Section One
Within part one I finished with
“There being numerous options re the 299008 in view of the fact that it is a multiple of, for example: 512…584…1460…2048, etc”
This being in relation to the year I
On the other hand: 1881 ÷ 6080 x 299008 = 92505.6, at this time we perceive the Maya Tzolkins: 5256 rearranged as it were, as a result: 92505.6 ÷ 5256 = 17.6, obviously the yards in one mile: 1760, abridged, there being numerous options regarding 92505.6, and nonetheless we resume the Prime Numbers exploration
The multiplication: 9.999 x 8.888 x 7.777 x 6.666 x 5.555 x 4.444 x 3.333 x 2.222 x 1.111 obtains: 936656.7084168849…{obviously abridged}
The 9.999 obviously being the number 10, consequently we in fact include:
{A} 10
{B} 80 ÷ 9 = 8.888
{C} 70 ÷ 9 = 7.777
{D} 60 ÷ 9 = 6.666
{E} 50 ÷ 9 = 5.555
{F} 40 ÷ 9 = 4.444
{G} 30 ÷ 9 = 3.333
{H} 20 ÷ 9 = 2.222
{I} 10 ÷ 9 = 1.111
In other words 10 x 80 x 70 x 60 x 50 x 40 x 30 x 20 x 10 = 40320000000000 that divided by 43046721 = 936656.7084168849…
The Comma of Pythagoras {531441:524288} component: 531441 x 81 = 43046721
Also within “part one” we observed a table indicating primes in sets of 5, the total being: 18847819859 in addition to we employed 30 prime numbers, as a result 18847819859 ÷ 30 = 628260661.9666
The 628260661.9666 ÷ 936656.7084168849 = 670.74805136295662946428571 {likewise abridged}
Dialogues of Plato: Timaeus
Within Timaeus, Plato I mentioned that, via extracting portions from the Whole, subsequently when completed, there being a surplus in the ratio: 256:243, which is the musical scale: Pythagorean Limma.
I also mentioned that via careful analysis, I deduced the Whole to be: 46656
The 46656 ÷ 936656.70841688499 = 0.0498112057285714, which is the 670.74805136295662946428571 ÷ 13465.80636931
The 13465.80636931 x 2799360 = 37695639718 which is exactly twice the 18847819859, which as illustrated is the chart total of primes in sets of 5
{A} 2 x 3 x 5 x 7 x 11 = 2310
{B} 13 x 17 x 19 x 23 x 29 = 2800733
{C} 31 x 37 x 41 x 43 x 47 = 95041567
{D} 53 x 59 x 61 x 67 x 71 = 907383479
{E} 73 x 79 x 83 x 89 x 97 = 4132280413
{F} 101 x 103 x 107 x 109 x 113 = 13710311357
Totals = 18847819859 {as we observe above}
The 2799360 being 60 x 46656, that as indicated, being the Timaeus “Whole”
The 670.74805136295662946428571 multiplied by {abridged} 3.2605387306843 = 2187, this being my PWS 17th member, accordingly we explore my version with reference to PWS {Plato World Series}, initially we observe a few ancient fractions, etc
The now abridged 670.7480513629 denoted as Prime
{A} Comma of Pythagoras: {531441:524288} divided by Prime x 2157.563786008 = 3.2605387306843
The 2157.563786008 x 2187 = 4718592 exactly, which is exactly 419904 multiplied by 11.2373113854 that multiplied by Gem: Mary: 192 will regain the 21575.63786008
{B} Rhind Papyrus fraction {256:81} divided by Prime x 691.98046875 = 3.2605387306843
The 691.98046875 multiplied by the Comma component: 524288 obtains exactly 362797056, which is the seconds in 24 hours: 86400 multiplied by exactly 4199.04, obviously the above 419904 abridged
This abridged 4199.04 is the 17th PWS member as indicated above, namely: 2187 x 1.92 obviously a reduced Gem: Mary: 192 and 192 x 2 = 384, the first PWS member
{C} Pythagorean Limma {256:243} divided by Prime x 2075.94140625 = 3.2605387306843
The 2075.94140625 x 524288 = 1088391168 which is the Platonic Precession: 25920 multiplied by the exact 41990.4
{D} Eye of Horus fraction {64:63} divided by Prime x 2152.828125 = 3.2605387306843
The 2152.828125 x 524288 = 1128701952 which is the exact 41990.4 x 26880
Incidentally the exact: 41990.4 + 9.6 = 42000
On the other hand: 42000 ÷ 41990.4 x 1146617856 = 1146880000, which is the 26880 x 42666.666, one third of 128000
The employed: 1146617856 being the Comma component: 524288 x 2187
My PWS numbers
There will be numerous occasions where cyclic patterns emerge, too many actually to underline as norm, hence as is fit and proper, feel free to verify the calculations. Furthermore as I mentioned prior, please note the amount of times a number will end with a number 5, seeing as whilst a number ends with a 5 {or zero} it is divisible by 5, obviously a prime number
As indicated: “The 628260661.9666 being 670.74805136295662946428571 x 936656.7084168849…
The {now abridged} 670.7480513… denoted as Prime
The 3.26053873068438 now denoted as Unit
Again, please note the amount of times a number will end with a 5
{1} 384 ÷ Prime x 5.6953125 = Unit
{2} 432 ÷ Prime x 5.0625 = Unit
{3} 486 ÷ Prime x 4.5 = Unit
{4} 512 ÷ Prime x 4.271484375 = Unit
{5} 576 ÷ Prime x 3.796875 = Unit
{6} 768 ÷ Prime x 2.84765625 = Unit
{7} 864 ÷ Prime x 2.53125 = Unit
{8} 972 ÷ Prime x 2.25 = Unit
{9} 1024 ÷ Prime x 2.1357421875 = Unit
{10} 1152 ÷ Prime x 1.8984375 = Unit
{11} 1296 ÷ Prime x 1.6875 = Unit
{12} 1458 ÷ Prime x 1.5 = Unit
{13} 1536 ÷ Prime x 1.423828125 = Unit
{14} 1728 ÷ Prime x 1.265625 = Unit
{15} 1944 ÷ Prime x 1.125 = Unit
At this time we will observe the number: 1
Moreover the FP {Pythagorean Limma: 256:243} multiplied by the Comma {Comma of Pythagoras: 531441:524288} that obtains: 1.06787109375
In addition the FP reversed, since 243 ÷ 256 = 0.94921875
