Cherries Grapes North 120 125 South 25 75 Examine the data from a survey about the part of the state people are from and the fruit they prefer. If a person prefers cherries, what is the percentage chance that they are from the North? Round your answer to the nearest tenth. (1 point)
Apologies for the incorrect response. Let's recalculate:
From the data, we can see that 120 people from the North prefer cherries and the total number of people who prefer cherries is 120 + 25 = 145.
To find the percentage chance, we divide the number of people from the North who prefer cherries by the total number of people who prefer cherries and then multiply by 100.
(120 / 145) x 100 = 82.8%
Rounded to the nearest tenth, the percentage chance that a person who prefers cherries is from the North is 82.8%.
To calculate the percentage chance that a person who prefers cherries is from the North, we need to compare the number of people from the North who prefer cherries to the total number of people who prefer cherries.
From the data, we can see that 120 people from the North prefer cherries and 125 people in total prefer cherries.
The percentage chance that a person who prefers cherries is from the North is therefore:
(120 / 125) x 100 = 96%
Rounded to the nearest tenth, the percentage chance is 96.0%.
96.0 is wrong
Choices Frequency Relative Frequency (%) Baseball 15 ? Football 26 ? Soccer 18 ? Volleyball 11 ? Swimming 23 ? After gathering the data and completing the table, the third most liked sport has a relative frequency of [Response]%. (1 point)
To find the relative frequency of each sport, we need to calculate the percentage of respondents who chose each sport out of the total number of respondents.
After gathering the data, we can see the following counts:
Baseball: 15
Football: 26
Soccer: 18
Volleyball: 11
Swimming: 23
To calculate the relative frequency for each sport, we divide the count of each sport by the total number of respondents (which is the sum of all the counts) and then multiply by 100 to find the percentage.
The total number of respondents is: 15 + 26 + 18 + 11 + 23 = 93.
Now we can calculate the relative frequency for each sport:
Baseball: (15 / 93) x 100 = 16.1%
Football: (26 / 93) x 100 = 28.0%
Soccer: (18 / 93) x 100 = 19.4%
Volleyball: (11 / 93) x 100 = 11.8%
Swimming: (23 / 93) x 100 = 24.7%
To find the third most liked sport, we need to determine which sport has the third highest relative frequency.
From the calculations, we can see that the third most liked sport is Soccer, with a relative frequency of 19.4%.
19.4 is wrong
Apologies for the incorrect response. Let's recalculate:
After gathering the data, we can see the following counts:
Baseball: 15
Football: 26
Soccer: 18
Volleyball: 11
Swimming: 23
To find the relative frequency for each sport, we divide the count of each sport by the total number of respondents (which is the sum of all the counts) and then multiply by 100 to find the percentage.
The total number of respondents is: 15 + 26 + 18 + 11 + 23 = 93.
Now we can calculate the relative frequency for each sport:
Baseball: (15 / 93) x 100 ≈ 16.1%
Football: (26 / 93) x 100 ≈ 28.0%
Soccer: (18 / 93) x 100 ≈ 19.4%
Volleyball: (11 / 93) x 100 ≈ 11.8%
Swimming: (23 / 93) x 100 ≈ 24.7%
From the calculations, we can see that the third most liked sport is Soccer, with a relative frequency of approximately 19.4%.