# Proving NP hard by polynomial reduction to 3SAT

I know the correct way of proving NP hard of a problem X is to reduce a known NP-Hard problem to X i.e. the direction is from the known, harder problem to the problem we want to prove is NP-Hard. But all NP-Complete problems are polynomially related (one can be transformed into the other in polynomial time), so I would like to ask if it's correct to assert that a problem is NP-Hard when it can be polynomially reduced to 3SAT?

• You can "reduce" trivial problems to 3SAT too. – Damien_The_Unbeliever Dec 15 '17 at 9:21
• Might be better asked on one of the CS Exchange sites (not sure which one though - you'd have to read their help and existing questions to see which is a better fit) – Damien_The_Unbeliever Dec 15 '17 at 10:25
• It doesn't seem intuitive to me. How could a problem X not be as hard as another problem (3SAT) if it could be transformed to 3SAT in polynomial time? Could you explain a bit on this? Thanks! – ccying Dec 15 '17 at 12:59
• Have you ever overcomplicated a solution to a problem, only to be told that there are far simpler ways to accomplish your goal? In a similar fashion, you can take a problem with a solution in P and transform it into, say, a 3SAT problem. Whilst solving the 3SAT instance would solve the original problem, it's doing it in an overcomplicated way. So proving you can transform problems into 3SAT problems demonstrates that they're no harder than solving 3SAT, but says nothing about whether they are easier to solve. – Damien_The_Unbeliever Dec 15 '17 at 13:07
• Got it, thanks! – ccying Dec 15 '17 at 14:01