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Explanation:

Let us form a group X of Mr. and Mr. Ahuja. They can be arranged in 2! = 2 ways.

Now, X and 4 other persons can be seated around a circle in 4! = 24 ways.

Now we have total 5 people (X is counted as 1 only, no one should sit between Ahujaas) and there are 5 places between these 5 people for Mr. and Mrs. Sharma to sit.

We need to select 2 of these 5 places for Mr. and Mrs. Sharma. This can be done in 5C2 = 10 ways.
Mr. and Mrs. Sharam can sit in these 2 places in 2! = 2 ways.

∴ Total number of ways = 2 × 24 × 10 × 2 = 960.

Hence, 960.

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