{16} 2048 ÷ Prime x 1.06787109375 = Unit
{17} 2187 ÷ Prime x 1 = Unit
{18} 2304 ÷ Prime x 0.94921875 = Unit
{19} 2592 ÷ Prime x 0.84375 = Unit
{20} 2916 ÷ Prime x 0.75 = Unit
{21} 3072 ÷ Prime x 0.7119140625 = Unit
{22} 3456 ÷ Prime x 0.6328125 = Unit
{23} 3888 ÷ Prime x 0.5625 = Unit
{24} 4096 ÷ Prime x 0.533935546875 = Unit
{25} 4374 ÷ Prime x 0.5 = Unit
{26} 4608 ÷ Prime x 0.474609375 = Unit
{27} 5184 ÷ Prime x 0.421875 = Unit
{28} 5832 ÷ Prime x 0.375 = Unit
{29} 6144 ÷ Prime x 0.35595703125 = Unit
Now we observe a break down regarding the numbers ending with a 5
{30} 6561 ÷ Prime x 0.333 = Unit
{31} 6912 ÷ Prime x 0.31640625 = Unit
{32} 7776 ÷ Prime x 0.28125 = Unit
{33} 8192 ÷ Prime x 0.2669677734375 = Unit
{34} 8748 ÷ Prime x 0.25 = Unit
{35} 9216 ÷ Prime x 0.2373046875 = Unit
{36} 10368 ÷ Prime x 0.2109375 = Unit
PWS total: 125606 ÷ Prime x 0.01741158861…= Unit
The: 0.01741158861 x 1444469 = 25150.5
Subsequently 1444469 ÷ 133.0714285 = 10854.839506172 that multiplied by the Plato Timaeus “Whole” 46656 obtains exactly 506443392 which is the first PWS member: 384 x 1318863
The 133.0714285 x 7 = 931.5 that multiplied by 27 = 25150.5
Then: 1444469 ÷ 1318863 x 25150.5 = 27545.7857142 which is one seventh of exactly 192820.5 that divided by the PWS total: 125606 then divided by the 0.01741158861 = 88.1666 which multiplied by the FP {256:243} component: 243 obtains exactly 21424.5 which is the 931.5 x 23 obviously a prime
Limma and Rhind
Within the list above we observe
{1} 384 ÷ Prime x 5.6953125 = Unit
{2} 432 ÷ Prime x 5.0625 = Unit
{3} 486 ÷ Prime x 4.5 = Unit
Etceteras
At this time we multiply the employed multiples, I.E in {1} the 5.6953125 by the FP {Pythagorean Limma {256:243} in addition to Rhind Papyrus {256:81} component 256
Please note in {6} the product: 729, in view of the fact that this is the square root of 531441, a Comma component {531441:524288}
As ever please bear in mind that the number 256 is not the sole option, in view of the fact that 256 is 8 x 32, otherwise 256 x 2048 = 524288, etc
Furthermore, merely to indicate the myriad options available, the 531441 divided by the {1} 5.6953125 = 93312, the numerical alphabet distance with reference to Earth to Sun being 93312000 miles.
The 93312000 being the row {1} number: 1458 x 64000, which is the 256 x 250
{1} 5.6953125 x 256 = 1458
{2} 5.0625 x 256 = 1296
{3} 4.5 x 256 = 1152
{4} 4.271484375 x 256 = 1093.5
{5} 3.796875 x 256 = 972
{6} 2.84765625 x 256 = 729
{7} 2.53125 x 256 = 648
{8} 2.25 x 256 = 576
{9} 2.1357421875 x 256 = 546.75
{10} 1.8984375 x 256 = 486
{11} 1.6875 x 256 = 432
{12} 1.5 x 256 = 384
{13} 1.423828125 x 256 = 364.5
{14} 1.265625 x 256 = 324
{15} 1.125 x 256 = 288
{16} 1.06787109375 x 256 = 273.375
{17} 1 {obvious}
{18} 0.94921875 x 256 = 243
{19} 0.84375 x 256 = 216
{20} 0.75 x 256 = 192
{21} 0.7119140625 x 256 = 182.25
{22} 0.6328125 x 256 = 162
{23} 0.5625 x 256 = 144
{24} 0.533935546875 x 256 = 136.6875
{25} 0.5 x 256 = 128
{26} 0.474609375 x 256 = 121.5
{27} 0.421875 x 256 = 108
{28} 0.375 x 256 = 96
{29} 0.35595703125 x 256 = 91.125 {increased Qedet of 9.1125}
{30} 0.333 x 256 = 85.333
{31} 0.31640625 x 256 = 81
{32} 0.28125 x 256 = 72
{33} 0.2669677734375 x 256 = 68.34375
{34} 0.25 x 256 = 64
{35} 0.2373046875 x 256 = 60.75
{36} 0.2109375 x 256 = 54
Moreover the Timaeus “Whole” of 46656 divided by the PWS total {125606} produced: 0.01741158861…= 2679594.666 that multiplied by 256 = 685976234.666 which is the 125606 x 5461.333, which is one third of 16384 pertaining to the musical scales, furthermore 16384 x 29235.9375 = 479001600 {=12!}
{Please see {5} below re 16384 etc}
Subsequently regarding, for example: {36} 0.2109375 x 256 = 54
The 29235.9375 ÷ 0.2109375 = 138600 which is the 16384 x 8.45947265625 that multiplied by 6553.6 = 55440, which is the prime number: 11 x 5040, the Plato: Magnesia number
Seeing as the majority of the multiples end with a 5, we may divide the entire by reduced Gem {Gematria} Simon Peter: 1.925…Tree of Life: 1.625…Founder of the City: 1.225…Abraxas, Mithras: 365…etc, etc
Section Three
Gematria with primes
As indicated prior, please bear in mind the amount of times a number will end with the prime 5
For the most part, units of measure are but ratios of themselves, as it were, for instance, via multiplying the Comma {531441:524288} twice by the FP {Pythagorean Limma {256:243} we obtain exactly 1.125, which is 9 ÷ 8, however 1.125 x 1.1 = 1.2375, which is exactly 12.25125 ÷ 9.9
The 12.25125 being a reduced Gem {Gematria} Founder of the City {1225} of 12.25 x 1.00010204081… that multiplied by 9800 = 9801
The numbers 2178 and 1089 being the only four digit numbers lesser than 10000 that are reversals of themselves, as it were, given that 2178 x 4 = 8712, and 1089 x 9 = 9801, equally 2178 being 2 x 1089
Otherwise 2178 + 8712 = 10890
Otherwise 1089 + 9801 = 10890
In addition to 9.9 x 1.9191 = 19 a prime, nevertheless Gem: Eve is 19, Gem: Adam is 45, as a result 45 minus 19 = 26, Gem: YHWH, in addition to obviously 26 ÷ 2 = 13, a prime
{1} The Platonic Precession: 25920 ÷ 1.2375 = 20945.4545 that multiplied by 11 = 230400, not simply with reference to the Sumerian King’s List, the 230400 being the GP height: 480 x 480.
