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I I U C O N L I N E C O N T E S T 2 0 0 8 |
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Problem C: The 3-Regular Graph |
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Input: standard input Output: standard output |
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The degree of a vertex in a graph is the number of edges adjacent to the vertex. A graph is 3-regular if all of its vertices have degree 3. Given an integer n, you are to build a simple undirected 3-regular graph with n vertices. If there are multiple solutions, any one will do.
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Input |
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For each test case, the input will be a single integer n as described above. End of input will be denoted by a case where n = 0. This case should not be processed.
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Output |
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If it is possible to build a simple undirected 3-regular graph with n vertices, print a line with an integer e which is the number of edges in your graph. Each of the following e lines describes an edge of the graph. An edge description contains two integers a & b, the two endpoints of the edge. Note that the vertices are indexed from 1 to n. If it is not possible to build a simple undirected 3-regular graph with n vertices, print Impossible in a single line.
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Constraints |
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- 1 ≤ n ≤ 100
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Sample Input |
Output for Sample Input |
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4 3 0 |
6 1 2 1 3 1 4 2 3 2 4 3 4 Impossible |
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Problem setter: Manzurur Rahman Khan Original idea: Mohammad Mahmudur Rahman |
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