Item 6. Pi and the Universe. Gives Applications to the Geometry of our Universe. 5 Total Pages
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1 Item 6 Pi and the Universe Gives Applications to the Geometry of our Universe 5 Total Pages 1
2 Pi and the Universe How Geometry Proves the Correct Ratio for Pi 201/64, as a decimal For our geometry proving the correct ratio for Pi our radius length of ½ inch forms our hexagon length of 3 inches within our circle circumference. Here our diameter length is one, making our circumference length Pi. Our hexagon gives us six equal divisions of our circle circumference, so that our circumference length ( ) can be divided into 6 equal lengths that gives us Pi can also be divided by 2, 3, 4, and 5 so that we can make application to our Poincare One Geometry. We can apply our quantum math application of reducing integers to a single integer by addition. For 201/64 we have 3/10 = 3/1 = 3. Three is the length of our hexagon (1/2 inch) times 6. Then = 21 = 3, also our hexagon length. When we multiply our integers of Pi, we have 720, the 2 circumference lines of our vacuum spheres, of our Poincare One, 360 degrees each. Our decimal part of Pi = 18 related to our 18 parameters, then 18 = 9 our fifth force velocity. Our prime integers of Pi, total 10, the 10 black holes of our Poincare One Geometry. Then our single time integers (1, 2, 4, and 5) total 12, the 12 time lines of our Poincare One illustration. For our 6 divisions of Pi, we have where our prime integers total 25, the 25 faces of our network structure part of our Poincare One Geometry. When we form a quantum fraction of 25, we have 2/5 as with our probability Model (A) M-Theory we could divide our 5 columns into 2/5 and 3/5, and also 1/5 and 4/5. For our single time integer of , we have 2, 4, 5, 5, and 7 that gives us 23, with our quantum fraction we have 2/3 the charge of our top quark that was produced from the Higgs Field Mass of 189 GeV. When divided by two, gives us , where our primes of 2, 3, 5, 5, and 7 give us a total of 22, the 22 curved wave structure lines of our Poincare One Geometry. Then our time integers give us 21 = 3 that corresponds to our hexagon length. 2
3 When divided by three, gives us our primes 7 and 5 total 12, as each half of our Poincare one counts 6 one half time wave structures, then our single time integers of 1, 4, 5, 7, and 8 total 25, again the 25 faces of our Poincare One Geometry. When divided by four, gives us Our primes of 2, 5, 5, 5, and 7 total 24, our 24 individual parts of our probability Model (D) related to quark particle construction. Then, our single time integers of 1, 2, 5, 5, 5, 7, and 8 total 33. Then, 33 gives us 3/3 = 1 our diameter length. Our last one is divided by 5 that gives us that gives us our greatest result our fifth force that was used to construct our universe, as our primes of 2, 2, and 5, total 9, our largest quantum integer representing our fifth force velocity. Then, our single time integers of 1, 2, 2, 5, and 8, give us 18, our 18 parameters. We Can Show That Pi is Also Related to Infinity We are going to use our count of whole numbers in rotation as our diameter to multiply Pi to give us our circumference lengths, where we will apply quantum math of reducing our results to a single integer by addition One times Pi = 21 = 3 Two times Pi = 24 = 6 Three times Pi = 36 = 9 Four times Pi = 21 = 3 If you continue this process for as far as you want to go, your end result will be the infinite repeating set of 3, 6, and 9 that gives us our fifth force velocity. We have shown that 3, 6, and 9 are related to both halves of our universe, our Poincare one. When added = 18, our 18 parameters. Then when multiplied 3 times 6 times 9 = 162, the 162 individual parts of our probability Models (B), (C), (D), (E), and (F), that made the transformation from our probability Model (A) M-Theory. So then, what do we find in , first we have prime integers of 2, 3, and 5 that gives our 10 one half time wave structures to the perimeter of our Poincare One Geometry. Then, our single time integers 1, 4, 2, and 5 gives us 12 for our 12 time lines. So then what is the number that they calculated to be Pi, as they did so by using an infinite series? What they calculated is time with both is positive and negative parts, as time is infinite. If you count all the integers of the present Pi up to 360, you will find 3, 6, and 0, where they went by 360 degrees, no wonder that they can never come to the end of their calculations, as they have an infinite application to a single circumference. 3
4 Euler was the one who solved the infinite series, as he found it to be, Pi squared over six, you will find it to be a finite result by using the real Pi. I think that if Euler was here he would be very surprised. So then, we now know how the real Pi corresponds to our universe. Pi also gives us a real physical constant. Next, we want to show the real infinite series for Pi, as Pi is the length of our circumference when our diameter is one, the same as We will use our count of numbers starting with one as our diameters. These will be our circumference results (1) , (2) , (3) , (4) , (5) , (6) , (an infinite process). Here again, we want to apply our quantum math of reducing to a single integer by addition. Our first application is to our whole numbers of each set so that this is our results 3, 6, 9, then 12 = 3, 15 = 6, and 18 = 9, so that our results are 3, 6, 9 3, 6, 9 infinite. parts. Next we want to make application of adding both our whole numbers and decimal Here we get the very same results as our first application, infinite repeating sets of 3, 6, 9 This gives us our two circumference lines related to our two spheres of our Poincare One Geometry containing our ½ time wave structures. Next we make application to our infinite decimal parts only, where we find that our results will always be 9, our fifth force velocity for the construction of the universe in the two different directions of time. We have shown that 3, 6, and 9 are related to both sides of our Poincare One Geometry as well as our probability models, as 3 times 6, times 9, gives us our 162 total parts of our probability Models (B), (C), (D), (E), and (F) that was produced form (A) M- Theory. It s the 162 total parts that apply to our Poincare One Geometry. Squaring is for mass, so that 3 squared equals 9, and 6 squared gives us 36, then 9 squared gives us 81, so that our total is 126, that gives us the 126 line of our Poincare Two Geometry, produced from 9, our super velocity that produced 26 particles, where 81 GeV is the mass of our w- and w+ bosons that give us 3 sets of bosons of 27 GeV. Remember 27 is also the total of our single time integers 1, 2, 4, 5, 7, and 8, related to both positive and negative time 6/7 and 1/7. We have shown that all prime numbers reduced to a single integer by addition becomes one of these six time integers. 4
5 You don t need Pi, to get the area of every circle circumference. All you have to do is multiply the finite length radius times ½ of the finite circle circumference length. By using the real Pi you can prove this to be true. Thanks, Richard Eicholtz 5
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