binary code source

Binary code source is actually quite ancient. Two symbols are used in the binary system: a “1” and a “0”. “One” is true or on; while “zero” is false or off. Look at the this primary3 x 3 magic square of antiquity. The 3 x 3 number square uses opposite binary pairs as: 4 + 6 = 10; 3 + 7 = 10; 9 +1 = 10; 2 + 8 = 10. See lower illustration. The question becomes: can you find higher binary numbers on this magic square? The answer is yes; but that is reserved for future posts. John Michell wrote quite a bit on magic squares. In a way he has been my constant philosophical companion by his writings even though he does not trace the story of magic squares anywhere close to the way I do.

So much can be traced to magic squares: Not only the binary code pictured on the lower number square, but also prominent Fibonacci numbers from the very next ancient square of numbers which is dedicated to Jupiter. Below is an excerpt from the internal link.

Add all the numbers from one to sixteen. The total is 136. Anyone familiar with ancient measurement immediately knows that 1.36 feet is exactly one-half of a megalithic yard of 2.72 feet. The full 2.72 megalithic yard is found in this magic square can be found as follows.

Take the 4 numbers at the center and cross multiply as follows: 7 x 10 = 70, Then multiply 6 x 11. Next add these two products 70 + 66 =136. 1.36 feet is exactly one half of a megalithic yard. Finally add these two ways as 1.36 + 1.36 = 2.72 and you have your megalithic yard by feet in numbers.