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Slide 185
What do the Freemasons Think? |
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Slide 186
Normal Hall at the Grand Masonic Lodge in Philadelphia. |
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Slide 187
Normal Hall at the Grand Masonic Lodge in Philadelphia. |
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Slide 188
Normal Hall at the Grand Masonic Lodge in Philadelphia. |
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Slide 189
Pyramids in the Normal Hall at the Grand Masonic Lodge in Philadelphia. |
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Slide 190
See those lines up the sides of the pyramids? |
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Slide 191
They point to where a right angle intersects the sides. |
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Slide 192
At the 1.272 : 1.0 ratio. |
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Slide 193
1.272 : 1.0 |
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Slide 194
This symbology can be extended to other pyramid designs in the same room. |
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Slide 195
Pyramids surround the sun. |
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Slide 196
These ones feature an additional design element. |
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Slide 197
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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Slide 198
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Slide 199
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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Slide 200
The base of a pyramid is a square. |
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Slide 201
This energy pattern of the sun is what the pyramid interacts with. |
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Slide 202
The base of the pyramid meets one of these squares. |
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Slide 203
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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Slide 204
And what of the remaining square? |
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Slide 205
It also meets the pyramid... but not just anywhere. |
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Slide 206
It interacts at the position above where the right angles intersect.In the upper part of the pyramid. |
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Slide 207
This is why the pyramids around the sun have the additional golden element in the upper part. |
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Slide 208
And it's why this element begins at the point where the right angle divides the sides. |
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Slide 209
A division of Phi within the pyramid. |
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Slide 210
Moving to another wall in the same room, we see another version of the pyramid in stunning detail. |
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Slide 211
Artistic impressions of magnetic forces at work. |
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Slide 212
You should be excited. |
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Slide 213
For those that may doubt... |
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Slide 214
A close examination of the two depictions of the pyramids reveals the similarities. |
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Slide 215
And the remaining unknowns... |
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Slide 216
...can be explained. |
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Slide 217
The Pyramid and the Flywheel |
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Slide 218
Ed's Flywheel |
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Slide 219
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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Slide 220
And then the pyramid... |
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Slide 221
A pyramid shape goes into the top of the flywheel. |
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Slide 222
Notice the four openings. |
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Slide 223
These allow a greater amount of 'individual magnets', as Leedskalnin would call them, up the sides of the pyramid. |
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Slide 224
You can see it here as well, the lines up the sides. |
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Slide 225
Pyramid on the Flywheel. |
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Slide 226
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Slide 227
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Slide 228
And we aren't even finished with the code. |
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Slide 229
Back to the Code. |
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Slide 230
7 129
6 105 195The 7 and the 6. |
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Slide 231
The secret to understanding the 7 and the 6 is... |
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Slide 232
Multiply each of them by the number of divisions on the wheel: 24. |
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Slide 233
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Slide 234
7 (168) 129
6 (144) 105 195 |
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Slide 235
To apply these numbers, we need to go back and look at what number sequences these values relate to. |
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Slide 236
The 7 from 7 129 |
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Slide 237
7 (168) 129Earlier, it was shown that 129 derives from the sequence of adding prime numbers together. |
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Slide 238
Because 7 is a part of the same 7129 line, its answer also lies in the sequence of prime sums. |
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Slide 239
71296105195 |
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Slide 240
Is 168 (7 x 24) anywhere in the sequence of prime sums? |
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Slide 241
168 just happens to be the sum of 4 consecutive prime number.37 + 41 + 43 + 47 = 168 |
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Slide 242
And not just any prime numbers. |
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Slide 243
These prime numbers surround the 195° axis. |
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Slide 244
Believe it or not, the Freemasons agree. |
