![flower :flower:](./images/smilies/icon_flower.gif)
Re: sPointers Island design
After a refreshing late afternoon nap, I awakened slowly and contemplated the sPointers Island geometry. I finally understood Sees 'em's SCIS when I modified the geometry with "just a few more lines".
![Duh! :duh](./images/smilies/icon_headbanger.gif)
... but first, this unresolved consternation:
Popular myth maintains that the CSC geometry of sPointers Island relates to two two-word sets (not 22-word sets) that are combinations of these four words: Spooners, Schooner, Court, and Port.
Here are the probable combinations (only "Spooners" is plural, for obvious reasons):
Court's Port, Port's Court,
Spooners' Port, Spooners' Court,
Schooner's Port, Schooner's Court,
Schooner's Spooners, Spooners' Schooner.
![scratch :scratch:](./images/smilies/icon_scratch.gif)
Say what?!
Having now studied the geometry, I suspect that the two (and only two) mysterious two-words sets identify two locations in close proximity on the coast of the Island. And further, the juxtaposition of these two locations somehow gives precise meaning to the geometry.
![Confused :?](./images/smilies/icon_confused.gif)
What's between "here and there" if "between" were a straight line?
Say what?! A range? A straight line called "between"? Not in my Math 101 books!
Perhaps, a straight line positioned with "here" on one side and "there" on the other side.
![study :study:](./images/smilies/icon_study.gif)
Oh, did I mention that the myth narrates that the straight line between "here and there" does not exist in the geometry?
But "between", by definition, does exist!
Just forget it! Any visitor to the Island, with sufficient time and leisure,
can investigate all possible locations identified by combinations of "Spooners, Schooner, Court, and Port".
As for the relationship of the two actual locations, that's between "here and there".
![Seeing Stars :stars:](./images/smilies/icon_stars.gif)
What?! The non-existing straight line?
No problem! Just assess Sees 'em's succinct saying:
"May the (lines of) force be with you".
Rod