lowest Nth value for the letter 1 is 3. The lowest Nth value for the letter 300 is 10. Together: 13. (This does not hold for the highest Nth value because Josiah is only a man.)

One might take the lowest Nth value for the letter 1 and pair it with the highest Nth value for the letter 300. This would be adding 3 and 18: 21 = 3 x 7.

6.9The first letter in feature 6 is 5. Search for the next letter that is higher in value. From that point search for a third letter that is lower in value. Continue searching alternating between high and low. This covers 219 letters. The total: 16877 = 7 x 2411. SF: 2418 = 2 x 3 x 13 x 31. SF: 49 = 7 x 7. SF: 14 = 2 x 7.

All The Letters

7The letter values of God’s name in Hebrew are applied 7 times to count through a quarter of the letters.

a) 10 5  6  5  10 5  6  5  10 5  6   5  10 5  6  5   10  5   6   5
b) 10 15 21 26 36 41 47 52 62 67 73  78 88 93 99 104 114 119 125 130
c) 5  40 2  5  6  40 5  30 1  7  200 6  7  1  5  50  6   10  6   30

a) 10  5   6   5   10  5   6   5    (Letter from the Name.)
b) 140 145 151 156 166 171 177 182  (Count.)
c) 2   40  70  70  200 10  2   5    (Letter found.)

Total: 861 = 3 x 7 x 41.

7.1Beginning with the first letter, take every Nth letter after. The following values of N produce totals divisible by 13.

2 33 80 84 140 145 163 174 206 226 228 253 278 283 289 296 303 311 312 314 321 342 350 377 416 417 418 421

Total of the N values: 7182 = 2 x 3³ x 7 x 19.

7.2.1The odd positioned letters: 26299 = 7 x 13 x 17 x 17.

7.2.1.1Odd positioned groups of 2 from 7.2.1: 14586 = 2 x 3 x 11 x 13 x 17.

7.2.1.2Even positioned groups of 2 from 7.2.1: 11713 = 13 x 17 x 53.

7.2.1.2.1Odd positioned groups of 15 from 7.2.1.2: 5798 = 2 x 13 x 223. SF: 238 = 2 x 7 x 17. SF: 26 = 2 x 13.

7.2.1.2.1.1Odd positioned from 7.2.1.2.1: 2834 = 2 x 13 x 109.

7.2.1.2.1.2Even positioned from 7.2.1.2.1: 2964 = 2² x 3 x 13 x 19. SF: 39 = 3 x 13.

7.2.1.2.2Even positioned groups of 15 from 7.2.1.2: 5915 = 5 x 7 x 13².

7.2.1.2.2.1Odd positioned from 7.2.1.2.2: 2926 = 2 x 7 x 11 x 19. SF: 39 = 3 x 13.

7.2.1.2.2.2Even positioned from 7.2.1.2.2: 2989 = 7² x 61.

7.2.1.2.2.2.1Odd positioned groups of 13 from 7.2.1.2.2.2: 1708 = 2² x 7 x 61.

7.2.1.2.2.2.2Even positioned groups of 13 from 7.2.1.2.2.2: 1281 = 3 x 7 x 61.

7.2.2Even positioned from 7.2: 26859 = 3 x 7 x 1279.

7.3659 letters are even valued. Their total: 52442 = 2 x 13 x 2017.

7.3.1389 letters have a first digit that is even valued. Their total: 30342 = 2 x 3 x 13 x 389.

7.4Divide the letters into four categories: A) odd valued and odd positioned, B) odd valued and even positioned, C) even valued and odd positioned, and D) even valued and even positioned. (See also 2.4 and 3.6).

A) 99 letters are odd positioned and odd valued.
Letter total: 377 = 13 x 29. SF. 42 = 2 x 3 x 7.

B) 323 letters are odd positioned and even valued.
Letter total: 25922 = 2 x 13 x 997.

C) 85 letters are even positioned and odd valued.
Letter total: 339 = 3 x 113.

D) 336 letters are even positioned and even valued.
Letter total. 26520 = 23 x 3 x 5 x 13 x 17.

