Degree 16: T839

Name(s): t16n839

Order: 512 = 29

Parity: 1

|Aut(K)|=|CS16(G)|= 2

Subfields: 2T1, 4T3, 4T3, 4T3, 8T18

Other representations: 16T839, 16T839, 16T839, 16T839, 16T839, 16T839, 16T839, 16T908, 16T908, 16T908, 16T908, 16T908, 16T908, 16T908, 16T908, 16T839, 16T839, 16T839, 16T839, 16T839, 16T839, 16T839, 16T839

Resolvents
  2: 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1, 2T1
  4: 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2, 4T2
  8: 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 4T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3, 8T3
  16: 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 8T9, 16T3
  32: 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 8T18, 16T25, 16T25, 16T25, 16T25, 16T25, 16T25, 16T25
  64: 16T105, 16T105, 16T105, 16T105, 16T105, 16T105, 16T105
  128: 16T223, 16T239, 16T325
  256: 32T?