reserve i,j for Nat;

theorem Th16:
  for K being Ring,M1,M2,M3 being Matrix of K st len M1=len M2 &
len M2=len M3 & width M1=width M2 & width M2 = width M3 holds M1 - M2 - M3 = M1
  - M3 - M2
proof
  let K be Ring,M1,M2,M3 be Matrix of K;
  assume that
A1: len M1=len M2 and
A2: len M2=len M3 and
A3: width M1=width M2 and
A4: width M2 = width M3;
A5: len (-M3)=len M3 & width (-M3)=width M3 by MATRIX_3:def 2;
A6: len (-M2)=len M2 & width (-M2)=width M2 by MATRIX_3:def 2;
  hence M1 - M2 - M3 =M1+(-M2+-M3) by A1,A3,MATRIX_3:3
    .=M1+(-M3+-M2) by A2,A4,A6,A5,MATRIX_3:2
    .= M1 - M3 - M2 by A1,A2,A3,A4,A5,MATRIX_3:3;
end;
