41edt
Division of the third harmonic into 41 equal parts (41edt) is related to 26 edo, but with the 3/1 rather than the 2/1 being just. The octave is about 6.1178 cents stretched and the step size is about 46.3891 cents. Unlike 26edo, it is only consistent up to the 10-integer-limit, with discrepancy for the 11th harmonic.
41edt is related to the regular temperament which tempers out |287 -121 -41> in the 5-limit, which is supported by 181, 207, 388, 569, 595, 957, and 1345 EDOs.
Related regular temperaments
181&207 temperament
5-limit
Comma: |287 -121 -41>
POTE generator: ~|140 -59 -20> = 46.3927
Map: [<1 0 7|, <0 41 -121|]
EDOs: 181, 207, 388, 569, 595, 957, 1345
7-limit
Commas: 823543/820125, 2199023255552/2197176384375
POTE generator: ~131072/127575 = 46.3932
Map: [<1 0 7 3|, <0 41 -121 -5|]
EDOs: 181, 207, 388, 569, 595
11-limit
Commas: 42592/42525, 43923/43904, 184877/184320
POTE generator: ~352/343 = 46.3934
Map: [<1 0 7 3 4|, <0 41 -121 -5 -14|]
EDOs: 181, 207, 388, 569, 595
13-limit
Commas: 847/845, 4096/4095, 4459/4455, 17303/17280
POTE generator: ~352/343 = 46.3921
Map: [<1 0 7 3 4 2|, <0 41 -121 -5 -14 44|]
EDOs: 181, 207, 388, 569, 595