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ONEZERO - Ones and zeros |
Certain positive integers have their decimal representation consisting only of ones and zeros, and having at least one digit one, e.g. 101. If a positive integer does not have such a property, one can try to multiply it by some positive integer to find out whether the product has this property.
Input
Number K of test cases (K is approximately 1000);
In each of the next K lines there is one integer n (1 ≤ n ≤ 20000)
Output
For each test case, your program should compute the smallest multiple of the number n consisting only of digits 1 and 0 (beginning with 1).
Example
Input: 3 17 11011 17 Output: 11101 11011 11101
Added by: | Paweł Dobrzycki |
Date: | 2005-05-26 |
Time limit: | 8s |
Source limit: | 4096B |
Memory limit: | 1536MB |
Cluster: | Cube (Intel G860) |
Languages: | All except: NODEJS PERL6 VB.NET |
Resource: | II Polish Olympiad in Informatics, Ist Stage |
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2024-12-12 09:24:06
listen to @wttc Last edit: 2024-12-12 09:24:18 |
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2023-01-20 09:18:35
go to Errichto youtube channel, he's explained in depth. |
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2022-06-01 10:32:00
@aryan__0406 If n = 8, the result will be 1000 |
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2021-08-11 13:57:28
The question is good but I/O bounds should have been mentioned more clearly. Since the questioner has not bothered to provide that information let me provide it to you. Input 1 <= n <= 20000 Output may not fit in long long int |
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2020-10-11 09:18:22
simple bfs to consider all possible permutations of 0 and 1, starting with 1. :) |
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2020-06-27 01:56:52
it is beautiful to understand a proof that an answer always exists |
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2020-06-12 13:16:16
can anyone explain the algorithm |
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2020-05-30 16:06:17
ez from LMH |
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2020-05-07 23:48:13
Good Question. Worth it! |
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2020-05-06 20:47:27
Every number till 20000 don't have such property such as 8.So in test cases only those numbers will be given which are valid.So chill! |