I think a Rodin Coil can show its operation in numbers. In this section I am alylizing the "Finger Print of God", "Vortex Glyph", or "Rodin Symbol", which ever you prefer. I will call it the Rodin Symbol, since he discovered it. This page will no doubt become very long, so the shortcuts below will take you to the latest entries.

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FeCu360 Winding Sequence

36 point Multi-layer Rodin Coil

Multi-layered Rodin Coils and the Fractal Torus

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Below I have drawings of 6 different stages of the Doubling Circuit. Forgive me for the quality of them, they were very time consuming to create, and took all my patience to finish. Each number has its own color code, including 9, which is invisible. I think the 9 will be important to see later, so I am including it. The Rodin Symbol is embedded in a full circle protractor. What I am going to show is how the degrees of a circle are numbered in reality.

Above is the first stage of the Doubling Circuit. Inside the red circles are the numbers for the Rodin Symbol as it is normally seen. The Rodin Symbol divides the circle into 9 sections, 40 degrees apart. In one of the Rodin videos, Marko says that the Coil is a 'Quanta'. The 360 degree circle is also a Quanta. If you look at where the red circle # 1 is, you see that it is at 40 degrees. Now divide 40 by 4 (quanta) and you get 10. Cross-add 1+0=1. Now lets try it with red circle # 8. Divide 320 by 4, which is 80, 8+0=8. This can be done with all nine numbers. There are 3 special numbers that you do not have to divide by 4 to prove them. Take red circle #3, it is at 120 degrees. Cross-add 1+2+0=3. This can be done with 3, 6, and 9.

If you click on the button to view the larger image, you can see that I have added numbers between each red circle. Starting from 9 at the top, they count every 4 degrees 1 through 9. The 3, 6, and 9 are colored red, to help seperate the numbers. The 1 in the red circle becomes part of the next set of 1 through 9. This continues all the way around the circle infinately. Now that we have 10 sets of 9's on the circle, we can start to see a pattern. The next drawing is a double of this one. Pay close attention to the 3, 6, and 9's. One important note, the circuit has already doubled complete revolutions to get to this point in the drawing, but we will get into that later.

On to the next step..

In this drawing the numbers are spaced every 2 degrees instead of 4 as in the first drawing. The first thing you notice in the second stage, is that all the numbers on the "Lazy Eight" have all shifted one spot. When I first did this drawing, I was kind of suprised of the direction they went. I thought the numbers were to travel clockwise on the right half of the symbol for doubling, and the opposite direction for halfing. This drawing is halfing the number of degrees on the circle, but are also doubling the amount of sets of 9 from 10 to 20. I am still not sure on this one. Nassim Haramin says the Universe is infinately large and small at the same time, so there is probably something I am missing.

Now on to what happend to the 3, 6, and 9's after the doubling. Notice the red circle #9 has not changed. Now follow the grey line from that nine to the other side of the circle, it connects to another 9. That 9 was also in the first drawing, and did not change either. The 9 NEVER changes, once one appears on the circle it is there forever. Now check out the red circle at 120 degrees, it is now a 6. Every 3 that was on the first drawing is now a 6. The same can be said about the 3 in the red circle at 240 degrees. Every 6 that was on the first drawing is now a 3. Every time the circuit doubles 3 and 6 ossolate.

The numbers 1, 2, 4, 8, 7, and 5, also are going to follow a pattern through out the doubling process. Just as the 1 in the red circle changed to 2, every 1 on the circle will change to 2. Every 2 will change to 4, and so on. One other thing to notice is the number 180 degrees away from any number, is the same number.

The above drawing is step 4. No, I didn't forget drawing 3, Rodin Math remember? :-) Just as in the second drawing, all the numbers in the red circles moved one more position, in the same direction. Every 9 remained the same, every 3 became a 6, every 6 became a 3, and all the other numbers increased by one - remember its Rodin Math, 124875124875124875.

This drawing interests me very much. Every degree on the circle has a number assigned to it. The number of sets of 9 has doubled from 20 to 40. Notice the red circle at 40 degrees is 4. Every degree number can be cross-added to it's real number. For example, take any degree like say, 235, cross-add 2+3+5=10 1+0=1. Now look at the drawing, there is a 1 at 235 degrees. This can be done for all 360 of the degrees. Once again, I think the symbol has become a Quanta. I am not sure what it all means, but I can see it is important.

