D:=[];
G:=[];
R:=[];
RG:=[];
# Design 1: 1 resolution(s), autom. group order 3, simple
D[1]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,8,9],[1,6,7,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,13,16],[1,14,15,16],[2,4,8,13],[2,5,6,11],[2,6,10,11],[2,7,9,14],[2,7,12,15],[2,8,13,16],[2,9,15,16],[2,10,12,14],[3,4,9,14],[3,5,10,16],[3,6,8,15],[3,6,13,14],[3,7,11,16],[3,7,12,13],[3,8,10,12],[3,9,11,15],[4,5,7,16],[4,5,12,14],[4,6,13,15],[4,8,9,10],[4,10,11,16],[4,11,12,15],[5,6,9,12],[5,7,8,15],[5,10,13,15],[5,11,13,14],[6,8,14,16],[6,9,12,16],[7,8,11,14],[7,9,10,13]];
G[1]:=Group([(1,2,6)(3,11,7)(4,5,10)(8,12,15)(9,14,13)]);
R[1]:=[];
RG[1]:=[];
# Design 1 / Resolution 1: autom. group order 3
R[1][1]:=[[1,35,38,39],[2,32,37,40],[3,17,25,36],[4,15,22,31],[5,16,26,28],[6,14,20,29],[7,18,21,27],[8,11,23,33],[9,13,19,34],[10,12,24,30]];
RG[1][1]:=Group([(1,6,2)(3,7,11)(4,10,5)(8,15,12)(9,13,14)]);
# Design 2: 1 resolution(s), autom. group order 3, decomposable
D[2]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,10,13],[1,11,13,14],[1,12,15,16],[1,14,15,16],[2,5,7,15],[2,5,8,14],[2,6,9,11],[2,6,14,16],[2,7,10,16],[2,8,9,13],[2,10,11,12],[2,12,13,15],[3,5,10,12],[3,5,12,13],[3,6,7,11],[3,6,13,14],[3,7,11,15],[3,8,9,16],[3,8,10,16],[3,9,14,15],[4,5,9,15],[4,5,10,14],[4,6,9,12],[4,6,12,16],[4,7,8,13],[4,7,13,16],[4,8,11,15],[4,10,11,14],[5,9,11,16],[5,11,13,16],[6,8,10,15],[6,10,13,15],[7,8,12,14],[7,9,12,14]];
G[2]:=Group([(1,3,4)(5,12,6)(7,10,16)(8,13,9)(11,14,15)]);
R[2]:=[];
RG[2]:=[];
# Design 2 / Resolution 1: autom. group order 3, decomposable
R[2][1]:=[[1,35,38,39],[2,36,37,40],[3,18,24,34],[4,17,26,32],[5,14,20,33],[6,15,22,27],[7,12,23,30],[8,11,25,29],[9,16,21,28],[10,13,19,31]];
RG[2][1]:=Group([(1,3,4)(5,12,6)(7,10,16)(8,13,9)(11,14,15)]);
# Design 3: 2 resolution(s), autom. group order 3, decomposable
D[3]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,13],[2,5,9,10],[2,6,9,14],[2,6,11,15],[2,7,8,14],[2,8,15,16],[2,10,11,12],[2,12,13,16],[3,5,8,16],[3,5,11,14],[3,6,9,12],[3,6,10,15],[3,7,8,12],[3,7,13,15],[3,9,13,16],[3,10,11,14],[4,5,10,16],[4,5,11,13],[4,6,12,13],[4,6,14,16],[4,7,10,12],[4,7,14,15],[4,8,9,11],[4,8,9,15],[5,9,12,15],[5,12,14,15],[6,7,11,16],[6,8,10,13],[7,9,11,16],[8,10,13,14]];
G[3]:=Group([(1,3,4)(5,11,8)(6,14,9)(7,10,15)(12,16,13)]);
R[3]:=[];
RG[3]:=[];
# Design 3 / Resolution 1: autom. group order 1
R[3][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,34],[4,17,25,32],[5,16,20,29],[6,13,24,27],[7,14,19,31],[8,15,21,28],[9,12,23,30],[10,11,22,33]];
RG[3][1]:=Group([()]);
# Design 3 / Resolution 2: autom. group order 3, decomposable
R[3][2]:=[[1,35,37,40],[2,36,38,39],[3,18,26,34],[4,17,25,32],[5,16,20,29],[6,12,24,30],[7,14,19,31],[8,15,21,28],[9,13,23,27],[10,11,22,33]];
RG[3][2]:=Group([(1,3,4)(5,11,8)(6,14,9)(7,10,15)(12,16,13)]);
# Design 4: 2 resolution(s), autom. group order 3, simple, decomposable
D[4]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,9,11],[2,5,7,12],[2,6,10,15],[2,6,13,16],[2,7,8,10],[2,8,13,14],[2,9,11,16],[2,12,14,15],[3,4,10,14],[3,5,15,16],[3,6,9,14],[3,6,11,15],[3,7,8,11],[3,7,12,13],[3,8,9,16],[3,10,12,13],[4,5,9,13],[4,5,12,16],[4,6,11,12],[4,7,14,15],[4,8,10,16],[4,8,13,15],[5,6,8,14],[5,7,9,15],[5,10,11,13],[5,10,11,14],[6,7,13,16],[6,9,10,12],[7,11,14,16],[8,9,12,15]];
G[4]:=Group([(1,10,16)(2,5,13)(3,11,6)(4,14,7)(8,12,9)]);
R[4]:=[];
RG[4]:=[];
# Design 4 / Resolution 1: autom. group order 1
R[4][1]:=[[1,36,37,40],[2,32,38,39],[3,18,25,35],[4,17,26,30],[5,16,20,29],[6,14,19,34],[7,12,22,31],[8,11,24,33],[9,15,21,28],[10,13,23,27]];
RG[4][1]:=Group([()]);
# Design 4 / Resolution 2: autom. group order 3, decomposable
R[4][2]:=[[1,36,37,40],[2,32,38,39],[3,18,25,35],[4,17,26,30],[5,16,20,29],[6,14,19,34],[7,15,22,28],[8,11,24,33],[9,12,21,31],[10,13,23,27]];
RG[4][2]:=Group([(1,10,16)(2,5,13)(3,11,6)(4,14,7)(8,12,9)]);
# Design 5: 1 resolution(s), autom. group order 3, simple, decomposable
D[5]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,11,15],[2,5,7,16],[2,6,8,9],[2,6,10,15],[2,7,10,14],[2,8,13,14],[2,9,11,12],[2,12,13,16],[3,4,12,14],[3,5,9,13],[3,6,11,16],[3,6,13,15],[3,7,8,16],[3,7,14,15],[3,8,10,12],[3,9,10,11],[4,5,9,16],[4,5,12,15],[4,6,9,14],[4,7,8,11],[4,8,10,13],[4,10,13,16],[5,6,10,12],[5,7,11,13],[5,8,14,15],[5,10,11,14],[6,7,12,13],[6,11,14,16],[7,9,12,15],[8,9,15,16]];
G[5]:=Group([(1,11,13)(2,6,10)(3,16,4)(5,14,8)(7,9,12)]);
R[5]:=[];
RG[5]:=[];
# Design 5 / Resolution 1: autom. group order 3, decomposable
R[5][1]:=[[1,36,37,40],[2,31,38,39],[3,18,26,35],[4,17,24,32],[5,16,21,28],[6,15,22,27],[7,11,23,33],[8,13,19,34],[9,12,25,29],[10,14,20,30]];
RG[5][1]:=Group([(1,13,11)(2,10,6)(3,4,16)(5,8,14)(7,12,9)]);
# Design 6: 1 resolution(s), autom. group order 3, decomposable
D[6]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,11],[2,5,12,14],[2,6,8,16],[2,6,14,15],[2,7,9,15],[2,8,10,12],[2,9,13,16],[2,10,11,13],[3,5,11,15],[3,5,12,13],[3,6,7,16],[3,6,10,14],[3,7,8,13],[3,8,9,15],[3,9,12,16],[3,10,11,14],[4,5,9,14],[4,5,13,16],[4,6,9,11],[4,6,10,13],[4,7,10,12],[4,7,12,15],[4,8,11,16],[4,8,14,15],[5,8,9,10],[5,10,15,16],[6,9,11,12],[6,12,13,15],[7,8,13,14],[7,11,14,16]];
G[6]:=Group([(1,3,4)(5,14,12)(6,10,7)(8,11,15)(9,16,13)]);
R[6]:=[];
RG[6]:=[];
# Design 6 / Resolution 1: autom. group order 3, decomposable
R[6][1]:=[[1,35,38,40],[2,36,37,39],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,13,19,31],[8,12,23,29],[9,16,21,27],[10,11,24,30]];
RG[6][1]:=Group([(1,4,3)(5,12,14)(6,7,10)(8,15,11)(9,13,16)]);
# Design 7: 1 resolution(s), autom. group order 3
D[7]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,14,16],[1,13,15,16],[2,5,8,13],[2,5,8,13],[2,6,9,12],[2,6,14,16],[2,7,9,14],[2,7,10,15],[2,10,11,16],[2,11,12,15],[3,5,10,16],[3,5,11,14],[3,6,8,16],[3,6,9,11],[3,7,9,15],[3,7,12,13],[3,8,12,15],[3,10,13,14],[4,5,11,15],[4,5,12,14],[4,6,10,11],[4,6,13,15],[4,7,8,10],[4,7,12,16],[4,8,9,16],[4,9,13,14],[5,9,10,12],[5,9,15,16],[6,8,14,15],[6,10,12,13],[7,8,11,14],[7,11,13,16]];
G[7]:=Group([(1,2,5)(3,13,7)(4,8,6)(9,14,11)(10,16,15)]);
R[7]:=[];
RG[7]:=[];
# Design 7 / Resolution 1: autom. group order 3
R[7][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,33],[5,14,24,27],[6,15,19,30],[7,16,21,28],[8,11,22,32],[9,12,23,29],[10,13,20,31]];
RG[7][1]:=Group([(1,5,2)(3,7,13)(4,6,8)(9,11,14)(10,15,16)]);
# Design 8: 1 resolution(s), autom. group order 3, simple
D[8]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,10,15],[2,5,7,12],[2,6,9,16],[2,6,10,11],[2,7,8,15],[2,8,14,16],[2,9,12,13],[2,11,13,14],[3,4,8,14],[3,5,11,13],[3,6,9,11],[3,6,10,16],[3,7,8,12],[3,7,13,16],[3,9,12,15],[3,10,14,15],[4,5,9,14],[4,5,10,13],[4,6,12,15],[4,7,11,16],[4,8,9,13],[4,11,12,16],[5,6,12,14],[5,7,11,15],[5,8,10,16],[5,9,15,16],[6,7,13,14],[6,8,13,15],[7,9,10,14],[8,10,11,12]];
G[8]:=Group([(1,4,7)(2,16,9)(3,11,10)(5,12,14)(8,15,13)]);
R[8]:=[];
RG[8]:=[];
# Design 8 / Resolution 1: autom. group order 3
R[8][1]:=[[1,36,37,40],[2,32,38,39],[3,18,25,35],[4,17,26,30],[5,16,20,29],[6,11,24,33],[7,13,19,34],[8,12,22,31],[9,15,21,28],[10,14,23,27]];
RG[8][1]:=Group([(1,4,7)(2,16,9)(3,11,10)(5,12,14)(8,15,13)]);
# Design 9: 1 resolution(s), autom. group order 3, decomposable
D[9]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,8,10],[2,5,8,12],[2,6,9,16],[2,6,14,16],[2,7,10,15],[2,7,12,14],[2,9,11,13],[2,11,13,15],[3,5,13,15],[3,5,13,16],[3,6,8,11],[3,6,11,12],[3,7,8,15],[3,7,9,16],[3,9,10,14],[3,10,12,14],[4,5,9,14],[4,5,11,14],[4,6,10,13],[4,6,10,15],[4,7,9,13],[4,7,11,12],[4,8,12,16],[4,8,15,16],[5,9,12,15],[5,10,11,16],[6,8,13,14],[6,9,12,15],[7,8,13,14],[7,10,11,16]];
G[9]:=Group([(2,3,4)(8,13,14)(9,12,15)(10,16,11)]);
R[9]:=[];
RG[9]:=[];
# Design 9 / Resolution 1: autom. group order 3, decomposable
R[9][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,33],[5,14,19,32],[6,16,20,30],[7,13,23,28],[8,12,24,29],[9,15,21,27],[10,11,22,31]];
RG[9][1]:=Group([(2,3,4)(8,13,14)(9,12,15)(10,16,11)]);
# Design 10: 1 resolution(s), autom. group order 3, simple
D[10]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,11,13],[1,10,13,14],[1,12,15,16],[1,14,15,16],[2,4,8,9],[2,5,11,15],[2,6,8,14],[2,6,13,15],[2,7,9,12],[2,7,14,16],[2,10,11,16],[2,10,12,13],[3,4,10,14],[3,5,8,16],[3,6,8,12],[3,6,13,16],[3,7,10,11],[3,7,11,13],[3,9,12,15],[3,9,14,15],[4,5,9,13],[4,5,10,15],[4,6,11,15],[4,7,12,14],[4,8,11,16],[4,12,13,16],[5,6,10,12],[5,7,9,16],[5,8,13,14],[5,11,12,14],[6,9,10,16],[6,9,11,14],[7,8,10,15],[7,8,13,15]];
G[10]:=Group([(1,7,15)(2,11,9)(4,10,14)(5,13,12)(6,8,16)]);
R[10]:=[];
RG[10]:=[];
# Design 10 / Resolution 1: autom. group order 3
R[10][1]:=[[1,36,37,40],[2,32,38,39],[3,17,25,35],[4,18,26,31],[5,12,22,30],[6,14,19,34],[7,16,21,28],[8,15,20,29],[9,13,23,27],[10,11,24,33]];
RG[10][1]:=Group([(1,15,7)(2,9,11)(4,14,10)(5,12,13)(6,16,8)]);
# Design 11: 1 resolution(s), autom. group order 3, decomposable
D[11]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,12,13],[1,14,15,16],[2,5,7,11],[2,5,9,11],[2,6,8,15],[2,6,13,15],[2,7,10,13],[2,8,10,14],[2,9,12,16],[2,12,14,16],[3,5,10,12],[3,5,12,14],[3,6,7,16],[3,6,9,16],[3,7,8,14],[3,8,9,13],[3,10,11,15],[3,11,13,15],[4,5,9,15],[4,5,14,15],[4,6,10,12],[4,6,12,13],[4,7,11,16],[4,7,13,14],[4,8,9,10],[4,8,11,16],[5,8,13,16],[5,10,13,16],[6,9,11,14],[6,10,11,14],[7,8,12,15],[7,9,12,15]];
G[11]:=Group([(1,2,3)(5,12,11)(6,16,15)(7,14,13)(8,9,10)]);
R[11]:=[];
RG[11]:=[];
# Design 11 / Resolution 1: autom. group order 3, decomposable
R[11][1]:=[[1,35,38,40],[2,36,37,39],[3,18,26,33],[4,17,25,32],[5,14,20,34],[6,15,22,28],[7,13,19,31],[8,12,23,30],[9,16,21,27],[10,11,24,29]];
