Four ambassadors and one advisor for each of them are to be seated at a round table with \(12\) chairs numbered in order \(1\) to \(12\). Each ambassador must sit in an even-numbered chair. Each advisor must sit in a chair adjacent to his or her ambassador. There are \(N\) ways for the \(8\) people to be seated at the table under these conditions. Find the remainder when \(N\) is divided by \(1000\).