In step 8, you can see things are getting crowded. What has happend is each degree is divided in half. There are now two rows of numbers around the circle. The outer row is the full degrees, the inner row is half degrees. To count around the circle, start at 1 at the half degree row, then go to 2 on the full degree row, then down to 3 on the half degree row, and so on. The same as before, the numbers in the red circles moved one position, the 9's stay the same, 3's to 6's and vice-versa, other numbers increase by one. This is a good time to point out that no matter how crowded the numbers get, NONE of the black numbers will ever be replaced by a red number, or the other way around. In the next steps you will see that if I could draw numbers any smaller than this, and if you had a microscope to view your monitor with, the numbers always keep their order.

(Image coming soon) Step 7 doesn't look like much changed at first glance. The red circles did change positions by one, and the numbers all did their own thing as usual. The problem is I don't have the room to draw all the numbers. In this step the symbol divided half degrees into quarter degrees. So we need to use a little imagination when looking at this drawing. In between each of these numbers shown are more numbers. To count around the circle, start at the quarter degree 1 not shown, then to half degree 2, then quarter degree 3 not shown, then to full degree 4, and so on.

(Image coming soon) Last step 5 shows a full rotation with the red circle at 40 degrees containing the number 1 again. This process keeps going on infinately, dividing each degree into smaller and smaller parts.

I created this quick and crude drawing to try to show what is happening when the numbers double. (Need to spend more time winding, less time drawing) If you follow any line from the center out that goes straight, it will follow a certian sequence. Follow the line to the right of the 9 in the center, straight up, and you notice it repeats 9's to the left of that line. Now follow the line to the right of the 1 in the center, it repeats 1,2,4,8,7,5.... If you do the same for the 3, it will repeat 3,6,3,6,3,6. This will work for every number around the circle. I wish I could of made this drawing bigger and better, but again it becomes too small the write numbers.

My Coil Design

Now that I have got some of the basics out of the way that lead up to my idea, I will tell you what it is. When I look at the Rodin Symbol, I see something that looks like it has many parts. For one thing it has a part that is an infinate loop, that is comprised of 6 different segments. Then there is two other segments that connect together at one point. This makes me think there is more to the coil. I believe that every straight line on the Rodin Symbol is it's own coil. The 1,2,4,8,7,5 coils would be wired in series in the order that they show on the symbol. The 3 and 6 coils would be connected at one common point. Also there may be a 9 coil. I know it is supposed to be invisible, but maybe this could be an output coil.

The above picture is a piece of one of the marker board pictures off of Marko Rodin's website. Notice the part where it says the 124875 is a coil, and the 3 and 6 are the magnetic field. It is a little blurry, but it also says that 9 is the flux. I believe this is correct, and the 3 and 6 coils will be the ones that get the activation sequence powered to them. The 124875 is going to be series circuit of 6 coils completely shorted out in their symbol order. This brings me to the other half of my idea, that the 3 and 6 are copper coils, while the 124875 are iron coils.

Your probably asking "what would a shorted out, series circuit of 6 iron coils do?". My thoughts are that they will carry magnetism as described in Ed Leedskalnin's books. In his Perpetual Motion Holder experiments he describes how "North and South pole magnets" will travel faster in soft iron. The north and south flow in opposite directions at the same time. They also flow forever, as long as the iron circuit is connected.

In the above picture you can see that the infinate loop has two paths. I think this could be the different directions of the "North and South Magnets" that Leedskalnin talks about. He also said in his book, that he could create a stronger electromagnet with a coil of iron than copper. I hope it is alright for me to use these images, if not I will take them down. I do try to keep everything original on my website.

Now that you all probably think I am crazy, I will show you how my coil is wound around the toroid ... based on Mathematics.

FeCu360 Winding Sequence

Above is the coil I have been talking about. I have decided to name this coil the "FeCu360 Rodin Coil". Fe and Cu being the element names for iron and copper, and 360 for the number of degrees this coil uses. I do not feel that putting my name on this coil would be right. The coil is still wound in Rodin's fashion of winding through the center of the toroid. Marko said himself that there are many ways to wind the coil. So his name stays.

Each color of the coil corresponds with the colors I have used in the ther drawings above. I can also prove that they are the coils they are, by the numbers. The winding sequences for each color coil is based on multiplication tables.

I need to stop here and give credit to Alex Petty. His website shows how the multiplication tables create paths around the Rodin Symbol. Seeing his work transformed my idea of a coil that I could not prove by numbers, to this one I am showing now. It will be helpfull to bring up this page of his website in another window to see what I am talking about here.