RG[11][1]:=Group([(1,3,2)(5,11,12)(6,15,16)(7,13,14)(8,10,9)]);
# Design 12: 1 resolution(s), autom. group order 3, simple
D[12]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,11,14],[2,5,7,12],[2,6,10,11],[2,6,13,16],[2,7,8,15],[2,8,14,16],[2,9,10,15],[2,9,12,13],[3,4,12,15],[3,5,11,13],[3,6,9,11],[3,6,10,16],[3,7,8,12],[3,7,9,16],[3,8,13,14],[3,10,14,15],[4,5,9,14],[4,5,10,13],[4,6,12,15],[4,7,11,16],[4,8,9,13],[4,8,10,16],[5,6,8,15],[5,7,10,14],[5,9,15,16],[5,11,12,16],[6,7,13,14],[6,9,12,14],[7,11,13,15],[8,10,11,12]];
G[12]:=Group([(1,4,6)(2,12,8)(3,15,5)(9,11,14)(10,16,13)]);
R[12]:=[];
RG[12]:=[];
# Design 12 / Resolution 1: autom. group order 3
R[12][1]:=[[1,35,37,40],[2,32,38,39],[3,17,25,36],[4,18,26,30],[5,16,20,29],[6,14,19,34],[7,11,24,33],[8,12,22,31],[9,15,21,28],[10,13,23,27]];
RG[12][1]:=Group([(1,4,6)(2,12,8)(3,15,5)(9,11,14)(10,16,13)]);
# Design 13: 1 resolution(s), autom. group order 3, simple
D[13]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,11,13],[1,10,13,14],[1,12,15,16],[1,14,15,16],[2,4,9,11],[2,5,7,15],[2,6,9,14],[2,6,13,14],[2,7,8,16],[2,8,13,15],[2,10,11,12],[2,10,12,16],[3,4,10,15],[3,5,12,14],[3,6,10,16],[3,6,11,15],[3,7,8,11],[3,7,12,13],[3,8,9,14],[3,9,13,16],[4,5,9,12],[4,5,10,13],[4,6,11,16],[4,7,14,15],[4,8,12,14],[4,8,13,16],[5,6,8,10],[5,7,9,16],[5,11,13,15],[5,11,14,16],[6,7,12,13],[6,9,12,15],[7,10,11,14],[8,9,10,15]];
G[13]:=Group([(1,6,12)(3,14,10)(4,9,11)(5,13,16)(7,15,8)]);
R[13]:=[];
RG[13]:=[];
# Design 13 / Resolution 1: autom. group order 3
R[13][1]:=[[1,36,37,40],[2,32,38,39],[3,18,25,35],[4,17,26,30],[5,16,20,29],[6,14,19,34],[7,12,21,31],[8,15,22,27],[9,13,23,28],[10,11,24,33]];
RG[13][1]:=Group([(1,12,6)(3,10,14)(4,11,9)(5,16,13)(7,8,15)]);
# Design 14: 1 resolution(s), autom. group order 3, simple
D[14]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,13,15],[1,11,15,16],[1,12,14,16],[2,3,8,9],[2,4,10,15],[2,5,11,16],[2,6,8,14],[2,7,10,16],[2,7,11,13],[2,9,12,13],[2,12,14,15],[3,4,13,14],[3,5,14,15],[3,6,9,11],[3,6,10,12],[3,7,11,12],[3,8,15,16],[3,10,13,16],[4,5,9,16],[4,5,12,13],[4,6,12,16],[4,7,8,15],[4,8,11,14],[4,9,10,11],[5,6,9,15],[5,7,8,13],[5,8,10,12],[5,10,11,14],[6,7,10,14],[6,8,13,16],[6,11,13,15],[7,9,12,15],[7,9,14,16]];
G[14]:=Group([(2,3,4)(5,7,6)(8,14,15)(9,13,10)(11,12,16)]);
R[14]:=[];
RG[14]:=[];
# Design 14 / Resolution 1: autom. group order 3
R[14][1]:=[[1,34,38,40],[2,25,30,39],[3,18,31,37],[4,17,24,35],[5,16,20,28],[6,15,19,32],[7,13,22,29],[8,14,23,26],[9,11,27,36],[10,12,21,33]];
RG[14][1]:=Group([(2,3,4)(5,7,6)(8,14,15)(9,13,10)(11,12,16)]);
# Design 15: 1 resolution(s), autom. group order 3, decomposable
D[15]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,14],[2,5,11,15],[2,6,8,13],[2,6,11,16],[2,7,9,16],[2,8,10,15],[2,9,12,13],[2,10,12,14],[3,5,9,12],[3,5,12,15],[3,6,7,13],[3,6,14,15],[3,7,8,10],[3,8,9,16],[3,10,11,14],[3,11,13,16],[4,5,9,11],[4,5,10,13],[4,6,10,12],[4,6,12,16],[4,7,11,14],[4,7,15,16],[4,8,9,15],[4,8,13,14],[5,8,14,16],[5,10,13,16],[6,9,10,11],[6,9,14,15],[7,8,11,12],[7,12,13,15]];
G[15]:=Group([(1,3,4)(5,12,6)(7,9,16)(8,15,10)(11,14,13)]);
R[15]:=[];
RG[15]:=[];
# Design 15 / Resolution 1: autom. group order 3, decomposable
R[15][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,25,32],[5,14,20,34],[6,15,22,28],[7,12,23,30],[8,13,19,31],[9,11,24,29],[10,16,21,27]];
RG[15][1]:=Group([(1,4,3)(5,6,12)(7,16,9)(8,10,15)(11,13,14)]);
# Design 16: 1 resolution(s), autom. group order 3, simple
D[16]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,10,11],[2,5,7,12],[2,6,11,16],[2,6,12,13],[2,7,8,14],[2,8,13,15],[2,9,10,15],[2,9,14,16],[3,4,14,15],[3,5,11,16],[3,6,9,13],[3,6,10,11],[3,7,8,13],[3,7,9,14],[3,8,12,16],[3,10,12,15],[4,5,8,15],[4,5,9,12],[4,6,12,14],[4,7,11,13],[4,8,10,16],[4,9,13,16],[5,6,9,15],[5,7,10,16],[5,10,13,14],[5,11,13,14],[6,7,15,16],[6,8,10,14],[7,11,12,15],[8,9,11,12]];
G[16]:=Group([(1,5,11)(2,13,9)(3,14,8)(4,10,12)(6,16,15)]);
R[16]:=[];
RG[16]:=[];
# Design 16 / Resolution 1: autom. group order 3
R[16][1]:=[[1,35,37,40],[2,32,38,39],[3,17,25,36],[4,18,26,30],[5,16,20,29],[6,14,19,34],[7,13,24,27],[8,12,21,31],[9,11,23,33],[10,15,22,28]];
RG[16][1]:=Group([(1,5,11)(2,13,9)(3,14,8)(4,10,12)(6,16,15)]);
# Design 17: 1 resolution(s), autom. group order 3, decomposable
D[17]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,16],[2,6,9,11],[2,6,14,16],[2,7,11,15],[2,7,13,14],[2,10,12,13],[2,10,12,15],[3,5,11,12],[3,5,13,15],[3,6,8,10],[3,6,10,14],[3,7,8,15],[3,7,12,14],[3,9,11,16],[3,9,13,16],[4,5,10,13],[4,5,12,16],[4,6,11,13],[4,6,15,16],[4,7,9,10],[4,7,9,12],[4,8,11,14],[4,8,14,15],[5,9,14,15],[5,10,11,14],[6,8,12,13],[6,9,12,15],[7,8,13,16],[7,10,11,16]];
G[17]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[17]:=[];
RG[17]:=[];
# Design 17 / Resolution 1: autom. group order 3, decomposable
R[17][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,33],[5,16,19,30],[6,14,20,31],[7,15,21,28],[8,11,24,29],[9,12,22,32],[10,13,23,27]];
RG[17][1]:=Group([(2,4,3)(5,7,6)(8,9,10)(11,13,15)(12,14,16)]);
# Design 18: 1 resolution(s), autom. group order 3, decomposable
D[18]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,16],[2,5,9,15],[2,6,9,11],[2,6,10,11],[2,7,8,14],[2,8,12,15],[2,10,13,14],[2,12,13,16],[3,5,8,16],[3,5,10,15],[3,6,9,12],[3,6,13,16],[3,7,10,13],[3,7,11,12],[3,8,9,14],[3,11,14,15],[4,5,11,13],[4,5,11,14],[4,6,10,12],[4,6,14,16],[4,7,8,13],[4,7,12,15],[4,8,9,10],[4,9,15,16],[5,9,12,13],[5,10,12,14],[6,7,14,15],[6,8,13,15],[7,9,11,16],[8,10,11,16]];
G[18]:=Group([(1,2,4)(5,6,11)(7,10,13)(8,9,14)(12,15,16)]);
R[18]:=[];
RG[18]:=[];
# Design 18 / Resolution 1: autom. group order 3, decomposable
R[18][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,24,34],[5,16,22,28],[6,12,23,30],[7,14,19,32],[8,15,21,27],[9,11,25,29],[10,13,20,31]];
RG[18][1]:=Group([(1,2,4)(5,6,11)(7,10,13)(8,9,14)(12,15,16)]);
# Design 19: 1 resolution(s), autom. group order 3, simple, decomposable
D[19]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,11,14],[2,5,7,11],[2,6,8,15],[2,6,12,13],[2,7,9,16],[2,8,10,16],[2,9,14,15],[2,10,12,13],[3,4,12,16],[3,5,15,16],[3,6,7,14],[3,6,10,14],[3,7,8,13],[3,8,9,13],[3,9,11,15],[3,10,11,12],[4,5,9,12],[4,5,13,15],[4,6,10,15],[4,7,13,16],[4,8,9,10],[4,8,11,14],[5,6,9,12],[5,7,10,11],[5,8,14,16],[5,10,13,14],[6,9,11,16],[6,11,13,16],[7,8,12,15],[7,12,14,15]];
G[19]:=Group([(1,15,16)(2,7,6)(3,12,11)(4,8,9)(5,14,13)]);
R[19]:=[];
RG[19]:=[];
# Design 19 / Resolution 1: autom. group order 3, decomposable
R[19][1]:=[[1,36,37,39],[2,31,38,40],[3,18,25,35],[4,17,26,30],[5,14,20,32],[6,15,22,28],[7,13,19,34],[8,11,23,33],[9,16,21,27],[10,12,24,29]];
RG[19][1]:=Group([(1,16,15)(2,6,7)(3,11,12)(4,9,8)(5,13,14)]);
# Design 20: 1 resolution(s), autom. group order 3, simple, decomposable
D[20]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,9,15],[2,5,11,16],[2,6,7,12],[2,6,10,11],[2,7,8,14],[2,8,9,13],[2,10,14,15],[2,12,13,16],[3,4,11,13],[3,5,9,14],[3,6,10,11],[3,6,14,16],[3,7,12,15],[3,7,13,16],[3,8,9,10],[3,8,12,15],[4,5,7,15],[4,5,8,16],[4,6,13,14],[4,8,10,16],[4,9,11,12],[4,10,12,14],[5,6,9,12],[5,7,10,13],[5,10,12,13],[5,11,14,15],[6,8,13,15],[6,9,15,16],[7,8,11,14],[7,9,11,16]];
G[20]:=Group([(1,13,14)(2,5,7)(3,10,8)(4,12,11)(6,16,15)]);
R[20]:=[];
RG[20]:=[];
# Design 20 / Resolution 1: autom. group order 3, decomposable
R[20][1]:=[[1,35,38,39],[2,32,37,40],[3,18,25,36],[4,17,24,31],[5,12,26,29],[6,11,22,34],[7,14,23,28],[8,15,19,33],[9,13,20,30],[10,16,21,27]];
RG[20][1]:=Group([(1,13,14)(2,5,7)(3,10,8)(4,12,11)(6,16,15)]);
# Design 21: 1 resolution(s), autom. group order 3, decomposable
D[21]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,14],[2,5,8,15],[2,6,9,13],[2,6,11,13],[2,7,12,14],[2,8,9,16],[2,10,11,16],[2,10,12,15],[3,5,11,12],[3,5,12,16],[3,6,7,15],[3,6,10,15],[3,7,9,16],[3,8,10,11],[3,8,13,14],[3,9,13,14],[4,5,10,13],[4,5,13,16],[4,6,9,12],[4,6,11,14],[4,7,8,10],[4,7,11,16],[4,8,14,15],[4,9,12,15],[5,9,10,14],[5,9,11,15],[6,8,12,16],[6,10,14,16],[7,8,12,13],[7,11,13,15]];
G[21]:=Group([(1,2,4)(5,6,13)(7,9,16)(8,11,10)(12,15,14)]);
R[21]:=[];
RG[21]:=[];
# Design 21 / Resolution 1: autom. group order 3, decomposable
R[21][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,32],[5,14,20,33],[6,15,22,28],[7,12,23,30],[8,16,21,27],[9,11,24,29],[10,13,19,31]];
RG[21][1]:=Group([(1,2,4)(5,6,13)(7,9,16)(8,11,10)(12,15,14)]);
# Design 22: 1 resolution(s), autom. group order 3, decomposable
D[22]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,8,14],[2,5,8,16],[2,6,9,10],[2,6,11,12],[2,7,10,13],[2,7,12,14],[2,9,15,16],[2,11,13,15],[3,5,10,15],[3,5,13,15],[3,6,8,16],[3,6,11,14],[3,7,8,13],[3,7,9,11],[3,9,12,16],[3,10,12,14],[4,5,9,12],[4,5,11,12],[4,6,10,15],[4,6,13,16],[4,7,9,15],[4,7,14,16],[4,8,10,14],[4,8,11,13],[5,9,13,14],[5,10,11,16],[6,8,12,15],[6,9,13,14],[7,8,12,15],[7,10,11,16]];
G[22]:=Group([(2,3,4)(8,15,12)(9,14,13)(10,11,16)]);
R[22]:=[];
RG[22]:=[];
# Design 22 / Resolution 1: autom. group order 3, decomposable
R[22][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,33],[5,14,20,32],[6,16,19,30],[7,12,22,31],[8,15,21,27],[9,11,24,29],[10,13,23,28]];
RG[22][1]:=Group([(2,3,4)(8,15,12)(9,14,13)(10,11,16)]);
# Design 23: 1 resolution(s), autom. group order 3, simple
D[23]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,14,16],[1,13,15,16],[2,4,14,15],[2,5,7,11],[2,6,8,15],[2,6,9,10],[2,7,13,14],[2,8,12,13],[2,9,11,16],[2,10,12,16],[3,4,11,12],[3,5,15,16],[3,6,9,15],[3,6,12,13],[3,7,8,16],[3,7,10,11],[3,8,9,14],[3,10,13,14],[4,5,9,13],[4,5,10,16],[4,6,11,14],[4,7,12,15],[4,8,9,16],[4,8,10,13],[5,6,10,12],[5,7,8,14],[5,9,12,14],[5,11,13,15],[6,7,13,16],[6,11,14,16],[7,9,12,15],[8,10,11,15]];
