let n be Nat; :: thesis: ( n > 0 implies [\(log 2,(2 * n))/] = [\(log 2,((2 * n) + 1))/] )
set l22n = log 2,(2 * n);
set l22np1 = log 2,((2 * n) + 1);
assume A1: n > 0 ; :: thesis: [\(log 2,(2 * n))/] = [\(log 2,((2 * n) + 1))/]
then ( [\(log 2,((2 * n) + 1))/] <> [\(log 2,(2 * n))/] + 1 & [\(log 2,((2 * n) + 1))/] <= [\(log 2,(2 * n))/] + 1 ) by Th13, Th14;
then [\(log 2,((2 * n) + 1))/] < [\(log 2,(2 * n))/] + 1 by XXREAL_0:1;
then A2: [\(log 2,((2 * n) + 1))/] <= ([\(log 2,(2 * n))/] + 1) - 1 by INT_1:20;
2 * 0 < 2 * n by A1, XREAL_1:70;
then log 2,(2 * n) <= log 2,((2 * n) + 1) by Th12, NAT_1:11;
then [\(log 2,(2 * n))/] <= [\(log 2,((2 * n) + 1))/] by Th11;
hence [\(log 2,(2 * n))/] = [\(log 2,((2 * n) + 1))/] by A2, XXREAL_0:1; :: thesis: verum