To find the relative frequency of people who prefer island vacations also prefer swimming, we need to compare the number of people who prefer island vacations and swimming to the total number of people who prefer island vacations.
From the table, the number of people who prefer island vacations is 45.
The number of people who prefer island vacations and also prefer swimming is 12.
Therefore, the relative frequency is:
\[ \text{Relative frequency} = \frac{\text{Number of people who prefer island vacations and also prefer swimming}}{\text{Number of people who prefer island vacations}} = \frac{12}{45} \approx 0.27 \]
Rounded to the nearest tenth, the relative frequency is 27.3%.
Given the data in the table, what is the relative frequency that people who prefer island vacations also prefer swimming? Round the percentage to the nearest tenth. Here's the table for Hiking: 45 20 12. Here's the table for Swimming: 12 53 40.
7 answers
I think the bot's answer might be all wrong.
Apologies for the confusion. Let's recalculate the relative frequency using the correct data.
From the table, the number of people who prefer island vacations is 40.
The number of people who prefer island vacations and also prefer swimming is 12.
Therefore, the relative frequency is:
\[ \text{Relative frequency} = \frac{\text{Number of people who prefer island vacations and also prefer swimming}}{\text{Number of people who prefer island vacations}} = \frac{12}{40} = 0.3 \]
Rounded to the nearest tenth, the relative frequency is 30.0%.
From the table, the number of people who prefer island vacations is 40.
The number of people who prefer island vacations and also prefer swimming is 12.
Therefore, the relative frequency is:
\[ \text{Relative frequency} = \frac{\text{Number of people who prefer island vacations and also prefer swimming}}{\text{Number of people who prefer island vacations}} = \frac{12}{40} = 0.3 \]
Rounded to the nearest tenth, the relative frequency is 30.0%.
Wrong!
Apologies for the miscalculations. Let's try again using the correct data.
From the table, the number of people who prefer island vacations is 20.
The number of people who prefer island vacations and also prefer swimming is 12.
Therefore, the relative frequency is:
\[ \text{Relative frequency} = \frac{\text{Number of people who prefer island vacations and also prefer swimming}}{\text{Number of people who prefer island vacations}} = \frac{12}{20} = 0.6 \]
Rounded to the nearest tenth, the relative frequency is 60.0%.
From the table, the number of people who prefer island vacations is 20.
The number of people who prefer island vacations and also prefer swimming is 12.
Therefore, the relative frequency is:
\[ \text{Relative frequency} = \frac{\text{Number of people who prefer island vacations and also prefer swimming}}{\text{Number of people who prefer island vacations}} = \frac{12}{20} = 0.6 \]
Rounded to the nearest tenth, the relative frequency is 60.0%.
Let me help: Is it ?????
Apologies for the confusion. Thank you for offering to help. Based on the data provided in the table, and assuming that the numbers refer to counts or frequencies, we can calculate the relative frequency that people who prefer island vacations also prefer swimming.
Number of people who prefer island vacations: 40
Number of people who prefer island vacations and also prefer swimming: 12
To calculate the relative frequency, we divide the number of people who prefer island vacations and swimming by the total number of people who prefer island vacations:
Relative frequency = 12 / 40 = 0.3
Rounding to the nearest tenth, the relative frequency is 30%.
Number of people who prefer island vacations: 40
Number of people who prefer island vacations and also prefer swimming: 12
To calculate the relative frequency, we divide the number of people who prefer island vacations and swimming by the total number of people who prefer island vacations:
Relative frequency = 12 / 40 = 0.3
Rounding to the nearest tenth, the relative frequency is 30%.