RE: Inverse tang
Yesterday, 11:29 (This post was last modified: Yesterday, 11:31 by Peter Blomberg.)
Yesterday, 11:29 (This post was last modified: Yesterday, 11:31 by Peter Blomberg.)
I now have a case where I'd need to fill in the area between
1 16 0 0 0 -43 0 0 0 0 -37 0 1 0 48\3-16edge.dat
and
1 16 0 0 0 -47 0 0 0 0 -41 0 1 0 48\1-6edge.dat
I can put a tang on the inside, but what about the outside?
Must I rotate a chord?
The 1-6 (8 segments) is not divisible with 3, so I cannot use aring.
Rings might also do it, but in several parts. First a ring37 (which doesn't exist for 1-6 or 1-4+1-8 yet), then a ring19 (1-4+1-8), and then a ring40(1-4 exists, but not 1-8). Other combinations with fewer prims or fewer new prims might exist. However, since 43/37 is an irrational number, I'd have to approximate it with 5 decimals.
1 16 0 0 0 -43 0 0 0 0 -37 0 1 0 48\3-16edge.dat
and
1 16 0 0 0 -47 0 0 0 0 -41 0 1 0 48\1-6edge.dat
I can put a tang on the inside, but what about the outside?
Must I rotate a chord?
The 1-6 (8 segments) is not divisible with 3, so I cannot use aring.
Rings might also do it, but in several parts. First a ring37 (which doesn't exist for 1-6 or 1-4+1-8 yet), then a ring19 (1-4+1-8), and then a ring40(1-4 exists, but not 1-8). Other combinations with fewer prims or fewer new prims might exist. However, since 43/37 is an irrational number, I'd have to approximate it with 5 decimals.