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Q: Maximum18 mode 7 median 12 range 13 data set of 12 numbers what is it?

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5,6,7,7,8,10,11,13,14,15,16,18

Yes. They must have a range and median. They may or may not have a mode.

Mean: 11 Median: 11 Mode: 4 Range: 18

4 4 6 6 10

The range of a data set is the difference between the largest and smallest number in your set of data. Median is the number that comes in the middle. 54, 55, 56 has a range of 54-56 and a median of 55. The set 53, 55, 57 has a median of 55 also!

The mode, median, and range of a single data point such as 65 are all the data point itself, 65 in this instance.

You then add the two middle ones and divide by two to get the median. If the numbers are the same then that is your median.

If 10122418142622 are all single digits, then the median is the lowest and the highest of the range of data. Which is 0 and 8

the median and mode are but the mean is not

range is the distance between the lowest and highest values median is the middle number in a set of data when the data is in numerical order (medium in drink size is in the middle)

Mean: Add all of the numbers in the data set, then divide by the amount of numbers in the set of data. Median: Order the numbers from least to greatest and find the middle number. If there is more than one number in the middle, add the 2 numbers together, then divide by two. Mode: To find the mode, look for the number that appears most in the data set. If there is a tie, write them both down. Range: To determine the range, subtract the smallest number to the biggest number.

The Inter-quartile range is the range of the middle half of the data. It is the difference between the upper and lower quartile.Example: 35,80,100 110,120,120,170,180.The Inter-quartile range would be 145-90 or 55To find the interquartile range, you:1) Arrange the data in numerical order.2) Then find the median of the data sets.3) Find the median of the top half and bottom half. (of the set of numbers)4) The groups you now have are "quartiles"5) Find the interquartile range. (subtract the smaller range from the range)

Yea

mean~ all the numbers in the data added together divided by the number of data. The mean is the same as the average. median~ the exact middle of the set of data. Example: 1,1,2,2, the median is 1.5 mean- the average median- the middle number in a set of numbers in a group.Example of Median-1,3,5,7,9,4,5 (put them in order and list them from least to greatest)1,3,4,5,5,7,9the median is 5!

mean~ all the numbers in the data added together divided by the number of data. The mean is the same as the average. median~ the exact middle of the set of data. Example: 1,1,2,2, the median is 1.5 mean- the average median- the middle number in a set of numbers in a group.Example of Median-1,3,5,7,9,4,5 (put them in order and list them from least to greatest)1,3,4,5,5,7,9the median is 5!

Arrange the data in increasing order and count the number of data points = N. Find the integer K = N/2 or (N+1)/2. The Kth number in the ordered set is the median. Now consider only the numbers from the smallest to the median and find the median of this subset. This is the lower quartile = Q1. Then consider only the numbers from the original median to the largest. Find the median of this subset. It is the upper quartile = Q3. Then IQR = Q3 - Q1

For an even number of values, there will be 2 middle numbers. Take the average of the 2 middle numbers for the median. It will be a value not in the data set.

When there are an even number of data items, there are two numbers in the middle.In this case the median is the mean average of the middle two numbers.

Make up a data set of at least 12 numbers that have the following landmarks maxium:18 range 13 mode 7 median 12

The median value of a range of values.

That is the Median of the numbers.

A quartile is a given section in a range of data. To find the quartile, you must first find the median. Then find the "median of the median", using these to separate your data into sections, giving you a total of four sections of data.

Analyzing the mean, median, and range of your experimental data helps establish patters present in the data set. Analyzing the mean will define the quantitative average, analyzing the median will find the number that is center most, and analyzing the range will find the difference between the largest and smallest number in the data set. Good luck!

A box and whisker graph is used to display a set of data so that you can easily see where most of the numbers are. First you write the data from smallest to largest. Then you find the median of all the numbers. This is called the main median. Next you look at the numbers on either side of the median and find their median. These are called the lower and upper medians. So you are just finding the median of a subset. One subset is the numbers above the median and one is the numbers below the median. Now, on the number line, make a mark for the main median and a mark for the upper and lower medians. Next, draw a box with the median lines above as the endpoints. Really it looks like a box with a line in the middle where the main median is. This is the BOX in the box and whisker graph. Last, draw lines from the ends of the box to the smallest data point and largest data point on either side of the box. These are the WHISKERS. The graphs you made tells you the range of the data and it tells you where each quarter is. The three medians split the data into 4 parts.

10, 10, 20, 30, 30, 50.