Starting to have a look at this in genesis
Genesis 9:111, the tower of babel…
Babel is spelt…
bet bet lamed
ב bet (value 2)…. occurs 22 times
ל Lamed (Value 30)…… occurs 37 times
Notice that bet has a gematria value of 2. There are 2 bets in Babel..that’s 2 two’s…….22, the number of times bet occurs in this passage. It’s warming up.
Notice how bet and lamed turn up in the word for confound/confusion.
ו נ ב ל הH1101 confound
ב ב ל H894 Babel There is another 37 occurrence, that is for Yod…
י=10 Yod
Here’s the data……
ס(60) = 1. ג(3) = 2. ז(7) = 2. צ(90) = 3. ק(100) = 3. ן(50) = 4. ח(8) = 8. ץ(90) = 8. כ(20) = 9. ד(4) = 10. פ(80) = 14. ת(400) = 14. מ(40) = 16. ע(70) = 18. נ(50) = 21. ב(2) = 22. ם(40) = 22. ש(300) = 27. ר(200) = 29. א(1) = 30. י(10) = 37. ל(30) = 37. ו(6) = 44. ה(5) = 54.
………………………………. Babel on the Sea (hoho, pure conjecture but, hey, why not?) This is Babel…bet bet lamed So…What is this… ים Maybe Jeremiah chapter 51 gives a clue:
Then in Revelation 18:21 we have: And one powerful angel picked up a stone like a great millstone and threw [it] into the sea, saying, “In this way Babylon the great city will be thrown down with violence, and will never be found again! Rev 18:21

All posts by elamku
1260 1290 1335 37 185 matrix plus 3d matrix
1 + 1 + 1 = 3
2 + 2 + 3 = 7
6 + 9 + 3 = 18
0 + 0 + 5 = 5
So…
3. 7. 18. 5 Or
37,185
This is very reminiscent of:
23001335noahandassyriansiege/
………
Ok, let’s now do a 3d matrix. So, we take the 2d matrix from above but repeat the 2d matrix so that there are 4 2d (dimensional) matrices thus making a 3d object.
Now we take the 2d matrix result, 37,185 and multiply by 4
37,185 × 4 = 148,740
Now, let’s digit group this result…
148 and 740
Hmm, let’s add them together
148 + 740 = 888
888. That’s… Jesus
Pretty good.
Let’s do some more matrices.
37,185 × 2 = 74,370
74 + 370 = 444
37,185 × 3 = 111,556
111 + 555 = 666
37,185 × 4 = 148,740
148 + 740 = 888
37,185 × 5 = 185,925
185 + 925 = 1,110
37,185 × 6 = 223,110
223 + 110 = 333
37,185 × 7 = 260,295
260 + 295 = 555
37,185 × 8 = 297,480
297 + 480 = 777
And so on…😂
1260
1260:
Rev 12:6: “and the woman fled into the wilderness, where she has a place prepared by God, in which she is to be nourished for 1,260 days.”
Yup, it’s chapter and verse, Rev 12:6,you just have to add the “0”. It’s staring you in the face 😀.
1260 1290 1335 … 777 Riddle
3885 ÷ 37 = 105 = 7 × 15
15 is the highest common factor of the 3 day numbers…
1260 ÷ 15 = 84
1290 ÷ 15 = 86
1335 ÷ 15 = 89
84 + 86 + 89 = 259
(3885 ÷ 15 = 259)
259 ÷ 37 = 7
3 × 259 = 777 (= 3 × 7 × 37)
…………
1260 + 1290 + 1335 = 3885
Now, digit group, so…
3 + 885 = 888
…….
1260:
Rev 12:6: “and the woman fled into the wilderness, where she has a place prepared by God, in which she is to be nourished for 1,260 days.”
Yup, it’s chapter and verse, Rev 12:6,you just have to add the “0”. It’s staring you in the face 😀.
1260 1290 1335 and 777
Using the digit grouping technique again (search this blog for an explanation – “=>” means digit grouping) but this time with two of the numbers being processed in the three different combinations..you’ll see.
1260 + 1290 = 2550 => 552
261 + 291 = 552
1260 + 1335 = 2595 => 597
261 + 336 = 597
1290 = 1335 = 2625 => 627
291 + 336 = 627
Now..
552 + 597 + 627 = 1776 => 777
Tada. Yeah, amazing.
So, as we did with the 888 post, we are going to rearrange the order of the digits in the sequence of 552, 597 & 627, starting with the second digit and then repeat the process starting with the third digit.
Off we go, lets rearrange 552, 597 & 627..
