let a, b be Real; ( a > 0 & a <> 1 & b > 0 implies - (log (a,b)) = log (a,(1 / b)) )
assume that
A1:
a > 0
and
A2:
a <> 1
and
A3:
b > 0
; - (log (a,b)) = log (a,(1 / b))
thus - (log (a,b)) =
0 - (log (a,b))
.=
(log (a,1)) - (log (a,b))
by A1, A2, POWER:51
.=
log (a,(1 / b))
by A1, A2, A3, POWER:54
; verum