Right. In order to satisfy all of those statements about Jim simultaneously, you need a nonstandard model of number theory. And generally we want our statements to be interpreted according to the standard model of number theory (which sort of makes numbers part of the "logic" rather than the thing the logic is operating on).

Perhaps LessWrong is a place where I can say "Your question is wrong" without causing unintended offense. (And none is intended.)

Yes, for ω-consistency to even be defined for a theory it must interpret the language of arithmetic. This is a necessary precondition for the statement you quoted, and does not contradict it.

Work in PA, and take a family of statements P(n) where each P(n) is true but independent of PA, and not overly simple statements themselves---say, P(n) is "the function epsilon n in the fast growing hierarchy is a total function". (The important thing here is that the statement is at least Pi2---true pure existence statements are always provable, and if the statements were universal there would be a different ω-consistency problem. The exact statement isn't so important, but not that these statements are true, but not provable in PA.)

Now consider the statement T="there is an n such that P(n) is false". PA+T has no standard model (because T is false), but PA+T doesn't prove any of the P(n), let alone all of them, so there's no ω-consistency problem.