2nd digit rearrange:
525 + 975 + 276 = 1776 => 777
3rd digit rearrange:
255 + 759 + 762 = 1776 => 777
Well, there you are 🙂
2300 & 1335, featuring Noah and the Assyrian seige of Jerusalem
(This is based on a note I took some time ago and previous posts. I just think it bears being reedited).
………………………………………………….
https://word37.wordpress.com/2014/03/25/2300/
https://word37.wordpress.com/2014/04/20/2300370185000/
………………………………………………………
1335 days = 2670 evenings and mornings
2670 – 2300 evenings and mornings = 370 evenings and mornings
370 time periods to the 1335 days.
Noah spends 370 days (time periods) on the Ark.
Look at it this way:
1335 days – 185 days = 1150 days = 2300 evenings and mornings.
or, perhaps clearer,
2300 evenings and mornings plus 370 evenings and mornings = 2670 evenings and mornings (2670 / 2 =1335 days)
When the 2300 evenings and mornings are completed, there are then 370 evenings and mornings until the blessed 1335 days (1335 days = 2670 evenings and mornings).
The significance of Noah’s time periods spent on the ark, the journey to the new world should not be difficult to see.
( Here is a speculative thought. Perhaps “unless those days had been shortened” refers to shortening from 370 days to 370 evenings and mornings}.
A pattern emerges – siege, then 185, then freedom.
More calculations on the Daniel gematria
Here we are going to look at some more operations/calculations on the gematria of the hebrew in Daniel.
Lets start with total letter gematrias for our four passages in the hebrew. ( I’ve included Chapter 8 on its own as it comes in with a nice result but its not really a part of what may be going on here ).
 Chapter1Chapter 2:4b: total letter gematria =92783
 Chapters 812: total letter gematria =509231
 Chapter1Chapter 2:4b + Chapters 812 total letter gematria =602014
 Chapter 8: total letter gematria =95119
Operation 1:
Now we are just going to add the digits together until we can proceed no further:
 Chapter1Chapter 2:4b: 9+2+7+8+3 = 29 or 2+9 = 2
 Chapters 812: 5+0+9+2+3+1 = 20 or 2+0 = 2
 ( Chapter1Chapter 2:4b ) + ( Chapters 812 ) 6+0+2+0+1+4 = 13 or 1+3 = 4
 Chapter 8: 9+5+1+1+9 = 25 or 2+5 = 7
Lets summarize things to keep it more visually accessible:
 92793 >2
 509231 >2
 602014 >4
 95119 >7
How interesting is that! 2+2 = 4
( Chapter1Chapter 2:4b = 2) + ( Chapters 812 = 2 )
= ( ( Chapter1Chapter 2:4b ) + ( Chapters 812 ) = 4 )
That’s….good. Then to round off, Chapter 8 on its own comes in at… 7. It’s pleasing but hardly conclusive.
However, spoiler here. Notice that the first and second sections (list items 1 & 2 ) have the same result. Here we are dealing with the power of 1 (ie, not raised to any power) , not squared or cubed. As you work through this post you will see that the odd powers eg: cubed, fifth or seventh powers keep this pattern going in a remarkable fashion while the even powers , (squares , fourth powers ) develop their own not so remarkable pattern (integrity).
Operation 2 – Cubed ^3 :
Ok , this time we are going to do the same thing but initially cubing the digits. So…
 Chapter1Chapter 2:4b: 9^3 + 2^3+ 7^3 + 8^3 + 3^3 = 729 + 8 + 343 + 512 + 27 = 1619 or 1+6+1+9 = 17 or 1+7 = 8
 Chapters 812: 5^3 + 0^3 + 9^3 + 2^3 + 3^3 + 1^3 = 125 + 0 + 729 + 8 + 27 + 1 = 890 or 8+9+0 = 17 or 1+7 = 8
 ( Chapter1Chapter 2:4b ) + ( Chapters 812 ): 6^3 + 0^3 + 2^3 + 0^3 + 1^3 + 4^3 = 216 + 0 + 8 + 0 + 1 + 64 = 289 or 2+8+9 = 19 or 1+9 = 10 or 1+0 = 1
 Chapter 8: 9^3 + 5^3 + 1^3 + 1^3 + 9^3 = 729 + 125 + 1 + 1 + 729 = 1585 or 1+5+8+5 = 19 or 1+9 = 10 or 1+0 = 1
Lets summarize things again (remember that the items 1 to 4 represent the 4 hebrew selections, item 3 being a combination, as detailed at the beginning of this post. Don’t lose sight of that :
 92793 >8
 509231 >8
 602014 >1
 95119 >1
Again we see that Chapter1Chapter 2:4b and Chapters 812 boil down to the same result, 8, in this operation. The nature of the operation means that the two sections combined cannot result in 16 but does result in 1 (as does chapter 8 on it’s own). So, for the second time the 2 sections of the hebrew share the same value. So, the result here could easily have been off but, it’s not. Hmmmm.