The 18th PWS member being 2304
{2} the seconds in 24 hours: 86400 ÷ 1.2375 = 69818.1818 that multiplied by 11 = 768000, the 6th PWS member being 768
{3} the square feet in once acre: 43560 ÷ 1.2375 = 35200 which is Gem: Lord Jesus Christ: 3168 x 11.111, one ninth of 100
{4} the cubic inches in one cubic yard: 46656 ÷ 1.2375 = 37701.8181 that multiplied by 11 = 414720 which is the below: 4266.666 x 97.2, the 8th PWS member being 972
{5} the modern-day mile of 5280 ÷ 1.2375 = 4266.666 which is the Comma {531441:524288} component: 524288 ÷ 122.88 pertaining to the musical scale: C
The 122.88 ÷ 9.1125 x 243 = 3276.8 which is the 4266.666 x 0.768 the 6th PWS member being 768
Likewise we observe prior: 16384, this being the 122.88 x 133.333 one third of 400
{6} the ancient unit of measure: Qedet: 9.1125 ÷ 1.2375 = 7.3636 that divided by the above 0.768 = 9.588068181 that multiplied by 11 then by the FP {256:243} obtains 111.111
{7} The Greek foot {441:440} of 1.0022727 ÷ 1.2375 = 0.809917355371…
The above 111.111 ÷ 0.809917355371 x 46656 x 1225 = 7840800000
This 7840800000 being the Platonic 25920 x 302500, in addition to the employed 1225 being Gem: Founder of the City
The 302500 x 0.9256198347107438016528 = 280000 that is 330 x 848.4848, which is 756 x 1.1223344556677890011223344556678 observed prior as B
For example, the prime: 19 ÷ B = 16.929
{8} The Egyptian foot of 1.14545 ÷ 1.2375 = 0.9256198347107438016528
{9} The Roman furlong of 608.256 ÷ 1.2375 = 491.52, the Plato Atl
{10} the end PWS member: 10368 ÷ 33.14732142857 = 312.785454 which is the Egyptian cubit of 1.71818 x 182.0444 which is the first PWS member: 384 ÷ 2.109375 that multiplied by the 4th member: 512 = 1080, the lunar, Yin-Yang number
{11} The Arabian Hashimi foot of 1.064448 ÷ 1.2375 = 0.86016 exactly, which is the 182.0444 ÷ 211.6402116, which is 2.216450 x 95.486111 which is 11 ÷ 0.1152, the 10th PWS member being 1152, likewise longer value Egyptian foot being 1.152
{12} The Sumerian cubit of 2.7428571 ÷ 1.2375 = 2.216450
In that case Gem: Mary: 192 ÷ 70 = 2.7428571
{13} The Schooldays Pi {22 ÷ 7} of 3.142857 ÷ 1.2375 = 2.539682 that multiplied by 1.2444 = 3.160493827 which is the Rhind Papyrus “Pi” {256:81}
The 1.2444 x 4628.571428 = 5760, the GP height {480 x 12} and Gem: Eagle being 576, in addition to: 4628.571428 x 7 = 32400
{14} The Rhind Papyrus {256:81} of 3.160493827 ÷ 1.2375 = 2.5539344057 which is 2.4888 x 1.026134359467692801
The 2.4888 being exactly 1.96 x 1.269841, this is the GP Tan: 480 ÷ 378
{15} The Eye of Horus {64:63} of 1.015873 ÷ 1.2375 x 584.71875 = 480, the 584.71875 x 5760 ÷ 1.2375 = 2721600, which is 25920 x 105
{16} the GP Tan {480 ÷ 378} of 1.269841 ÷ 1.2375 = 1.026134359467692801
I assume the proposal is implicit, each and every one of the foregoing and forthcoming numbers are perfectly interrelated
Section Four
The Sea mile of 6080
Prior we observe: “In addition to 9.9 x 1.9191 = 19 a prime”
The Sea mile of 6080 ÷ 1.9191 = 3168, Gem: Lord Jesus Christ that minus Gem: Lord 800 = 2368, Gem: Jesus Christ
However as observe prior 3168 is 0.6 miles of 5280
Via dividing the FP {Pythagorean Limma {256:243} by a reduced Gem: Jesus Christ {2368} of 0.2368 we obtain: 4.4488933377822266711155600044489 denoted as C
With reference to prime numbers and C
{1} 2 ÷ C = 0.44955 exactly, subsequently 3 ÷ 0.44955 = 6.673340006 that multiplied by exactly 2.54745 = 17
The 2.54745 x 4.407407 = 11.22765 that multiplied by the GP base perimeter of 3024 obtains exactly 33952.4136 which is exactly 6.4895015025 x 1176 x C, moreover Gem: Only-begotten son, being 1176
{2} 3 ÷ C = 0.674325 exactly, subsequently 5 ÷ 0.674325 = 7.414822229 that multiplied by exactly 2.292705 = 17
The 2.292705 x 14808.888 = 33952.4136 {as above}
The 14808.888 multiplied by the FP {256:243} component: 243 obtains exactly 3598560 which is Gem: 1176 x 3060 which is 20 x 153, the “fishes” and 153 x 8 = 1224, also pertaining to the “fishes”
{3} 5 ÷ C = 1.123875 exactly, subsequently 7 ÷ 1.123875 = 6.22845067289 that is {In {1} above} the 6.673340006 x 1.0714285 which is one seventh of 7.5
Change tack with the above 1.2375
C being: Pythagorean Limma {256:243} divided 0.2368 = 4.448893337782 {abridged}
{4} 7 ÷ C = 1.573425 exactly, that is the 1.2375 x 1.2714545 that multiplied by 5280 = 6713.28, this being the GP base perimeter of 3024 multiplied by exactly 2.22
{5} 11 ÷ C = 2.472525 exactly, that is the 1.2375 x 1.998 that multiplied by 5280 = 10549.44, this being the GP base perimeter of 3024 x 3.48857142 which is the Schooldays Pi {22 ÷ 7} of 3.142857 ÷ 0.900900 that multiplied by exactly 1.11 = 1
{6} 13 ÷ C = 2.922075 exactly, that is the 1.2375 x 2.3612727 that multiplied by 5280 = 12467.52, which is the GP base perimeter of 3024 x 4.12285714 which is the Schooldays Pi of 3.142857 x 1.311818 which is the 2.922075 divided by exactly 2.2275 that multiplied by the FP {256:243} then by 3600 obtains exactly 8448 which is 64 x 132