G[23]:=Group([(1,6,7)(2,14,15)(3,11,12)(5,16,9)(8,13,10)]);
R[23]:=[];
RG[23]:=[];
# Design 23 / Resolution 1: autom. group order 3
R[23][1]:=[[1,35,37,40],[2,32,38,39],[3,18,25,36],[4,17,26,30],[5,16,20,29],[6,15,21,28],[7,11,23,33],[8,12,22,31],[9,13,24,27],[10,14,19,34]];
RG[23][1]:=Group([(1,7,6)(2,15,14)(3,12,11)(5,9,16)(8,10,13)]);
# Design 24: 1 resolution(s), autom. group order 3, simple
D[24]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,11,13],[1,10,13,14],[1,12,15,16],[1,14,15,16],[2,4,8,9],[2,5,13,15],[2,6,8,14],[2,6,10,15],[2,7,9,16],[2,7,12,14],[2,10,11,16],[2,11,12,13],[3,4,13,16],[3,5,8,12],[3,6,8,16],[3,6,11,14],[3,7,10,11],[3,7,10,13],[3,9,12,15],[3,9,14,15],[4,5,9,11],[4,5,10,15],[4,6,11,15],[4,7,12,16],[4,8,13,14],[4,10,12,14],[5,6,12,13],[5,7,9,14],[5,8,10,16],[5,11,14,16],[6,9,10,12],[6,9,13,16],[7,8,11,15],[7,8,13,15]];
G[24]:=Group([(1,7,15)(2,10,9)(4,11,12)(5,13,14)(6,8,16)]);
R[24]:=[];
RG[24]:=[];
# Design 24 / Resolution 1: autom. group order 3
R[24][1]:=[[1,36,37,40],[2,32,38,39],[3,18,26,35],[4,17,25,31],[5,12,22,30],[6,14,19,34],[7,16,21,28],[8,15,20,29],[9,13,24,27],[10,11,23,33]];
RG[24][1]:=Group([(1,15,7)(2,9,10)(4,12,11)(5,14,13)(6,16,8)]);
# Design 25: 1 resolution(s), autom. group order 3, simple
D[25]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,12,16],[2,5,7,13],[2,6,11,14],[2,6,11,16],[2,7,8,14],[2,8,9,13],[2,9,10,15],[2,10,12,15],[3,4,8,15],[3,5,10,11],[3,6,7,12],[3,6,9,15],[3,7,10,14],[3,8,12,13],[3,9,14,16],[3,11,13,16],[4,5,10,16],[4,5,14,15],[4,6,9,12],[4,7,11,13],[4,8,10,11],[4,9,13,14],[5,6,13,15],[5,7,9,16],[5,8,12,14],[5,9,11,12],[6,8,10,16],[6,10,13,14],[7,8,15,16],[7,11,12,15]];
G[25]:=Group([(1,6,10)(3,11,15)(4,16,12)(5,14,9)(7,8,13)]);
R[25]:=[];
RG[25]:=[];
# Design 25 / Resolution 1: autom. group order 3
R[25][1]:=[[1,36,38,39],[2,32,37,40],[3,17,26,35],[4,18,25,30],[5,14,24,28],[6,11,23,33],[7,13,19,34],[8,16,21,27],[9,12,22,31],[10,15,20,29]];
RG[25][1]:=Group([(1,10,6)(3,15,11)(4,12,16)(5,9,14)(7,13,8)]);
# Design 26: 1 resolution(s), autom. group order 3, simple
D[26]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,8,9],[1,6,10,11],[1,7,8,12],[1,9,10,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,3,12,14],[2,4,6,16],[2,5,11,15],[2,7,8,10],[2,7,11,13],[2,8,9,14],[2,9,12,13],[2,10,15,16],[3,4,11,13],[3,5,9,16],[3,6,7,10],[3,6,9,15],[3,8,11,14],[3,8,13,15],[3,10,12,16],[4,5,8,10],[4,5,11,12],[4,6,12,13],[4,7,9,15],[4,7,14,16],[4,10,14,15],[5,6,9,14],[5,7,12,15],[5,8,13,16],[5,10,13,14],[6,7,13,14],[6,8,11,16],[6,8,12,15],[7,9,11,16],[9,10,11,12]];
G[26]:=Group([(1,4,9)(2,7,10)(3,15,13)(5,14,12)(6,16,11)]);
R[26]:=[];
RG[26]:=[];
# Design 26 / Resolution 1: autom. group order 3
R[26][1]:=[[1,35,38,39],[2,24,30,40],[3,17,31,37],[4,13,25,36],[5,11,29,34],[6,18,19,32],[7,12,23,33],[8,14,20,28],[9,15,22,26],[10,16,21,27]];
RG[26][1]:=Group([(1,9,4)(2,10,7)(3,13,15)(5,12,14)(6,11,16)]);
# Design 27: 1 resolution(s), autom. group order 3, decomposable
D[27]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,11],[2,6,9,12],[2,6,13,15],[2,7,12,16],[2,7,14,15],[2,10,11,14],[2,10,13,16],[3,5,12,13],[3,5,14,16],[3,6,8,10],[3,6,10,15],[3,7,8,16],[3,7,11,13],[3,9,11,14],[3,9,12,15],[4,5,10,14],[4,5,11,15],[4,6,11,16],[4,6,12,14],[4,7,9,10],[4,7,9,13],[4,8,12,15],[4,8,13,16],[5,9,15,16],[5,10,12,13],[6,8,13,14],[6,9,11,16],[7,8,14,15],[7,10,11,12]];
G[27]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[27]:=[];
RG[27]:=[];
# Design 27 / Resolution 1: autom. group order 3, decomposable
R[27][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,33],[5,16,19,29],[6,14,20,31],[7,15,21,28],[8,11,24,30],[9,13,23,27],[10,12,22,32]];
RG[27][1]:=Group([(2,4,3)(5,7,6)(8,9,10)(11,13,15)(12,14,16)]);
# Design 28: 1 resolution(s), autom. group order 3, decomposable
D[28]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,16],[2,6,9,11],[2,6,13,15],[2,7,12,16],[2,7,13,14],[2,10,11,14],[2,10,12,15],[3,5,11,12],[3,5,14,16],[3,6,8,10],[3,6,10,14],[3,7,8,15],[3,7,11,13],[3,9,12,15],[3,9,13,16],[4,5,10,13],[4,5,11,15],[4,6,12,14],[4,6,15,16],[4,7,9,10],[4,7,9,12],[4,8,11,14],[4,8,13,16],[5,9,14,15],[5,10,12,13],[6,8,12,13],[6,9,11,16],[7,8,14,15],[7,10,11,16]];
G[28]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[28]:=[];
RG[28]:=[];
# Design 28 / Resolution 1: autom. group order 3, decomposable
R[28][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,33],[5,16,19,30],[6,14,20,31],[7,15,21,28],[8,11,24,29],[9,12,22,32],[10,13,23,27]];
RG[28][1]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
# Design 29: 1 resolution(s), autom. group order 3, simple
D[29]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,11,15],[1,12,15,16],[1,13,14,16],[2,4,9,16],[2,5,7,11],[2,6,9,11],[2,6,13,16],[2,7,10,12],[2,8,12,14],[2,8,14,15],[2,10,13,15],[3,4,10,14],[3,5,15,16],[3,6,8,16],[3,6,10,12],[3,7,8,9],[3,7,13,15],[3,9,11,14],[3,11,12,13],[4,5,11,15],[4,5,12,14],[4,6,11,13],[4,7,12,16],[4,8,9,15],[4,8,10,13],[5,6,10,14],[5,7,8,13],[5,9,10,16],[5,9,12,13],[6,7,14,15],[6,9,12,15],[7,11,14,16],[8,10,11,16]];
G[29]:=Group([(1,2,14)(3,8,13)(4,12,16)(5,15,9)(6,10,11)]);
R[29]:=[];
RG[29]:=[];
# Design 29 / Resolution 1: autom. group order 3
R[29][1]:=[[1,36,37,40],[2,32,38,39],[3,17,26,35],[4,18,25,30],[5,16,20,29],[6,11,24,33],[7,15,21,27],[8,14,23,28],[9,13,19,34],[10,12,22,31]];
RG[29][1]:=Group([(1,2,14)(3,8,13)(4,12,16)(5,15,9)(6,10,11)]);
# Design 30: 1 resolution(s), autom. group order 3, decomposable
D[30]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,8,10],[2,5,12,14],[2,6,8,11],[2,6,9,16],[2,7,9,16],[2,7,13,15],[2,10,13,15],[2,11,12,14],[3,5,8,13],[3,5,11,15],[3,6,10,14],[3,6,15,16],[3,7,9,12],[3,7,10,14],[3,8,13,16],[3,9,11,12],[4,5,9,15],[4,5,12,16],[4,6,10,12],[4,6,11,13],[4,7,8,14],[4,7,11,13],[4,8,14,16],[4,9,10,15],[5,9,13,14],[5,10,11,16],[6,8,12,15],[6,9,13,14],[7,8,12,15],[7,10,11,16]];
G[30]:=Group([(2,3,4)(8,15,12)(9,14,13)(10,11,16)]);
R[30]:=[];
RG[30]:=[];
# Design 30 / Resolution 1: autom. group order 3, decomposable
R[30][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,34],[5,12,22,32],[6,16,21,28],[7,14,20,31],[8,15,19,29],[9,13,24,27],[10,11,23,30]];
RG[30][1]:=Group([(2,4,3)(8,12,15)(9,13,14)(10,16,11)]);
# Design 31: 1 resolution(s), autom. group order 3, simple
D[31]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,8,9],[1,6,10,11],[1,7,12,13],[1,8,10,14],[1,9,11,15],[1,12,14,16],[1,13,15,16],[2,4,8,15],[2,5,6,12],[2,6,7,16],[2,7,9,14],[2,8,11,13],[2,9,10,12],[2,10,13,16],[2,11,14,15],[3,4,9,10],[3,5,15,16],[3,6,8,11],[3,6,9,13],[3,7,11,12],[3,7,13,15],[3,8,12,14],[3,10,14,16],[4,5,7,14],[4,5,10,13],[4,6,14,15],[4,8,12,13],[4,9,11,16],[4,11,12,16],[5,6,8,16],[5,7,10,11],[5,9,12,15],[5,11,13,14],[6,9,13,14],[6,10,12,15],[7,8,9,16],[7,8,10,15]];
G[31]:=Group([(1,6,11)(2,13,16)(3,9,4)(5,14,12)(7,8,15)]);
R[31]:=[];
RG[31]:=[];
# Design 31 / Resolution 1: autom. group order 3
R[31][1]:=[[1,36,38,39],[2,32,37,40],[3,15,26,35],[4,17,23,29],[5,14,20,30],[6,18,19,33],[7,12,24,31],[8,13,25,28],[9,11,22,34],[10,16,21,27]];
RG[31][1]:=Group([(1,11,6)(2,16,13)(3,4,9)(5,12,14)(7,15,8)]);
# Design 32: 1 resolution(s), autom. group order 3, simple
D[32]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,3,11,12],[2,4,9,15],[2,5,14,16],[2,6,10,11],[2,7,10,16],[2,7,13,15],[2,8,9,14],[2,8,12,13],[3,4,14,15],[3,5,12,15],[3,6,7,14],[3,6,10,13],[3,8,9,10],[3,8,13,16],[3,9,11,16],[4,5,9,11],[4,5,13,16],[4,6,7,12],[4,7,8,16],[4,10,11,14],[4,10,12,13],[5,6,9,13],[5,7,8,11],[5,8,10,15],[5,10,12,14],[6,8,14,15],[6,9,12,16],[6,11,15,16],[7,9,12,15],[7,11,13,14]];
G[32]:=Group([(1,3,13)(2,8,11)(4,16,15)(5,10,14)(6,9,7)]);
R[32]:=[];
RG[32]:=[];
# Design 32 / Resolution 1: autom. group order 3
R[32][1]:=[[1,34,37,40],[2,24,30,39],[3,17,31,38],[4,16,25,35],[5,11,27,36],[6,15,19,32],[7,14,20,29],[8,18,21,26],[9,13,23,28],[10,12,22,33]];
RG[32][1]:=Group([(1,3,13)(2,8,11)(4,16,15)(5,10,14)(6,9,7)]);
# Design 33: 1 resolution(s), autom. group order 3, decomposable
D[33]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,15,16],[1,12,13,14],[2,5,7,13],[2,5,9,15],[2,6,9,15],[2,6,11,14],[2,7,8,10],[2,8,14,16],[2,10,11,12],[2,12,13,16],[3,5,8,13],[3,5,10,16],[3,6,11,13],[3,6,12,15],[3,7,14,15],[3,7,14,16],[3,8,9,12],[3,9,10,11],[4,5,11,16],[4,5,12,15],[4,6,10,13],[4,6,10,14],[4,7,8,11],[4,7,9,12],[4,8,14,15],[4,9,13,16],[5,9,11,14],[5,10,12,14],[6,7,12,16],[6,8,9,16],[7,11,13,15],[8,10,13,15]];
G[33]:=Group([(2,3,4)(5,16,13)(6,15,14)(7,10,9)(8,11,12)]);
R[33]:=[];
RG[33]:=[];
# Design 33 / Resolution 1: autom. group order 3, decomposable
R[33][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,23,34],[5,16,21,28],[6,12,24,29],[7,15,22,27],[8,14,19,32],[9,11,25,30],[10,13,20,31]];
RG[33][1]:=Group([(2,4,3)(5,13,16)(6,14,15)(7,9,10)(8,12,11)]);
# Design 34: 1 resolution(s), autom. group order 3, decomposable
D[34]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,13],[2,5,8,14],[2,6,9,16],[2,6,11,16],[2,7,10,11],[2,8,9,12],[2,10,14,15],[2,12,13,15],[3,5,10,13],[3,5,12,15],[3,6,7,14],[3,6,8,15],[3,7,9,12],[3,8,10,11],[3,9,13,16],[3,11,14,16],[4,5,10,16],[4,5,12,16],[4,6,9,15],[4,6,11,13],[4,7,11,12],[4,7,14,15],[4,8,9,10],[4,8,13,14],[5,9,11,14],[5,9,11,15],[6,10,12,13],[6,10,12,14],[7,8,13,16],[7,8,15,16]];
G[34]:=Group([(1,2,4)(5,6,16)(7,9,12)(8,11,10)(13,15,14)]);
R[34]:=[];
RG[34]:=[];
