Answer:
There are 18,525 ways to choose at least one of the junior partners to be on the committee.
Explanation:
If all partners can be chosen in any way the choices would be combinations of any 3 partners from all 51 partners. The number of ways to arrange it would be:
A = [tex]{51 \choose 3} = \frac{51!}{3!(51-3)!} = 20,825[/tex]
The opposite of choosing at least one junior partner is to choose no junior partner. Those choices would be combinations of any 3 partners from 25 senior partners. The number of ways to arrange it would be
B = [tex]{25 \choose 3} = \frac{25!}{3!(25-3)!} = 2,300[/tex]
So the number of ways to choose at least one of the junior partners to be on the committee would be: A - B = 20,825 - 2,300 = 18,525
There are 18,525 ways to choose at least one of the junior partners to be on the committee.
A combination is a selection of all or part of a set of objects, without regard to the order in which objects are selected.
If all partners can be chosen in any way the choices would be combinations of any 3 partners from all 51 partners. The number of ways to arrange it would be:
A
= ( 5/3 )
= 5! / 3!( 51 - 3)!
= 20,825
The opposite of choosing at least one junior partner is to choose no junior partner. Those choices would be combinations of any 3 partners from 25 senior partners. The number of ways to arrange it would be
B
= ( 25 / 3)
= 25! / 3! ( 23 - 3) !
= 2,300
Hence, the number of ways to choose at least one of the junior partners to be on the committee would be:
= A - B
= 20,825 - 2,300
= 18,525
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