Change of tack to employ 46656, the Timaeus: “Whole”
C being: Pythagorean Limma {256:243} divided 0.2368 = 4.448893337782 {abridged}
{7} 17 ÷ C = 3.821175 exactly, that is the 1.2375 x 3.0878181 that multiplied by 5280 = 16303.68
The Plato “Whole”: 46656 ÷ 16303.68 x 5.940555 = 17
The 5.940555 ÷ FP x 524288 = 2956400.64 exactly, which is 17 x 173905.92 which is 17 x 10229.76 which is 17 x 601.750588235294117647
Gem: Only-begotten son: 1176 ÷ 601.750588235294117647 = 1.95429804804
The 1.95429804804 multiplied by exactly 550702.08 = 1076236
The 550702.08 is 19 x 28984.32 exactly which is 17 x 1704.96 which multiplied by 11 x 13 obtains exactly 243809.28
In that case 243809.28 x C = 1084681.481481
Subsequently 601.750588235294117647 x 1076236 = 647625646.08 this is the 1084681.481481 x 597.0652741258
The 597.0652741258 multiplied by the Grand Gallery floor line length {19 x 99} of 1881 x 13 obtains exactly 14600037.1482 which multiplied by the 1.95429804804 obtains exactly 28532824.10015625 so on and so forth
Change of tack to produce various units of measure
C being: Pythagorean Limma divided 0.2368 = 4.448893337782 {abridged}
{8} 19 ÷ C = 4.270725 exactly, that is the 1.2375 x 3.4510909 that multiplied by 5280 = 18221.76 which is the Roman furlong of 608.256 x 29.957386363 which is 14.84375 x 2.01818 x 14.84375 that is 19 ÷ 1.28
{9} 23 ÷ C = 5.169825 exactly, that is the 1.2375 x 4.1776363 that multiplied by 5280 = 22057.92 which is the Greek mile of 5068.8 x 4.351704545 which is the 2.01818 x 2.15625 that is 23 ÷ 10.666, one third of 32
{10} 29 ÷ C = 6.518475 exactly, that is the 1.2375 x 5.2674545 that multiplied by 5280 = 27812.16 which is the Greek furlong of 633.6 x 43.895454 which is the 2.01818 x 21.75 which is 29 ÷ 1.333 one third of 4
{11} 31 ÷ C = 6.968025 exactly, that is the 1.2375 x 5.6307272 that multiplied by 5280 = 29730.24 which is the Egyptian Stade of 691.2 x 43.0125 which is the 2.01818 x 21.3125 which is 31 ÷ 1.4545, which is the Egyptian foot of 1.14545 x 1.269841 which is the GP Tan {480 ÷ 378}
{12} 37 ÷ C = 8.316675 exactly, that is the 1.2375 x 6.7205454 that multiplied by 5280 = 35484.48 which is the Sumerian cubit of 2.7428571 x 12937.05 which is the Sea mile of 6080 x 2.127804276…
Then 37 ÷ 2.127804276 = 17.388817 that multiplied by the 2.01818 x 19 x 693 = 462080 which is the mile of 5280 x 87.5151 that multiplied by 33 = 2888
The 2888 ÷ 1.2375 x 198 = 462080
The square yards in one acre: 4840 divided by the 693 = 6.984126, which is the GP Tan {480 ÷ 378} of 1.269841 multiplied by exactly 5.5, this indicated purposefully in view of the fact that we observe 5.5 within {A} below
Section Five
The prime number 7 in the company of Prime numbers in bold
Now multiplied by multiples of the prime 19: I.E: 38, 57, 76, and 95 etc with the Tetractys number total: 8436 {84 x 36 = 3024, the GP base perimeter} in addition to 8436 ÷ 666 = 12.666
The options being numerous to validate the “this multiplied by” numbers, therefore I will indicate interconnections employing the prime 3, obviously multiples of 3 are of additional benefit; nonetheless the options are in
{A} 7 ÷ 2 + 2 = 5.5 this multiplied by 0.3636 = 2
The 0.3636 x 11 = 4
The 0.3636 x 5.5 = 2
The 5.5 x 38 = 209 that divided by 12.666 = 16.5 which is 5.5 x 3
Subsequently 3 minus 0.3636 x 11 = 29
{B} 7 ÷ 3 + 3 = 5.333 this multiplied by 0.5625 = 3
The 5.333 x 3 = 16
The 0.5625 x 5.333 = 3
The 5.333 x 57 = 304 that divided by 12.666 = 24 which is 5.333 x 4.5
Subsequently 3 minus 0.5625 x 5.333 = 13
{C} 7 ÷ 4 + 4 = 5.75 this multiplied by 0.8695652173 = 5
The 0.8695652173 x 19.55 = 17
The 0.8695652173 x 5.75 = 5
The 5.75 x 76 = 437 that divided by 12.666 = 34.5 which is 5.75 x 6
Subsequently 3 minus 0.8695652173 x 5.75 = 12.25 a reduced Gem {Gematria} Founder of the City 1225 furthermore the reduced 12.25 is the prime 49 x 0.25
{D} 7 ÷ 5 + 5 = 6.4 this multiplied by 1.09375 = 7
The 1.09375 x 256 = 280
The 1.09375 x 6.4 = 7
The 6.4 x 95 = 608 that divided by 12.666 = 48 which is 6.4 x 7.5
Subsequently 3 minus 1.09375 x 6.4 = 12.2 which is 61 ÷ 5
{E} 7 ÷ 6 + 6 = 7.1666 this multiplied by 1.5348837209 = 11
The 1.5348837209 x 14.98484 = 23
The 1.5348837209 x 7.1666 = 11
The 7.1666 x 114 = 817 that divided by 12.666 = 64.5 which is 7.1666 x 9
Subsequently 3 minus 1.5348837209 x 7.1666 = 10.5 which is the 14.98484 ÷ 1.427128 that multiplied by 693 = 989, which is the prime 43 x 23
{F} 7 ÷ 7 + 7 = 8 this multiplied by 1.625 = 13
The 1.625 x 256 x 23 = 9568 which is 5280 x 1.81212
The 1.625 x 8 = 13
The 8 x 133 = 1064 that divided by 12.666 = 84 which is 8 x 10.5
Subsequently 3 minus 1.625 x 8 = 11
I will extend {G} to illustrate the myriad avenues to follow
{G} 7 ÷ 8 + 8 = 8.875 this multiplied by 1.91549295774 = 17
The 1.91549295774 x 9.9191176470588235294 = 19
The 1.91549295774 x 8.875 = 17
8.875 x 152 = 1349 that divided by 12.666 = 106.5 which is 8.875 x 12
