If you've never seen Euler's Identity, well, behold because it is one the most beautiful equations in mathematics. What makes it so beautiful is its simplicity, somewhat like E=MC2. However there's more. Euler's equation is special because it contains five incredibly important numbers, e, i, pi, 1, and 0, arranged in sums and exponents. Its diversity is amazing.
I, much like other scientists, want to know what this equation means. Sure we know that its used in quantum physics. And we also know that it is deeply related to the pythagorean theorem. Even more, we know that this equation is describing rotations thru a complex, imaginary plane.
I'm suggesting to go even further. I believe that it can be dissected and read, according to the meanings of the variables within the equation. FYI, the imaginary number, i, describes rotations. So if I take the square root of both sides of Euler's identity, and reveal an imaginary number on the right side, I see something that can be read.
'The root to growing an imaginary perimeter is imaginary rotation'. I believe this is what's happening in MultiSpace. Euler's identity is describing the fundamental motion of Time and Space in MultiSpace. Space rotates, creating imaginary perimeters of time.
Can eiπ be considered as a reflection of SpaceTime? Does it represent the OI duality? I'll let you figure that one out, but I'll end with this:
The Pythagorean formula uses 'squares' to describe distances across real, physical planes. In contrast, Euler's formula uses 'rotations' to describe distances across imaginary, abstract planes (that is coincidentally used in quantum mechanics).
Are you beginning to see the symmetry between the physical world of SpaceTime, and the abstract world of MultiSpace?
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