(This is starting to resound a bit like the letter occurrences of gimel(value of 3) and zayin(value of 7) where the occurrences for both were 11 in the first section and 77 in the second section, making a total of 88 occurrences of both gimel and zayin. Both sections share this equality of occurrences of gimel and zayin – it’s different but, well, lets see if we progress any further.)
Operations 3 & 4 – squared ^2 & fourth powers ^4:
However, the pattern doesn’t hold for squares or fourth powers. In the case of squares the results are :
 92793 >9
 509231 >3
 602014 >3
 95119 >9
For fourth powers they are:
 92783 >6
 509231 >3
 602014 >3
 95119 >6
However, there is a pattern emerging – even powers versus odd powers?. Lets try fifth powers:
Operation 5 – fifth powers ^5:
(Hehe, the results are in).
 92793 >8
 509231 >8
 602014 >4
 95119 >4
This is remarkably close to the cubed result which was 8,8,1,1.
Lets now try seventh powers, keep going with the odd powers for this next operation.
Operation 6 – seventh powers ^7:
Oh boy, get this, the results for the operation using seventh powers:
 92793 >8
 509231 >8
 602014 >7
 95119 >7
Something is happening here. Cubed, fifth and seventh powers all result in an 8 for the first and second section hebrew sections of Daniel. Not only that but the entire hebrew combined and the results from chapter 8 are the same within the boundary of each unique operation (items 3 & 4). (Daniel chapter 8 not only has 73 as a divisor but exhibits an amazing letter occurrence pattern in the first 14 verses).
So you can follow along, I’m going to write out the full operation for the seventh powers as I did with the cubed powers (omitting the x^7 + y^7 etc for brevity except for the first item, so you can see what is being done ) :
 92793 = 9^9 + 2^9 + 7^9 + 9^9 + 3^9 = 4782969 + 128 + 823543 + 2097152 + 2187 =7705979 or 7+7+0+5+9+7+9 = 44 or 4+4 = 8
 509231 >78125 + 0 + 4782969 + 128 + 2187 + 1 = 4863410 or 4+8+6+3+4+1+0 = 26 or 2+6 = 8
 602014 >279936 + 0 + 128 + 0 + 1 + 16384 = 296449 or 2+9+6+4+4+9 = 34 or 3+4 = 7
 95119 >4782969 + 78125 + 1 + 1 + 4782969 = 9644065 or 9+6+4+4+0+6+5 = 34 or 3+4 = 7
There you go. Phew!
Right , someone blow a trumpet, please!
Operation 7 – ninth powers ^9:
Make sure you are sitting down as this is a standing miracle!
Let’s do the summary first:
 92793 >8
 509231 >8
 602014 >1
 95119 >1
Let’s just work through this again in full, it deserves it:
 92793 = 9^9 + 2^9 + 7^9 + 9^9 + 3^9 = 387420489 + 512 + 40353607 + 134217728 + 19683 = 562012019 or 5+6+2+0+1+2+0+1+9 = 26 or 2+6 = 8
 509231 = 5^9 + 0^9 + 9^9 + 2^9 + 3^9 + 1^9 = 1953125 + 0 + 387420489 + 512 + 19683 + 1 = 389393810 or 3+8+9+3+9+3+8+1+0 = 44 or 4+4 =8
 602014 = 6^9 + 0^9 + 2^9 + 0^9 + 1^9 + 4^9 = 10077696 + 0 + 512 + 0 + 1 + 262144 = 10340353 or 1+0+3+4+0+3+5+3 = 19 or 1+9 =10 or 1+0 = 1
 95119 = 9^9 + 5^9 1^9 + 1^9 + 9^9 = 387420489 + 1953125 + 1 + 1 + 387420489 = 776794105 or 7+7+6+7+9+4+1+0+5 = 46 or 4+6 = 10 or 1+0 = 1
This is EXACTLY the same result as we got using cubed powers, ^3.
It will not have escaped you, I hope, that 3*3 or 3^2 = 9.
Is there someone out there who can explain this.
I’m going to tackle eleventh powers ^11. At some point I’ll resume with even powers but for the moment the smart money is on the odd powers ( maybe giving a new meaning to the phrase “odd powers” ). Here goes.
Operation 8 – eleventh powers ^11:
Let’s do the summary first:
 92793 >8
 509231 >8
 602014 >4
 95119 >4
Oh ye of little faith. uh hum.
EXACTLY the same result as the fifth powers , ^5
^3 = ^9, now ^5 = ^11. It follows really nice. Another pattern? Only the ^13 will tell? Will ^7 be the same result as ^13. Well find out tomorrow as it’s supper time now.