Given a list of phone numbers, determine if it is consistent in the sense that no number is the prefix of another. Let’s say the phone catalogue listed these numbers:
Alice 97 625 999
Bob 91 12 54 26
In this case, it’s not possible to call Bob, because the central would direct your call to the emergency line as soon as you had dialled the first three digits of Bob’s phone number. So this list would not be consistent.
The first line of input gives a single integer, $1 \le t \le 40$, the number of test cases. Each test case starts with $n$, the number of phone numbers, on a separate line, $1 \leq n \leq 10\, 000$. Then follows $n$ lines with one unique phone number on each line. A phone number is a sequence of at most ten digits. Note that leading zeros in phone numbers are significant, e.g., “0911” is a different phone number than “911”.
For each test case, output “YES” if the list is consistent, or “NO” otherwise.
|Sample Input 1||Sample Output 1|
2 3 911 97625999 91125426 5 113 12340 123440 12345 98346