# Design 34 / Resolution 1: autom. group order 3, decomposable
R[34][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,25,31],[5,14,20,34],[6,13,19,32],[7,15,22,28],[8,12,23,30],[9,16,21,27],[10,11,24,29]];
RG[34][1]:=Group([(1,4,2)(5,16,6)(7,12,9)(8,10,11)(13,14,15)]);
# Design 35: 1 resolution(s), autom. group order 3
D[35]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,10],[1,11,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,5,7,11],[2,5,9,12],[2,6,8,13],[2,6,10,16],[2,7,11,15],[2,8,14,16],[2,9,12,15],[2,10,13,14],[3,5,10,12],[3,5,13,15],[3,6,7,14],[3,6,12,16],[3,7,8,15],[3,8,9,13],[3,9,11,16],[3,10,11,14],[4,5,9,14],[4,5,13,14],[4,6,10,15],[4,6,11,12],[4,7,9,16],[4,7,13,16],[4,8,10,11],[4,8,12,15],[5,8,11,16],[5,10,15,16],[6,9,11,13],[6,9,14,15],[7,8,12,14],[7,10,12,13]];
G[35]:=Group([(1,2,4)(5,9,7)(6,12,16)(8,15,13)(10,11,14)]);
R[35]:=[];
RG[35]:=[];
# Design 35 / Resolution 1: autom. group order 3
R[35][1]:=[[1,35,38,40],[2,36,37,39],[3,18,25,34],[4,17,26,32],[5,16,20,30],[6,15,22,28],[7,14,23,27],[8,13,19,31],[9,11,24,29],[10,12,21,33]];
RG[35][1]:=Group([(1,2,4)(5,9,7)(6,12,16)(8,15,13)(10,11,14)]);
# Design 36: 1 resolution(s), autom. group order 3
D[36]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,13,15],[1,11,14,16],[1,12,15,16],[2,5,7,13],[2,5,8,14],[2,6,9,15],[2,6,11,15],[2,7,9,12],[2,8,10,11],[2,10,14,16],[2,12,13,16],[3,5,10,16],[3,5,12,14],[3,6,7,16],[3,6,8,13],[3,7,11,12],[3,8,9,10],[3,9,14,15],[3,11,13,15],[4,5,10,15],[4,5,12,15],[4,6,9,16],[4,6,11,14],[4,7,10,11],[4,7,13,14],[4,8,9,12],[4,8,13,16],[5,9,11,13],[5,9,11,16],[6,10,12,13],[6,10,12,14],[7,8,14,15],[7,8,15,16]];
G[36]:=Group([(1,2,4)(5,6,15)(7,11,12)(8,9,10)(13,14,16)]);
R[36]:=[];
RG[36]:=[];
# Design 36 / Resolution 1: autom. group order 3
R[36][1]:=[[1,35,38,40],[2,36,37,39],[3,17,26,33],[4,18,25,31],[5,14,20,34],[6,13,19,32],[7,16,21,28],[8,12,23,29],[9,15,22,27],[10,11,24,30]];
RG[36][1]:=Group([(1,2,4)(5,6,15)(7,11,12)(8,9,10)(13,14,16)]);
# Design 37: 1 resolution(s), autom. group order 3, simple
D[37]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,8,9],[1,6,10,11],[1,7,10,12],[1,8,13,14],[1,9,11,15],[1,12,13,16],[1,14,15,16],[2,3,8,11],[2,4,7,15],[2,5,9,10],[2,6,13,16],[2,7,8,12],[2,9,11,16],[2,10,13,14],[2,12,14,15],[3,4,6,14],[3,5,14,16],[3,6,8,12],[3,7,9,13],[3,9,10,16],[3,10,12,15],[3,11,13,15],[4,5,8,16],[4,5,10,15],[4,6,10,13],[4,7,11,13],[4,9,12,14],[4,11,12,16],[5,6,11,12],[5,7,11,14],[5,8,13,15],[5,9,12,13],[6,7,9,14],[6,7,15,16],[6,8,9,15],[7,8,10,16],[8,10,11,14]];
G[37]:=Group([(1,6,14)(2,7,8)(3,15,10)(4,16,11)(5,9,13)]);
R[37]:=[];
RG[37]:=[];
# Design 37 / Resolution 1: autom. group order 3
R[37][1]:=[[1,35,37,40],[2,25,30,39],[3,17,31,38],[4,14,24,33],[5,18,22,26],[6,16,19,34],[7,12,23,32],[8,15,20,28],[9,11,27,36],[10,13,21,29]];
RG[37][1]:=Group([(1,6,14)(2,7,8)(3,15,10)(4,16,11)(5,9,13)]);
# Design 38: 1 resolution(s), autom. group order 3, simple
D[38]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,8,9],[1,6,10,11],[1,7,12,13],[1,8,14,15],[1,9,14,16],[1,10,12,15],[1,11,13,16],[2,4,8,10],[2,5,6,15],[2,6,9,13],[2,7,8,12],[2,7,9,11],[2,10,11,14],[2,12,14,16],[2,13,15,16],[3,4,11,12],[3,5,13,14],[3,6,7,16],[3,6,10,15],[3,7,14,15],[3,8,9,12],[3,8,11,16],[3,9,10,13],[4,5,7,14],[4,5,11,13],[4,6,8,16],[4,9,10,14],[4,9,15,16],[4,12,13,15],[5,6,9,12],[5,7,10,16],[5,8,11,15],[5,10,12,16],[6,8,13,14],[6,11,12,14],[7,8,10,13],[7,9,11,15]];
G[38]:=Group([(1,11,16)(2,7,5)(3,9,10)(4,15,12)(6,8,14)]);
R[38]:=[];
RG[38]:=[];
# Design 38 / Resolution 1: autom. group order 3
R[38][1]:=[[1,36,37,40],[2,31,38,39],[3,17,26,35],[4,16,21,32],[5,18,24,27],[6,12,25,30],[7,13,19,34],[8,14,22,28],[9,15,20,29],[10,11,23,33]];
RG[38][1]:=Group([(1,16,11)(2,5,7)(3,10,9)(4,12,15)(6,14,8)]);
# Design 39: 1 resolution(s), autom. group order 3, simple
D[39]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,6,7],[1,8,9,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,14,16],[1,13,15,16],[2,3,8,9],[2,4,8,14],[2,5,14,15],[2,6,9,15],[2,7,11,16],[2,7,12,13],[2,10,11,13],[2,10,12,16],[3,4,10,12],[3,5,8,13],[3,6,10,11],[3,6,15,16],[3,7,13,14],[3,9,14,16],[3,11,12,15],[4,5,10,16],[4,5,11,14],[4,6,9,12],[4,7,11,15],[4,8,13,16],[4,9,13,15],[5,6,10,13],[5,7,9,12],[5,8,12,15],[5,9,11,16],[6,7,8,16],[6,8,11,14],[6,12,13,14],[7,8,10,15],[7,9,10,14]];
G[39]:=Group([(1,2,10)(3,13,14)(4,11,15)(5,12,9)(6,16,8)]);
R[39]:=[];
RG[39]:=[];
# Design 39 / Resolution 1: autom. group order 3
R[39][1]:=[[1,35,38,39],[2,25,30,40],[3,18,31,37],[4,17,24,34],[5,16,22,27],[6,14,23,26],[7,13,19,36],[8,15,20,28],[9,11,29,32],[10,12,21,33]];
RG[39][1]:=Group([(1,10,2)(3,14,13)(4,15,11)(5,9,12)(6,8,16)]);
# Design 40: 1 resolution(s), autom. group order 3
D[40]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,14,16],[1,13,15,16],[2,5,7,15],[2,5,9,14],[2,6,9,12],[2,6,10,12],[2,7,8,11],[2,8,13,14],[2,10,13,16],[2,11,15,16],[3,5,8,10],[3,5,14,15],[3,6,9,16],[3,6,11,15],[3,7,10,16],[3,7,12,13],[3,8,9,13],[3,11,12,14],[4,5,12,13],[4,5,12,16],[4,6,10,11],[4,6,13,15],[4,7,8,16],[4,7,11,14],[4,8,9,15],[4,9,10,14],[5,9,11,16],[5,10,11,13],[6,7,13,14],[6,8,14,16],[7,9,12,15],[8,10,12,15]];
G[40]:=Group([(1,2,4)(5,6,12)(7,10,16)(8,9,13)(11,14,15)]);
R[40]:=[];
RG[40]:=[];
# Design 40 / Resolution 1: autom. group order 3
R[40][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,24,34],[5,16,22,28],[6,12,23,30],[7,14,20,31],[8,15,21,27],[9,11,25,29],[10,13,19,32]];
RG[40][1]:=Group([(1,4,2)(5,12,6)(7,16,10)(8,13,9)(11,15,14)]);
# Design 41: 2 resolution(s), autom. group order 3, simple
D[41]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,9,11],[2,5,12,15],[2,6,7,12],[2,6,13,16],[2,7,8,9],[2,8,15,16],[2,10,11,14],[2,10,13,14],[3,4,12,13],[3,5,9,10],[3,6,10,15],[3,6,12,14],[3,7,11,15],[3,7,11,16],[3,8,9,14],[3,8,13,16],[4,5,10,16],[4,5,11,13],[4,6,8,10],[4,7,14,15],[4,8,14,15],[4,9,12,16],[5,6,11,14],[5,7,8,13],[5,7,14,16],[5,9,12,15],[6,9,11,16],[6,9,13,15],[7,10,12,13],[8,10,11,12]];
G[41]:=Group([(1,4,8)(2,15,11)(3,14,12)(5,7,10)(9,16,13)]);
R[41]:=[];
RG[41]:=[];
# Design 41 / Resolution 1: autom. group order 3
R[41][1]:=[[1,35,38,40],[2,31,37,39],[3,17,26,36],[4,18,23,32],[5,16,19,33],[6,14,20,30],[7,12,24,29],[8,15,22,28],[9,13,25,27],[10,11,21,34]];
RG[41][1]:=Group([(1,8,4)(2,11,15)(3,12,14)(5,10,7)(9,13,16)]);
# Design 41 / Resolution 2: autom. group order 1
R[41][2]:=[[1,35,38,40],[2,31,37,39],[3,17,26,36],[4,18,23,32],[5,16,19,33],[6,14,20,30],[7,12,24,29],[8,11,22,34],[9,13,25,27],[10,15,21,28]];
RG[41][2]:=Group([()]);
# Design 42: 1 resolution(s), autom. group order 3
D[42]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,11,13],[1,10,12,13],[1,14,15,16],[1,14,15,16],[2,5,8,9],[2,5,8,13],[2,6,9,14],[2,6,12,15],[2,7,10,15],[2,7,12,14],[2,10,11,16],[2,11,13,16],[3,5,11,15],[3,5,13,14],[3,6,8,16],[3,6,10,11],[3,7,9,10],[3,7,13,16],[3,8,12,14],[3,9,12,15],[4,5,10,15],[4,5,11,14],[4,6,9,16],[4,6,11,12],[4,7,8,16],[4,7,12,13],[4,8,10,14],[4,9,13,15],[5,9,12,16],[5,10,12,16],[6,8,13,15],[6,10,13,14],[7,8,11,15],[7,9,11,14]];
G[42]:=Group([(2,5,16)(3,6,15)(4,7,14)(8,12,11)(9,10,13)]);
R[42]:=[];
RG[42]:=[];
# Design 42 / Resolution 1: autom. group order 3
R[42][1]:=[[1,35,38,39],[2,36,37,40],[3,17,25,34],[4,18,26,33],[5,14,24,28],[6,15,20,29],[7,16,21,27],[8,13,19,31],[9,11,22,32],[10,12,23,30]];
RG[42][1]:=Group([(2,5,16)(3,6,15)(4,7,14)(8,12,11)(9,10,13)]);
# Design 43: 1 resolution(s), autom. group order 3
D[43]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,8,9],[1,6,10,11],[1,7,12,13],[1,8,14,15],[1,9,14,16],[1,10,12,16],[1,11,13,15],[2,5,6,16],[2,5,7,15],[2,6,8,10],[2,7,8,13],[2,9,11,14],[2,9,12,15],[2,10,12,14],[2,11,13,16],[3,5,9,12],[3,5,11,14],[3,6,8,16],[3,6,12,13],[3,7,8,14],[3,7,10,15],[3,9,10,13],[3,11,15,16],[4,5,10,15],[4,5,13,16],[4,6,9,15],[4,6,12,14],[4,7,11,12],[4,7,14,16],[4,8,9,13],[4,8,10,11],[5,8,11,12],[5,10,13,14],[6,7,9,11],[6,13,14,15],[7,9,10,16],[8,12,15,16]];
G[43]:=Group([(1,3,4)(5,6,16)(7,8,13)(9,12,14)(10,11,15)]);
R[43]:=[];
RG[43]:=[];
# Design 43 / Resolution 1: autom. group order 3
R[43][1]:=[[1,35,38,39],[2,36,37,40],[3,17,26,33],[4,18,24,30],[5,16,23,28],[6,15,21,27],[7,11,25,31],[8,12,22,34],[9,14,20,29],[10,13,19,32]];
RG[43][1]:=Group([(1,4,3)(5,16,6)(7,13,8)(9,14,12)(10,15,11)]);
# Design 44: 1 resolution(s), autom. group order 3, decomposable
D[44]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,10,13],[1,11,13,14],[1,12,15,16],[1,14,15,16],[2,5,7,11],[2,5,12,15],[2,6,8,9],[2,6,13,15],[2,7,13,14],[2,8,10,12],[2,9,14,16],[2,10,11,16],[3,5,11,13],[3,5,12,14],[3,6,7,16],[3,6,10,15],[3,7,8,16],[3,8,9,13],[3,9,12,14],[3,10,11,15],[4,5,9,15],[4,5,9,16],[4,6,10,14],[4,6,11,14],[4,7,10,12],[4,7,12,13],[4,8,11,16],[4,8,13,15],[5,8,10,14],[5,10,13,16],[6,9,11,12],[6,12,13,16],[7,8,14,15],[7,9,11,15]];
G[44]:=Group([(1,3,4)(5,15,12)(6,10,7)(8,11,13)(9,16,14)]);
R[44]:=[];
RG[44]:=[];
# Design 44 / Resolution 1: autom. group order 3, decomposable
R[44][1]:=[[1,35,38,40],[2,36,37,39],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,12,23,30],[8,16,21,27],[9,11,24,29],[10,13,19,31]];
RG[44][1]:=Group([(1,4,3)(5,12,15)(6,7,10)(8,13,11)(9,14,16)]);
# Design 45: 2 resolution(s), autom. group order 3, simple
D[45]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,8,9],[1,6,10,11],[1,7,10,12],[1,8,13,14],[1,9,12,15],[1,11,13,16],[1,14,15,16],[2,3,8,16],[2,4,11,13],[2,5,8,15],[2,6,9,12],[2,7,10,13],[2,7,14,15],[2,9,11,14],[2,10,12,16],[3,4,6,15],[3,5,10,14],[3,6,9,10],[3,7,8,11],[3,9,13,16],[3,11,12,15],[3,12,13,14],[4,5,8,12],[4,5,10,13],[4,6,11,14],[4,7,9,16],[4,7,12,14],[4,10,15,16],[5,6,14,16],[5,7,9,11],[5,9,13,15],[5,11,12,16],[6,7,8,16],[6,7,13,15],[6,8,12,13],[8,9,10,14],[8,10,11,15]];
