I was trying to translate some of these using the 13 shift thing. I noticed some of them produce no vowels. Then I looked and checked what vowels would be produced. Not sure if this helps. Maybe a brute force way of finding ways to analyses this for characteristics. Can the number of vowels in the end results help understand what has been done to it. Maybe with shift of 1-26?
13 shift:
A E I O U
N R V B H
eyketsoa
icineccans
rhT7aamtC7
oloRqExal
aAnonVt
1ieso
iypuloe
tnlhboRClar
H17nE
anlI7CDsD
typrrhSu
utlnsi
RcemoiecL8H
iein i
seedteMA
rleEes
aR2rCeha
CiieMls
eAti
xstfGu
a 9
u dAcH1
9baEaaata
WltQui
IrFseRa <- These two are very similar
irFna <- These two are very similar
0rrnoLT
iRtealaae
ohrierH4isi
Ctord
Vmiema
oaEufnxZrP
4h6iim
w 1un
yGwTsD
ea
Mbsuoib
alt
PmeiT4
oPoiO0nar
iuui <-? Not many combos could make this into something.
itScatsai6
Sumsnkpe
minVitiDo
diou
paI6K4r
nua
P5lytPe
You notice some of them would have no vowels. Some even have many non vowels repeating like "iein i."(ironically vowels.) Maybe this sort of analysis helps figuring it out with all the difference number shifts. Would it help try to analyse the cypther method and narrow down how it was manipulated. If all methods produce a lack of vowels it might show what is happening. Or could the hex values be used to shift out vowels and make that worthless?
In the end you are still dealing with words and translating into or out of a 26 letter number sequence. Presumabely.
Only other thing I can think of is the hex editor clue. Do we run it through as hex or 16 bit characters? 0-9 A-F. Maybe this is a simpler puzzle?! Although ther are lots of letters outside...
Plus there is a way to quantify fibbonachi. I forget the forumula. Isn't there a single variable formula that describes it?! I thought there was but I can't remember.
https://www.math.hmc.edu/funfacts/ffiles/10002.4-5.shtml ?
There are also 21 total numbers and 9 numbers used: 0,1,2,4,5,6,7,8,9 all single digit.
Instances:
0 = 2
1 = 4
2 = 1
4 = 4
5 = 1
6 = 3
7 = 3
8 = 1
9 = 2
Order appearing in:
7, 1, 8, 2, 9, 0, 4, 6, 5
Backwards:
5, 6 4(reversable?), 0, 1, 9, 2, 8, 7
Exact order: (lack of coma means same word)
7 7, 1,
1 7, 8, 2, 9, 1, 9, 0, 4,
4 6, 1, 4, 0, 6,
6 4, 5
There are only 4 double numbers. 7 7, 1 7, 4 6, 6 4
this means only 17 words have numbers. This is out of 48 words. 48 is 16x3. Possibly related to hexadecimal?! 48 / 17 = 2.823529412?!
Numbered words with letters:
3, 6, 9, 10, 13, 17, 21, 22, 23, 27, 29, 30, 34, 39, 40, 42, 46, 48 (total: 462)
Difference between words containing numbers. (Starting from
0)
3, 3, 3, 1, 3, 4, 4, 1, 1, 4, 2, 1, 4, 5, 1, 2, 4, 2
If you add these up, including the from
0, you get 48 in total over 18 occurances for an average of 2.666666 spaces per word.... IE frequency of occurrence. Without the extra
0 number it's 45/17 = 2.647058824 frequency. I think it should be 48/17 = 2.823529412
Double lettered words:
3, 9, 33, 46 (total: 91)
Difference between words containing numbers. (Starting from
0)
3, 6, 24, 13 (total:
46 (43))
Plus the only number missing from 0-9 is 3...
Is there anything that comes in only 9 variations that might be decipherable from this?!
Do the numbers correspond to hex letters as some sort of key? Do letters A-F matter also? What if you seperate those numbers and letters?
