- #1
AxiomOfChoice
- 533
- 1
If I know:
[itex]|A \cup B \cup C|[/itex] = 1000
[itex]|A|[/itex] = 344
[itex]|B|[/itex] = 572
[itex]|C|[/itex] = 296
[itex]|A \cap B|[/itex] = 301
[itex]|B \cap C|[/itex] = 252
[itex]|A \cap C|[/itex] = 213
and I use the standard formula to compute [itex]|A \cap B \cap C|[/itex], I get 554, which is absurd. Can someone tell me what's wrong here? Is there something inconsistent in the initial data we're given? If so, I can't find it...
[itex]|A \cup B \cup C|[/itex] = 1000
[itex]|A|[/itex] = 344
[itex]|B|[/itex] = 572
[itex]|C|[/itex] = 296
[itex]|A \cap B|[/itex] = 301
[itex]|B \cap C|[/itex] = 252
[itex]|A \cap C|[/itex] = 213
and I use the standard formula to compute [itex]|A \cap B \cap C|[/itex], I get 554, which is absurd. Can someone tell me what's wrong here? Is there something inconsistent in the initial data we're given? If so, I can't find it...