## Interior points of a set

Hello!

1. The problem statement, all variables and given/known data
Find the interior of each set.

a.) {1/n : n$$\in$$N}

b.) [0,3]$$\cup$$(3,5)

c.) {r$$\in$$Q:0<r<$$\sqrt{2}$$}

d.) [0,2]$$\cap$$[2,4]

I understand that b.)'s interior points are (0,5). I don't understand why the rest have int = empty set.

By definition, if there exist a neighborhood N of x such that N$$\subseteq$$S, then x is an interior point of S. So for part d.), any points between 0 and 2 are, if I understand correctly, interior points. But the solution says that part d.)'s set of interior points is an empty set. Why is this?

Thank you

M
2. Relevant equations

3. The attempt at a solution

 PhysOrg.com science news on PhysOrg.com >> 'Whodunnit' of Irish potato famine solved>> The mammoth's lament: Study shows how cosmic impact sparked devastating climate change>> Curiosity Mars rover drills second rock target
 d) The set is an intersection of two sets. 0 for example is in only one set, but not the other, so it's not in the intersection. First think about what points are actually in the set, then try to figure out the interior.
 Recognitions: Homework Help it also helps clear on what sets are open. In this case, i'm guessing the sets are all considered as subsets of R with the usual definition of open sets. this may seem like a trivial comment, but is important ;)