Tweet
Base Number Patterns 2-64 for multiplication by 2-9:
https://imgur.com/Kk7Ye4t
The different color paths are the different patterns present in the base number system, the more colors present, the more unique patterns within that base number system. The patterns work like Marko Rodins base 10 number system patterns. The gif shows all the patterns for the multiplication operations of *2 to *9 for base numbers 2-64. I figured out this discovery after watching Rodins vortex math videos. His number patterns only apply to the base 10 number system, my base number pattern algorithm applies to ALL base number systems. I only show base number system patterns for base 2 (binary) to base 64 because all ascii alpha-numeric symbols only account for base 2-base 61 (then I added 3, I believe they were ^,|, and & to make it a even 64), but my algorithm can get the patterns for ANY base number system it just gets ugly looking when you can no longer use a single symbol to represent the base number.
Some things I discovered by doing this were that every base number system has unique patterns. The number of unique base number patterns for even base number systems does not exceed 8(iirc) and the number of unique base number patterns for odd base number systems does not exceed the odd base number(so base 61 has less than 61 patterns). Some things I discovered since making the gif above are that the number '1' could be placed in the center to represent the ancient greek monad and/or to represent an electrical engineering copper wire. When I imagine each pattern operating independently and as a vortex around a center point (copper wire/monad) the entire concept of polyphase electrical systems becomes much easier to visualize. I also suspect these patterns have something to do with the basis of all elements...The yellow balls are the location in time, a physicist might call them the 'electron cloud valence levels' but physicists have invented nothing, ever, in history, soooo who cares what any of them think.
IMO Eric Dollard's book 'Versor Algebra' could further simplify greater than 2nd order differential equation algebra by utilizing base number system patterns like shown. I believe Dollards book 'Versor Algebra' only scratches the surface for what is possible by using 'operators' to represent imaginary numbers within electrical phase calculations. I suspect the matrix math and complicated series mathematics can be completely abstracted out by the use of different base number system patterns. For the exact base number pattern tables email me, pm me, or ask me in the comments.
https://imgur.com/Kk7Ye4t
The different color paths are the different patterns present in the base number system, the more colors present, the more unique patterns within that base number system. The patterns work like Marko Rodins base 10 number system patterns. The gif shows all the patterns for the multiplication operations of *2 to *9 for base numbers 2-64. I figured out this discovery after watching Rodins vortex math videos. His number patterns only apply to the base 10 number system, my base number pattern algorithm applies to ALL base number systems. I only show base number system patterns for base 2 (binary) to base 64 because all ascii alpha-numeric symbols only account for base 2-base 61 (then I added 3, I believe they were ^,|, and & to make it a even 64), but my algorithm can get the patterns for ANY base number system it just gets ugly looking when you can no longer use a single symbol to represent the base number.
Some things I discovered by doing this were that every base number system has unique patterns. The number of unique base number patterns for even base number systems does not exceed 8(iirc) and the number of unique base number patterns for odd base number systems does not exceed the odd base number(so base 61 has less than 61 patterns). Some things I discovered since making the gif above are that the number '1' could be placed in the center to represent the ancient greek monad and/or to represent an electrical engineering copper wire. When I imagine each pattern operating independently and as a vortex around a center point (copper wire/monad) the entire concept of polyphase electrical systems becomes much easier to visualize. I also suspect these patterns have something to do with the basis of all elements...The yellow balls are the location in time, a physicist might call them the 'electron cloud valence levels' but physicists have invented nothing, ever, in history, soooo who cares what any of them think.
IMO Eric Dollard's book 'Versor Algebra' could further simplify greater than 2nd order differential equation algebra by utilizing base number system patterns like shown. I believe Dollards book 'Versor Algebra' only scratches the surface for what is possible by using 'operators' to represent imaginary numbers within electrical phase calculations. I suspect the matrix math and complicated series mathematics can be completely abstracted out by the use of different base number system patterns. For the exact base number pattern tables email me, pm me, or ask me in the comments.
Comment