Three of the four categories have letter totals that are divisible by 13. The odds would have suggested only one. The total of the positions for category A is also a feature: 43505 = 5 x 7 x 11 x 113.

7.5Exactly 169 (13²) letters are prime numbers.

7.6146 letters are in positions that are prime numbers.

a) 2 3  5 7   11 13 17 19 23 29 31 37 41 43 47 53 59 61  67 71 73  79
b) 5 50 1 300 10 2  5  4  2  1  2  10 40 40 5  5  10 200 7  4  200 10

a) 83 89 97 101 103 107 109 113 127 131 137 139 149 151 157 163 167 173
b) 40 2  5  50  2   30  30  4   2   10  50  5   10  70  90  40  80  6

a) 179 181 191 193 197 199 211 223 227 229 233 239 241 251 257 263 269
b) 6   5   40  7   6   400 50  50  5   300 200 10  10  400 300 40  1

a) 271 277 281 283 293 307 311 313 317 331 337 347 349 353 359 367 373
b) 30  2   1   6   1   1   80  5   10  10  20  10  6   2   6   50  2

a) 379 383 389 397 401 409 419 421 431 433 439 443 449 457 461 463 467
b) 400 50  5   2   6   400 6   1   2   6   80  90  40  300 6   30  90

a) 479 487 491 499 503 509 521 523 541 547 557 563 569 571 577 587 593
b) 40  80  10  20  400 80  30  50  9   300 30  10  300 1   10  2   300

a) 599 601 607 613 617 619 631 641 643 647 653 659 661 673 677 683 691
b) 30  30  5   5   5   5   40  400 1   4   1   10  6   20  100 200 90

a) 701 709 719 727 733 739 743 751 757 761 769 773 787 797 809 811 821
b) 6   1   100 10  5   70  80  8   5   2   20  30  300 2   80  6   20

a) 823 827 829 839 (Position that is a prime number.)
b) 400 40  5   40  (Letter value.)

Total of the letters (b): 8879 = 13 x 683.

7.7There are 421 ways to extract a group of letters from the middle of the 843 letters. The odds would suggest one in seven of these to be multiples of 7, or about 60. Only 49 are possible.

837 803 781 773 771 745 743 737 723 709 703 699 693 685 669 641 627 605 595 581 569 519 515 481 439 423 393 387 383 353 345 335 325 309 263 249 241 223 219 197 177 163 161 133 99 93 83 51 15

This is less than the odds, but it is curious how there are exactly 49.

7.8There are 27 ways to extract a group of letters from the middle and have them be divisible by 13.

783 765 661 647 623 617 613 609 593 583 577 567 527 481 471 433 403 387 373 337 303 241 197 153 147 83 69

Total of the values: 12243 = 3 x 7 x 11 x 53.

7.9When the letters are added one by one, 124 times the accumulated total will be multiple of 7. The letters where this occurs add up to 8778. (2 x 3 x 7 x 11 x 19. SF: 42 = 2 x 3 x 7.)

7.10When the letters are added one by one, 68 times the accumulated total will be multiple of 13. The positions of the letters where this occurs add up to 27972 ( 2² x 3³ x 7 x 37).

7.11Divide the letters into alternating groups of M and N-number of letters, where M and N are multiples of 7 or 13.

7.11.1Alternating groups of 112 and 169.

7.11.1.1Groups of 112: 19586 = 2 x 7 x 1399.

7.11.1.2Groups of 169: 33572 = 2² x 7 x 11 x 109.

7.11.2Alternating groups of 259 and 325.

7.11.2.1Groups of 259: 31150 = 2 x 5² x 7 x 89.

7.11.2.2Groups of 325: 22008 = 2³ x 3 x 7 x 131. SF: 147 = 3 x 7².

7.12The first letter is 6. Search for the next letter that is higher in value. From that point search for another letter that is lower. Continue searching alternating between high and low until all letters are covered. Total of the letters selected: 33201 = 3² x 7 x 17 x 31.

