Complement
Let M = < Q ,,q0 , , A > be a DFA that accepts a language L.
Then a DFA that accepts the complement of L, i.e. * - L, can be obtained by swapping its accepting states with its non-accepting states, that is Mc = < Q , , q0 , , Q - A > is a DFA that accepts * - L .
For example the following DFA accepts the language a+ over = { a , b }.
A DFA that accepts its complement is obtained from the above DFA by changing all single circles to double circles and vice versa as shown below.
Remark 1: If we have NFA rather than DFA, we must first convert it to DFA before swapping states to get its complement.
Remark 2: Since a language is regular if and only if it is accepted by some NFA, the complement of a regular language is also regular.
So C is correct.
Ref: https://www.cs.odu.edu/~toida/nerzic/390teched/regular/fa/complement.html