The correct answer is $\boxed{pq}$.
Let $A$ be the event that a computer is faulty and $B$ be the event that a computer is declared faulty. We are given that $P(A) = p$ and $P(B|A) = q$. We want to find $P(A \cap B)$.
By the definition of conditional probability, $P(B|A) = \frac{P(A \cap B)}{P(A)}$. Substituting in the given values, we get $q = \frac{P(A \cap B)}{p}$. Multiplying both sides by $p$, we get $pq = P(A \cap B)$.
Therefore, the probability of a computer being declared faulty is $pq$.
Option A is incorrect because it includes the term $(1 – p) (1 – q)$. This term represents the probability that a computer is not faulty and the testing process gives a correct result. This is not the event that we are interested in.
Option B is incorrect because it is the probability that a computer is not faulty. This is not the event that we are interested in.
Option C is incorrect because it is the probability that a computer is faulty and the testing process gives an incorrect result. This is not the event that we are interested in.