Question

1. a contractor is installing a new door. there are six styles of doors, three different finishes, and eight door handles to choose from. how many doors are possible?

type __________
explanation: __________

1. samson is the hiring manager at costco. she needs to hire 5 new employees. twenty seven people have applied to work at costco. in how many ways can she fill the five new positions?

type __________
explanation: __________

1. you roll a six - sided die three times. how many outcomes are there?

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explanation: __________

1. selina has x items in her lunch box. she is going to pull out one item from her lunch box. is this a permutation or a combination? explain.

Explanation:

Problem 5 (Door Installation)

Step1: Identify the principle

We use the multiplication principle of counting. If there are \( n_1 \) ways to do one thing, \( n_2 \) ways to do a second thing, and \( n_3 \) ways to do a third thing, the total number of ways to do all three things together is \( n_1\times n_2\times n_3 \). Here, \( n_1 = 6 \) (styles), \( n_2=3 \) (finishes), \( n_3 = 8 \) (handles).

Step2: Calculate the total number

Multiply the number of options for each category: \( 6\times3\times8 \)
First, \( 6\times3 = 18 \), then \( 18\times8=144 \)

Step1: Determine the type of problem

This is a permutation or combination problem. Since the order in which we hire employees (i.e., assigning different positions) might matter (assuming different positions are distinct), we use permutations. The formula for permutations is \( P(n,r)=\frac{n!}{(n - r)!} \), where \( n = 27 \) (total applicants) and \( r=5 \) (positions to fill).

Step2: Calculate the permutation

\( P(27,5)=\frac{27!}{(27 - 5)!}=\frac{27!}{22!}=27\times26\times25\times24\times23 \)
Calculate step - by - step:
\( 27\times26 = 702 \)
\( 702\times25=17550 \)
\( 17550\times24 = 421200 \)
\( 421200\times23=9687600 \)

Step1: Identify the counting principle

When rolling a die three times, for each roll, there are 6 possible outcomes. By the multiplication principle, if we have \( n \) independent trials (rolls) each with \( k \) outcomes, the total number of outcomes is \( k^n \). Here, \( k = 6 \) (sides of the die) and \( n = 3 \) (number of rolls).

Step2: Calculate the total number of outcomes

The total number of outcomes is \( 6^3=6\times6\times6 \)
\( 6\times6 = 36 \), then \( 36\times6 = 216 \)

Answer:

144

Problem 6 (Hiring Employees)