G[45]:=Group([(1,10,11)(2,3,14)(4,5,9)(7,8,13)(12,15,16)]);
R[45]:=[];
RG[45]:=[];
# Design 45 / Resolution 1: autom. group order 3
R[45][1]:=[[1,35,37,39],[2,25,29,40],[3,17,31,38],[4,15,24,32],[5,13,23,30],[6,11,28,34],[7,18,19,33],[8,12,20,36],[9,16,21,26],[10,14,22,27]];
RG[45][1]:=Group([(1,10,11)(2,3,14)(4,5,9)(7,8,13)(12,15,16)]);
# Design 45 / Resolution 2: autom. group order 1
R[45][2]:=[[1,35,37,39],[2,23,30,40],[3,17,31,38],[4,15,24,32],[5,13,25,29],[6,11,28,34],[7,18,19,33],[8,12,20,36],[9,16,21,26],[10,14,22,27]];
RG[45][2]:=Group([()]);
# Design 46: 1 resolution(s), autom. group order 3, simple
D[46]:=[[1,2,3,4],[1,2,5,6],[1,3,5,7],[1,4,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,3,8,9],[2,4,10,11],[2,5,8,13],[2,6,9,12],[2,7,10,14],[2,7,15,16],[2,11,12,16],[2,13,14,15],[3,4,12,13],[3,5,12,15],[3,6,10,15],[3,6,13,16],[3,7,8,14],[3,9,11,16],[3,10,11,14],[4,5,9,15],[4,5,10,16],[4,6,12,14],[4,7,9,11],[4,8,13,16],[4,8,14,15],[5,6,11,14],[5,7,11,13],[5,8,10,12],[5,9,14,16],[6,7,8,16],[6,8,11,15],[6,9,10,13],[7,9,12,15],[7,10,12,13]];
G[46]:=Group([(2,5,6)(3,7,4)(8,11,12)(9,13,14)(10,15,16)]);
R[46]:=[];
RG[46]:=[];
# Design 46 / Resolution 1: autom. group order 3
R[46][1]:=[[1,35,37,40],[2,25,30,39],[3,17,31,38],[4,18,24,34],[5,16,19,32],[6,15,22,26],[7,12,20,36],[8,11,28,33],[9,14,23,27],[10,13,21,29]];
RG[46][1]:=Group([(2,5,6)(3,7,4)(8,11,12)(9,13,14)(10,15,16)]);
# Design 47: 2 resolution(s), autom. group order 3, simple, decomposable
D[47]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,9,16],[2,5,7,13],[2,6,9,14],[2,6,11,15],[2,7,8,14],[2,8,15,16],[2,10,11,12],[2,10,12,13],[3,4,8,10],[3,5,11,14],[3,6,9,12],[3,6,10,15],[3,7,8,12],[3,7,13,15],[3,9,13,16],[3,11,14,16],[4,5,10,16],[4,5,11,13],[4,6,12,13],[4,7,14,15],[4,8,9,11],[4,12,14,15],[5,6,10,14],[5,7,12,16],[5,8,9,15],[5,9,12,15],[6,7,11,16],[6,8,13,16],[7,9,10,11],[8,10,13,14]];
G[47]:=Group([(1,4,7)(2,14,9)(3,15,10)(5,12,11)(8,13,16)]);
R[47]:=[];
RG[47]:=[];
# Design 47 / Resolution 1: autom. group order 1
R[47][1]:=[[1,36,37,40],[2,32,38,39],[3,18,26,35],[4,17,25,30],[5,16,20,29],[6,11,24,33],[7,14,19,34],[8,13,23,28],[9,15,21,27],[10,12,22,31]];
RG[47][1]:=Group([()]);
# Design 47 / Resolution 2: autom. group order 3, decomposable
R[47][2]:=[[1,36,37,40],[2,32,38,39],[3,18,26,35],[4,17,25,30],[5,16,20,29],[6,11,24,33],[7,14,19,34],[8,15,21,28],[9,13,23,27],[10,12,22,31]];
RG[47][2]:=Group([(1,7,4)(2,9,14)(3,10,15)(5,11,12)(8,16,13)]);
# Design 48: 1 resolution(s), autom. group order 3, simple, decomposable
D[48]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,8,16],[2,5,7,14],[2,6,9,15],[2,6,11,13],[2,7,9,10],[2,8,11,16],[2,10,12,13],[2,12,14,15],[3,4,13,15],[3,5,10,11],[3,6,10,12],[3,6,13,14],[3,7,8,14],[3,7,15,16],[3,8,9,12],[3,9,11,16],[4,5,9,12],[4,5,12,15],[4,6,10,16],[4,7,8,13],[4,9,11,14],[4,10,11,14],[5,6,14,16],[5,7,11,15],[5,8,10,13],[5,9,13,16],[6,7,11,12],[6,8,9,15],[7,12,13,16],[8,10,14,15]];
G[48]:=Group([(1,11,15)(2,4,9)(3,14,6)(5,10,8)(7,16,12)]);
R[48]:=[];
RG[48]:=[];
# Design 48 / Resolution 1: autom. group order 3, decomposable
R[48][1]:=[[1,36,37,40],[2,32,38,39],[3,18,26,35],[4,17,24,31],[5,16,22,28],[6,15,19,33],[7,11,21,34],[8,14,23,27],[9,12,25,29],[10,13,20,30]];
RG[48][1]:=Group([(1,11,15)(2,4,9)(3,14,6)(5,10,8)(7,16,12)]);
# Design 49: 1 resolution(s), autom. group order 3, decomposable
D[49]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,15,16],[1,12,13,14],[2,5,7,13],[2,5,8,15],[2,6,11,14],[2,6,12,15],[2,7,13,16],[2,8,9,11],[2,9,10,12],[2,10,14,16],[3,5,11,14],[3,5,12,13],[3,6,7,16],[3,6,9,15],[3,7,10,11],[3,8,10,12],[3,8,14,16],[3,9,13,15],[4,5,10,14],[4,5,10,15],[4,6,9,14],[4,6,12,16],[4,7,8,9],[4,7,11,12],[4,8,13,16],[4,11,13,15],[5,9,11,16],[5,9,12,16],[6,8,10,13],[6,10,11,13],[7,8,14,15],[7,12,14,15]];
G[49]:=Group([(2,3,4)(5,13,15)(6,14,16)(7,9,10)(8,12,11)]);
R[49]:=[];
RG[49]:=[];
# Design 49 / Resolution 1: autom. group order 3, decomposable
R[49][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,32],[5,14,19,33],[6,15,22,27],[7,12,23,30],[8,13,20,31],[9,11,24,29],[10,16,21,28]];
RG[49][1]:=Group([(2,3,4)(5,13,15)(6,14,16)(7,9,10)(8,12,11)]);
# Design 50: 1 resolution(s), autom. group order 3, simple, decomposable
D[50]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,4,12,14],[2,5,7,13],[2,6,9,14],[2,6,11,16],[2,7,9,10],[2,8,11,12],[2,8,13,15],[2,10,15,16],[3,4,9,15],[3,5,10,11],[3,6,8,12],[3,6,13,15],[3,7,12,14],[3,7,13,16],[3,8,9,16],[3,10,11,14],[4,5,11,13],[4,5,14,16],[4,6,10,12],[4,7,8,15],[4,8,10,16],[4,9,11,13],[5,6,10,15],[5,7,8,14],[5,9,12,15],[5,9,12,16],[6,7,11,16],[6,9,13,14],[7,11,12,15],[8,10,13,14]];
G[50]:=Group([(1,9,11)(2,5,16)(3,12,6)(4,15,7)(10,13,14)]);
R[50]:=[];
RG[50]:=[];
# Design 50 / Resolution 1: autom. group order 3, decomposable
R[50][1]:=[[1,35,37,40],[2,31,38,39],[3,17,26,36],[4,18,23,32],[5,16,22,28],[6,11,24,33],[7,14,19,34],[8,12,25,29],[9,13,20,30],[10,15,21,27]];
RG[50][1]:=Group([(1,11,9)(2,16,5)(3,6,12)(4,7,15)(10,14,13)]);
# Design 51: 1 resolution(s), autom. group order 3, decomposable
D[51]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,15,16],[1,12,13,14],[2,5,7,11],[2,5,8,13],[2,6,11,15],[2,6,13,16],[2,7,9,10],[2,8,9,14],[2,10,12,15],[2,12,14,16],[3,5,10,12],[3,5,14,15],[3,6,7,12],[3,6,13,16],[3,7,11,14],[3,8,9,15],[3,8,10,16],[3,9,11,13],[4,5,10,13],[4,5,14,15],[4,6,9,12],[4,6,9,15],[4,7,8,16],[4,7,14,16],[4,8,11,12],[4,10,11,13],[5,9,11,16],[5,9,12,16],[6,8,10,14],[6,10,11,14],[7,8,13,15],[7,12,13,15]];
G[51]:=Group([(5,14,15)(6,13,16)(7,9,10)(8,12,11)]);
R[51]:=[];
RG[51]:=[];
# Design 51 / Resolution 1: autom. group order 3, decomposable
R[51][1]:=[[1,35,37,40],[2,36,38,39],[3,18,24,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,13,19,31],[8,12,23,29],[9,16,21,27],[10,11,25,30]];
RG[51][1]:=Group([(5,14,15)(6,13,16)(7,9,10)(8,12,11)]);
# Design 52: 1 resolution(s), autom. group order 3, simple, decomposable
D[52]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,4,11,12],[2,5,7,11],[2,6,13,16],[2,6,14,16],[2,7,8,15],[2,8,9,12],[2,9,10,14],[2,10,13,15],[3,4,9,16],[3,5,12,15],[3,6,7,13],[3,6,8,10],[3,7,12,14],[3,8,10,14],[3,9,11,16],[3,11,13,15],[4,5,10,15],[4,5,10,16],[4,6,9,15],[4,7,12,14],[4,8,11,13],[4,8,13,14],[5,6,11,14],[5,7,9,13],[5,8,12,16],[5,9,13,14],[6,9,12,15],[6,10,11,12],[7,8,15,16],[7,10,11,16]];
G[52]:=Group([(1,8,9)(2,7,5)(3,15,13)(4,16,14)(6,12,10)]);
R[52]:=[];
RG[52]:=[];
# Design 52 / Resolution 1: autom. group order 3, decomposable
R[52][1]:=[[1,36,38,39],[2,32,37,40],[3,17,26,35],[4,18,25,30],[5,14,20,31],[6,13,23,27],[7,15,19,33],[8,16,21,28],[9,12,24,29],[10,11,22,34]];
RG[52][1]:=Group([(1,8,9)(2,7,5)(3,15,13)(4,16,14)(6,12,10)]);
# Design 53: 1 resolution(s), autom. group order 3, decomposable
D[53]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,11],[2,6,9,14],[2,6,10,14],[2,7,11,16],[2,7,15,16],[2,10,12,13],[2,12,13,15],[3,5,13,14],[3,5,13,16],[3,6,8,15],[3,6,10,15],[3,7,8,12],[3,7,12,14],[3,9,10,11],[3,9,11,16],[4,5,10,12],[4,5,10,16],[4,6,11,12],[4,6,11,13],[4,7,9,13],[4,7,9,15],[4,8,14,15],[4,8,14,16],[5,9,12,15],[5,11,14,15],[6,8,13,16],[6,9,12,16],[7,8,10,13],[7,10,11,14]];
G[53]:=Group([(2,3,4)(5,7,6)(8,12,11)(9,14,13)(10,16,15)]);
R[53]:=[];
RG[53]:=[];
# Design 53 / Resolution 1: autom. group order 3, decomposable
R[53][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,34],[5,16,19,29],[6,14,20,32],[7,15,21,27],[8,11,24,30],[9,13,23,28],[10,12,22,31]];
RG[53][1]:=Group([(2,4,3)(5,6,7)(8,11,12)(9,13,14)(10,15,16)]);
# Design 54: 1 resolution(s), autom. group order 3, decomposable
D[54]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,15,16],[1,12,13,14],[2,5,7,13],[2,5,9,15],[2,6,11,14],[2,6,12,16],[2,7,8,10],[2,8,9,11],[2,10,14,15],[2,12,13,16],[3,5,11,14],[3,5,11,16],[3,6,7,15],[3,6,10,13],[3,7,9,12],[3,8,10,12],[3,8,14,15],[3,9,13,16],[4,5,8,13],[4,5,10,16],[4,6,9,14],[4,6,12,15],[4,7,11,12],[4,7,14,16],[4,8,13,15],[4,9,10,11],[5,9,12,15],[5,10,12,14],[6,8,9,16],[6,10,11,13],[7,8,14,16],[7,11,13,15]];
G[54]:=Group([(2,3,4)(5,13,16)(6,14,15)(7,9,10)(8,12,11)]);
R[54]:=[];
RG[54]:=[];
# Design 54 / Resolution 1: autom. group order 3, decomposable
R[54][1]:=[[1,35,38,39],[2,36,37,40],[3,18,25,34],[4,17,26,31],[5,14,19,33],[6,12,22,32],[7,15,20,30],[8,13,23,27],[9,11,24,29],[10,16,21,28]];
RG[54][1]:=Group([(2,3,4)(5,13,16)(6,14,15)(7,9,10)(8,12,11)]);
# Design 55: 1 resolution(s), autom. group order 3, simple, decomposable
D[55]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,4,8,16],[2,5,7,16],[2,6,12,14],[2,6,12,15],[2,7,10,11],[2,8,10,14],[2,9,11,13],[2,9,13,15],[3,4,10,15],[3,5,13,14],[3,6,7,11],[3,6,8,13],[3,7,9,14],[3,8,9,12],[3,10,15,16],[3,11,12,16],[4,5,9,12],[4,5,9,15],[4,6,10,13],[4,7,12,14],[4,8,11,16],[4,11,13,14],[5,6,11,15],[5,7,13,16],[5,8,10,14],[5,10,11,12],[6,9,10,16],[6,9,14,16],[7,8,12,15],[7,8,13,15]];
G[55]:=Group([(1,8,9)(2,15,16)(3,7,6)(4,13,14)(5,12,10)]);
R[55]:=[];
RG[55]:=[];
# Design 55 / Resolution 1: autom. group order 3, decomposable
R[55][1]:=[[1,36,38,40],[2,32,37,39],[3,18,26,35],[4,17,25,30],[5,14,20,31],[6,13,19,34],[7,11,23,33],[8,12,24,29],[9,16,21,28],[10,15,22,27]];
RG[55][1]:=Group([(1,8,9)(2,15,16)(3,7,6)(4,13,14)(5,12,10)]);