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Slide 245
We need to add a square into our chart that represents the base of the pyramid, as it would sit on the flywheel. |
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Slide 246
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Slide 247
A Closer Examination... |
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Slide 248
We can see how each side of the pyramid is subject to the magnetism of 7 magnets. |
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Slide 249
However the 168 tells us to use only this position. |
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Slide 250
328 - 160 = 168Along the very side of the pyramid. |
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Slide 251
We don't want all 7. |
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Slide 252
We only want 5. |
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Slide 253
The Masons Show The Same. |
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Slide 254
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Slide 255
What we don't want.Notice how there are 'knots' on each side of the pyramid. |
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Slide 256
This is what we need to do.Notice each side now shows artistic magnetism instead. |
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Slide 257
Notice how the magnets from the corners have been ignored. |
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Slide 258
That is the meaning of the 168. |
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Slide 259
Only take the side. |
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Slide 260
It's all in the masonic temple. |
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Slide 261
It should be simple. |
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Slide 262
And when we peek at what's on the INSIDE of Ed's flywheel... |
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Slide 263
...everything lines up. |
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Slide 264
144 and 288 |
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Slide 265
7 (168) 1296 (144) 105 195The remaining part of the code is the number 6, or 144. (6 x 24 = 144) |
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Slide 266
This is even better. |
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Slide 267
6 (144) 105 195We earlier determined that this line is related to both prime quadruplets and angles. |
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Slide 268
Following the same logic as before with the 7129... |
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Slide 269
Because the 6 is part of the 6105195 line, it should also be related to prime quadruplets. |
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Slide 270
Does the number 144 come up anywhere in the prime quadruplets? |
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Slide 271
Prime Quadruplets under 2000 chart. 1: 5, 7, [9], 11, 132: 11, 13, [15], 17, 193: 101, 103, [105], 107, 1094: 191, 193, [195], 197, 1995: 821, 823, [825], 827, 8296: 1481, 1483, [1485], 1487, 14897: 1871, 1873, [1875],1877, 1879 |
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Slide 272
144 isn't a prime number itself, so it won't be part of a prime quadruplet, so we need to look at the prime sequence numbers. |
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Slide 273
Prime quadruplets chart with sequence numbers. |
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Slide 274
Prime numbers in both the 5th of 7th prime quadruplet are in position 144 and 288! |
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Slide 275
Not bad, with prime quadruplets being so rare and all... |
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Slide 276
144 and 288 in the 5th and 7th prime quadruplet. |
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Slide 277
Pyramid in the Number. |
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Slide 278
Remember where the magic is? |
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Slide 279
In the centers of the prime quadruplets. |
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Slide 280
Let's take a look at the center of the prime quadruplets at prime sequence positions 144 and 288. |
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Slide 281
The associated primes to 144 and 288
are 825 and 1875. |
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Slide 282
You'll never believe this... |
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Slide 283
825 and 1875These two values create exactly the same ratio as a right angle in a pyramid. |
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Slide 284
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Slide 285
1875/825 = 2.727 |
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Slide 286
These values from the centers of prime quadruplets can be assigned positions on the pyramid itself. |
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Slide 287
It's like this pyramid diagram.Pyramid value at the top: 1875 (288)
Pyramid value at the center: 825 (144)
1050 / 825 = 1.272
Upper Length / Short Length = SqRt(Phi) |
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Slide 288
Knowing these co-ordinates, we could map a complete spiral of numbers in the pyramid.(That might be fun.) |
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Slide 289
Again... the centers of prime quadruplets correspond to angles. |
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Slide 290
6 105 195We've seen how the centers of prime quadruplets are also angles. |
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Slide 291
105° to 195° |
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Slide 292
Meaning, we don't just know a particular height in the pyramid... |
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Slide 293
We know what side of the pyramid as well. |
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Slide 294
And:825 MOD 360° = 105° |
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Slide 295
Now we know that the center of the prime quadruplet that meets prime sequence number 144 is at 105° on the pyramid, and at a height where a right angle would intersect. |
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Slide 296
The Code Almost Solved |
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Slide 297
7 (168) 1296 (144) 105 195In case you haven't noticed. |
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Slide 298
Our analysis of the 7 (168) lead us straight to the 195° axis, with no height.