Subsequently 3 minus 1.91549295774 x 8.875 = 9.625, which is Gem: Simon Peter 1925 ÷ 200 obviously 100 x 2
I highlighted Gem: Only-begotten son: 1176 within the above 9.9191176470588235294
As a result: 1176 ÷ 9.9191176470588235294 = 118.55893254…
Exactly 264.3354 ÷ 19 = 13.9123894736842105263157 this multiplied by 8.5218238582 = 118.55893254
The 8.5218238582 divided by the 1.91549295774 = 4.4488933377822 {abridged} this being C as observed prior, the FP {25:243} divided by 0.2368
{H} 7 ÷ 9 + 9 = 9.777 this multiplied by 1.9431818 = 19
The 1.9431818 x 11 = 21.375 which is the likewise observed prior: 1.2375 x 17.2727 this is 19 ÷ 1.1
The 9.777 x 171 = 1672 that divided by 12.666 = 132 which is the 9.777 x 13.5
Subsequently 3 minus 1.9431818 x 9.777 = 10.333 which is one third of 31
{I} 7 ÷ 10 + 10 = 10.7 this multiplied by 2.14953271028 = 23
The 10.7 x 190 = 2033 that divided by 12.666 = 160.5 which is the 10.7 x 15
The 2.14953271028 x 502.9 = 1081 which is 47 x 23
Subsequently 3 minus 2.14953271028 x 10.7 = 9.1 that is the 502.9 ÷ 55.263736 which is the prime 47 x 1.175824
In that case 10.7 ÷ 1.175824 x 7 x 13 = 9.1
{J} 7 ÷ 11 + 11 = 11.6363 this multiplied by 2.4921875 = 29
The 11.6363 x 209 = 2432 that divided by 12.666 = 192 which is 11.6363 x 16.5
The 2.4921875 x 360960 = 899580, which is 47 x 19140 which is 29 x 660
Subsequently 3 minus 2.4921875 x 11.6363 = 5.9090 that multiplied by 11 = 65, which is the prime 13 x 5
{K} 7 ÷ 12 + 12 = 12.58333 this multiplied by 2.463576158 = 31
The 12.58333 x 228 = 2869 that divided by 12.666 = 226.5 which is 12.58333 x 18
Subsequently 3 minus 2.463576158 x 12.58333 = 6.75 which is 54 ÷ 8
And 54 is, for example the prime 23 + 31
{L} 7 ÷ 13 + 13 = 13.538461 this multiplied by 2.73295454 = 37
The 13.538461 x 247 = 3344 that divided by 12.666 = 264 which is 13.538461 x 19.5 which is the prime 13 ÷ 0.666 one third of 2
The 2.73295454 being the Egyptian foot of 1.14545 x 2.3859126984
Subsequently 3 minus 2.73295454 x 13.538461 x 13 = 47
The 2.3859126984 being the GP Tan {480 ÷ 378} of 1.269841 multiplied by exactly 1.87890625
The 13.538461 x 390 = 5280, the 390 being the prime 13 x 30
{M} 7 ÷ 14 + 14 = 14.5 this multiplied by 2.827586206 = 41
The 14.5 x 266 = 3857 that divided by 12.666 = 304.5 which is 14.5 x 21
Subsequently 3 minus 2.827586206 x 14.5 = 2.5 which is 5 ÷ 2
{N} 7 ÷ 15 + 15 = 15.4666 this multiplied by 2.78017241 = 43
The 15.4666 x 285 = 4408 that divided by 12.666 = 348 which is 15.4666 x 22.5
Subsequently 3 minus 2.78017241 x 15.4666 = 3.4 obviously 17 ÷ 5
{O} 7 ÷ 16 + 16 = 16.4375 this multiplied by 2.85931558 = 47
The 16.4375 x 304 = 4997 that divided by 12.666 = 394.5 which is 16.4375 x 24
Subsequently 3 minus 2.85931558 x 16.4375 = 2.3125
In that case 47 ÷ 2.3125 = 20.324324 that multiplied by 37 = 752 which is 16 x 47
The “that multiplied by” numbers will at this time go beyond the prime number 3, therefore we reverse the sequence
{P} 7 ÷ 17 + 17 = 17.4117647058823529 that multiplied by 3.043918918 = 53
The 17.4117647058823529 x 323 = 5624 that divided by 12.666 = 444 which is the 17.4117647058823529 x 25.5 which is the prime 17 ÷ 0.666 one third of 2
Subsequently 3.043918918 minus 3 x 17.4117647058823529 = 0.7647058823529411
The prime 53 ÷ 0.7647058823529411 = 69.307692 that multiplied by 13 = 901 which is the prime 17 x 53
{Q} 7 ÷ 18 + 18 = 18.3888 that multiplied by 3.208459214 = 59
The 18.3888 x 342 = 6289 that divided by 12.666 = 496.5 which is 18.3888 x 27
Subsequently 3.208459214 minus 3 x 18.3888 = 3.8333 which is the prime 23 ÷ 6
{R} 7 ÷ 19 + 19 = 19.368421052631578947 that multiplied by 3.149456521 = 61
19.368421052631578947 x 361 = 6992 that divided by 12.666 = 552 which is the 19.368421052631578947 x 28.5 which is the prime 19 x 1.5 one half of 3
Subsequently 3.149456521 minus 3 x 19.368421052631578947 = 2.894736842105263157 that multiplied by 19 = 55 that plus 6 = 61
{S} 7 ÷ 20 + 20 = 20.35 that multiplied by 3.292383 = 67
The 20.35 x 380 = 7733 that divided by 12.666 = 610.5 which is 20.35 x 30
Subsequently 3.149456521 minus 3 x 20.35 = 5.95, which is 714 ÷ 120, in addition to 714 x 715 = 510510 which, for example, is 17 x 3 x 10010 that multiplied by 70.3 = 703703
With regard to the highlighted 714, the numbers 714 along with 715 obtain a special mathematical property, the sum of their prime factors are equal, in view of the fact that
The 714 = 2 x 3 x 7 x 17
The 715 = 5 x 11 x 13
Then 2 + 3 + 7 + 17 = 29
Then 5 + 11 + 13 = 29
The 3.292383 x 703703 = 2316860 which is 5624 x 411.9594594, and this multiplied by 19 x 37 = 289607.5 which is the prime 67 x 4322.5
The employed 703703 likewise being the GP Pyramidion number: 10.01 x 70300, this is the 37 x 1900
An example with regard to the: {P} highlighted: 5624
We observe prior: “4884 this being Gem: 3168 x 1.541666 that multiplied by the GP “finished” height {480 x 12} namely 5760 = 8880, which divided by the above 5624 x 19 = 30…”
The number: 6, with Prime numbers in bold
