After the Ferries Wheel, many friends hope to receive the Misaki's kiss again,so Misaki numbers them $1,2...N-1,N$,if someone's number is M and satisfied the $GCD(N, M)$ equals to $N$ XOR $M$,he will be kissed again.
Please help Misaki to find all $M(1<=M<=N)$.
Note that:
$GCD(a, b)$ means the greatest common divisor of $a$ and $b$.
$A$ XOR $B$ means $A$ exclusive or $B$
Input
There are multiple test cases.
For each testcase, contains a integets $N (0 < N <= {10}^{10})$
Output
For each test case,
first line output Case #X:,
second line output $k$ means the number of friends will get a kiss.
third line contains $k$ number mean the friends' number, sort them in ascending and separated by a space between two numbers
Sample Input
3
5
15
Sample Output
Case #1:
1
2
Case #2:
1
4
Case #3:
3
10 12 14
Hint
In the third sample, gcd(15,10)=5 and (15 xor 10)=5, gcd(15,12)=3 and (15 xor 12)=3,gcd(15,14)=1 and (15 xor 14)=1
