To solve this problem, we need to use the combination formula, which is used when the order of selection does not matter. The formula is:

C(n, k) = n! / [k!(n-k)!]

Where:
- n is the total number of items (in this case, 15 employees)
- k is the number of items to choose (in this case, 3 employees)
- "!" denotes a factorial, meaning the product of all positive integers up to that number.

Substituting these into the formula gives:

C(15, 3) = 15! / [3!(15-3)!] = (15*14*13) / (3*2*1) = 455

So there are 455 different ways to select the top three outstanding employees from a group of 15 employees.

Question

To solve this problem, we need to use the combination formula, which is used when the order of selection does not matter. The formula is:

C(n, k) = n! / [k!(n-k)!]

Where:
- n is the total number of items (in this case, 15 employees)
- k is the number of items to choose (in this case, 3 employees)
- "!" denotes a factorial, meaning the product of all positive integers up to that number.

Substituting these into the formula gives:

C(15, 3) = 15! / [3!(15-3)!] = (15*14*13) / (3*2*1) = 455

So there are 455 different ways to select the top three outstanding employees from a group of 15 employees.

Knowee AI · Accepted Answer

To solve this problem, we need to use the combination formula, which is used when the order of selection does not matter. The formula is:

C(n, k) = n! / [k!(n-k)!]

Where:
- n is the total number of items (in this case, 15 employees)
- k is the number of items to choose (in this case, 3 employees)
- "!" denotes a factorial, meaning the product of all positive integers up to that number.

Substituting these into the formula gives:

C(15, 3) = 15! / [3!(15-3)!] = (15*14*13) / (3*2*1) = 455

So there are 455 different ways to select the top three outstanding employees from a group of 15 employees.

The company needs to select the top three outstanding employees from 15 employees. How many selection methods are there?

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