Difference between revisions of "2009 Indonesia MO Problems/Problem 4"
Victorzwkao (talk | contribs) (Created page with "==Solution== Suppose that among the 7 vertices, each has a degree of 3. Then the total amount of edges will be <math>\frac{7\cdot 3}{2}</math>, which isn't an integer. Theref...") |
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− | <math>F</math> has a degree of 3 or more. If <math>F</math> is connected to at least 2 elements from set <math>S</math>, then | + | <math>F</math> has a degree of 3 or more. If <math>F</math> is connected to at least 2 elements from set <math>S</math>, then <math>A</math>, <math>F</math>, and these 2 vertices will form a loop with 4 elements. For example, if <math>F</math> is connected to <math>B</math> and <math>C</math>, then <math>A-B-F-C-A</math> will form a loop. |
− | The only way for <math>F</math> to connect to 3 other vertices is by having an edge between <math>FG</math>, an edge between <math>AF</math>, and an edge between <math>F</math> and one of the vertices from set <math>S</math>. WLOG, let <math>FB</math> be the edge. | + | The only way for <math>F</math> to connect to 3 other vertices without forming a 4-vertices loop is by having an edge between <math>FG</math>, an edge between <math>AF</math>, and an edge between <math>F</math> and one of the vertices from set <math>S</math>. WLOG, let <math>FB</math> be the edge. |
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− | Similar to <math>F</math>, <math>G</math> also connects to 3 other vertices. If <math>G</math> connects to 2 vertices from <math>S</math>, then <math>A</math>, <math>G</math>, and the 2 vertices will again form a 4 | + | Similar to <math>F</math>, <math>G</math> also connects to 3 other vertices. If <math>G</math> connects to 2 vertices from <math>S</math>, then <math>A</math>, <math>G</math>, and the 2 vertices will again form a 4-vertices loop. However, if <math>G</math> forms an edge with <math>A</math>, <math>A-B-F-G-A</math> will again be a 4-vertices loop. Thus, it's impossible to have <math>G</math> form an edge with 2 other vertices without creating a 4-vertices loop. |
Latest revision as of 12:37, 18 September 2024
Solution
Suppose that among the 7 vertices, each has a degree of 3. Then the total amount of edges will be , which isn't an integer. Therefore, at least one vertex has a minimal degree of 4.
WLOG, let be the vertex with a degree of 4 or more. must be connected to at least 4 other vertices, name them , , , and , and name the set that contains these 4 vertices .
has a degree of 3 or more. If is connected to at least 2 elements from set , then , , and these 2 vertices will form a loop with 4 elements. For example, if is connected to and , then will form a loop.
The only way for to connect to 3 other vertices without forming a 4-vertices loop is by having an edge between , an edge between , and an edge between and one of the vertices from set . WLOG, let be the edge.
Similar to , also connects to 3 other vertices. If connects to 2 vertices from , then , , and the 2 vertices will again form a 4-vertices loop. However, if forms an edge with , will again be a 4-vertices loop. Thus, it's impossible to have form an edge with 2 other vertices without creating a 4-vertices loop.