In the company of multiples of 19: I.E: 38, 57, 76, 95 etc
{1} 6 ÷ 2 + 2 = 5
5 x 0.6 = 3
0.6 x 19 = 11.4
{2} 6 ÷ 3 + 3 x 0.6 = 3
0.6 x 5 = 3
5 x 38 = 190
{3} 6 ÷ 4 + 4 x 0.9090 = 5
0.9090 x 5.5 = 5
5.5 x 76 = 418
{4} 6 ÷ 5 + 5 x 1.12903225806 = 7
1.12903225806 x 6.2 = 7
6.2 x 95 = 589
{5} 6 ÷ 6 + 6 x 1.571428 = 11
1.571428 x 7 = 11
7 x 114 = 798
{6} 6 ÷ 7 + 7 x 1.65454 = 13
1.65454 x 7.857142 = 13
7.857142 x 133 = 1045
{7} 6 ÷ 8 + 8 x 1.9428571 = 17
1.9428571 x 8.75 = 17
8.75 x 152 = 1330
{8} 6 ÷ 9 + 9 x 1.96551724 = 19
1.96551724 x 9.666 = 19
9.666 x 171 = 1653
{9} 6 ÷ 10 + 10 x 2.1698113207547 = 23
2.1698113207547 x 10.6 = 23
10.6 x 190 = 2014
{10} 6 ÷ 11 + 11 x 2.51181102 = 29
2.51181102 x 11.5454 = 29
11.5454 x 209 = 2413
{11} 6 ÷ 12 + 12 x 2.48 = 31
2.48 x 12.5 = 31
12.5 x 228 = 2850
{12} 6 ÷ 13 + 13 x 2.74857142 = 37
2.74857142 x 13.461538 = 37
13.461538 x 247 = 3325
{13} 6 ÷ 14 + 14 x 2.8415 = 41
2.8415 x 14.428571 = 41
14.428571 x 266 = 3838
{14} 6 ÷ 15 + 15 x 2.792207 = 43
2.792207 x 15.4 = 43
15.4 x 285 = 4389
{15} 6 ÷ 16 + 16 x 2.870229007 = 47
2.870229007 x 16.375 = 47
16.375 x 304 = 4978
{16} 6 ÷ 17 + 17 x 3.0542372881 = 53
3.0542372881 x 17.3529411764705882 = 53
17.3529411764705882 x 323 = 5605
{17} 6 ÷ 18 + 18 x 3.21818 = 59
3.21818 x 18.333 = 59
18.333 x 342 = 6270
{18} 6 ÷ 19 + 19 x 3.158038147 = 61
3.158038147 x 19.31578947 = 61
19.31578947 x 361 = 6973
{19} 6 ÷ 20 + 20 x 3.3004926108 = 67
3.3004926108 x 20.3 = 67
20.3 x 380 = 7714
Primes with primes
There being no adv
At this time the highlighted in red numbers employing the maxim: “As above-So below” to obtain primes we employ and “reverse” the primes:
2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53,59,61,67,71,73,
79,83,89,97,101,103,107,109,113,127,131,137,139,149,151
In other words we commence with the very last prime: 151, with the first prime: 2 {or 3} afterwards the penultimate prime in the chart 149, with the second prime: 3, {or 5} so on and so forth, and another time the numbers being abridged, Possibly I have not explained the process unmistakably, however it ought to be apparent as we progress
With regard to the green products, I.E. in {1} 755, otherwise in {3} 1043 we need but add or subtract multiples of the prime number 2 to obtain more primes, as I will illustrate, likewise the green number products will be reversed then added, likewise an “As above-So below” scenario
A few examples regarding the forthcoming numbers and the numerous options
Within {2} the 1.190476 x 362.88 = 432
Within {3} the 0.89090 x 604.8 = 432
Within {4} the 1.329670 x 3640 = 4840, square yards in one acre
Within {5} the 0.903743315508021 ÷ 0.891 x 9153827846.163 = 9284748291 exactly and this multiplied by 19 ÷ 17 ÷ 0.9037424117647058823529 = 11482333333.333
The cyclic 4117647058823529 contains 1176 Gem: Only begotten son
As a result 1176 ÷ 0.9037424117647058823529 x 87875000 ÷ 34447000000 x 0.9037424117647058823529 = 3
We will in a little while observe the number 755 within {1} and {2} below
The 11482333333.333 being one third of 34447000000 that divided by 755 afterwards multiplied by the prime 151 obtains exactly 6889400000, which is the modern-day mile of 5280 x 1304810.6060, which is the Egyptian foot of 1.14545 x 1139120.370370 that multiplied by the very commencing 1.190476 = 1356095.679012345 that multiplied by 81 = 109843750
This 109843750 divided by the 34447000000 then multiplied by Gem: Founder of the City: 1225 obtains exactly 3.90625 that multiplied by the FP {256:243} and Rhind {256:81} component: 256 = 1000
On the other hand, the 34447000000 being the 109843750 multiplied by exactly 313.6 that multiplied by the 755 ÷ 151 = 1568, which is the Lead PWS member: 384 x 4.08333, which is Gem: Founder of the City: 1225 ÷ 300
I calculated the breathtaking Grand Gallery 7-stepped corbel mean vertical height as 235.2 {modern-day inches}, which is apt, seeing as the Gallery leads to the alleged: King’s Chamber, the wall height via my calculations likewise being 235.2, that fares well with the data of William Flinders Petrie
Then the 313.6 divided by the longer value Greek foot of 1.01376 = 309.3434 which is the 235.2 divided by exactly 0.76032 that multiplied by the 109843750 = 83516400, which is the square feet in one acre: 43560 x 1917.2727
The Tetractys number total: 8436 ÷ 1917.2727 = 4.4
The GP Tan
No insult to the readers’ intellect, conceivably I will not explain the process clearly, hence please excuse any vagueness I cause. Anyway I subsequently added all the green numbers, not the four-digit green numbers the numbers such as
Within {2} the 1.190476
Within {3} the 0.89090
Within {4} the 1.329670
Within {5} the 0.903743315508021
The sum total being 35.5 which is the prime number 71 ÷ 2 the first prime number
I subsequently added all the red numbers such as
Within {1} the 0.6
Within {3} the 0.714285
Within {6} the 0.8947368421
Within {10} the 0.837837
