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Chaptter 4--Lookiing att tthe Hiigh
7 \' R/ t0 ~- a7 z6 v jAlthough both of these crossings of Jupiter by Mars occurred at, A3 L1 x' y% I& Y
the exact price of beans, neither one of these crossings was at the% X: S0 H) U1 n6 z8 ^2 V7 e- q& O9 [
real high of this  period. Remember we started this 267-week4 N# s! h1 R- A& N. w
study as presented in Gann's discussion of the Square of 144 on Jan.* P# S) m% H6 v* I% Y
15, 1948 when the high was $4.36.
* G# x/ E# ]/ v* |& [Did you look at the planetary positions on Jan. 15, 1948 that I
3 B$ K6 G# w/ q, n( Blisted in chapter 3 and find something interesting?
! {3 I$ y0 Q" p, U! s6 rIf you did not, try comparing the number of Mars with the other/ P! p- h' X" |/ c3 W
planets. Now what did you find? Correct. You found Mars and Pluto at
9 s5 J0 q# y6 o; iconjunction (at the same degree) at:
' b- ~6 ^. T+ ?$ I! D133
% u% ^9 J$ p0 [2 }$ SThat's an interesting number because of its relationship to a9 d: S8 r8 i1 } k6 G7 k
number in "The Tunnel Thru the Air," Gann's novel, and its
) b5 C- |9 e, V. O9 C3 N& U- erelationship to the Great Cycle. But that's another work for another$ e; H) B( y# V8 N- s* W
and there is no need to go down that path now., B6 t3 B7 Y( [# k0 I0 _, V' g
It is also interesting because of its position on the Square of
! {, C# F5 L V8 z% P( d& XNine chart in relationship to a triangle of the Teleois and their/ o5 i, U Y8 A& Y( Y3 N4 h
relationship to a paragraph in Gann's planetary discussion of. H* W1 S+ v2 c0 c( m0 j
resistance lines on soybeans in his "private papers."& v0 q! K- L4 }; b; f3 F
But that again is for another work and that path would take us/ E) W, o0 r6 p3 f& d6 t) t
down lots of roads with many forks and the work we have at hand is5 B: g" j& d2 O. S& O
enough to fill this book.
- v, V0 l; u, _0 u: ~Chaptter 5--Subttracttiing 360 Degreess
4 C8 O( E( \9 O M6 AJust like in a single digit numbering system (another path we; Z. d! E3 I5 I' Q& R; b, o" @
will explore later) where "you cannot go beyond 9 without starting7 B0 `, N6 ?) r" V
over" Gann noted that you cannot go more than 360 degrees in a circle
- F2 K) G+ S3 t+ owithout starting over.
) p6 r. F6 [1 b, W8 y. e) x- n) V; g(We will discover why later in our study of "Natural Squares.")
8 i6 {( D; p! Z% R. z; qHe illustrates this in his discussion of the price and time chart of
& L o1 q! x/ R% P$ w7 ]0 to 360 degrees on page 153 of the course.
" m- G3 q3 D* _0 W3 s8 Y% V0 SActually the high on beans was $4.36 3/4, but Gann often rounded
4 ~1 n; g+ S3 z" A2 Toff numbers for convenience sake. So, subtracting 360 from 436 I got7 [# m, P8 J3 ]# p$ s6 l2 @
76. As I said in the preface, I ran thousands of numbers through my
. W: t" a6 z1 e- q8 } Xcalculator looking for PATTERNS. Here, I went one better than Gann.
0 l8 m# F% q/ \3 o& Y; KInstead of subtracting 360 from 436, I subtracted 76 from 436 and got: I. h% O3 l9 y+ n0 L0 s. I6 o* x( ^* x1 ~
360 and kept subtracting 76 until I could not subtract any more in
2 b0 |( r# b$ r* q* Dthis manner:, }$ l- m; o' U# N% _% a; P: R
436-76=3603 |& X$ d% P( f
360-76=284 |
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