Asked by Bubin
Question Find the mean absolute deviation of the following dataset: 8.4, 9.4, 14.2, 5.6, 8.3, 9.0, 10.2. Round the answer to the nearest tenth.(1 point) Responses 11.8 11.8 9.3 9.3 7.0 7.0 1.7
Answers
Answered by
Bubin
WRONG ITS NOT 1.9 GET IT RIGHT. Question Find the mean absolute deviation of the following dataset: 8.4, 9.4, 14.2, 5.6, 8.3, 9.0, 10.2. Round the answer to the nearest tenth.(1 point) Responses 11.8 11.8 9.3 9.3 7.0 7.0 1.7
Answered by
GPT 3.5
To find the mean absolute deviation, we first need to find the mean of the dataset:
(8.4 + 9.4 + 14.2 + 5.6 + 8.3 + 9.0 + 10.2) / 7 = 9.4
Next, we calculate the absolute deviation of each number from the mean:
|8.4 - 9.4| = 1.0
|9.4 - 9.4| = 0.0
|14.2 - 9.4| = 4.8
|5.6 - 9.4| = 3.8
|8.3 - 9.4| = 1.1
|9.0 - 9.4| = 0.4
|10.2 - 9.4| = 0.8
Now, we calculate the mean of these absolute deviations:
(1.0 + 0.0 + 4.8 + 3.8 + 1.1 + 0.4 + 0.8) / 7 = 1.9
Therefore, the mean absolute deviation of the dataset is 1.9. Rounding to the nearest tenth, the answer is 1.9.
(8.4 + 9.4 + 14.2 + 5.6 + 8.3 + 9.0 + 10.2) / 7 = 9.4
Next, we calculate the absolute deviation of each number from the mean:
|8.4 - 9.4| = 1.0
|9.4 - 9.4| = 0.0
|14.2 - 9.4| = 4.8
|5.6 - 9.4| = 3.8
|8.3 - 9.4| = 1.1
|9.0 - 9.4| = 0.4
|10.2 - 9.4| = 0.8
Now, we calculate the mean of these absolute deviations:
(1.0 + 0.0 + 4.8 + 3.8 + 1.1 + 0.4 + 0.8) / 7 = 1.9
Therefore, the mean absolute deviation of the dataset is 1.9. Rounding to the nearest tenth, the answer is 1.9.
Answered by
GPT 3.5
Let's revisit the solution to find the correct mean absolute deviation:
First, let's find the mean of the dataset:
(8.4 + 9.4 + 14.2 + 5.6 + 8.3 + 9.0 + 10.2) / 7 = 8.8
Next, calculate the absolute deviation of each number from the mean:
|8.4 - 8.8| = 0.4
|9.4 - 8.8| = 0.6
|14.2 - 8.8| = 5.4
|5.6 - 8.8| = 3.2
|8.3 - 8.8| = 0.5
|9.0 - 8.8| = 0.2
|10.2 - 8.8| = 1.4
Now, calculate the mean of these absolute deviations:
(0.4 + 0.6 + 5.4 + 3.2 + 0.5 + 0.2 + 1.4) / 7 = 1.9
Therefore, the mean absolute deviation of the dataset is 1.9. Rounding to the nearest tenth, the correct answer is 1.9.
First, let's find the mean of the dataset:
(8.4 + 9.4 + 14.2 + 5.6 + 8.3 + 9.0 + 10.2) / 7 = 8.8
Next, calculate the absolute deviation of each number from the mean:
|8.4 - 8.8| = 0.4
|9.4 - 8.8| = 0.6
|14.2 - 8.8| = 5.4
|5.6 - 8.8| = 3.2
|8.3 - 8.8| = 0.5
|9.0 - 8.8| = 0.2
|10.2 - 8.8| = 1.4
Now, calculate the mean of these absolute deviations:
(0.4 + 0.6 + 5.4 + 3.2 + 0.5 + 0.2 + 1.4) / 7 = 1.9
Therefore, the mean absolute deviation of the dataset is 1.9. Rounding to the nearest tenth, the correct answer is 1.9.