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#163 - Prime Sequence Numbers
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#164 - You have seen that prime numbers are important to many aspects of the solution.
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#165 - However, it is not just the prime numbers themselves that are important.
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#166 - Their actual position in the prime number sequence is highly significant!
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#167 - Sequence Number 1 2 3 4 5 6 Prime Number 2 3 5 7 11 13
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#168 - This can be called the Prime Sequence Number.
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#169 - It's simple, The 10th prime number (29) has a prime sequence number of 10, and so on. Because it is the 10th.
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#170 - Phi in Prime Quadruplets
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#171 - Remember the prime quadruplets?
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#172 - 9 15 105 195 825 1485 1875
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#173 - To find Phi: We need to look at the Prime Sequence Numbers of the values in the Prime Quadruplets.
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#174 - This table shows the prime sequence numbers next to the prime numbers that make up the prime quadruplets.
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#175 - As an example, the second prime quadruplet is: 11, 13, 17, 19, These values have prime sequence numbers of: 5, 6, 7, 8 (11 is the 5th prime number, 13 is the 6th prime number, etc.)
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#176 - What about the centers of the prime quadruplets?
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#177 - The centers of prime quadruplets aren't prime numbers, but we need to assign them prime sequence numbers as well. (For the secrets to be revealed!)
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#178 -
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#179 -
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#180 - 6 105 195, We are now going to examine the two prime quadruplets that are related to this part of the code.
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#181 - 6 105 195 Recall that the 105 and 195 both happen to be at the centers of two consecutive prime quadruplets.
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#182 - By using the associated prime quadruplets, we can find Phi. And this only works for the two prime quadruplets from Ed's Code. (None of the others!)
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#183 -
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#184 - 7129 6105195
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#185 - Phi at Last
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#186 - The first prime quadruplet is 101, 103, 107, 109. It's prime numbers are at positions 26, 27, 28 and 29.
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#187 - The center value of the first prime quadruplet is 105. It is surrounded by prime numbers that have sequence positions 27 and 28.
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#188 - So, we assign 105 a prime sequence position of 27.5. We do the same for 195. The center of 44 and 45 is 44.5.
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#189 - We now have prime sequence numbers for the 105 and 195. 27.5 and 44.5.
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#190 - The ratio of these numbers is precisely... Phi.
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#191 - 44.5/27.5 = Phi 1.618
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#192 - Prime Quadruplets help to define the very reality we exist in.
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#193 - 6 105 195 And Edward Leedskalnin knew all about them.
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#194 - 7 129 6 105 195 Phi
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#195 - This alone, is far beyond the possibility of coincidence.
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#196 - Everything else fits into the prime quadruplets as well.
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#197 - Remember ADM = 144?
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#198 - There are sets of prime quadruplets at prime sequence positions 144 and 288!
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#199 - (These is amazing, remember - there are only 7 prime quadruplet sets under 2000.)
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#200 - And every single one deserves extensive study.
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#201 -
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#202 -
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#203 -
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#204 - And then I'll show you how 144
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#205 - Makes Phi.
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#206 - Again!
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#207 - The magic is being held in at the center of the prime quadruplets.
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#208 - The Pyramid and the Right Angles
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#209 - A pyramid shape, like the Great Pyramid in Egypt, has a slope angle of 51.83 degrees.
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#210 - From a side perspective...
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#211 - 51.83 degrees
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#212 - If a right angle is drawn from the center of the base, it creates a division through each side.
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#213 - 51.83 degrees
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#214 - The ratio of the two divisions created is always the same: 1.272 : 1.0
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#215 - Length 1.272, Length 1.0, 51.83 degrees
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#216 - For example: If the total slope length of the pyramid side is 2272, it will be divided as: 1272 in the upper portion and 1000 in the lower portion.
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#217 - Where the total slope length is 2272: 1272, 1000, 51.83 degrees
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#218 - There is something else you should know about 1.272.
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#219 - It is the square root of Phi! SqRt(1.618) = 1.272.
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#220 - We have a direct connection: Right Angles, The Pyramid Shape, The Square Root of Phi (1.272)
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#221 - What do the Freemasons Think?
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#222 -
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#223 -
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#224 -
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#225 - See those lines up the sides of the pyramids?
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#226 - They point to where a right angle intersects the sides.
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#227 - At the 1.272 : 1.0 ratio.
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#228 -
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#229 - 1.272, 1.0
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#230 - This symbology can be extended to other pyramid designs in the same room.
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#231 - Pyramids surround the sun.
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#232 - These ones feature an additional design element.
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#233 - If we look closely at the 16-fold sun, we can see that it is actually based on a design of two squares.
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#234 - If we look closely at the 16-fold sun, we can see that it is actually based on a design of two squares.
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#235 - If we look closely at the 16-fold sun, we can see that it is actually based on a design of two squares.
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#236 - If we look closely at the 16-fold sun, we can see that it is actually based on a design of two squares.
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#237 - If we look closely at the 16-fold sun, we can see that it is actually based on a design of two squares.
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#238 - The base of a pyramid is a square.
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#239 - This energy pattern of the sun is what the pyramid interacts with.
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#240 - The base of the pyramid meets one of these squares.
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#241 - From a bird's eye perspective, the base of a pyramid meets one of the squares of the 16-fold pattern.
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#242 - And what of the remaining square?
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#243 - It also meets the pyramid... But not just anywhere.
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#244 - It interacts at the position above where the right angesl intersect. In the upper part of the pyramid.
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#245 - This is why the pyramids around the sun have the additional golden element in the upper part.
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#246 - And it's why this element begins at the point where the right angle divides the sides.
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#247 - A division of Phi within the pyramid.
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#248 - Moving to another wall in the same room, we see another version of the pyramid in stunning detail.
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#249 -
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#250 - Artistic impressions of magnetic forces at work.
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#251 - You should be excited.
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#252 - For those that may doubt...
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#253 - A close examination of the two depictions of the pyramids reveals the similarities.
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#254 -
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#255 - And the remaining unknowns...
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#256 - Can be explained.
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#257 - The Pyramid and the Flywheel
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#258 - Ed's Flywheel.
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#259 - The star in the center of the flywheel generates the 16-fold pattern we have just seen at the masonic temple.
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#260 - And then the pyramid...
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#261 - A pyramid shape goes onto the top of the flywheel.
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#262 - Notice the four openings.
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#263 - These are to allow a greater amount of 'individual magnets', as Leedskalnin would call them, up the sides of the pyramid.
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#264 - You can see it here as well, the lines are up the sides.
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#265 - Pyramid on the Flywheel.
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#266 - Pyramid on the Flywheel.
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#267 - Pyramid on the Flywheel.
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#268 - And we aren't even finished with the code.
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