nL-n-P13 is the Par1/Par2-Homothetic Center (nL-n-Luc5e) of mL-n-P13, where m=(n-1).
This recursive construction can be rolled up to increasing larger values of n.
Starting value for n is 4, where 4L-n-P13=QL-P28.
See also general remarks and construction at nL-n-P12.
This recursive construction can be rolled up to increasing larger values of n.
Starting value for n is 4, where 4L-n-P13=QL-P28.
See also general remarks and construction at nL-n-P12.
Correspondence with ETC/EQF:
In a 3-Line:
Any 3L-Par1/Par2-predecessor ?
In a 4-Line:
4L-n-P13 = QL-P28
In a 3-Line:
Any 3L-Par1/Par2-predecessor ?
In a 4-Line:
4L-n-P13 = QL-P28
Properties:
• It looks like that for all n the lengths of the line segments of Par1 are equal to the corresponding line segments of Par2 as well as Per2.