# Design 56: 1 resolution(s), autom. group order 3, decomposable
D[56]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,11],[2,5,9,12],[2,6,8,15],[2,6,13,14],[2,7,13,16],[2,8,10,15],[2,9,12,16],[2,10,11,14],[3,5,11,16],[3,5,12,15],[3,6,7,16],[3,6,12,14],[3,7,8,10],[3,8,9,14],[3,9,13,15],[3,10,11,13],[4,5,9,13],[4,5,10,15],[4,6,10,12],[4,6,11,13],[4,7,9,14],[4,7,14,15],[4,8,11,16],[4,8,12,16],[5,8,13,14],[5,10,14,16],[6,9,10,16],[6,9,11,15],[7,8,12,13],[7,11,12,15]];
G[56]:=Group([(1,2,4)(5,9,7)(6,12,14)(8,16,15)(10,11,13)]);
R[56]:=[];
RG[56]:=[];
# Design 56 / Resolution 1: autom. group order 3, decomposable
R[56][1]:=[[1,35,37,40],[2,36,38,39],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,13,19,31],[8,16,21,27],[9,11,24,29],[10,12,23,30]];
RG[56][1]:=Group([(1,4,2)(5,7,9)(6,14,12)(8,15,16)(10,13,11)]);
# Design 57: 1 resolution(s), autom. group order 3, decomposable
D[57]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,14],[1,12,15,16],[2,5,7,11],[2,5,12,15],[2,6,8,13],[2,6,14,15],[2,7,14,16],[2,8,9,12],[2,9,10,11],[2,10,13,16],[3,5,11,14],[3,5,12,13],[3,6,7,16],[3,6,9,15],[3,7,8,10],[3,8,10,14],[3,9,11,15],[3,12,13,16],[4,5,10,13],[4,5,10,15],[4,6,9,13],[4,6,11,16],[4,7,9,12],[4,7,12,14],[4,8,11,16],[4,8,14,15],[5,8,9,16],[5,9,14,16],[6,10,11,12],[6,10,12,14],[7,8,13,15],[7,11,13,15]];
G[57]:=Group([(1,3,4)(5,15,12)(6,9,7)(8,11,14)(10,16,13)]);
R[57]:=[];
RG[57]:=[];
# Design 57 / Resolution 1: autom. group order 3, decomposable
R[57][1]:=[[1,35,38,40],[2,36,37,39],[3,17,26,34],[4,18,25,32],[5,14,20,33],[6,15,22,27],[7,12,23,30],[8,13,19,31],[9,16,21,28],[10,11,24,29]];
RG[57][1]:=Group([(1,3,4)(5,15,12)(6,9,7)(8,11,14)(10,16,13)]);
# Design 58: 1 resolution(s), autom. group order 3, decomposable
D[58]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,14],[2,6,9,11],[2,6,14,16],[2,7,11,15],[2,7,12,13],[2,10,12,13],[2,10,15,16],[3,5,10,13],[3,5,13,15],[3,6,8,10],[3,6,14,15],[3,7,9,16],[3,7,12,14],[3,8,11,12],[3,9,11,16],[4,5,11,16],[4,5,12,16],[4,6,10,12],[4,6,11,13],[4,7,8,15],[4,7,9,10],[4,8,14,15],[4,9,13,14],[5,9,12,15],[5,10,11,14],[6,8,13,16],[6,9,12,15],[7,8,13,16],[7,10,11,14]];
G[58]:=Group([(2,3,4)(8,13,16)(9,15,12)(10,11,14)]);
R[58]:=[];
RG[58]:=[];
# Design 58 / Resolution 1: autom. group order 3, decomposable
R[58][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,34],[5,16,22,27],[6,14,20,32],[7,15,21,28],[8,11,24,30],[9,12,23,29],[10,13,19,31]];
RG[58][1]:=Group([(2,4,3)(8,16,13)(9,12,15)(10,14,11)]);
# Design 59: 2 resolution(s), autom. group order 3, decomposable
D[59]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,16],[2,5,9,11],[2,6,10,15],[2,6,13,16],[2,7,8,10],[2,8,13,14],[2,9,11,12],[2,12,14,15],[3,5,9,13],[3,5,12,16],[3,6,8,14],[3,6,11,16],[3,7,9,15],[3,7,14,15],[3,8,10,12],[3,10,11,13],[4,5,10,14],[4,5,12,15],[4,6,9,14],[4,6,11,15],[4,7,8,11],[4,7,12,13],[4,8,9,16],[4,10,13,16],[5,8,13,15],[5,10,11,14],[6,7,12,13],[6,9,10,12],[7,11,14,16],[8,9,15,16]];
G[59]:=Group([(1,2,3)(5,9,7)(6,11,15)(8,12,14)(10,16,13)]);
R[59]:=[];
RG[59]:=[];
# Design 59 / Resolution 1: autom. group order 1
R[59][1]:=[[1,35,38,39],[2,36,37,40],[3,18,26,33],[4,17,24,34],[5,16,22,28],[6,14,23,27],[7,11,25,30],[8,12,21,32],[9,15,20,29],[10,13,19,31]];
RG[59][1]:=Group([()]);
# Design 59 / Resolution 2: autom. group order 3, decomposable
R[59][2]:=[[1,35,38,39],[2,36,37,40],[3,18,26,33],[4,17,24,34],[5,16,22,28],[6,14,23,27],[7,15,20,30],[8,12,21,32],[9,11,25,29],[10,13,19,31]];
RG[59][2]:=Group([(1,2,3)(5,9,7)(6,11,15)(8,12,14)(10,16,13)]);
# Design 60: 1 resolution(s), autom. group order 3, decomposable
D[60]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,10,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,7,14],[2,5,9,15],[2,6,8,13],[2,6,15,16],[2,7,11,16],[2,8,9,12],[2,10,11,13],[2,10,12,14],[3,5,10,11],[3,5,11,12],[3,6,7,13],[3,6,12,15],[3,7,13,14],[3,8,9,16],[3,8,10,15],[3,9,14,16],[4,5,8,14],[4,5,10,16],[4,6,9,11],[4,6,10,16],[4,7,9,12],[4,7,12,15],[4,8,13,14],[4,11,13,15],[5,9,13,15],[5,12,13,16],[6,9,11,14],[6,10,12,14],[7,8,10,15],[7,8,11,16]];
G[60]:=Group([(1,3,4)(5,7,14)(6,13,8)(9,16,10)(11,12,15)]);
R[60]:=[];
RG[60]:=[];
# Design 60 / Resolution 1: autom. group order 3, decomposable
R[60][1]:=[[1,35,38,40],[2,36,37,39],[3,18,24,34],[4,17,26,32],[5,14,20,33],[6,12,23,30],[7,15,22,27],[8,16,21,28],[9,11,25,29],[10,13,19,31]];
RG[60][1]:=Group([(1,4,3)(5,14,7)(6,8,13)(9,10,16)(11,15,12)]);
# Design 61: 1 resolution(s), autom. group order 3, simple, decomposable
D[61]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,4,9,14],[2,5,7,15],[2,6,11,13],[2,6,13,14],[2,7,10,16],[2,8,10,12],[2,8,12,15],[2,9,11,16],[3,4,13,15],[3,5,12,16],[3,6,7,11],[3,6,8,16],[3,7,9,12],[3,8,9,13],[3,10,11,14],[3,10,14,15],[4,5,8,10],[4,5,9,14],[4,6,10,16],[4,7,12,13],[4,8,11,15],[4,11,12,16],[5,6,12,14],[5,7,11,15],[5,9,13,16],[5,10,11,13],[6,9,10,15],[6,9,12,15],[7,8,13,14],[7,8,14,16]];
G[61]:=Group([(1,8,9)(2,14,15)(3,7,6)(4,16,12)(5,13,10)]);
R[61]:=[];
RG[61]:=[];
# Design 61 / Resolution 1: autom. group order 3, decomposable
R[61][1]:=[[1,36,38,40],[2,32,37,39],[3,17,25,35],[4,18,26,30],[5,14,20,31],[6,15,19,33],[7,11,22,34],[8,12,24,29],[9,16,21,28],[10,13,23,27]];
RG[61][1]:=Group([(1,8,9)(2,14,15)(3,7,6)(4,16,12)(5,13,10)]);
# Design 62: 1 resolution(s), autom. group order 3, decomposable
D[62]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,12],[2,5,8,14],[2,6,9,13],[2,6,11,13],[2,7,12,15],[2,8,9,16],[2,10,11,16],[2,10,14,15],[3,5,11,12],[3,5,14,16],[3,6,7,15],[3,6,10,14],[3,7,9,16],[3,8,10,11],[3,8,13,15],[3,9,12,13],[4,5,10,13],[4,5,13,16],[4,6,9,14],[4,6,11,15],[4,7,8,10],[4,7,11,16],[4,8,12,15],[4,9,12,14],[5,9,10,15],[5,9,11,15],[6,8,12,16],[6,10,12,16],[7,8,13,14],[7,11,13,14]];
G[62]:=Group([(1,2,4)(5,6,13)(7,9,16)(8,11,10)(12,14,15)]);
R[62]:=[];
RG[62]:=[];
# Design 62 / Resolution 1: autom. group order 3, decomposable
R[62][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,32],[5,14,20,33],[6,15,22,28],[7,12,23,30],[8,16,21,27],[9,11,24,29],[10,13,19,31]];
RG[62][1]:=Group([(1,4,2)(5,13,6)(7,16,9)(8,10,11)(12,15,14)]);
# Design 63: 1 resolution(s), autom. group order 3, decomposable
D[63]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,14],[1,12,15,16],[2,5,7,13],[2,5,11,15],[2,6,8,14],[2,6,11,15],[2,7,13,16],[2,8,9,12],[2,9,10,12],[2,10,14,16],[3,5,12,13],[3,5,12,14],[3,6,7,16],[3,6,9,15],[3,7,8,10],[3,8,10,11],[3,9,13,15],[3,11,14,16],[4,5,10,14],[4,5,10,15],[4,6,9,14],[4,6,12,16],[4,7,9,11],[4,7,11,12],[4,8,13,15],[4,8,13,16],[5,8,9,16],[5,9,11,16],[6,10,11,13],[6,10,12,13],[7,8,14,15],[7,12,14,15]];
G[63]:=Group([(2,3,4)(5,13,15)(6,14,16)(7,9,10)(8,11,12)]);
R[63]:=[];
RG[63]:=[];
# Design 63 / Resolution 1: autom. group order 3, decomposable
R[63][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,32],[5,14,20,34],[6,15,22,27],[7,12,23,30],[8,13,19,31],[9,16,21,28],[10,11,24,29]];
RG[63][1]:=Group([(2,4,3)(5,15,13)(6,16,14)(7,10,9)(8,12,11)]);
# Design 64: 1 resolution(s), autom. group order 3, decomposable
D[64]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,16],[2,5,9,11],[2,6,8,15],[2,6,12,13],[2,7,10,14],[2,8,10,11],[2,9,14,15],[2,12,13,16],[3,5,11,14],[3,5,13,15],[3,6,7,15],[3,6,12,14],[3,7,11,16],[3,8,9,10],[3,8,9,12],[3,10,13,16],[4,5,9,13],[4,5,10,12],[4,6,9,16],[4,6,10,14],[4,7,8,13],[4,7,11,12],[4,8,15,16],[4,11,14,15],[5,8,14,16],[5,10,12,15],[6,9,11,16],[6,10,11,13],[7,8,13,14],[7,9,12,15]];
G[64]:=Group([(1,2,3)(5,13,9)(6,12,8)(7,16,10)(11,15,14)]);
R[64]:=[];
RG[64]:=[];
# Design 64 / Resolution 1: autom. group order 3, decomposable
R[64][1]:=[[1,35,38,40],[2,36,37,39],[3,18,24,34],[4,17,26,32],[5,14,19,33],[6,15,20,29],[7,13,23,28],[8,12,22,31],[9,11,25,30],[10,16,21,27]];
RG[64][1]:=Group([(1,2,3)(5,13,9)(6,12,8)(7,16,10)(11,15,14)]);
# Design 65: 1 resolution(s), autom. group order 3, simple
D[65]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,10,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,11,14],[2,5,7,13],[2,6,9,15],[2,6,10,11],[2,7,8,14],[2,8,15,16],[2,9,12,13],[2,10,12,16],[3,4,13,16],[3,5,11,12],[3,6,9,11],[3,6,10,16],[3,7,8,13],[3,7,12,15],[3,8,9,14],[3,10,14,15],[4,5,9,15],[4,5,10,12],[4,6,13,14],[4,7,11,16],[4,8,9,12],[4,8,10,15],[5,6,8,16],[5,7,10,14],[5,9,14,16],[5,11,13,15],[6,7,12,15],[6,12,13,14],[7,9,11,16],[8,10,11,13]];
G[65]:=Group([(1,6,7)(2,14,11)(3,13,16)(5,12,9)(8,15,10)]);
R[65]:=[];
RG[65]:=[];
# Design 65 / Resolution 1: autom. group order 3
R[65][1]:=[[1,35,37,40],[2,32,38,39],[3,18,25,36],[4,17,26,30],[5,16,20,29],[6,13,19,34],[7,11,24,33],[8,12,22,31],[9,14,23,27],[10,15,21,28]];
RG[65][1]:=Group([(1,6,7)(2,14,11)(3,13,16)(5,12,9)(8,15,10)]);
# Design 66: 1 resolution(s), autom. group order 3
D[66]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,11,13],[1,12,15,16],[1,14,15,16],[2,5,7,13],[2,5,11,15],[2,6,8,15],[2,6,9,12],[2,7,10,14],[2,8,10,14],[2,9,12,16],[2,11,13,16],[3,5,9,16],[3,5,14,15],[3,6,7,11],[3,6,10,12],[3,7,11,16],[3,8,12,13],[3,8,13,14],[3,9,10,15],[4,5,9,13],[4,5,10,12],[4,6,13,15],[4,6,14,16],[4,7,8,16],[4,7,12,14],[4,8,9,11],[4,10,11,15],[5,8,10,16],[5,11,12,14],[6,9,11,14],[6,10,13,16],[7,8,9,15],[7,12,13,15]];
G[66]:=Group([(1,2,3)(5,9,13)(6,12,8)(7,16,14)(10,11,15)]);
R[66]:=[];
RG[66]:=[];
# Design 66 / Resolution 1: autom. group order 3
R[66][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,32],[5,12,24,30],[6,15,19,29],[7,13,23,28],[8,14,20,31],[9,16,21,27],[10,11,22,33]];
RG[66][1]:=Group([(1,3,2)(5,13,9)(6,8,12)(7,14,16)(10,15,11)]);
# Design 67: 1 resolution(s), autom. group order 3, decomposable
D[67]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,14],[2,5,11,15],[2,6,8,14],[2,6,13,16],[2,7,9,16],[2,8,10,15],[2,9,11,12],[2,10,12,13],[3,5,9,12],[3,5,12,15],[3,6,7,11],[3,6,13,15],[3,7,8,10],[3,8,9,16],[3,10,13,14],[3,11,14,16],[4,5,9,13],[4,5,10,14],[4,6,10,12],[4,6,12,16],[4,7,11,13],[4,7,15,16],[4,8,9,15],[4,8,11,14],[5,8,13,16],[5,10,11,16],[6,9,10,11],[6,9,14,15],[7,8,12,13],[7,12,14,15]];
