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I was wondering if it was possible to get the median as decimal value for finding the missing median? If there is an even number of numbers in the set, the median is the average of the two middle numbers, and the only way to find the missing number is if the median is one of those two numbers.

For example,  3 2 0 8 9 9 1 e If the median is 4.5, which number could e be? 

Would it possible to get median as a decimal value?

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Here we have $8$ numbers, so the median must have been computed by taking the average of the two "middle" numbers.

In our list we have $0$, $1$, $2$, and $3$. Since the median is $>3$, $3$ must be one of the "middle" numbers. The other middle number can't be $8$, for that would make the median larger than $4.5$. So the other middle number must be $e$, and we must have $\frac{3+e}{2}=4.5.$ Multiply both sides by $2$. We get $3+e=9$, so $e=6$.

Comment: This one was fairly straightforward. One can produce problems that have a similar look and feel but that are harder to figure out.

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    @amala: You are welcome. If there $20$ people in a class, one got $79$, another got $80$, a total of $10$ got $\le 79$, and a total of $10$ got $\ge 80$, it makes perfect sense to say the class median was $79.5$. But note that there are other conventions about the meaning of *median*. For details, look up *median* in Wikipedia.2011-07-06