The sum total being 31.5 which multiplied by 2 = 63, that minus 2 = 61 a prime number
The GP Tan being: 480 ÷ 378 = 1.269841
Subsequently 35.5 ÷ 31.5 = 1.126984 nigh on the same cyclic as 1.269841
Followed by 624 minus 198 = 426 x 1.126984 = 480.095238 which is 1.269841 multiplied by exactly 378.075
The 480.095238 being the Rhind Papyrus fraction {256:81} of 3.160493827 x 151.9051339285714 one seventh of exactly 1063.3359375, this is the 378.075 x 2.8125 that multiplied by 256 = 720
The 480.095238 being the Eye of Horus fraction {64:63} of 1.015873 multiplied by exactly 472.59375, this is the 378.075 x 1.25 one fourth of 5
Etceteras
Therefore: 35.5 ÷ 31.5 = 1.126984 x 378 = 426
Followed by 480 ÷ 378 = 1.269841 that minus 1.126984 = 0.142857 which is 1 ÷ 7
Hence 1.126984 ÷ 0.9 = 1.252204585537918871 that multiplied by 567 = 710
Therefore 31.5 ÷ 35.5 = 0.8873239436619…
Followed by 0.8873239436619… x 8094 = 7182
In that case 7182 ÷ 19 = 378
Anyway we commence the intended exercise
Likewise of interest being, why the need of Plato to mention the number 656 {Dialogues of Plato: LAWS 11}
The Law 656 refers to the Egyptians adhering to laws of music, dance, art, sculpture etc
“These they fixed and exhibited the patterns of them, in their temples: and no painter or artist is allowed to innovate upon them, or to leave the traditional forms and invent new ones”
We will presently observe 6560 within {1} below
{1} 2 ÷ 3 = 0.666 that multiplied by 0.9 = 0.6
The prime 151 ÷ 0.6 x 3 = 755
The 755 + 557 = 1312, which is 0.666 x 1968 that is the 0.9 x 2186.666 one third of 6560
{2} 3 ÷ 5 = 0.6 that multiplied by 1.1904761 = 0.714285 which is 5 ÷ 7
The prime 151 ÷ 0.6 x 3 = 755
The 755 + 557 = 1312, which is 0.6 x 2186.666 that is the 1.1904761 x 1836.8 which is the above 6560 x 0.28
{3} the 5 ÷ 7 product: 0.714285 x 0.89090 = 0.6363 which is 7 ÷ 11
The prime 149 ÷ 0.714285 x 5 = 1043
The 1043 + 3401 = 4444, which is 0.714285 x 6221.6 that is the 0.89090 x 6983.428571 on seventh of 48884
I will discontinue the reversing then adding of the green products, else the page will be a crossword of indecipherable number, it probably is in any case, via my seeming awry modus operand, hence we resume
{4} the 7 ÷ 11 product: 0.6363 x 1.329670 = 0.846153 which is 11 ÷ 13
The prime 139 ÷ 0.6363 x 7 = 1529
The prime 137 ÷ 0.846153 x 11 = 1781
{5} the 11 ÷ 13 product: 0.846153 x 0.903743315508 = 0.7647058823 which is 13 ÷ 17
{6} the 13 ÷ 17 product 0.7647058823 x 1.170040485829 = 0.8947368421 which is 17 ÷ 19
The prime 131 ÷ 0.7647058823 x 13 = 2227
{7} the 13 ÷ 17 product 0.8947368421 x 0.92327365728 = 0.826086956521 which is 19 ÷ 23
The prime 127 ÷ 0.8947368421 x 17 = 2413
{8} the 19 ÷ 23 product 0.826086956521 x 0.960072595281 = 0.7931034482 which is 23 ÷ 29
The prime 113 ÷ 0.826086956521 x 19 = 2599
{9} the 23 ÷ 29 product 0.7931034482 x 1.179523141654 = 0.9354838709 which is 29 ÷ 31
The prime 109 ÷ 0.7931034482 x 23 = 3161
{10} the 29 ÷ 31 product 0.9354838709 x 0.89561975768 = 0.837837 which is 31 ÷ 37
The prime 107 ÷ 0.9354838709 x 29 = 3317
{11} the 31 ÷ 37 product 0.837837 x 1.07710464201 = 0.90243 which is 37 ÷ 41
The prime 103 ÷ 0.837837 x 31 = 3811
{12} the 37 ÷ 41 product 0.90243 x 1.0565681961 = 0.95348837209 which is 41 ÷ 43
The prime 101 ÷ 0.90243 x 37 = 4141
{13} the 41 ÷ 43 product 0.95348837209 x 0.9595225739 = 0.914893617021 which is 43 ÷ 47
The prime 97 ÷ 0.95348837209 x 41 = 4171
{14} the 43 ÷ 47 product 0.914893617021 x 0.96928477402 = 0.8867924528301 which is 47 ÷ 53
The prime 89 ÷ 0.914893617021 x 43 = 4183
{15} the 47 ÷ 53 product 0.8867924528301 x 1.012982329 = 0.8983050847 which is 53 ÷ 59
The prime 83 ÷ 0.8867924528301 x 47 = 4399
{16} the 53 ÷ 59 product 0.8983050847 x 1.076708939 = 0.96721311475409 which is 59 ÷ 61
The prime 79 ÷ 0.8983050847 x 53 = 4661
{17} the 59 ÷ 61 product 0.96721311475409 x 0.94131039716 = 0.91044776119 which is 61 ÷ 67
The prime 73 ÷ 0.96721311475409 x 59 = 4453
{18} the 61 ÷ 67 product 0.91044776119 x 1.03648118217 = 0.94366197183 which is 67 ÷ 71
The prime 71 ÷ 0.91044776119 x 61 = 4757
{19} the 67 ÷ 71 product 0.94366197183 x 1.0306685749 = 0.97260273 which is 71 ÷ 73
The prime 67 ÷ 0.94366197183 x 67 = 4757
{20} the 71 ÷ 73 product 0.97260273 x 0.9500802282 = 0.9240506329 which is 73 ÷ 79
The prime 61 ÷ 0.97260273 x 71 = 4453
Although I illustrated prior a few properties with regard to the green numbers merely as an example to verify there actually is interconnection the 4453 divided by the 0.9500802282 = 4686.97260273 which is the 71 ÷ 73 product 0.97260273 multiplied by exactly 4819 which is 79 x 61
{21} the 73 ÷ 79 product 0.9240506329 x 1.030037960059 = 0.951807228 which is 79 ÷ 83
The prime 59 ÷ 0.9240506329 x 73 = 4661
{22} the 79 ÷ 83 product 0.951807228 x 0.9798037263 = 0.932584269 which is 83 ÷ 89
The prime 53 ÷ 0.951807228 x 79 = 4399
Another example re the green number, the 4399 ÷ 0.9798037263 x 83 = 372643 which is 89 x 4187 which is 79 x 53
Etceteras
