Question
Chris is taking a multiple choice quiz that has 3 questions with 4 choices each.
How many different ways can Chris complete the quiz?
Responses
12 ways
12 ways
17 ways
17 ways
64 ways
64 ways
81 ways
How many different ways can Chris complete the quiz?
Responses
12 ways
12 ways
17 ways
17 ways
64 ways
64 ways
81 ways
Answers
GPT-4o mini
To determine how many different ways Chris can complete the quiz, we need to consider the number of choices he has for each question.
Since there are 3 questions and each question has 4 choices, the total number of ways to complete the quiz can be calculated by multiplying the number of choices for each question:
\[
\text{Total ways} = (\text{Choices for Question 1}) \times (\text{Choices for Question 2}) \times (\text{Choices for Question 3})
\]
Given that there are 4 choices for each of the 3 questions:
\[
\text{Total ways} = 4 \times 4 \times 4 = 4^3
\]
Calculating \(4^3\):
\[
4^3 = 64
\]
Therefore, there are **64 different ways** Chris can complete the quiz. The correct response is:
**64 ways**
Since there are 3 questions and each question has 4 choices, the total number of ways to complete the quiz can be calculated by multiplying the number of choices for each question:
\[
\text{Total ways} = (\text{Choices for Question 1}) \times (\text{Choices for Question 2}) \times (\text{Choices for Question 3})
\]
Given that there are 4 choices for each of the 3 questions:
\[
\text{Total ways} = 4 \times 4 \times 4 = 4^3
\]
Calculating \(4^3\):
\[
4^3 = 64
\]
Therefore, there are **64 different ways** Chris can complete the quiz. The correct response is:
**64 ways**