let K be Field; :: thesis: for M1, M2 being Matrix of K st len M1 = len M2 & width M1 = width M2 holds
- (M1 + M2) = (- M1) + (- M2)
let M1, M2 be Matrix of K; :: thesis: ( len M1 = len M2 & width M1 = width M2 implies - (M1 + M2) = (- M1) + (- M2) )
assume A1: ( len M1 = len M2 & width M1 = width M2 ) ; :: thesis: - (M1 + M2) = (- M1) + (- M2)
A2: ( len (- M1) = len M1 & width (- M1) = width M1 ) by MATRIX_3:def 2;
A3: ( len (- M2) = len M2 & width (- M2) = width M2 ) by MATRIX_3:def 2;
A4: ( len (M1 + M2) = len M1 & width (M1 + M2) = width M1 ) by MATRIX_3:def 3;
A5: ( len ((- M1) + (- M2)) = len M1 & width ((- M1) + (- M2)) = width M1 ) by A2, MATRIX_3:def 3;
per cases ( len M1 > 0 or len M1 = 0 ) by NAT_1:3;
suppose A6: len M1 > 0 ; :: thesis: - (M1 + M2) = (- M1) + (- M2)
then A7: M2 is Matrix of len M1, width M1,K by A1, MATRIX_1:20;
A8: M1 is Matrix of len M1, width M1,K by A6, MATRIX_1:20;
(M1 + M2) + ((- M1) + (- M2)) = (M1 + M2) + ((- M2) + (- M1)) by A1, A2, A3, MATRIX_3:4
.= ((M1 + M2) + (- M2)) + (- M1) by A1, A2, A3, A4, MATRIX_3:5
.= (M1 + (M2 + (- M2))) + (- M1) by A1, A3, MATRIX_3:5
.= (M1 + (0. K,(len M1),(width M1))) + (- M1) by A7, MATRIX_3:7
.= M1 + (- M1) by A8, MATRIX_3:6
.= 0. K,(len M1),(width M1) by A8, MATRIX_3:7 ;
hence - (M1 + M2) = (- M1) + (- M2) by A4, A5, Th8; :: thesis: verum
end;
suppose A9: len M1 = 0 ; :: thesis: - (M1 + M2) = (- M1) + (- M2)
then len (M1 + M2) = 0 by MATRIX_3:def 3;
then A10: len (- (M1 + M2)) = 0 by MATRIX_3:def 2;
len (- M1) = 0 by A9, MATRIX_3:def 2;
then len ((- M1) + (- M2)) = 0 by MATRIX_3:def 3;
hence - (M1 + M2) = (- M1) + (- M2) by A10, CARD_2:83; :: thesis: verum
end;
end;