The smallest value is 14. This can be found by looking
at row 1 and at the first leaf.
The largest value is 43 which can be found by Looking at the last
row and last leaf.
Range = 43 - 14 = 29
So Answer is (A)
Provide an appropriate response. For the stem-and-leaf plot below, find the range of the data set....
DI Question 3 Provide an appropriate response For the stem-and-leaf plot below, what is the maximum and what is the minimum entry? Key: 11 9 11.9 11 69 12 4667s9 13 0112 3667 S S 14 3 4 6 6 8999 15 01 12377S9 16 2257 SS99 max 177 min 11.6 max: 17S, min 119 max 17 S min 116 max 179, min: 116 : Question 4
A set of data is summarized by the stem and leaf plot below.
Provide your answer below:
There are ___ values in the data set which are greater than or
equal to 20 and less than or equal to
29. There are_____ values in the data set which
are greater than or equal to 10 and less than or
equal to 19.
Please explain how too! Thank you!!
by the stem and leaf plot below. Stem Leaf 1 012 347788999...
Use a stem-and-leaf plot that has two rows for each stem to display the data, which represent the income (in millions) of 30 of the highest paid athletes. Describe any patterns. 37 36 44 50 35 55 56 65 45 63 46 37 76 45 34 44 43 81 53 38 73 34 38 87 34 53 41 42 45 58 Determine the leaves in the stem-and-leaf plot below. Key: 3|3equals33 Income ($ millions) 3 nothing 3 nothing 4 nothing...
A set of data is summarized by the stem and leaf plot below Stem Leaf 1 13566 2 11233489 30000 23677888 411122 33456 7777 Provide your answer below: There arevalues in the data set which are greater than or equal to 20 and less than or equal to 29. There are | | values in the data set which are greater than or equal to 10 and less than or equal to 19. There are「values in the data set which...
4. Based on the stem-and-leaf plot below, would you say that the a) the mean will be greater than the median b) the mean will be smaller than the median c) the mean will be identical to the median d) the mean can not be obtained since the outliers are present Stem| Leaf 11 1 25 55678 8 899 99 9 21 1 1 4 5 566677778 31 0 0 0 1 22 34 5 6 7 8 41 1166...
Consider the stem and leaf plot produced by Minitab below. Find the value of the missing depth x (in the second to last row). Stem-and-leaf of C7 N = 1151 Leaf Unit = 1.0 N* = 51 1 1 5 8 2 0005555 37 3 00000000005555555555555555555 82 4 0000000000000000005555555555555+ 166 5 0000000000000000555555555555555+ 310 6 0000000000000000000000000000000+ 510 7 0000000000000000000000000000000+ (257) 8 0000000000000000000000000000000+ x 9 0000000000000000000000000000000+ 67 10 0000000000000000000000000000000+
For the stem-and-leaf plot below, what are the maximum and minimum entries? 1 |14 16667 89 2 011 2344566 2 7778 8999 3 011 234455 3 66678899 4 02 ⓔ A. max :42; min-1 1 ○ B. max=47; min=14 O C. max-40; min 11 ○ D. max = 38; min = 7
According to the stem-and-leaf plot below, this data set has a negative median. Stem-and-leaf of P/E ratio; N = 75 Leaf Unit = 0.01 -2 60 -1 555420 -0 9999988777766544322111111000 0 0112223333334466678889999 1 002222233456 2 03 TRUE OR FALSE
Construct a Stem and Leaf plot (stemplot) using the data below. The sum (total) of the numbers that comprise the leaf in the first row is ____: 11 25 22 19 23 21 17 27 21 21 23 28 10 29 11 17 19 29
Here is a data set summarized as a stem-and-leaf plot: 5#| 13355568 6#| 002234444555777 7#| 04578 8#1 125 How many data values are in this data set? What is the minimum value in the last class? What is the frequency of the modal class? (Hint, That is the frequency of the class with the most data points in it.) How many of the original values are greater than 70?