100811: [AtCoder]ABC081 B - Shift only
Description
Score : $200$ points
Problem Statement
There are $N$ positive integers written on a blackboard: $A_1, ..., A_N$.
Snuke can perform the following operation when all integers on the blackboard are even:
- Replace each integer $X$ on the blackboard by $X$ divided by $2$.
Find the maximum possible number of operations that Snuke can perform.
Constraints
- $1 \leq N \leq 200$
- $1 \leq A_i \leq 10^9$
Input
Input is given from Standard Input in the following format:
$N$ $A_1$ $A_2$ ... $A_N$
Output
Print the maximum possible number of operations that Snuke can perform.
Sample Input 1
3 8 12 40
Sample Output 1
2
Initially, $[8, 12, 40]$ are written on the blackboard. Since all those integers are even, Snuke can perform the operation.
After the operation is performed once, $[4, 6, 20]$ are written on the blackboard. Since all those integers are again even, he can perform the operation.
After the operation is performed twice, $[2, 3, 10]$ are written on the blackboard. Now, there is an odd number $3$ on the blackboard, so he cannot perform the operation any more.
Thus, Snuke can perform the operation at most twice.
Sample Input 2
4 5 6 8 10
Sample Output 2
0
Since there is an odd number $5$ on the blackboard already in the beginning, Snuke cannot perform the operation at all.
Sample Input 3
6 382253568 723152896 37802240 379425024 404894720 471526144
Sample Output 3
8