I knew it GOD was vectors all along
She no on my yes til I Deconceptualize
Interesting that the pcmi shows structures that can be seen in the ...
When all operations complete (reach Omega in the tree graph), one t...
1 GOD
Γ
k
∈R
2
,
Γ
k+1
=
Γ
k+1
Γ
k
,
Γ
k
∩
Γ
k+1
=Γ
k+1
‘ Γ
2
∶=
(n
1
+1,n
2
)
(n
1
,n
2
)
; n
1
, n
2
∈Z
Γ
3(k−2)+2
×
α
θ
3(k−2)+2
0
0 α
θ
3(k−2)+2
×
1
γ
3(k−2)+2
=
Γ
3(k−2)+3
(1)
Γ
3(k−2)
×
α
θ
3(k−2)
0
0 α
θ
3(k−2)
×1 =
Γ
3(k−2)+4
(2)
Γ
3(k−2)+4
×
α
θ
3(k−2)+4
0
0 α
θ
3(k−2)+4
×γ
3(k−2)+5
=
Γ
3(k−2)+5
(3)
α
θ
=−δ
θ,π
(1)+δ
θ,0
(1), Ψ(x)=
cos(x) −sin(x)
sin(x) cos(x)
;
Γ
2
×Ψ
3π
2
k−5
3
−2
∑
i=2
δ
θ
i
,0
(1)−δ
θ
i
,π
(1)
×
γ
k
γ
2
=
Γ
k
k ∈Z; δ
ij
=
1 i =j
0 i ≠j
(4)
Γ
n
×Ψ
3π
2
k−5
3
−2
∑
i=n
δ
θ
i
,0
(1)−δ
θ
i
,π
(1)
×
γ
k
γ
n
=
Γ
k
n <k
(5)
Γ
2
∶=
(n
1
+1,n
2
)
(n
1
,n
2
)
,
Γ
k
∶=
(m
1
+1,m
2
)
(m
1
,m
2
)
, k ∶=m
2
−n
2
.
∃Γ
m
, m, n ∈Z
+
, ∀Γ
n
, y(Γ
m
)≥y(Γ
n
)⇒Γ
m
∶=Max
y
(Γ). ∀X,
X ∶=(a, b)⇒X ∶=(y(X), x(X)).∃Γ
m
, Γ
l
, m, n, l ∈Z, ∀Γ
n
, X(Γ
m
)≥x(Γ
n
), x(Γ
l
)≥
x(Γ
n
)⇒
⇒Γ
m
∶=Max
x
(Γ), Γ
l
∶=Min
x
(Γ).γ
n
∈M ∶={n ∈Z
+
, 2 <n ≤10}, ∃k,
Γ
k
; ∄n,
Γ
n
;
n >k >m;
Γ
n
,
Γ
k
,
Γ
m
∈M;
Γ
k
∩
Γ
k+1
=∅;
Γ
k
∩
Γ
k−1
=Γ
k−1
⇒k ∶=∇
M
;
∇
M
∶=Random(x; x ∈Z
>1
)
∆
−
M
∶∀k ∈Z
+
, Γ
k
∈M, ∆
+
M
=min(x(Γ
k
))⇒∆
−
M
−X(Γ
1
))∶=
∗
∆
−
M
(6)
∆
+
M
∶∀k ∈Z
+
, Γ
k
∈M, ∆
+
M
=max(x(Γ
k
))⇒∆
+
M
−X(Γ
1
))∶=
∗
∆
+
M
(7)
∂
M
∶∀k ∈Z
+
, Γ
k
∈M; ∂
M
=max(y(Γ
k
))⇒∂
M
−y(Γ
1
)∶=
∗
∂
M
(8)
1
2
3
Interesting that the pcmi shows structures that can be seen in the human eye
She no on my yes til I Deconceptualize
When all operations complete (reach Omega in the tree graph), one timeframe passes?
I knew it GOD was vectors all along