mode-the most (highest # in a set of data) median-the middle # when you put a set of data in order from least to greatest let's take for example a reasonable set of 10,3,4,5,7,5,9 3,4,5,5,7,9,10 3,4,5,5,7,9,10 and than your mode 5 because there was two 5's so YES IT IS POSSIBLE TO HAVE THE SAME MEDIAN AND MODE FOR ONE SET OF DATA DEPENDING ON WHAT THAT SET OF DATA IS
Of course they can, and they can also be the same. It just depends on the set of data you're looking at.
Yea
In a normal distribution the mean, median and mode are all the same value.
With just one data point, the mean, median and mode are all the same as the data point itself. In this case, 14.
Yes, for example this set: 1,2,2,5.
(10,10,30,30,30,50,50) (20,20,30,30,30,40,40) These two sets have the same mean, median and mode.
The minimum and maximum are the same. The mean, median, and mode can be different.
Of course they can, and they can also be the same. It just depends on the set of data you're looking at.
Yea
In a normal distribution the mean, median and mode are all the same value.
With just one data point, the mean, median and mode are all the same as the data point itself. In this case, 14.
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!
Can the median and mode be used to describe both categorical data and numerical data
Yes, for example this set: 1,2,2,5.
The mode is the most frequent number in a set of data. For instance in the data 1, 2, 2, 2, 2, 4, 6, 6, 7, 8, 9, 9, it is clear that 2 is the mode. The median is the middle number in the data. The above set has already been ordered from smallest to largest, and the middle number is 6. Thus the median of the above data is 6. It is clear that the mode and median can easily be the same value. For instance, in the data set 1, 3, 4, 5, 5, 5, 5, 7, 9. Here, 5 is both the middle number and the most frequent. Thus the median and mode are the same value.
Yes, it is. One easy way for this to happen is if every number in a data set is the same: then it's the mean, median, and mode at the same time. That's not the only way for it to happen, of course. For example, if the data set is 1, 2, 2, 3 then the mean, median, and mode is 2.
It is possible for two sets of data - not ALL of which are the same - to have the same measures of central tendency. However, if the two sets do have a mode, then that number must appear in both sets ... several times.