Conclusion

The prophecy concerning Josiah in 1 Kings 13:1-5 and its fulfillment in 2 Kings 23:20-25 clearly go together. When this prophecy was given, it was confirmed with a miracle (1 Kings 13:5). And when the two passages are put together, primary numeric features similar to those in The Proclamation also appear confirming it. There are also features from the words reflected not only in the first and last letters, but also in the letters themselves. The prophecy is of the coming of a king, and thus, the value 13 appears in quite a number of the factors. All this can't be coincidence. Even though this prophecy was fulfilled, it still foreshadows the future when the King of Kings and Lord of Lords will come to restore the covenant and set things right. (Malachi 3:1; Revelation 19:11-16)

Notes

1. English reference quotes are from the Revised Standard Version, Thomas Nelson Inc., 1972.
2. Hebrew text is from, The Biblia Hebraica Stuttgartensia (BHS), edited by K. Elliger and W. Rudolph of the Deutsche Biblegesselchaft (German Bible Society) 1983.

Numeric Study Links

• Home
• Preface & Dedication
• Part 1: Introduction
• Part 2: God Describes Himself With Words & Numbers
  • The Hypothesis
  • Selecting The Verses
  • Formulating Rules
  • Applying The Rules To Exodus 34:6-7
    (The Proclamation)
  • The Proclamation's Complexity
  • Odd & Even
    (Complementary Opposites)
  • Combining Rules

  • The Structural Miracle I
    (Features from inside the verse.)
  • The Structural Miracle II
  • The Structural Miracle III
    (Features from the Bible outside the verse.)
  • The Structural Miracle IV
    (Features near the verse.)
  • The Proclamation & Revelation 1:8
  • The Divine Name & Signature
  • What It Means To Us
    (The first two commandments.)
• Part 3: A Bible Numbers Experiment
  (Eliminating randomness.)
• Part 4: Computer Searches
  • Short Computer Searches
    Quest For God’s Signature

    • Old Testament Verses
      • Exodus 17:16 War With Those Against God
      • Joshua 24:24 The Proper Response
      • 1 Kings 8:2-9 Solomon's Temple
      • 2 Kings 24:8 Kingship Rescinded
      • Psalm 89:8-12 Praising God
      • Isaiah 2:19-3:2 End Times
      
      
    • New Testament Verses (GNT)
      • Matthew 13:52-58
        Response (to teaching)
      • Philippians 2:14-15
        Advice For Service
      • Luke 1:31-36
        Divine Announcement Of Jesus' Birth
      • John 8:19-20
        Knowing God
      • Romans 2:13-16
        Doers Of The Law
      • Galatians 5:13-14
        The Second Great Commandment

      • 2 Timothy 2:22-3:2
        An Evil End Time Generation
      • Revelation 3:14-17
        The Church At The End Times
      • Revelation 4:8-10
        Heaven Praises God
      • Revelation 7:9-11
        The Great Multitude
      • Revelation 12:1-6
        The Woman And The Dragon
      • Revelation 19:12-14
        King Of Kings, Lord Of Lords
      
      
    • New Testament Verses (GNS)
      • Matthew 9:3-8
        The Son Of Man's Authority For Forgiving Sin.
      • Matthew 11:4-6
        Jesus' Ministry.
      • Matthew 18:21-22
        Forgive Your Brethren
      • Matthew 21:18-21
        Faith & Miracles
      • Mark 2:6-13
        Confirmation Of The Authority To Forgive (GNT)
      • Mark 2:8-10
        Authority To Forgive Sins. (See also the verse above.)
      • Mark 3:24-29
        Blaspheming The Holy Spirit (Unforgivable Sin).
      • Mark 13:8-11
        What To Say Before Persecutors.
      • Mark 14:48-49
        Man Made Religion Kills.
      • Mark 16:1-2
        The Women Visit Jesus' Tomb.
      • Mark 16:2-14
        The Resurrection Of Jesus.
      • Luke 7:46-50
        Why Jesus & God Forgive
      • Luke 9:38-43
        Perverse Generation.

