Codeforces Global Round 1 |
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Finished |
You are given two integers $$$l$$$ and $$$r$$$.
Let's call an integer $$$x$$$ modest, if $$$l \le x \le r$$$.
Find a string of length $$$n$$$, consisting of digits, which has the largest possible number of substrings, which make a modest integer. Substring having leading zeros are not counted. If there are many answers, find lexicographically smallest one.
If some number occurs multiple times as a substring, then in the counting of the number of modest substrings it is counted multiple times as well.
The first line contains one integer $$$l$$$ ($$$1 \le l \le 10^{800}$$$).
The second line contains one integer $$$r$$$ ($$$l \le r \le 10^{800}$$$).
The third line contains one integer $$$n$$$ ($$$1 \le n \le 2\,000$$$).
In the first line, print the maximum possible number of modest substrings.
In the second line, print a string of length $$$n$$$ having exactly that number of modest substrings.
If there are multiple such strings, print the lexicographically smallest of them.
1 10 3
3 101
1 11 3
5 111
12345 12346 6
1 012345
In the first example, string «101» has modest substrings «1», «10», «1».
In the second example, string «111» has modest substrings «1» ($$$3$$$ times) and «11» ($$$2$$$ times).
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