Often, an irrational Real number (besides pi) is rationally just another way of describing a fraction. Pi is sensible, because it is a scalar value that literally represents how many times of a traversal a half of an arc of a circle is when relative to the radius of the said given arbitrary circle. Again, the second example is similar to the first one.
Take the value of (e^(ipi)). It equals a negative one when one considers the formula isin(pi)+icos(pi). This formula is obviously correct, when one considers the radial delineation of the initial value. ln(e^(ipi))=ln(-1)=0-, which amounts to basically nothing, again, when radially delineated. Yet, if one is to linearly delineate such an imaginary scalar through a physical tensor that amounts to the traversal of an entity in anterior dimensions, then, numbers divisible by i(pi) are not then considered to be such zeroes anymore.
Think about it for yourself: If anterior dimensions and parallel universes are indeed real, is this actually possible?! I will continue with the suspense later! Sincerely, Sam Roach.
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