sols2_47:= [ PowerStructure(GrpMat) | MatrixGroup<2, GF(47) | \[ 0, 1, 46, 46 ] /* order = 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 46, 0, 0, 46 ] /* order = 4 = 2^2 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 46 ], \[ 46, 0, 0, 46 ] /* order = 6 = 2 * 3 */ >, MatrixGroup<2, GF(47) | \[ 1, 0, 46, 46 ], \[ 0, 1, 1, 0 ] /* order = 6 = 2 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 23 ], \[ 12, 20, 14, 35 ] /* order = 46 = 2 * 23 */ >, MatrixGroup<2, GF(47) | \[ 2, 0, 0, 2 ], \[ 0, 1, 5, 29 ] /* order = 69 = 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 7 ], \[ 0, 46, 1, 40 ] /* order = 8 = 2^3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 15, 3, 3, 32 ] /* order = 8 = 2^3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 1, 0, 0, 46 ] /* order = 8 = 2^3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 41, 23, 24, 41 ] /* order = 12 = 2^2 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 1 ], \[ 0, 46, 46, 0 ] /* order = 12 = 2^2 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 45, 40, 41, 2 ] /* order = 12 = 2^2 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 15, 0 ], \[ 30, 0, 0, 30 ] /* order = 92 = 2^2 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 17 ], \[ 31, 7, 17, 16 ] /* order = 92 = 2^2 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 0 ], \[ 6, 10, 37, 7 ] /* order = 92 = 2^2 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 10, 15 ], \[ 35, 0, 0, 35 ] /* order = 138 = 2 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 31, 43 ], \[ 28, 0, 29, 19 ] /* order = 138 = 2 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 32, 0 ], \[ 27, 10, 17, 20 ] /* order = 1058 = 2 * 23^2 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 3 ], \[ 46, 0, 0, 46 ] /* order = 16 = 2^4 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 0 ], \[ 46, 7, 0, 1 ] /* order = 16 = 2^4 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 5, 44, 44, 2 ] /* order = 16 = 2^4 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 32 ], \[ 8, 36, 11, 32 ] /* order = 24 = 2^3 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 1 ], \[ 30, 11, 42, 17 ] /* order = 24 = 2^3 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 8, 27, 15, 39 ] /* order = 24 = 2^3 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 0 ], \[ 1, 0, 12, 46 ] /* order = 24 = 2^3 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 43, 0 ], \[ 25, 36, 44, 25 ] /* order = 184 = 2^3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 27, 30, 30, 42 ] /* order = 184 = 2^3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 35, 0 ], \[ 37, 41, 22, 10 ] /* order = 184 = 2^3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 7, 0 ], \[ 43, 0, 0, 4 ] /* order = 184 = 2^3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 35, 6 ], \[ 3, 23, 6, 0 ] /* order = 276 = 2^2 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 22, 0 ], \[ 17, 32, 4, 30 ] /* order = 276 = 2^2 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 44, 12 ], \[ 0, 17, 4, 0 ] /* order = 276 = 2^2 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 41, 0, 0, 29 ], \[ 0, 1, 44, 0 ] /* order = 2116 = 2^2 * 23^2 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 20, 44 ], \[ 41, 0, 18, 6 ] /* order = 2116 = 2^2 * 23^2 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 3 ], \[ 34, 5, 42, 2 ] /* order = 32 = 2^5 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 44 ], \[ 39, 26, 3, 8 ] /* order = 32 = 2^5 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 11, 1, 19, 36 ] /* order = 32 = 2^5 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 27 ] /* order = 48 = 2^4 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 7, 5, 37, 40 ] /* order = 48 = 2^4 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 32 ], \[ 0, 46, 46, 0 ] /* order = 48 = 2^4 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 6, 12, 13, 34 ] /* order = 48 = 2^4 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 18 ], \[ 39, 27, 20, 8 ] /* order = 368 = 2^4 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 19, 44 ], \[ 31, 33, 32, 16 ] /* order = 368 = 2^4 * 23 */ >, MatrixGroup<2, GF(47) | \[ 6, 0, 42, 41 ], \[ 0, 1, 1, 0 ] /* order = 368 = 2^4 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 39, 27 ], \[ 44, 40, 9, 43 ] /* order = 552 = 2^3 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 39, 20 ], \[ 29, 45, 0, 18 ] /* order = 552 = 2^3 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 35, 41 ], \[ 46, 11, 44, 1 ] /* order = 552 = 2^3 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 35, 23 ], \[ 29, 29, 4, 17 ] /* order = 552 = 2^3 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 22, 0 ], \[ 23, 8, 12, 23 ] /* order = 4232 = 2^3 * 23^2 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 0 ], \[ 27, 32, 15, 16 ] /* order = 64 = 2^6 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 41 ], \[ 32, 27, 27, 11 ] /* order = 96 = 2^5 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 46, 0 ], \[ 32, 11, 11, 42 ] /* order = 96 = 2^5 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 0 ], \[ 16, 38, 9, 42 ] /* order = 96 = 2^5 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 22, 12 ], \[ 26, 12, 29, 29 ] /* order = 736 = 2^5 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 33, 19 ], \[ 26, 29, 7, 21 ] /* order = 736 = 2^5 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 5, 7 ], \[ 0, 14, 24, 0 ] /* order = 736 = 2^5 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 39, 29 ], \[ 21, 30, 42, 45 ] /* order = 1104 = 2^4 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 22, 0 ], \[ 28, 36, 2, 19 ] /* order = 1104 = 2^4 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 4, 0 ], \[ 42, 38, 36, 27 ] /* order = 1104 = 2^4 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 35, 20 ], \[ 4, 25, 44, 41 ] /* order = 1104 = 2^4 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 1, 26 ], \[ 4, 34, 23, 43 ] /* order = 192 = 2^6 * 3 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 15, 0 ], \[ 0, 29, 35, 1 ] /* order = 1472 = 2^6 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 40, 24 ], \[ 21, 13, 3, 4 ] /* order = 2208 = 2^5 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 15, 17 ], \[ 5, 7, 27, 42 ] /* order = 2208 = 2^5 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 2, 0 ], \[ 10, 40, 13, 37 ] /* order = 2208 = 2^5 * 3 * 23 */ >, MatrixGroup<2, GF(47) | \[ 0, 1, 9, 0 ], \[ 11, 42, 22, 36 ] /* order = 4416 = 2^6 * 3 * 23 */ > ];