Its a class of problems. The class P consists of those problems that are solvanle in polynomial time. For example, they could be solved in O(n^k) for some constant k, where n is the size of the input. Simply put, you can write a program that will run in *reasonable* time.

The class NP consists of those problems that are **verifiable** in polynomial time. That is, if we are given a potential solution then we could check if the given solution is correct in polynomial time.

Some examples are the Boolean Satisfiability (SAT) problem, or the Hamiltonian-cycle problem. There are many problems that are known to be in the class NP. NP-complete means the problem is as hard as any problem in NP. 

It is important to computer science because it has been proven that any problem in NP can be *transformed* into another problem in NP. That means that a solution to any one NP-complete problem is a solution to all NP problems.

Many algorithms in security depends on the fact that no known solutions exist for NP hard problems. It would definitely have a significant impact on computing if a solution were found.