1. Almost perfect ratio - 808:962 (0.83992, 0.84 - 0.83992 = 0.00008!)
2. Usefull area is 98.26% if you count panels and accumulators only!
(808*4) + (962*9) = 12100, empty spaces = 12, 3 roboports = 48(3x16), 4 medium power poles and 2 lamps, 36 substations = 144(36x4)
12100 - (12+48+4+2+144) = 11890.
(11890*100)/12100 = 98.26446%
3. Almost perfect symmetry.
4. Tileable.
5. You can use only one roboport, if you want (construction area is perfect 110x110).
IMAGE
POWER CIRCUIT
BLUEPRINT
Constructive criticism is welcome. Also, can you give me an idea what to place into empty spaces ? Maybe some logic combinators to do something or whatever...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