The median is 4.5
It depends on the data set, but if you take the data set 1,2,3 2 is the median and to find the mean you have to add all the numbers and divide by the number of items so 1+2+3=6 and 6 divided by 3= 2 now the median is 2 and the mean is 2 so this is when they can be the same
Yes, but the two are measures of very different things. The median is a measure of central tendency whereas the range is a measure of spread. Nevertheless, the set 1, 2, 3, 4, 4 has a range of 3 and a median of 3.
No, because the mode is the most common score, and does not necessarily represent the middle point of the scores, which is the median. For example: 1, 1, 1, 2, 3, 4, 5, 6, 7 In this set of data the mode is 1 but the median (the 5th score in this example) is 3.
2.5 is the median
The middle # in a set of data.
Yes. An example: the data set {1, 1, 2, 2, 2, 2, 2, 2, 2, 3, 5} has median = Q1 = Q3 = 2.
If its a odd set of numbers then the median will be (n+1/2)th term. where, n=set of numbers like 2,4,5 then the median will be (3+1/2)th term=2nd term=4. therefore the median is 4 And if its a even set of numbers like 1,4,7,9,6,8 then the median will be the (sum of mid numbers/2) 7+9/2=8 therefore the median is 8
There is only one median in a set of values. If it is an odd amount of values, the median is the middle number. If there is an even amount of numbers, the median is the value halfway between the two middle numbers. So, in 1, 2, 3; the median is 2. In 1, 2, 3, 4; the median is 2.5, as that is halfway between 2 and 3.
mean= 2, mode= 1 and 3, median= 3, and range= 2
It depends on the data set, but if you take the data set 1,2,3 2 is the median and to find the mean you have to add all the numbers and divide by the number of items so 1+2+3=6 and 6 divided by 3= 2 now the median is 2 and the mean is 2 so this is when they can be the same
Yes, but the two are measures of very different things. The median is a measure of central tendency whereas the range is a measure of spread. Nevertheless, the set 1, 2, 3, 4, 4 has a range of 3 and a median of 3.
No, because the mode is the most common score, and does not necessarily represent the middle point of the scores, which is the median. For example: 1, 1, 1, 2, 3, 4, 5, 6, 7 In this set of data the mode is 1 but the median (the 5th score in this example) is 3.
1
A median is the middle of a series of numbers, so the answer is 2.
2.5 is the median
From the number set 1, 2, 3, 4, I can tell that the range is 3, The mean is 2.5, the median is 2.5, yet there is absolutely no mode.
I am guessing you are asking for an example of a set of numbers with these properties. Let's start with 5 numbers, so the median will be the middle number; say 1, 2, 3, 4, 5. The median is 3, but so is the mean. Now let's replace the 5 with 10. The median is still 3, but the mean is 4. To make the mode less than 3, let us change the 2 into a 1. Now the median is still 3, the mode is 1, and the mean is 3.8. So 1, 1, 3, 4, 10 will work.