I am trying to understand the relation between these classes of languages. Can someone do some order in my way of thinking of this? For example, if i take the language HAMPATH = {: G has a hamiltonion path}. I know this is in NP and also NP hard. Does this teach me anything about being in R, RE coRE? is there any connection between them?

All problems in **P**, **NP**, and co-**NP** are decidable, so all of these classes are strict subsets of **R**. It's known that **R** is a strict subset of both **RE** and co-**RE** and, furthermore, that **R** = **RE** ∩ co-**RE**.

There's a nice intuitive connection between these classes. The definitions of **R**, **RE**, and co-**RE** can essentially be described as

**R**languages are languages that can be decided.**RE**languages are languages that have verifiers.- co-
**RE**languages are languages whose complements are in**RE**.

The definitions of **P**, **NP**, and co-**NP** are

**P**languages are languages that can be decided*in polynomial time*.**NP**languages are languages that have verifiers*that run in polynomial time*.- co-
**NP**languages are languages whose complements are in**NP**.

In a sense, you can go from one class of languages to the other by adding or removing a polynomial-time restriction. (This also helps explain the containments).

possibilityof getting an answer at all.