User:Liniarc

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A liniarc is a straight curve. For the mathematically minded it's a linear parabola. A squaicle is formed when four equally length liniarcs meet at right angles. Liniarcs only exist in the fifth dimension. A liniarc can cross each other two times one time or both.

A liniarc is created by an anti-quadratic equilateral equation against the Z-axis.

[edit] Other Dimensions

Due to the limited amount that's visible in other dimentions, things may look very different

[edit] Second dimension

It appears as two over lapping spirals that meet at the outer tip. It is the shape of it in the third dimension squashed flat.

[edit] Third dimension

If we were to see an liniarc in the third dimension, It would look like a spiral that starts and ends at the ends of a sphere. The actual length of a liniarc is the length of the diameter of the sphere.