You probably recognize the above picture from Rodin's website also. This is the winding sequence for the iron parts of this coil. You can see the same order on Alex Petty's site. Alex also has the sequence for the 3 and 6 coils on his site. How do we wind a coil with only 9 numbers? Well you can also wind it based on how far apart the degrees are from each pin. If you follow the degrees exactly, you will be following the pattern of the multiplication tables. Below I have drawings showing how this is, please click on the larger view and zoom in to see them clearly.

This drawing is the first 3 stages of winding the 1 coil. Each pin is 91 degrees apart. I have circled the numbers of each pin that the wire lands on. As you can see, it goes from 9,1,2,3, and would continue on with the pattern 9123456789... until the wire lands back at the first 9 at the top of the circle.

This drawing is the first 3 stages of winding the 2 coil. Each pin is 101 degrees apart. Again, I have circled the numbers of each pin that the wire lands on. Now the pattern has switched to 9,2,6,8 and would continue on with the pattern 9246813579... until the wire lands back at the first 9 at the top of the circle.

This drawing is the first 3 stages of winding the 3 coil. Each pin is 111 degrees apart. Again, I have circled the numbers of each pin that the wire lands on. Now the pattern has switched to 9,3,6,9 and would continue on with the pattern 9369369369... until the wire lands back at the first 9 at the top of the circle. Notice how this coil only uses one third of the circle's degrees. This would be the first winding of copper if you were building the coil. Below are the rest of the winding sequences, I will add more comments as time permits.

Coil 4 121 degree Winding Sequence.

Coil 5 131 degree Winding Sequence.

Coil 6 141 degree Winding Sequence.

Coil 7 151 degree Winding Sequence.

Coil 8 161 degree Winding Sequence.

Coil 9 171 degree Winding Sequence. One great thing if you haven't noticed already, if you cross-add the winding degree.. you get the number of the coil~~~~> 1+7+1=9.

More information on how I plan to wind this coil will be on the "Coils" tab above. I will get more into the physical winding problems there.

This drawing is what started it all for me. One night as I was trying to sleep, it struck me that I could change how the circle is numbered to follow the doubling sequence. The result was 3 new coil winding paths that fit perfectly around the original windings. After thinking about how I numbered the FeCu360 coil, I thought what if I apply the 1-9 numbering and multiplication table winding sequence to this drawing?

This was the result of adding 1-9 around the circle. Amazingly, the coil paths did not change. The only thing that did change is what the coils are called. Originally when I labeled the coils I associated their distance from the center, with the lines on the Rodin Symbol. An example being the 1 and 8 lines are smaller and farthest away from the center of the Rodin Symbol, so I made the green coil the 1 to 8 coil.

Now when we follow the multiplication table winding sequence we can find out the true name for these coils. If you follow the red windings, you will find the pattern 123456789 or 987654321 depending on what rotation you follow. Those patterns are the multiplication tables for 1 and 8. The same can be done with the blue and green coils. The blue is the 4 and 5 coil windings, and the green is the 2 and 7 coil windings. Now the original Rodin coil windings are interesting. The black lines follow the pattern of 147, which is one Family Number Group, and the dotted line follows the pattern of the 258 Family Number Group. The only coil winding path not shown in the drawing is the 369 Family Number Group, which is the "gap space" of the original Rodin Coil. Note that the 369 Family Number Group sequences are exactly the same as a 3 or 6 multiplication table sequence.

The two other coils that are close to the outer diameter always used to bother me. I always thought, why are these coils here? They don't fit anywhere with the Rodin Symbol. I eventually used them as a 3D guide for the torroid dimentions. Now with the 1-9 numbering, it shows that they truely are not coils. Their 1-9 winding sequence doesn't match up with any multiplication table. Maybe the 124875 sequence shows us more about physical design than electrical design? I am still amazed that the red, blue, and green winding paths did not change with an entirely different winding sequence.

And so the puzzle pieces keep dropping in...

Above is the Rodin number map torus. I spent some time trying to figure out what relationship the Multi-Layer Rodin coils and the number map torus have. If you look at how the numbers flow when you follow the diamonds point to point into the center, the numbers either go 1-2-3-4-5-6-7-8-9 or 9-8-7-6-5-4-3-2-1 repeating 2 times. This is exactly how an 18 point Multi-Layered Rodin Coil is numbered!

