1. doings
premise
1. "0" ~utterance of nothingness = real ~ "WORD" ~ ThOth/nU ~ God
2. "0" : "1" ~ = 1 &… = a real
3. 1 &… : "2" ~ = 2 &… = a real
thesis
"0": Signifier, Sr : ((I^2) : 1): Signified, Sd : (1/(I^2): 1) :2: "Word"
denotation connotation "myth"
hypothesis
(I^2) : -(I^2) : 1/(I^2)
I: "too"----------------ŕ 1 : 2
2. Acts
premise
1. "0" ~| (1 x "0") | = utterance of nothingness = a real : God’s "Word"
2. | "I" | ~ fourth root of 1 = real
3. | "(i^2)" |~ root 1 ~ = -1 = real
4. |"(i^3)" | ~ | -I | ~ fourth root of 1 = real
5. | "(i^4)" |~ "1" ~ = 1 = real
6. "pi" ~ 3 + s = approx. 3.1415926 = real
7. "1" ~ = 1^0 = 1 = real
8. (1 + 1) ~ = 2^1 = 2 = real
9. (1 x 1) ~ = 2^0 ~ = 2 = 1 = real
thesis
| (i^2) | : (1/2) : -(1/2)
hypothesis
(-1) : (1/2) : 1 : (2)
II: "for" ----------------ŕ 2 : 3
3. Works/plays
premise
1. | "0" | ~ 2 values, "0" : "1", approx. I : (I^4)
2. | "I" | ~ 1/(root 2)
3. |"(i^2)|" ~ ˝
4. |"(i^3)"| ~ ˝(root 2)
5. |"(i^4)"| ~ "1" = 1
6.. pi ~ 3 + s = approx. 3.1415926
7. "1" ~ "2" ~ = 2
8./9. (1 + 1)/(1 x 1) : (1 x 1)(1 x 1) : & ~ "2" :
Too ~ = 2 ~ = 8+ : river ~ = 4 : 4 : ….for
12./13. "2" ~ "3" ~= 13… aN
16./17. |"0"|~ ˝ : 4 : 2 : -2 ~= 8 : 8 ~ "16+"~ … naScent
thesis
|(i^2)|
: |(1/2) : 1| : |(2)|"myth" too myth for myth
hypothesis
"Too" Myth
s:A = F (x) :F (y) ~ "Too" = F (I^2}(I^4):F (Y)/"1"-(I^2):(I^4) (I^2)(I^4) x (I^2)x
III: "for"------------------ŕ neUn
: 8 : 94. Happenings
"0"---ŕ
premise
"0": , :~ (Y) :~ & :~ "TOTALITY" ~ "0" :~ 1 ~ "a" ~ "1":~ "a"…
"1": ,’ :~ (X) :~ (X : Y) :~ 1& ~ 1 :~ 2 ~ 1 + "a" ~"2" :~ "an"…
"2": ," :~ (XY) ; ( XX) ; (YY) :~ 2& ~ 2 : 3 : 4 : 5 : 6 : 7 : 8 :~ 9 ~ 2 + "a" ~ "3"
:~ "ana"…
"3": ,’" :~ (XX, X) : (YY, Y) : (XX, Y) ; (XY, X) : ( YY, X) ; (XY,Y)
:~ 4 : 5 : 6 : 7 : 8 : 9 : 10 : 11 : 12 :~ 13 ~ 3& :~ 3 + ‘a’ ~ "4" :~ anan…
"4": ," " :~ (XX, XX) : ( YY, YY) : (XX, XY) : (YY, XY) : (XX, YY) ; (XY,XY)
:~ 13 : 14 : 15 : 16 :~ 17 ~ 4& :~ 4 + "a" = :~ "5" :~ anana…
dISTINGUISHED Categories of mythics studied: "primes":
play 1
Levi-Strauss’ Greek myth : "2" :~ 1& = "0" : 1
Too: "1"/"2" :~ 2& = 2
for: "3" :~ 2& = 2 : 3
neUn: "9" :~ 8& = 8 : 9
anan: "13" :~ 12& = 12 : 13
naScent: aNana: "17" :~ 16& = 16 : 17
play 2
the naScent :~ 16 + "0" :~ "17"
thesis
"0" : "1"
|1 0| :~ (I^2)
|0 1| :~ "1"
where |"_" "_"| refers to value of sum of matrix set = a determinant…
antithesis
|1 0| :~ "1" := "2" := 1/(I^2)
|0 1|
|0 1| :~ "(2)" := 2/-(I^2)
|1 0|
|1 0| :~ "-(I^2)" := "1" := "2" ~ (I^2)(-(I^2)) :~ (I^2) . (1/(I^2))
|1 0|
|0 1| :~ "2" := "-2" ~ 2((I^2)) :~ 1/(I^2) . (I^2)
|0 1|
1/(16 + "0") = "0!"
do 1
= d = 1/(16 + d) = 0.06201
do 2
or,
and, since 1/"0" -----ŕ infinity :~ "0!"
1/d = p
act 1
"0!" = 16.12402 = 16 + 2d = 16 + D
do 3
and, "00" = 0.12402 = D
do 4
1/(n + "0n") : "0n" ~ "0!n"…
"0!n" satisfies all of:
1/(n -1) : 1 + n = -"0!n"…
1/(n -1) : 1 + 2n = -"0!n"…
1/(n + 0) : n(1 + 1) :~ -"0!n"…
1/(n + 0) : n(1 + 2) :~ -"0!n"…
1/(n + 1) : n(1 + 2) :~ -"0!n"…
1/(n + 1) : 2(1 + n) …
myth : ways of making "two" into "one":
"00" = -1/2 ~ "0!0" = -(I^2) …
0 : "1" :~ -1…
Too : "01" = ˝ ~ "0!1" = -2 …
"1" : "2"…
for : "02" = (3^(-1)) :~ (3^0) := (3^1) etc., etc ~ "0!2" = -3 …
"2" : "3"…
neUn : "03" = 0.123106 ~ "0!3" = -4 :~ -9 …
"3" : "4"
1
an : "04" = 0.0822075 ~ "0!4" = -13 …
"4" : "5"…
naScent : "05" = 0.062 ~ "0!5" = -17 …
"5" : "6"…
play 1
A definite "0" is easily known
((i^2) ^ -(1/2)) - (a "0") = (fourth root (pi))
(root 2) - (0.082878) = (fourth root (pi))
(1/i) = (i^3) = (fourth root (pi) + (0.082878)
(0.082878) = "0"
demo 1
therefore…
I = 1/(root 2) = 1/4…
(i^2) = root 2 = 2 = "1"
and, also "1" = 4…..
From Pythagoras:
(see diagram below)
(a^2) = (x^2) + (y^2)
(a^2) + (b^2) = (c^2)
therefore:
root ((1/x)^2 + (1/y)^2) = 2((x^2) + (y^2))
act 2
as… c = 2x = 2y
(c^2) = 4(x^2)
act 3
since, x = y : I :~ 1/(root 2)
c :~ 4(I^2)
act 4
Also…
circumference of ensuing circle : 2. I. Pi = 2. I. Pi . x
play 3
neUn : naScent
since 1/p = d,
therefore, p = 8 + 2d = 1/d
similarly, 1/P = D, P = 16 + d = 1D
conditon 1
Therefore, as D = 2d
2P + (I^2).p = 28
act 5
(I^2) = 2(d^2) + 8d
act 6
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