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IFTA JOURNAL<br />
2017 EDITION<br />
Every type of these pyramids has its unique cell distribution<br />
in its rows or layers, and every cell has its unique number that<br />
is loaded with its specific price value. We have to know price<br />
increment value to multiply it by cell number to calculate the<br />
cell value. If we draw plan pictures of the pyramid cones as if<br />
we are looking to it from the top, we will get all the next types of<br />
charts. Some of these charts, like Square of Nine, Hexagon, and<br />
Circle of 24, were used by W.D. Gann, and the rest were deduced<br />
based on the main concept of charting structure. W.D. Gann<br />
didn`t mention the logic behind the structure of his Square of<br />
Nine and its interaction with human psychology, but surely his<br />
methodology was a reflection to price rotation around conic<br />
geometrics because W.D. Gann mentioned in one of his books The<br />
Tunnel Thru the Air this sentence: “In making my predictions I<br />
use geometry and mathematics just as an astronomer, based on<br />
immutable laws.” 4 Also, this point of view was confirmed later<br />
by Mr. Daniel Ferrera. Daniel Ferrera in his new course The Gann<br />
Pyramid: Square Of Nine Essentials beautifully describes the<br />
various functions of the Square of Nine as a mathematical and<br />
astronomical calculator. He also points out that the Square of Nine<br />
is not to be perceived in only its two-dimensional perspective<br />
but as a pyramid spiraling from the center around and down to<br />
the outer ring at the base of the pyramid. This ties in nicely with<br />
our understanding of natural growth and its relationship to the<br />
extension of the universal vital principle called “Brahma” through<br />
the lotus temple or market. Manifest form projects itself into<br />
the three dimensions of space and time in the form of a threedimensional<br />
conic, not a two-dimensional spiral. Therefore we<br />
should perceive the growth of our form taking on extension in the<br />
Z-plane forming a vortex, whirlpool, or conic spiral as it rotates<br />
through the mathematical grid of planetary and stellar influences.<br />
India is not the only ancient civilization to have possessed this<br />
subtle wisdom. Again, in Ancient Egypt we find the same design<br />
built into the ground plan of the Great Pyramid. 5 <br />
Types of Pyramid Charts<br />
Circle of 24<br />
Figure 3. Circle of 24 Chart<br />
Formula of moving around circle of 24.<br />
To increase starting cell no. by a complete one rotation =<br />
(cell no.+24) * increment<br />
To decrease starting cell no. by a complete one rotation =<br />
(cell no.-24) * Increment<br />
For example, to add one complete rotation from cell number 79 =<br />
(79+24)*1 = 103<br />
Square of Four<br />
Figure 4. Square of Four Chart<br />
In this type, the top layer zero consists of four cells, and the<br />
next layer consists of 12 cells, ending with cell no. 16 and so<br />
on.No. of cells in layer = (layer no. +1) * 4<br />
Formula of moving around square of 4<br />
To increase starting cell no. by a complete one rotation ≈<br />
(Square root (Cell no.* Increment) + 1.999) ^2<br />
To decrease starting cell no. by a complete one rotation ≈<br />
(Square root(Cell no.* Increment )-1.999) ^2<br />
For example, to add one complete rotation from cell number 79 ≈<br />
((square root(79*1)+1.999)^2 ≈ 118.53<br />
Square of Nine<br />
Figure 5. Square of Nine<br />
In this type, every row or layer is divided into 24 cells, which<br />
means that every part is 15 degrees cell numbering is rotating<br />
counter-clockwise and spacing between each row is constant =<br />
24 cells (e.g., 25-1=24 and 49-25=24degrees is starting from the<br />
right at watch 3 counter-clockwise).<br />
In this type, the top layer zero consists of only one cell, and<br />
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