let x be FinSequence of REAL ; for A being Matrix of REAL st len A = len x & len x > 0 & width A > 0 holds
(- x) * A = - (x * A)
let A be Matrix of REAL ; ( len A = len x & len x > 0 & width A > 0 implies (- x) * A = - (x * A) )
assume that
A1:
len A = len x
and
A2:
len x > 0
and
A3:
width A > 0
; (- x) * A = - (x * A)
A4:
(A @ ) * x = x * A
by A1, A2, A3, MATRIXR1:52;
A5:
width (A @ ) = len x
by A1, A3, MATRIX_2:12;
then A6:
(A @ ) * (- x) = (- 1) * ((A @ ) * x)
by A2, MATRIXR1:59;
A7:
len (- x) = len x
by RVSUM_1:144;
len (A @ ) > 0
by A3, MATRIX_2:12;
then
(- x) * ((A @ ) @ ) = (A @ ) * (- x)
by A2, A5, A7, MATRIXR1:53;
hence
(- x) * A = - (x * A)
by A1, A2, A3, A6, A4, MATRIX_2:15; verum