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Chaptter 4--Lookiing att tthe Hiigh
% {9 v$ M" p' h$ n6 @, pAlthough both of these crossings of Jupiter by Mars occurred at h1 A+ G7 N9 R& L
the exact price of beans, neither one of these crossings was at the. X! ]5 P& N$ Z6 m" |
real high of this period. Remember we started this 267-week" w2 g7 J, Y' Z4 V$ r
study as presented in Gann's discussion of the Square of 144 on Jan.6 P8 t& ]9 I- \( S5 a
15, 1948 when the high was $4.36.
" Y5 j3 E$ d8 u) K1 b! r- [Did you look at the planetary positions on Jan. 15, 1948 that I% }9 {' d( v8 `; Y* e. z8 t
listed in chapter 3 and find something interesting?
$ m# o( m: Z8 [1 V+ lIf you did not, try comparing the number of Mars with the other
7 }1 W+ H6 a& I N+ ]$ w8 R3 bplanets. Now what did you find? Correct. You found Mars and Pluto at
, I1 ~3 _. `) d4 ]$ Iconjunction (at the same degree) at:* |+ c* R7 B' ~4 d
133+ R' d2 m+ ~+ K2 \, |1 ?& E
That's an interesting number because of its relationship to a
4 y; o) x$ C* W$ M7 X/ I! j9 Mnumber in "The Tunnel Thru the Air," Gann's novel, and its- `& }2 e. Z( E; g
relationship to the Great Cycle. But that's another work for another
. C" l6 u/ c/ t, x5 X1 ^, K$ i and there is no need to go down that path now.
) U2 F; K( M! D% oIt is also interesting because of its position on the Square of' K+ Y) F: N' \ y6 e6 d* n
Nine chart in relationship to a triangle of the Teleois and their
, }# l* E+ ~8 x: R, f, T9 Z& Crelationship to a paragraph in Gann's planetary discussion of8 X% D$ G0 g, g3 ?6 [4 e
resistance lines on soybeans in his "private papers."6 _$ I6 }) D( r& D9 a9 m* T
But that again is for another work and that path would take us: Y: J4 a7 }% Y
down lots of roads with many forks and the work we have at hand is& Y! b; I( U* E. O- j6 `! R
enough to fill this book.
0 [, \9 a8 W; @; JChaptter 5--Subttracttiing 360 Degreess
" I8 X1 t6 V( u' ~" r+ MJust like in a single digit numbering system (another path we: A/ }8 c3 M( T, M+ a0 z1 W
will explore later) where "you cannot go beyond 9 without starting
* [+ v; a2 I7 m- J) ^1 ~5 c" C6 Iover" Gann noted that you cannot go more than 360 degrees in a circle" |8 O- y, F/ F+ E( V
without starting over.
0 }: _) q. C% F% E2 K(We will discover why later in our study of "Natural Squares.")
/ [8 R- h* R/ fHe illustrates this in his discussion of the price and time chart of
+ O! |4 A7 q p9 W z3 M# @0 to 360 degrees on page 153 of the course.
& _* T0 ~; W/ [8 q( cActually the high on beans was $4.36 3/4, but Gann often rounded
$ A- W8 ?1 [% c' ]off numbers for convenience sake. So, subtracting 360 from 436 I got
2 t9 E' Q' {& L# I76. As I said in the preface, I ran thousands of numbers through my
3 n. `0 y: k* a8 `) Ecalculator looking for PATTERNS. Here, I went one better than Gann.
' B" h5 D, I0 o# m) zInstead of subtracting 360 from 436, I subtracted 76 from 436 and got
* R5 A3 [& ~( j: a" _$ l. U( L360 and kept subtracting 76 until I could not subtract any more in
+ X# A* M) r! B' o0 T. Rthis manner:3 {1 t/ W: F* B0 y+ F$ g# U
436-76=3608 {+ c3 n* z8 J( b0 _* m
360-76=284 |
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