Given: 15 members are sitting around a circular table such that the secretary and deputy secretary on either side of the chairman Let us consider the secretary, chairman and deputy secretary as one group. So, the total number of members now = 13 As we know, the number of ways to arrange n distinct things in a circular arrangement is given by: (n - 1)!. So, these 13 members can sit in a circular table in 12! ways. The group consisting of secretary, chairman and deputy secretary can be arranged in 2 ways such that the secretary and deputy secretary on either side of the chairman. So, 2 × 12! ways are there in 15 members can sit in a circular table such that the secretary and deputy secretary on either side of the chairman. Hence, option C is the correct answer.