The following stem-and leaf display shows the weight, in kilogram, boxes of juice Stem-and-Leaf Display N = * Leaf Unit = 0.1 9 0 002334666 20 1 01123356777 (**) 2 00122223346799 *** 3 56778899 12 4 0002344 5 5 66789 Determine the values of *, ** and ***. What is the value of the median? Find the modal yield of this data set. What is the range of the data set
The following stem-and leaf display shows the weight, in kilogram, boxes of juice Stem-and-Leaf Display N = * Leaf Unit = 0.1 9 0 002334666 20 1 01123356777 (**) 2 00122223346799 *** 3 56778899 12 4 0002344 5 5 66789 Determine the values of *, ** and ***. What is the value of the median? Find the modal yield of this data set. What is the range of the data set
The following stem-and leaf display shows the weight, in kilogram, boxes of juice Stem-and-Leaf Display N = * Leaf Unit = 0.1 9 0 002334666 20 1 01123356777 (**) 2 00122223346799 *** 3 56778899 12 4 0002344 5 5 66789 Determine the values of *, ** and ***. What is the value of the median? Find the modal yield of this data set. What is the range of the data set
The following stem-and leaf display shows the weight, in kilogram, boxes of juice Stem-and-Leaf Display N = * Leaf Unit = 0.1 9 0 002334666 20 1 01123356777 (**) 2 00122223346799 *** 3 56778899 12 4 0002344 5 5 66789 Determine the values of *, ** and ***. What is the value of the median? Find the modal yield of this data set. What is the range of the data set
Definition Definition Middle value of a data set. The median divides a data set into two halves, and it also called the 50th percentile. The median is much less affected by outliers and skewed data than the mean. If the number of elements in a dataset is odd, then the middlemost element of the data arranged in ascending or descending order is the median. If the number of elements in the dataset is even, the average of the two central elements of the arranged data is the median of the set. For example, if a dataset has five items—12, 13, 21, 27, 31—the median is the third item in ascending order, or 21. If a dataset has six items—12, 13, 21, 27, 31, 33—the median is the average of the third (21) and fourth (27) items. It is calculated as follows: (21 + 27) / 2 = 24.
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