Respuesta :
Let's start with the first set of data.
18, 20, 11, 10, 8, 6, 12, 4
First, you need to order the numbers from least to greatest.
4, 6, 8, 10, 11, 12, 18, 20
The minimum is the smallest data value, and the maximum is the largest.
Minimum: 4
Maximum: 20
The median is the data value in the middle of the data set or, in this case because there is an even number of values, the average of the two middle values.
Median: 10.5
The first quartile value is the median for the numbers before the median.
So find the median of 4, 6, 8, 10, the same way we did in the last step.
First quartile: 7
Finding the third quartile is exactly the same as the first, except use the values after the median. (11, 12, 18, 20)
Third quartile: 15
So, for the first problem it goes
Minimum: 4
First quartile: 7
Median: 10.5
Third quartile: 15
Maximum: 20
Now for the second problem, do the exact same thing as the first one!
60, 50, 130, 200, 180, 150, 100, 140
50, 60, 100, 130, 140, 150, 180, 200
Minimum: 50
First quartile: 80
Median: 135
Third quartile: 165
Maximum: 200
Hope this helps!!!
18, 20, 11, 10, 8, 6, 12, 4
First, you need to order the numbers from least to greatest.
4, 6, 8, 10, 11, 12, 18, 20
The minimum is the smallest data value, and the maximum is the largest.
Minimum: 4
Maximum: 20
The median is the data value in the middle of the data set or, in this case because there is an even number of values, the average of the two middle values.
Median: 10.5
The first quartile value is the median for the numbers before the median.
So find the median of 4, 6, 8, 10, the same way we did in the last step.
First quartile: 7
Finding the third quartile is exactly the same as the first, except use the values after the median. (11, 12, 18, 20)
Third quartile: 15
So, for the first problem it goes
Minimum: 4
First quartile: 7
Median: 10.5
Third quartile: 15
Maximum: 20
Now for the second problem, do the exact same thing as the first one!
60, 50, 130, 200, 180, 150, 100, 140
50, 60, 100, 130, 140, 150, 180, 200
Minimum: 50
First quartile: 80
Median: 135
Third quartile: 165
Maximum: 200
Hope this helps!!!
The median of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 10.5.
The first quartile is median of {4, 6, 8, 10} or 7.
The third quartile is median of: {11, 12, 18, 20} or 15.
The maximum of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 20.
The minimum of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 4.
The median of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 135.
The first quartile is the median of 60, 50, 130, 200, 180, 150, 100, 140 is 80.
The third quartile is median of 60, 50, 130, 200, 180, 150, 100, 140 is 165.
The maximum of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 200.
The minimum of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 50.
Median
The median is defined as the middle value of the given data set.
The minimum, first quartile, median, third quartile, and a maximum of the data set.
The median is defined as the middle value of the given data set.
The median of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 10.5.
The median of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 135.
The third quartile is the value in the data set that divides the upper half of the data into two equal parts. It can also be called the median of the upper half.
The third quartile is median of: {11, 12, 18, 20} or 15.
The third quartile is median of 60, 50, 130, 200, 180, 150, 100, 140 is 165.
A median divides the data arranged in ascending order into two equal parts. The lower half and the upper half.
The first quartile is median of {4, 6, 8, 10} or 7.
The first quartile is the median of 60, 50, 130, 200, 180, 150, 100, 140 is 80.
The maximum of data is the largest value in the data set.
The maximum of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 20.
The maximum of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 200.
The minimum of the data set is the smallest value in the data set.
The minimum of the data set 18, 20, 11, 10, 8, 6, 12, 4 is 4.
The minimum of the data set 60, 50, 130, 200, 180, 150, 100, 140 is 50.
To know more about the median click the link is given below.
https://brainly.com/question/1203158