G[67]:=Group([(1,3,4)(5,12,6)(7,9,16)(8,15,10)(11,13,14)]);
R[67]:=[];
RG[67]:=[];
# Design 67 / Resolution 1: autom. group order 3, decomposable
R[67][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,25,32],[5,14,20,34],[6,15,22,28],[7,12,23,30],[8,13,19,31],[9,11,24,29],[10,16,21,27]];
RG[67][1]:=Group([(1,4,3)(5,6,12)(7,16,9)(8,10,15)(11,14,13)]);
# Design 68: 1 resolution(s), autom. group order 3, simple, decomposable
D[68]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,4,9,15],[2,5,7,14],[2,6,8,12],[2,6,11,15],[2,7,10,16],[2,8,10,16],[2,9,12,13],[2,11,13,14],[3,4,10,11],[3,5,9,15],[3,6,10,12],[3,6,13,15],[3,7,8,14],[3,7,11,16],[3,8,13,14],[3,9,12,16],[4,5,12,14],[4,5,12,16],[4,6,7,13],[4,8,9,11],[4,8,13,16],[4,10,14,15],[5,6,11,16],[5,7,9,13],[5,8,10,15],[5,10,11,13],[6,9,10,14],[6,9,14,16],[7,8,12,15],[7,11,12,15]];
G[68]:=Group([(1,7,14)(2,12,9)(3,15,6)(4,8,16)(5,11,10)]);
R[68]:=[];
RG[68]:=[];
# Design 68 / Resolution 1: autom. group order 3, decomposable
R[68][1]:=[[1,36,38,39],[2,31,37,40],[3,18,26,35],[4,17,24,32],[5,14,25,28],[6,15,22,27],[7,11,23,33],[8,16,20,29],[9,12,21,30],[10,13,19,34]];
RG[68][1]:=Group([(1,14,7)(2,9,12)(3,6,15)(4,16,8)(5,10,11)]);
# Design 69: 1 resolution(s), autom. group order 3, simple
D[69]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,11,13],[1,10,14,15],[1,12,14,16],[1,13,15,16],[2,4,9,14],[2,5,10,11],[2,6,7,12],[2,6,11,16],[2,7,8,15],[2,8,13,14],[2,9,15,16],[2,10,12,13],[3,4,11,13],[3,5,14,15],[3,6,10,15],[3,6,11,16],[3,7,9,12],[3,7,14,16],[3,8,9,12],[3,8,10,13],[4,5,7,13],[4,5,12,15],[4,6,8,14],[4,8,10,16],[4,9,11,15],[4,10,12,16],[5,6,9,10],[5,7,13,16],[5,8,9,16],[5,11,12,14],[6,9,13,14],[6,12,13,15],[7,8,11,15],[7,10,11,14]];
G[69]:=Group([(1,10,15)(2,4,8)(3,16,7)(5,12,11)(6,13,9)]);
R[69]:=[];
RG[69]:=[];
# Design 69 / Resolution 1: autom. group order 3
R[69][1]:=[[1,35,38,40],[2,32,37,39],[3,17,26,36],[4,18,24,31],[5,16,22,28],[6,11,21,34],[7,13,20,30],[8,14,25,27],[9,15,19,33],[10,12,23,29]];
RG[69][1]:=Group([(1,10,15)(2,4,8)(3,16,7)(5,12,11)(6,13,9)]);
# Design 70: 1 resolution(s), autom. group order 3, simple, decomposable
D[70]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,4,11,15],[2,5,7,13],[2,6,12,16],[2,6,14,16],[2,7,9,10],[2,8,9,12],[2,8,13,14],[2,10,11,15],[3,4,8,12],[3,5,10,14],[3,6,9,14],[3,6,9,15],[3,7,12,16],[3,7,13,15],[3,8,11,13],[3,10,11,16],[4,5,10,14],[4,5,12,15],[4,6,7,11],[4,8,10,16],[4,9,13,14],[4,9,13,16],[5,6,11,13],[5,7,8,16],[5,9,11,16],[5,9,12,15],[6,8,10,15],[6,10,12,13],[7,8,14,15],[7,11,12,14]];
G[70]:=Group([(1,4,14)(2,9,12)(3,13,11)(5,16,7)(6,10,15)]);
R[70]:=[];
RG[70]:=[];
# Design 70 / Resolution 1: autom. group order 3, decomposable
R[70][1]:=[[1,35,38,39],[2,32,37,40],[3,17,26,36],[4,18,23,31],[5,14,25,28],[6,13,24,27],[7,11,21,34],[8,12,22,30],[9,16,20,29],[10,15,19,33]];
RG[70][1]:=Group([(1,14,4)(2,12,9)(3,11,13)(5,7,16)(6,15,10)]);
# Design 71: 1 resolution(s), autom. group order 3, simple, decomposable
D[71]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,4,13,15],[2,5,7,11],[2,6,11,16],[2,6,14,16],[2,7,8,12],[2,8,9,13],[2,9,10,14],[2,10,12,15],[3,4,8,14],[3,5,12,13],[3,6,7,15],[3,6,9,13],[3,7,10,16],[3,8,10,14],[3,9,11,16],[3,11,12,15],[4,5,10,11],[4,5,10,16],[4,6,9,12],[4,7,13,14],[4,8,11,15],[4,9,12,16],[5,6,12,14],[5,7,9,15],[5,8,13,16],[5,9,14,15],[6,8,10,15],[6,10,11,13],[7,8,12,16],[7,11,13,14]];
G[71]:=Group([(1,8,9)(2,7,5)(3,12,15)(4,16,14)(6,13,10)]);
R[71]:=[];
RG[71]:=[];
# Design 71 / Resolution 1: autom. group order 3, decomposable
R[71][1]:=[[1,36,38,39],[2,32,37,40],[3,17,26,35],[4,18,25,30],[5,14,20,31],[6,11,23,33],[7,13,19,34],[8,16,21,28],[9,12,24,29],[10,15,22,27]];
RG[71][1]:=Group([(1,8,9)(2,7,5)(3,12,15)(4,16,14)(6,13,10)]);
# Design 72: 1 resolution(s), autom. group order 3, decomposable
D[72]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,11],[2,6,9,16],[2,6,13,15],[2,7,12,15],[2,7,12,16],[2,10,11,14],[2,10,13,14],[3,5,13,16],[3,5,14,16],[3,6,8,10],[3,6,10,15],[3,7,8,14],[3,7,11,13],[3,9,11,12],[3,9,12,15],[4,5,10,12],[4,5,11,15],[4,6,11,14],[4,6,12,14],[4,7,9,10],[4,7,9,13],[4,8,13,16],[4,8,15,16],[5,9,14,15],[5,10,12,13],[6,8,12,13],[6,9,11,16],[7,8,14,15],[7,10,11,16]];
G[72]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[72]:=[];
RG[72]:=[];
# Design 72 / Resolution 1: autom. group order 3, decomposable
R[72][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,34],[5,15,19,29],[6,14,20,31],[7,16,21,28],[8,11,24,30],[9,13,23,27],[10,12,22,32]];
RG[72][1]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
# Design 73: 1 resolution(s), autom. group order 3, decomposable
D[73]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,14],[2,6,9,11],[2,6,14,16],[2,7,11,15],[2,7,12,13],[2,10,12,13],[2,10,15,16],[3,5,11,16],[3,5,13,15],[3,6,8,10],[3,6,10,12],[3,7,8,15],[3,7,12,14],[3,9,11,16],[3,9,13,14],[4,5,10,13],[4,5,12,16],[4,6,11,13],[4,6,14,15],[4,7,9,10],[4,7,9,16],[4,8,11,12],[4,8,14,15],[5,9,12,15],[5,10,11,14],[6,8,13,16],[6,9,12,15],[7,8,13,16],[7,10,11,14]];
G[73]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[73]:=[];
RG[73]:=[];
# Design 73 / Resolution 1: autom. group order 3, decomposable
R[73][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,33],[5,16,19,30],[6,14,20,31],[7,15,21,28],[8,11,24,29],[9,12,22,32],[10,13,23,27]];
RG[73][1]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
# Design 74: 1 resolution(s), autom. group order 3, simple
D[74]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,14,16],[1,13,15,16],[2,4,9,14],[2,5,7,12],[2,6,9,13],[2,6,10,16],[2,7,8,15],[2,8,14,16],[2,10,11,12],[2,11,13,15],[3,4,12,15],[3,5,11,13],[3,6,9,14],[3,6,10,13],[3,7,8,12],[3,7,11,16],[3,8,10,14],[3,9,15,16],[4,5,9,11],[4,5,10,16],[4,6,12,15],[4,7,13,14],[4,8,10,11],[4,8,13,16],[5,6,8,15],[5,7,13,14],[5,9,12,16],[5,10,14,15],[6,7,11,16],[6,11,12,14],[7,9,10,15],[8,9,12,13]];
G[74]:=Group([(1,4,6)(2,12,8)(3,15,5)(9,14,11)(10,13,16)]);
R[74]:=[];
RG[74]:=[];
# Design 74 / Resolution 1: autom. group order 3
R[74][1]:=[[1,36,37,40],[2,32,38,39],[3,18,25,35],[4,17,26,30],[5,16,20,29],[6,14,19,34],[7,11,24,33],[8,13,23,28],[9,15,22,27],[10,12,21,31]];
RG[74][1]:=Group([(1,4,6)(2,12,8)(3,15,5)(9,14,11)(10,13,16)]);
# Design 75: 1 resolution(s), autom. group order 3, decomposable
D[75]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,14],[1,12,15,16],[2,5,7,13],[2,5,14,15],[2,6,9,11],[2,6,10,15],[2,7,8,16],[2,8,11,12],[2,9,14,16],[2,10,12,13],[3,5,8,13],[3,5,9,12],[3,6,12,15],[3,6,13,16],[3,7,9,10],[3,7,11,15],[3,8,10,14],[3,11,14,16],[4,5,10,11],[4,5,14,15],[4,6,9,11],[4,6,13,16],[4,7,8,16],[4,7,12,14],[4,8,9,15],[4,10,12,13],[5,9,12,16],[5,10,11,16],[6,7,12,14],[6,8,10,14],[7,11,13,15],[8,9,13,15]];
G[75]:=Group([(5,14,15)(6,13,16)(7,9,10)(8,11,12)]);
R[75]:=[];
RG[75]:=[];
# Design 75 / Resolution 1: autom. group order 3, decomposable
R[75][1]:=[[1,35,38,39],[2,36,37,40],[3,18,26,33],[4,17,24,34],[5,16,22,28],[6,12,23,30],[7,15,21,27],[8,13,19,32],[9,14,20,31],[10,11,25,29]];
RG[75][1]:=Group([(5,14,15)(6,13,16)(7,9,10)(8,11,12)]);
# Design 76: 1 resolution(s), autom. group order 3, decomposable
D[76]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,12,13],[1,14,15,16],[2,5,7,15],[2,5,8,15],[2,6,9,11],[2,6,11,14],[2,7,10,14],[2,8,10,13],[2,9,12,16],[2,12,13,16],[3,5,9,16],[3,5,13,16],[3,6,7,12],[3,6,10,12],[3,7,8,13],[3,8,9,14],[3,10,11,15],[3,11,14,15],[4,5,9,11],[4,5,12,14],[4,6,10,16],[4,6,13,15],[4,7,11,16],[4,7,13,14],[4,8,9,10],[4,8,12,15],[5,10,11,13],[5,10,12,14],[6,8,14,16],[6,9,13,15],[7,8,11,16],[7,9,12,15]];
G[76]:=Group([(1,2,3)(5,16,15)(6,12,11)(7,13,14)(8,9,10)]);
R[76]:=[];
RG[76]:=[];
# Design 76 / Resolution 1: autom. group order 3, decomposable
R[76][1]:=[[1,35,37,40],[2,36,38,39],[3,18,26,33],[4,17,25,32],[5,14,20,34],[6,15,19,30],[7,12,22,31],[8,13,23,28],[9,11,24,29],[10,16,21,27]];
RG[76][1]:=Group([(1,3,2)(5,15,16)(6,11,12)(7,14,13)(8,10,9)]);
# Design 77: 1 resolution(s), autom. group order 3, decomposable
D[77]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,8,10],[2,5,8,14],[2,6,9,12],[2,6,12,16],[2,7,11,15],[2,7,13,15],[2,9,13,14],[2,10,11,16],[3,5,11,12],[3,5,13,15],[3,6,8,14],[3,6,10,15],[3,7,8,16],[3,7,9,12],[3,9,13,14],[3,10,11,16],[4,5,9,16],[4,5,10,13],[4,6,11,13],[4,6,14,16],[4,7,9,11],[4,7,10,14],[4,8,12,15],[4,8,12,15],[5,9,15,16],[5,11,12,14],[6,8,11,13],[6,9,10,15],[7,8,13,16],[7,10,12,14]];
G[77]:=Group([(5,6,7)(8,12,15)(9,13,14)(10,16,11)]);
R[77]:=[];
RG[77]:=[];
# Design 77 / Resolution 1: autom. group order 3, decomposable
R[77][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,33],[4,18,25,34],[5,16,19,30],[6,14,20,32],[7,15,21,27],[8,13,23,28],[9,12,22,31],[10,11,24,29]];
RG[77][1]:=Group([(5,6,7)(8,12,15)(9,13,14)(10,16,11)]);
# Design 78: 1 resolution(s), autom. group order 3, decomposable
D[78]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,14],[1,12,15,16],[2,5,7,13],[2,5,8,13],[2,6,11,15],[2,6,11,16],[2,7,14,15],[2,8,9,12],[2,9,10,12],[2,10,14,16],[3,5,9,16],[3,5,12,14],[3,6,7,16],[3,6,12,14],[3,7,8,10],[3,8,10,11],[3,9,13,15],[3,11,13,15],[4,5,10,15],[4,5,12,15],[4,6,9,14],[4,6,10,13],[4,7,9,11],[4,7,11,12],[4,8,13,16],[4,8,14,16],[5,9,11,16],[5,10,11,14],[6,8,9,15],[6,10,12,13],[7,8,14,15],[7,12,13,16]];
G[78]:=Group([(2,3,4)(5,13,15)(6,14,16)(7,9,10)(8,11,12)]);
R[78]:=[];
RG[78]:=[];
