let x, y, z be ExtReal; ( y <= 0 & z <= 0 implies x * (y + z) = (x * y) + (x * z) )
assume A1:
( y <= 0 & z <= 0 )
; x * (y + z) = (x * y) + (x * z)
thus x * (y + z) =
- (- (x * (y + z)))
.=
- (x * (- (y + z)))
by Th92
.=
- (x * ((- y) + (- z)))
by Th9
.=
- ((x * (- y)) + (x * (- z)))
by A1, Th96
.=
- ((- (x * y)) + (x * (- z)))
by Th92
.=
- ((- (x * y)) + (- (x * z)))
by Th92
.=
- (- ((x * y) + (x * z)))
by Th9
.=
(x * y) + (x * z)
; verum