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Doctors Medicines MCQs Q&A

Eight Board of Directors B, M, N, D, P, C, R and E are sitting around a round table facing the centre at equal distance from each other, but not necessarily in the same order. D is to the immediate right of B and third to the left of P. M is the immediate neighbour of C but not of N. P is the immediate neighbour of E and second to the right of M. N is not the neighbour of B. Who is sitting diagonally opposite to M?

Eight Board of Directors B, M, N, D, P, C, R and E are sitting around a round table facing the centre at equal distance from each other, but not necessarily in the same order. D is to the immediate right of B and third to the left of P. M is the immediate neighbour of C but not of N. P is the immediate neighbour of E and second to the right of M. N is not the neighbour of B. Who is sitting diagonally opposite to M? Correct Answer N

D is immediate right of B.

D is third left of P.

P is second right to M.

M is immediate neighbor of C.

P  is the immediate neighbor of E and N is not the neighbor of B.

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">

N  is sitting diagonally opposite to M.

Hence, the correct answer is "N".

Related Questions

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