let n be Nat; ( n > 0 implies [\(log (2,n))/] + 1 = [\(log (2,((2 * n) + 1)))/] )
assume A1:
n > 0
; [\(log (2,n))/] + 1 = [\(log (2,((2 * n) + 1)))/]
then [\(log (2,((2 * n) + 1)))/] =
[\(log (2,(2 * n)))/]
by Th13
.=
[\((log (2,2)) + (log (2,n)))/]
by A1, POWER:53
.=
[\((log (2,n)) + 1)/]
by POWER:52
.=
[\(log (2,n))/] + 1
by INT_1:28
;
hence
[\(log (2,n))/] + 1 = [\(log (2,((2 * n) + 1)))/]
; verum