Carlos Cetina wrote on Fri, Sep 19, 2014 04:32 AM UTC:Excellent ★★★★★
Thank you, Jörg. I did not know the Jelliss' writing "Theory of Journeys". I will study it carefully.
We can get a first approach to the relative strength of these nightriders by placing them on the central square (g7) of a 13x13 board and counting the number of squares affected/checked from there.
Doing it, we would find these results:
NN11
Diagonal Wide Crooked Nightrider
56
NN02
Straight Wide Crooked Nightrider
36
NN31
Quintessence
36
NN00
Rose
32
NN33
Diagonal Narrow Crooked Nightrider
24
NN21
Standard Nightrider
24
NN04
Straight Narrow Crooked Nightrider
20
Hence, the following equivalences should be near to be true:
We can get a first approach to the relative strength of these nightriders by placing them on the central square (g7) of a 13x13 board and counting the number of squares affected/checked from there.
Doing it, we would find these results:
Hence, the following equivalences should be near to be true:
NN11 = NN00 + NN33 = NN00 + NN21 = NN31 + NN04 = NN02 + NN04