      • Luke 9:43-46
        Man Made Religion Blinds.
      • Luke 10:16-19
        Jesus Gives Authority To His Disciples.
      • Luke 14:12-13
        Invite Those Who Can't Repay.
      • Luke 17:23-27
        The "Presence" Of The Son Of Man.
      • Luke 21:8-10
        Signs Of The End.
      • John 11:53-54
        Man Made Religion Seeks Death.
      • Acts 2:45-3:1
        Voluntary Sharing.
      • Acts 13:32-34
        Prophecy Fulfilled In The Gospel.
      • Romans 9:33-10:4
        Jesus The Stumbling Block For Israel.
      • 1John 1:7-9
        Jesus Is Faithful To Forgive
      • Hebrews 12:11-17
        The Closing Door.
      • Revelation 20:14-21:5
        New Heaven & Earth.
  • Long Computer Searches
    Widening The Search For God’s Signature

    Extended Old Testament Passages

    • The Story Of Abraham
    • The Story Of Jacob
    • The Exodus
    • The Journey From Darkness To Light
    • The Conquest Of Canaan
    • God, The Master Of Time

    Extended New Testament Passages (GNT)

    • John 1:1-37a
    • Matthew chapters 5:1 to 9:17b
    • Confirmation Of Jesus' Life, Teachings & Ministry
• Part 5: Taking It All Further
  • Moving Beyond The Bible
    (English in numbers.)
  • The Founding Of Modern Israel
  • We Hold These Truths...
    (A piece from the American Declaration Of Independence.)
  • Comparing Other Texts
• Part 6: Chinese Numbers
  • The Proclamation (Chinese)
    出 埃 及 34:6-7
  • Genesis 1:1
    創 世 記 1:1
  • John 1:1
    約 翰 福 音 1:1
  • Revelation 1:8
    啟 示 錄 1:8
  • Revelation 22:13 & 21:6
    啟 示 錄 22:13

  • The Vision In Revelation
    啟 示 錄 1:8-22:13
  • The Vision in 3D
    啟 示 錄 1:8-22:13 (三 維)
  • Chinese Character Number Convertor
    漢字編號轉換板
  • More...
    • Related Verses In Chinese
    • Jesus' Birth (Luke 1:31-36 路加福音)
    • Our Response (Joshua 24:24 約書亞記)
    • The Greatest Commandment (Matthew 22:37 馬太福音)
    • Other Verses In Chinese
    • Prophecy Of China & America (Isaiah 18 以賽亞)
• Part 7: Closing Words On Bible Numbers
  (The grand picture.)
• Part 8: What This Means To The World
  • A Message For Skeptics, & Unbelievers
  • A Message For Christians
  • A Message For Muslims.
  • A Message For Jews.
• New Numeric Experiments
  • The Proclamation In English
  • The Proclamation In Greek
  • Prophecy Of China & America
    Isaiah 18 (English)
  • Numeric Experiments: Conclusion
  • Speculative Numeric Experiments

  Further Numeric Experiments

  • Numeric Experiments
  • Second Experiment: It's Not Easy
  • The Balfour Declaration In Chinese
  • The U.S. Recognition Of Israel In Chinese
  • A New Proclamation In Chinese
• Miscellaneous
  • The Future Of The Middle East.
  • The Prayer Of Moses.
  • The lord Is My Shepherd.
  • The Structure Of History.
  • The Donkey Speaks.
  • Be Holy For I Am Holy.

  • God’s Covenant.
  • The Tower Of Babel.
  • The First Marriage.
  • The Flood.
  • The Imperial Number.
• Appendix: Why 7 & 13?
• About This Site & Contact

May the Lord god rebuke any who seek to misuse what is presented on this site.

The Rational Bible

Bible Issues

presents the Bible as a rational book, as history, economics, and prophecy (with an extensive look at the book of Revelation) also covering a diverse range of topics. (Active site.)

The foolishness of God is greater than anything we can imagine (1 Corinthians 1:25). On the off chance the numbers are a form of foolishness, do not spend too much time on them.

Copyright © 2025