It's true that if you define a circle as having the same radius all the way round from your centre then at least one other shape other than a circle follows this rule. So how clear is using the diameter or Newtons method ect at the point of infinite iteration with different approaches to a perfect circle pi may skew or the circle may be imperfect what do we really mean by perfect at this scale.
Also if you want understand how a glome or 4d N-Sphere works better what happens when starting from a line evolving dimensionally from a line to a box to a cube to a tesseract ect an inscribed N-Sphere and a line from the centre to the furthest corner type of the N-cube as it grows in dimension.
yes what does happen to that line that intersects the evolving inscribed N-sphere and the furthest corner of the evolving N-cube as the dimension shifts from 3d to 4d and how does a graphing of this curvature work regarding an evolving N-sphere intersection plot as it approaches infinity if you want to know more about curves discreetly represented on an infinite plane as to their approach that is.
Also if you want understand how a glome or 4d N-Sphere works better what happens when starting from a line evolving dimensionally from a line to a box to a cube to a tesseract ect an inscribed N-Sphere and a line from the centre to the furthest corner type of the N-cube as it grows in dimension.
yes what does happen to that line that intersects the evolving inscribed N-sphere and the furthest corner of the evolving N-cube as the dimension shifts from 3d to 4d and how does a graphing of this curvature work regarding an evolving N-sphere intersection plot as it approaches infinity if you want to know more about curves discreetly represented on an infinite plane as to their approach that is.
