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Chapter 11: Problem 53

You volunteer to help drive children at a charity event to the zoo, but you can fit only 8 of the 17 children present in your van. How many different groups of 8 children can you drive?

Short Answer

Expert verified
There are 24310 different groups of 8 children you can drive from a group of 17 children.

Step by step solution

01

Identify the variables

First identify the number of children you're choosing from, \(n\), and the number of children you're choosing, \(k\). In this case, \(n = 17\) and \(k = 8\).
02

Apply the combination formula

Next, apply the values to the formula for combinations. Given by \(C(n, k) = \frac{n!}{k!(n-k)!}\) substituting \(n = 17\) and \(k = 8\), we get: \(C(17, 8) = \frac{17!}{8!(17-8)!}\)
03

Evaluate the factorials

Evaluate 17!, 8! and 9! (17-8). The factorial of a number is the product of all positive integers less than or equal to that number.
04

Plug in the values and compute

After computing the factorials, plug them into the formula and simplify to get the result. You divide the product of integers from 1 to 17 by the product of integers from 1 to 8 and 1 to 9. The result will give you the number of different groups of 8 children that can be selected from 17 children.
05

Interpret the result

The result gotten from step 4 is the number of different ways you can select 8 children from a group of 17 children. This is the solution to the problem.

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