What is the complexity for converting any propositional formula to CNF format? Is it an NP-complete problem?

The standard algorithm to transform a general Well-Formed Formula to an **equivalent** CNF has an *exponential run time*, since in the worst case a n-clauses WFF is equivalento to a 2^n-clauses CNF.

However, you can transform *in polynomial time* an arbitrary boolean formula into a CNF that is **not stricty equivalent, but satisfable only if the boolean formula is satisfable**. This is the standard reduction used to prove that 3CNF is NP-complete, givent that the more general SAT is NP-complete. See here.