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Slide 299
And the 6 (144) sent us to the 105° axis, with a height on the pyramid. |
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Slide 350
The Norman Hall room, decorated by George Herzog, also a Freemason. |
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Slide 301
Ed has designed his 'built to last' flywheel in such a way that our numbers, derived from his clues, match its internal configuration. |
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Slide 302
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Slide 303
So, a height at 105°, and no height at 195°. |
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Slide 304
1 is the 7 x 24 = 168.2 is the 6 x 24 = 144. |
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Slide 305
Number 1 has no height, while number 2 does. |
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Slide 306
The flywheel. |
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Slide 307
The height around 105° is actually the handle (2) of the flywheel. |
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Slide 308
Notice how this appears to approximately match the 1.272 : 1.0 ratio when a pyramid square is overlayed. |
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Slide 309
A round bit of metal (1) is attached to the star, to assist in collecting 168. |
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Slide 310
The alignment here is perfect. |
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Slide 311
And the orientation of the star... |
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Slide 312
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Slide 313
Matches the other star. |
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Slide 314
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Slide 315
The Angle over the Star. |
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Slide 316
At the masonic temple, the star is inside a deliberate angle. |
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Slide 317
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Slide 318
This may look like it is a right angle, however this angle is a little oblique, less than 90°. |
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Slide 319
In this case, it is not the specific angle that's important. |
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Slide 320
The answer is hidden in the alignment. |
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Slide 321
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Slide 322
The angle is representative of collecting the 168. |
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Slide 323
We need to count the streams within the alignment. |
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Slide 324
We can label the north (N) and south (S) pole streams of magnetism. |
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Slide 325
Polarities. |
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Slide 326
This matches the magnets that we need to take from the side of the pyramid. |
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Slide 327
Take it from Sweet 16. |
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Slide 328
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Slide 329
Ed's Sweet 16. |
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Slide 330
Generated by the star. |
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Slide 331
Just don't forget to ring twice. |
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Slide 332
It is interesting that one of the oldest manuscripts in the Hebrew Bible, the Leningrad Codex, makes the same connection. |
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Slide 333
Tying it Up. |
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Slide 334
All the codes indicate that the values should be accessed in this order: |
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Slide 335
168
144
Then drop it below. |
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Slide 336
Drop it below? |
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Slide 337
ADM.10c.DROP BELOW. |
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Slide 338
Now it can make sense. |
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Slide 339
And that cutaway at the top represents the span of prime numbers adding to 168.[note: this is now known to be incorrect] |
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Slide 340
[note: this is now known to be incorrect - the top should be 0° and the bottom 180°] |
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Slide 341
[note: this is now known to be incorrect - the top should be 0° and the bottom 180°] |
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Slide 342
Dropping it below, is the last step. |
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Slide 343
DROP BELOW. |
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Slide 344
And guess what? |
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Slide 345
There is a place to attach a wire... |
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Slide 346
Underneath the flywheel. |
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Slide 347
Ed knew what clues would last through time, and planned each one, carefully. |
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Slide 348
Drop below. |
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Slide 349
The masonic temple is Philadelphia is older than Coral Castle.The architect was James Windrim, a Freemason. |
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Slide 350
The Norman Hall room, decorated by George Herzog, also a Freemason. |
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Slide 351
Now we can appreciate its true value. |
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Slide 352
The Freemasons have kept these secrets forever. |
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Slide 353
This is the oldest science in the world. |
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Slide 354
The secrets used to construct megaliths weighing amounts beyond comprehension. |
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Slide 355
The ultimate secret of magnetism and antigravity. |
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Slide 356
"It's not difficult really, the secret is in knowing how." - Edward Leedskalnin |
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Slide 357
Edward Leedskalnin claimed to know the secrets of antigravity and magnetism. |
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Slide 358
He proved it by building Coral Castle. |
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Slide 359
Modern archaeologists like to think they know how these huge structures were built. |
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Slide 360
They just can't seem to figure out where all the people required to build them could even have room to stand. |
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Slide 361
There are ancient stories of floating stones from all around the world. |
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Slide 362
But they are just myths... |
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Slide 363
...right? |
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Slide 364
YOU WILL BE SEEING UNUSUAL ACCOMPLISHMENT. ED. |
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Slide 365
Let's build this thing. |
