How can I find 2-approximate solution for a problem of determining a maximum subgraph with no cycles of an oriented graph? Subgraph is "maximum" if it contains the maximal number of edges amongst other graphs that bear the same property.
2-approximate means that we can build 2 times smaller graph than the optimal one. That's quite a big constraint reduction and should lead to quite a dumb algorithm that--wow!--turns out to be only twice worse than the exact solution.
[That's a problem from the exam I passed recently. Not a homework anymore.]