"name it after a french."

. in opportunity,
our beloved dimensions:
.
point, as in: end to some.
.
If a line exists perfectly straight in your mind,
and if it's comprised of two points in a plane,
I would like to name this pointed line of thought (L).
.
A curve is found between the direction of two (L)
not necessarily sharing a point,
-(though that'd be very much pleasing for the point
  I guess...)-
n be the number of dimensional planes available to build dim(n)
(M) be a common point for each of its (n L)
.
Remember at least two (M) in f*,
 and pair each (L) of an (M)
 with each (L) of the next (M),
 so that f* tells of one ring.
Now to create a curvy form of dim(n),
you'll need to create curves from
every paired (L) in ring f*.
.
The new curvy form is closed if
first and last (M) in f* coincide.
.
if now n was 3, you would not need triangles
to display your pesky helix.