theorem Th76:
  for o being OperSymbol of S st
  o = In((the connectives of S).12, the carrier' of S)
  holds the_arity_of o = <*the_array_sort_of S,I,I*> &
  the_result_sort_of o = the_array_sort_of S
  proof
    let o be OperSymbol of S;
    assume A1: o = In((the connectives of S).12, the carrier' of S);
    11+3 <= len the connectives of S by AOFA_A00:def 51;
    then 12 <= len the connectives of S by XXREAL_0:2;
    then 12 in dom the connectives of S by FINSEQ_3:25;
    then o = (the connectives of S).12 by A1,FUNCT_1:102,SUBSET_1:def 8;
    then o is_of_type <*the_array_sort_of S,I,I*>, the_array_sort_of S
    by Th73;
    hence the_arity_of o = <*the_array_sort_of S,I,I*> &
    the_result_sort_of o = the_array_sort_of S;
  end;