{23} the 83 ÷ 89 product 0.932584269 x 0.98385293 = 0.91752577 which is 89 ÷ 97
The prime 47 ÷ 0.932584269 x 83 = 4183
{24} the 89 ÷ 97 product 0.91752577 x 0.983852937 = 0.9603 which is 97 ÷ 101
The prime 43 ÷ 0.91752577 x 89 = 4171
{25} the 97 ÷ 101 product 0.9603 x 1.02101891702 = 0.980582524 which is 101 ÷ 103
The prime 41 ÷ 0.9603 x 97 = 4141
{26} the 101 ÷ 103 product 0.980582524 x 0.98167854168 = 0.962616822 which is 103 ÷ 107
The prime 37 ÷ 0.980582524 x 101 = 3811
{27} the 103 ÷ 107 product 0.962616822 x 1.01977375968 = 0.9816513761 which is 107 ÷ 109
The prime 31 ÷ 0.962616822 x 103 = 3317
A final green verification, in view of the fact that the options are numerous, the 3317 ÷ 1.01977375968 = 3252.6822429906 which is exactly 3193 ÷ 1.01869158878 that multiplied by 107 = 109
The 3193 being the primes 103 x 31
{28} the 107 ÷ 109 product 0.9816513761 x 0.982631709 = 0.96460176991 which is 109 ÷ 113
The prime 29 ÷ 0.9816513761 x 107 = 3161
{29} the 109 ÷ 113 product 0.96460176991 x 0.922415661 = 0.889763779 which is 113 ÷ 127
The prime 23 ÷ 0.96460176991 x 109 = 2599
{30} the 113 ÷ 127 product 0.889763779 x 1.0895764372 = 0.9694656488 which is 127 ÷ 131
The prime 19 ÷ 0.889763779 x 113 = 2413
{31} the 127 ÷ 131 product 0.9694656488 x 0.9863210529 = 0.956204379 which is 131 ÷ 137
The prime 17 ÷ 0.9694656488 x 127 = 2227
{32} the 131 ÷ 137 product 0.956204379 x 1.03075402273 = 0.98561151079 which is 137 ÷ 139
The prime 13 ÷ 0.956204379 x 131 = 1781
{33} the 137 ÷ 139 product 0.98561151079 x 0.94650467839 = 0.93288590604 which is 139 ÷ 149
The prime 11 ÷ 0.98561151079 x 137 = 1529
{34} the 139 ÷ 149 product 0.93288590604 x 0.9465046783 = 0.986754966887 which is 149 ÷ 151
The prime 7 ÷ 0.93288590604 x 139 = 1043
{35} the 149 ÷ 151 product 0.986754966887 x 0.97469328431 = 0.9617834394 which is 151 ÷ 157
The prime 5 ÷ 0.986754966887 x 149 = 755
At this time, as mentioned prior, the addition of multiples of the prime number 2
|
|
|
|
|
Primes |
|
|
|
|
|
Primes |
|
755 |
minus |
4 |
= |
751 |
|
755 |
plus |
2 |
= |
757 |
|
1043 |
plus |
6 |
= |
1049 |
|
1043 |
minus |
4 |
= |
1039 |
|
1529 |
minus |
6 |
= |
1523 |
|
1529 |
plus |
2 |
= |
1531 |
|
1781 |
plus |
6 |
= |
1787 |
|
1781 |
minus |
4 |
= |
1777 |
|
2227 |
minus |
6 |
= |
2221 |
|
2227 |
plus |
10 |
= |
2237 |
|
2413 |
plus |
4 |
= |
2417 |
|
2413 |
minus |
2 |
= |
2411 |
|
2599 |
minus |
6 |
= |
2593 |
|
2599 |
plus |
10 |
= |
2609 |
|
3161 |
plus |
6 |
= |
3167 |
|
3161 |
minus |
24 |
= |
3137 |
|
3317 |
minus |
4 |
= |
3313 |
|
3317 |
plus |
6 |
= |
3323 |
|
3811 |
plus |
10 |
= |
3821 |
|
3811 |
minus |
8 |
= |
3803 |
|
4141 |
minus |
2 |
= |
4139 |
|
4141 |
plus |
12 |
= |
4153 |
|
4171 |
plus |
6 |
= |
4177 |
|
4171 |
minus |
12 |
= |
4159 |
|
4183 |
minus |
6 |
= |
4177 |
|
4183 |
plus |
18 |
= |
4201 |
|
4399 |
plus |
10 |
= |
4409 |
|
4399 |
minus |
2 |
= |
4397 |
|
4661 |
minus |
2 |
= |
4663 |
|
4661 |
plus |
2 |
= |
4663 |
|
4453 |
plus |
4 |
= |
4457 |
|
4453 |
minus |
2 |
= |
4451 |
|
4757 |
minus |
6 |
= |
4751 |
|
4757 |
plus |
2 |
= |
4759 |
|
4757 |
plus |
2 |
= |
4759 |
|
4757 |
minus |
6 |
= |
4751 |
|
4453 |
minus |
2 |
= |
4451 |
|
4453 |
plus |
4 |
= |
4457 |
|
4661 |
plus |
2 |
= |
4663 |
|
4661 |
minus |
4 |
= |
4657 |
|
4399 |
minus |
2 |
= |
4397 |
|
4399 |
plus |
10 |
= |
4409 |
|
4183 |
plus |
18 |
= |
4201 |
|
4183 |
minus |
6 |
= |
4177 |
|
4171 |
minus |
12 |
= |
4159 |
|
4171 |
plus |
6 |
= |
4177 |
|
4141 |
plus |
12 |
= |
4153 |
|
4141 |
minus |
2 |
= |
4139 |
|
3811 |
minus |
8 |
= |
3803 |
|
3811 |
plus |
10 |
= |
3821 |
|
3317 |
plus |
2 |
= |
3319 |
|
3317 |
minus |
4 |
= |
3313 |
|
3161 |
minus |
24 |
= |
3137 |
|
3161 |
plus |
2 |
= |
3163 |
|
2599 |
plus |
10 |
= |
2609 |
|
2599 |
minus |
6 |
= |
2593 |
|
2413 |
minus |
2 |
= |
2411 |
|
2413 |
plus |
4 |
= |
2417 |
|
2227 |
plus |
10 |
= |
2237 |
|
2227 |
minus |
6 |
= |
2221 |
|
1781 |
minus |
4 |
= |
1777 |
|
1781 |
plus |
2 |
= |
1783 |
|
1529 |
plus |
2 |
= |
1531 |
|
1529 |
minus |
6 |
= |
1523 |
|
1043 |
minus |
4 |
= |
1039 |
|
1043 |
plus |
6 |
= |
1049 |
|
755 |
plus |
2 |
= |
757 |
|
755 |
minus |
4 |
= |
751 |
|
471 |
minus |
4 |
= |
467 |
|
471 |
plus |
8 |
= |
479 |
|
|
total |
216 |
|
|
|
|
total |
218 |
|
|
In that case the totals: 218 ÷ 216 = 1.00925925
We observe prior: 35.5 ÷ 31.5 = 1.126984 minus the 1.00925925 = 0.11772486
The 0.11772486 multiplied by exactly 6.84972288 obtains exactly 0.80638272
On the other hand: 1.00925925 + 1.126984 minus 0.142857 = 2.13624338
The 2.13624338 multiplied by exactly 6.8607 obtains exactly 14.656125 that multiplied by the Limma {256:243} and Rhind {256:81} component: 256 = 3751.968 which is the 6.8607 x 546.878306 that multiplied by the GP base side length: 756 = 413440, which is the 2.13624338 multiplied by exactly 193536 which is the GP base side length of 756 x 256, obviously the FP, and Rhind component also the Comma component 524288 ÷ 256 = 2048
Until the next essay