There are, 20475 different groups are possible if the manager wants to select one group of 4 people from his 28 assistants.
A permutation is the number of different ways a set can be organized; order matters in permutations, but not in combinations.
We have:
A manager wants to select one group of 4 people from his 28 assistants.
The total number of groups possible = C(28, 4)
[tex]= \rm \dfrac{28!}{4!(28-4)!}[/tex]
After calculating:
= 20475
Thus, there are, 20475 different groups are possible if the manager wants to select one group of 4 people from his 28 assistants.
Learn more about permutation and combination here:
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