# Design 78 / Resolution 1: autom. group order 3, decomposable
R[78][1]:=[[1,35,38,39],[2,36,37,40],[3,17,26,34],[4,18,25,32],[5,13,20,33],[6,15,19,30],[7,14,23,28],[8,12,22,31],[9,16,21,27],[10,11,24,29]];
RG[78][1]:=Group([(2,4,3)(5,15,13)(6,16,14)(7,10,9)(8,12,11)]);
# Design 79: 1 resolution(s), autom. group order 3, decomposable
D[79]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,7,14],[2,5,11,15],[2,6,11,12],[2,6,14,16],[2,7,8,13],[2,8,9,15],[2,9,10,12],[2,10,13,16],[3,5,10,13],[3,5,15,16],[3,6,7,13],[3,6,9,11],[3,7,12,16],[3,8,10,12],[3,8,14,15],[3,9,11,14],[4,5,10,11],[4,5,12,14],[4,6,8,10],[4,6,9,16],[4,7,9,15],[4,7,12,15],[4,8,13,14],[4,11,13,16],[5,8,9,16],[5,9,12,13],[6,10,14,15],[6,12,13,15],[7,8,11,16],[7,10,11,14]];
G[79]:=Group([(1,3,4)(5,11,15)(6,9,7)(8,14,12)(10,13,16)]);
R[79]:=[];
RG[79]:=[];
# Design 79 / Resolution 1: autom. group order 3, decomposable
R[79][1]:=[[1,35,38,40],[2,36,37,39],[3,17,25,34],[4,18,26,32],[5,13,20,33],[6,14,19,31],[7,12,23,29],[8,15,22,28],[9,11,24,30],[10,16,21,27]];
RG[79][1]:=Group([(1,3,4)(5,11,15)(6,9,7)(8,14,12)(10,13,16)]);
# Design 80: 1 resolution(s), autom. group order 3, simple, decomposable
D[80]:=[[1,2,3,4],[1,2,3,5],[1,4,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,4,11,14],[2,5,7,13],[2,6,8,15],[2,6,11,14],[2,7,9,16],[2,8,10,16],[2,9,12,15],[2,10,12,13],[3,4,13,15],[3,5,15,16],[3,6,7,12],[3,6,9,12],[3,7,10,11],[3,8,9,11],[3,8,14,16],[3,10,13,14],[4,5,9,14],[4,5,12,16],[4,6,10,15],[4,7,11,16],[4,8,9,10],[4,8,12,13],[5,6,10,14],[5,7,8,13],[5,9,11,15],[5,10,11,12],[6,9,13,16],[6,11,13,16],[7,8,14,15],[7,12,14,15]];
G[80]:=Group([(1,15,16)(2,7,6)(3,14,13)(4,8,9)(5,12,11)]);
R[80]:=[];
RG[80]:=[];
# Design 80 / Resolution 1: autom. group order 3, decomposable
R[80][1]:=[[1,36,37,39],[2,31,38,40],[3,18,25,35],[4,17,26,30],[5,14,20,32],[6,15,19,33],[7,13,23,28],[8,11,22,34],[9,16,21,27],[10,12,24,29]];
RG[80][1]:=Group([(1,16,15)(2,6,7)(3,13,14)(4,9,8)(5,11,12)]);
# Design 81: 1 resolution(s), autom. group order 3, decomposable
D[81]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,11],[2,6,9,14],[2,6,14,15],[2,7,10,11],[2,7,15,16],[2,10,12,13],[2,12,13,16],[3,5,10,13],[3,5,13,14],[3,6,8,16],[3,6,10,15],[3,7,8,12],[3,7,12,14],[3,9,11,15],[3,9,11,16],[4,5,10,16],[4,5,12,15],[4,6,11,12],[4,6,11,13],[4,7,9,13],[4,7,9,16],[4,8,10,14],[4,8,14,15],[5,9,12,15],[5,11,14,16],[6,8,13,16],[6,9,10,12],[7,8,13,15],[7,10,11,14]];
G[81]:=Group([(2,3,4)(5,7,6)(8,12,11)(9,14,13)(10,16,15)]);
R[81]:=[];
RG[81]:=[];
# Design 81 / Resolution 1: autom. group order 3, decomposable
R[81][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,33],[5,16,20,29],[6,14,19,32],[7,15,21,28],[8,11,24,30],[9,13,23,27],[10,12,22,31]];
RG[81][1]:=Group([(2,4,3)(5,6,7)(8,11,12)(9,13,14)(10,15,16)]);
# Design 82: 4 resolution(s), autom. group order 3, decomposable
D[82]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,12],[2,5,8,10],[2,6,10,13],[2,6,11,14],[2,7,13,15],[2,8,14,16],[2,9,11,15],[2,9,12,16],[3,5,11,13],[3,5,12,14],[3,6,9,13],[3,6,9,14],[3,7,8,15],[3,7,8,16],[3,10,11,15],[3,10,12,16],[4,5,9,15],[4,5,9,16],[4,6,10,16],[4,6,12,15],[4,7,11,12],[4,7,13,14],[4,8,10,11],[4,8,13,14],[5,10,14,15],[5,11,13,16],[6,7,11,16],[6,8,12,15],[7,9,10,14],[8,9,12,13]];
G[82]:=Group([(1,3,4)(5,6,9)(7,13,15)(8,14,16)(10,11,12)]);
R[82]:=[];
RG[82]:=[];
# Design 82 / Resolution 1: autom. group order 1
R[82][1]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,32],[5,16,19,30],[6,15,20,29],[7,14,24,27],[8,13,23,28],[9,11,22,33],[10,12,21,31]];
RG[82][1]:=Group([()]);
# Design 82 / Resolution 2: autom. group order 3, decomposable
R[82][2]:=[[1,35,37,40],[2,36,38,39],[3,18,25,34],[4,17,26,32],[5,16,19,30],[6,15,20,29],[7,14,24,27],[8,13,23,28],[9,11,22,33],[10,12,21,31]];
RG[82][2]:=Group([(1,4,3)(5,9,6)(7,15,13)(8,16,14)(10,12,11)]);
# Design 82 / Resolution 3: autom. group order 1
R[82][3]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,32],[5,16,19,30],[6,15,20,29],[7,14,23,28],[8,13,24,27],[9,11,22,33],[10,12,21,31]];
RG[82][3]:=Group([()]);
# Design 82 / Resolution 4: autom. group order 3
R[82][4]:=[[1,35,37,40],[2,36,38,39],[3,17,26,34],[4,18,25,32],[5,16,19,30],[6,15,20,29],[7,14,23,28],[8,13,24,27],[9,12,22,31],[10,11,21,33]];
RG[82][4]:=Group([(1,3,4)(5,6,9)(7,13,15)(8,14,16)(10,11,12)]);
# Design 83: 1 resolution(s), autom. group order 3, decomposable
D[83]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,11],[2,5,12,15],[2,6,9,16],[2,6,12,13],[2,7,8,13],[2,8,10,16],[2,9,14,15],[2,10,11,14],[3,5,9,10],[3,5,14,16],[3,6,7,15],[3,6,13,14],[3,7,11,15],[3,8,9,12],[3,8,12,16],[3,10,11,13],[4,5,8,14],[4,5,9,13],[4,6,10,14],[4,6,11,12],[4,7,10,16],[4,7,12,16],[4,8,11,15],[4,9,13,15],[5,10,12,15],[5,11,13,16],[6,8,10,15],[6,9,11,16],[7,8,13,14],[7,9,12,14]];
G[83]:=Group([(1,3,4)(5,8,9)(6,12,13)(7,16,15)(10,14,11)]);
R[83]:=[];
RG[83]:=[];
# Design 83 / Resolution 1: autom. group order 3, decomposable
R[83][1]:=[[1,35,38,39],[2,36,37,40],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,12,22,31],[7,13,23,27],[8,16,21,28],[9,11,24,29],[10,15,19,30]];
RG[83][1]:=Group([(1,4,3)(5,9,8)(6,13,12)(7,15,16)(10,11,14)]);
# Design 84: 1 resolution(s), autom. group order 3, decomposable
D[84]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,14],[1,12,15,16],[2,5,7,15],[2,5,9,11],[2,6,8,16],[2,6,12,13],[2,7,10,14],[2,8,10,14],[2,9,11,16],[2,12,13,15],[3,5,13,16],[3,5,14,16],[3,6,7,11],[3,6,12,14],[3,7,11,15],[3,8,9,10],[3,8,9,12],[3,10,13,15],[4,5,9,13],[4,5,10,12],[4,6,9,15],[4,6,10,16],[4,7,8,13],[4,7,12,14],[4,8,11,15],[4,11,14,16],[5,8,14,15],[5,10,11,12],[6,9,14,15],[6,10,11,13],[7,8,13,16],[7,9,12,16]];
G[84]:=Group([(1,2,3)(5,13,9)(6,12,8)(7,15,10)(11,16,14)]);
R[84]:=[];
RG[84]:=[];
# Design 84 / Resolution 1: autom. group order 3, decomposable
R[84][1]:=[[1,35,38,40],[2,36,37,39],[3,18,24,34],[4,17,26,32],[5,14,20,33],[6,15,19,29],[7,13,23,28],[8,12,22,31],[9,11,25,30],[10,16,21,27]];
RG[84][1]:=Group([(1,3,2)(5,9,13)(6,8,12)(7,10,15)(11,14,16)]);
# Design 85: 1 resolution(s), autom. group order 3, decomposable
D[85]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,10],[1,11,12,13],[1,11,12,14],[1,13,15,16],[1,14,15,16],[2,5,7,11],[2,5,9,12],[2,6,8,15],[2,6,13,14],[2,7,11,16],[2,8,10,15],[2,9,12,16],[2,10,13,14],[3,5,10,16],[3,5,12,15],[3,6,7,16],[3,6,12,13],[3,7,8,14],[3,8,9,13],[3,9,11,15],[3,10,11,14],[4,5,9,14],[4,5,14,15],[4,6,10,11],[4,6,10,12],[4,7,9,13],[4,7,13,15],[4,8,11,16],[4,8,12,16],[5,8,11,13],[5,10,13,16],[6,9,11,15],[6,9,14,16],[7,8,12,14],[7,10,12,15]];
G[85]:=Group([(1,2,4)(5,9,7)(6,12,13)(8,16,15)(10,11,14)]);
R[85]:=[];
RG[85]:=[];
# Design 85 / Resolution 1: autom. group order 3, decomposable
R[85][1]:=[[1,35,38,40],[2,36,37,39],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,16,21,27],[8,13,19,31],[9,12,23,29],[10,11,24,30]];
RG[85][1]:=Group([(1,4,2)(5,7,9)(6,13,12)(8,15,16)(10,14,11)]);
# Design 86: 1 resolution(s), autom. group order 3, decomposable
D[86]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,9,11],[1,10,12,13],[1,11,14,15],[1,12,13,16],[1,14,15,16],[2,5,7,12],[2,5,9,13],[2,6,8,14],[2,6,11,16],[2,7,10,15],[2,8,10,14],[2,9,13,15],[2,11,12,16],[3,5,11,15],[3,5,13,14],[3,6,7,15],[3,6,13,16],[3,7,8,12],[3,8,9,16],[3,9,10,14],[3,10,11,12],[4,5,9,11],[4,5,12,14],[4,6,10,11],[4,6,10,13],[4,7,9,16],[4,7,14,16],[4,8,12,15],[4,8,13,15],[5,8,10,16],[5,10,15,16],[6,9,12,14],[6,9,12,15],[7,8,11,13],[7,11,13,14]];
G[86]:=Group([(1,2,4)(5,9,7)(6,13,16)(8,15,14)(10,12,11)]);
R[86]:=[];
RG[86]:=[];
# Design 86 / Resolution 1: autom. group order 3, decomposable
R[86][1]:=[[1,35,38,40],[2,36,37,39],[3,18,25,34],[4,17,26,32],[5,14,20,33],[6,15,22,28],[7,13,19,31],[8,11,24,30],[9,16,21,27],[10,12,23,29]];
RG[86][1]:=Group([(1,4,2)(5,7,9)(6,16,13)(8,14,15)(10,11,12)]);
# Design 87: 1 resolution(s), autom. group order 3, decomposable
D[87]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,7],[1,8,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,13,15],[1,12,14,16],[2,5,8,9],[2,5,8,14],[2,6,9,11],[2,6,13,15],[2,7,12,13],[2,7,12,16],[2,10,11,14],[2,10,15,16],[3,5,11,16],[3,5,14,16],[3,6,8,10],[3,6,10,12],[3,7,8,15],[3,7,11,13],[3,9,12,15],[3,9,13,14],[4,5,10,13],[4,5,11,15],[4,6,12,14],[4,6,14,15],[4,7,9,10],[4,7,9,16],[4,8,11,12],[4,8,13,16],[5,9,12,15],[5,10,12,13],[6,8,13,16],[6,9,11,16],[7,8,14,15],[7,10,11,14]];
G[87]:=Group([(2,3,4)(5,6,7)(8,10,9)(11,15,13)(12,16,14)]);
R[87]:=[];
RG[87]:=[];
# Design 87 / Resolution 1: autom. group order 3, decomposable
R[87][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,33],[5,15,19,30],[6,14,20,31],[7,16,21,28],[8,11,24,29],[9,12,22,32],[10,13,23,27]];
RG[87][1]:=Group([(2,4,3)(5,7,6)(8,9,10)(11,13,15)(12,14,16)]);
# Design 88: 1 resolution(s), autom. group order 3, decomposable
D[88]:=[[1,2,3,4],[1,2,3,4],[1,5,6,7],[1,5,6,8],[1,7,9,10],[1,8,11,12],[1,9,13,14],[1,10,15,16],[1,11,15,16],[1,12,13,14],[2,5,7,13],[2,5,11,13],[2,6,8,15],[2,6,12,16],[2,7,14,16],[2,8,9,11],[2,9,10,12],[2,10,14,15],[3,5,9,15],[3,5,11,14],[3,6,7,15],[3,6,12,14],[3,7,10,11],[3,8,10,12],[3,8,13,16],[3,9,13,16],[4,5,10,16],[4,5,12,16],[4,6,9,14],[4,6,10,13],[4,7,8,9],[4,7,11,12],[4,8,13,15],[4,11,14,15],[5,8,10,14],[5,9,12,15],[6,9,11,16],[6,10,11,13],[7,8,14,16],[7,12,13,15]];
G[88]:=Group([(2,3,4)(5,13,16)(6,14,15)(7,9,10)(8,12,11)]);
R[88]:=[];
RG[88]:=[];
# Design 88 / Resolution 1: autom. group order 3, decomposable
R[88][1]:=[[1,35,37,40],[2,36,38,39],[3,17,25,34],[4,18,26,32],[5,14,20,33],[6,15,19,30],[7,13,23,28],[8,12,22,31],[9,11,24,29],[10,16,21,27]];
RG[88][1]:=Group([(2,4,3)(5,16,13)(6,15,14)(7,10,9)(8,11,12)]);