Way at the top of this page I described how the doubling circuit looked as it progressed around the Rodin Symbol. I think what that shows us is how these number maps can fit inside each other. It also makes me raise the question of where do the emanations actually come from?

The drawing above shows part of a cross section of 4 different number map torus's. The center is the 9x9 torus, the next ring is the 18x18 torus, and the next is 36x36 and so on. Again notice the 9's form straight lines coming from the center. You can see that the 9 in the lower right corner of the outer ring does not show any 9's leading to the center. They are just hidden between the numbers. The line passes between the 4 and 5 on the third ring, that is 4.5. Cross-add and get 4+5=9. The same can be done with the first two rings if you know the exact decimal number that the line crosses. The 3's and 6's also form lines of repeating 3636363636. The rest of the numbers follow the doubling sequence in a line.

I think this is where the emanations really start from, the core of the torus. They radiate in all directions from the center. If you think about the torus as a whole, the emanations are coming from a ring at the center of the core.

This is Marko's drawing showing the emanations coming from the center hole of the torus. I don't think there is anything wrong with this, though it is putting the cart before the horse as they say. I think the part that is wrong is showing these emanations activating the 3, 6, and 9. I believe they are activated by their own fractal center. These fractal torus's are what create the emanations coming from center of the picture above.

This drawing shows a cross section of the 36x36 number map torus. Notice how the number rotation is opposite on each circle. I chose to cut the torus at the point were the 9's are at the top, bottom, and sides. It is going to take some imagination to really get this in 3D. I haven't got any 3D drawing skills as of yet. :-) I have the emanations shown coming from the core of the torus for the 3, 6, and 9. This is more accurate than an emanatoin coming from the center hole of the toroid. If you tried to draw a line from the center hole to say one of the top 9's, it would have a chance of hitting another number that is not a 9.

If you look at the horizontal lines going through the middle of the torus you can see that they collide in the center of the hole. These are the lines that are shown in the violet picture above. My question is, do these lines collide and cause a force, or do they simply pass by each other and give the illusion of the violet drawing?

Notice the Red line I have drawn vertically through the center hole of the torus. I think this is a new line of 9's forming the axis of the torus. It is created by all of the emanations coming from the fractal torus's. For example, you can see the two emanation lines coming from the 6's and crossing at the red line. Remember that this is only a cross section of a 3D object, so there are more than two lines crossing here. We have two 6's shown, but there are other diamonds on the torus emanating to this exact point. I believe we can cross-add all these numbers and get a 9 every time, no matter where an emanation crosses on the axis. This brings up a new question, how do we space the numbers in the patterns on the emanations?

Here I extended a couple emanations and added numbers to the lines. The spacing between the numbers are not to scale, I am just showing a concept. The repeating pattern of 3's and 6's comes from the idea that the number map torus's can fit inside each other. You can see how the 6's lines intersect at the red line to form a 9. Of course 6+6=12 1+2=3 and does not equal 9, but there are four 3's, four 6's and four 9's emanating to this point. So we get 3+3+3+3=12 1+2=3, 6+6+6+6=24 2+4=6, 9+9+9+9=36 3+6=9, 3+6+9=18 1+8=9. This example only included family number group 3. I don't really know if the other 2 groups create emanations, but if they did they would also cross-add to nine at this point.

If you look to where I extended the emanations to another intersection, you can see that I laid out the pattern so that they also added up to 9. This is where I think the spacing of the pattern is important. If they are spaced so that the intersection is a 3 and a 6, they would equal 9, but if they were spaced so that they were a 6 and 6 or 3 and 3 they would not. Im going to go out on a limb and say that I have that part of the drawing made wrong. I think maybe that intersection could add up to 6 and the intersection oppposite of it on the bottom side of the torus could be a 3. This could represent North and South magnetic poles. Say if you had another torus like this energized they could stick together magneticly. North needs to stick to south, or we could say 3 needs to stick to 6. Maybe when those points interact they add up to 9, even though they are emanations from two separate torus's. Two neo magnets don't just stick together, they also align their axis which would be the 9 spine. When the magnets are together the fields of the two attracted poles no longer curve out, they go straight, just like a 9. Either way I think arranging smaller torus's to create a bigger more powerful torus is possible. That is my goal with the 18 point Multi-Layer Rodin Coils. The way that these coils will be soldered together follows the 18x36 number map torus. I think this configuration may have some of the "activation sequence" already built in. Check it out on my coils page on the tab above.

More to come...