Number of Characters:
(/wo# x) = How many character without numbers being present.
eyketsoa; 8
icineccans; 10
rhT7aamtC7; 10 (/wo# 8)
oloRqExal; 9
aAnonVt; 7
1ieso; 5 (/wo# 4)
iypuloe; 7
tnlhboRClar; 11
H17nE; 5 (/wo# 3)
anlI7CDsD; 9 (/wo# 8)
typrrhSu; 8
utlnsi; 6
RcemoiecL8H; 11 (/wo# 10)
***iein i; 4,1 (5)
seedteMA; 8
rleEes; 6
aR2rCeha; 8 (/wo# 7)
CiieMls; 7
eAti; 4
xstfGu; 6
***a 9; 1,1 (2)(/wo# 1)
***u dAcH1; 1,5 (6)(/wo# 1, 4(5))
9baEaaata; 9 (/wo# 8)
WltQui; 6
IrFseRa; 7
irFna; 5
0rrnoLT; 7 (/wo# 6)
iRtealaae; 9
ohrierH4isi; 11 (/wo# 10)
Ctord; 5
Vmiema; 6
oaEufnxZrP; 10
4h6iim; 6 (/wo# 4)
***w 1un; 1,3 (4) (/wo# 1,2(3))
yGwTsD; 6
ea; 2
Mbsuoib; 7
alt; 3
PmeiT4; 6
oPoiO0nar; 9 (/wo# 8)
iuui; 4
itScatsai6; 10 (/wo# 9)
Sumsnkpe; 8
minVitiDo; 9
diou; 4
paI6K4r; 7 (/wo# 6)
nua; 3
P5lytPe;7 (/wo# 6)
Total Characters: 328 (332 if spaces count)
Total Letters: 307
Total Numbers: 21
Total words: 52 (including spaced)
Sequence(by character total): ((#(x,x)) = Digit reference(Value(s)); (x,x) = word count with character value. combing these means one word has a number in it. (x,x(#(x,x))) or (x(#(x,x)),x). This notes which word has the number.)
Italicized, underlined=
double words,
bold=numbers.
48x1:
8, 10,
10(#(7,7)), 9, 7,
5(#(1)), 7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7, 4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6, 7, 5,
7(#(0)), 9,
11(#(4)), 5, 6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2, 7, 3,
6(#(4)),
9(#(0)), 4,
10(#(6)), 8, 9, 4,
7(#(6,4)), 3,
7(#(5))
24x2:
8, 10,
10(#(7,7)), 9, 7,
5(#(1)), 7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7, 4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6,
7, 5,
7(#(0)), 9,
11(#(4)), 5, 6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2, 7, 3,
6(#(4)),
9(#(0)), 4,
10(#(6)), 8, 9, 4,
7(#(6,4)), 3,
7(#(5))
16x3:
8, 10,
10(#(7,7)), 9, 7,
5(#(1)), 7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7, 4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6, 7, 5,
7(#(0)), 9,
11(#(4)), 5, 6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2, 7, 3,
6(#(4)),
9(#(0)), 4,
10(#(6)), 8, 9, 4,
7(#(6,4)), 3,
7(#(5))
12x4:
8, 10,
10(#(7,7)), 9, 7,
5(#(1)), 7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7, 4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6,
7, 5,
7(#(0)), 9,
11(#(4)), 5, 6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2,
7, 3,
6(#(4)),
9(#(0)), 4,
10(#(6)), 8, 9, 4,
7(#(6,4)), 3,
7(#(5))
8x6:
8, 10,
10(#(7,7)), 9, 7,
5(#(1)), 7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7, 4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6,
7, 5,
7(#(0)), 9,
11(#(4)), 5, 6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2, 7, 3,
6(#(4)),
9(#(0)),
4,
10(#(6)), 8, 9, 4,
7(#(6,4)), 3,
7(#(5))
6x8
8, 10,
10(#(7,7)), 9, 7,
5(#(1)),
7, 11,
5(#(1,7)), 9
(#(7)), 8, 6,
11(#(8)),
5(4,1), 8, 6,
8(#(2)), 7,
4, 6,
2(1,1(#1(9))),
6(1,5(#1(1))),
9(#(9)), 6,
7, 5,
7(#(0)), 9,
11(#(4)), 5,
6, 10,
6(#(4,6)),
4(1,2),(#(1)), 6, 2,
7, 3,
6(#(4)),
9(#(0)), 4,
10(#(6)),
8, 9, 4,
7(#(6,4)), 3,
7(#(5))
There are 4 double words! This means there are technically 52 words. All double words have one word with 1 character only. All but one double words contain a number! No double words contain two numbers.
They occur at words:
14, 21, 22, 34
Frequency:
14, 7, 1, 12
No idea if any of this helps.