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2 votes
A mixed pair in a tennis match consists of 1 man and 1 woman. To form the team you have to select 4 pairs of 1 man and 1 woman.So there'll always be 4 men and 4 women in team. Hence your approach is incorrect.

So suppose you have 5 men: M1, M2, M3, M4, M5 and 5 women: W1, W2, W3, W4, W5

Now, for first pair if you select a man, you have 5 options for women to form a team.

For second pair, if you select a man, you have 4 options for women (one women already formed the team, so she can't be included in any other team)

Similarly, for 3rd pair, you have 3 options and 4th pair you have 2 options.

Now from 5 men, you have to select 4 [e.g.you can select M1, M2, M3, M4 or M2, M3, M4, M5 or ... ] i.e., $5 \choose 4$

So total possible number of selections:  $5 \choose 4$ * 5 * 4 * 3 * 2 = 5 * 120 = 600
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3 votes

Here, they are asking In how many ways the pairing can be done?

First, select 4 men and 4 women. Thaat can be done $\binom{5}{4}$ * $\binom{5}{4}$

Now, once selected, they can be arranged in 4! ways (i.e. onto functions from 4 men to 4 women)

So, asnwer = $\binom{5}{4}$ * $\binom{5}{4}$ * 4! ways

                 = 600 ways

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