I've encountered an interesting situation while calculating the inter-quartile range. Assuming we have a dataframe such as:

```
import pandas as pd
index=pd.date_range('2014 01 01',periods=10,freq='D')
data=pd.np.random.randint(0,100,(10,5))
data = pd.DataFrame(index=index,data=data)
data
Out[90]:
0 1 2 3 4
2014-01-01 33 31 82 3 26
2014-01-02 46 59 0 34 48
2014-01-03 71 2 56 67 54
2014-01-04 90 18 71 12 2
2014-01-05 71 53 5 56 65
2014-01-06 42 78 34 54 40
2014-01-07 80 5 76 12 90
2014-01-08 60 90 84 55 78
2014-01-09 33 11 66 90 8
2014-01-10 40 8 35 36 98
# test for q1 values (this works)
data.quantile(0.25)
Out[111]:
0 40.50
1 8.75
2 34.25
3 17.50
4 29.50
# break it by inserting row of nans
data.iloc[-1] = pd.np.NaN
data.quantile(0.25)
Out[115]:
0 42
1 11
2 34
3 12
4 26
```

The first quartile can be calculated by taking the median of values in the dataframe that fall below the overall median, so we can see what data.quantile(0.25) should have yielded. e.g.

```
med = data.median()
q1 = data[data<med].median()
q1
Out[119]:
0 37.5
1 8.0
2 19.5
3 12.0
4 17.0
```

It seems that quantile is failing to provide an appropriate representation of q1 etc. since it is not doing a good job of handling the NaN values (i.e. it works without NaNs, but not with NaNs).

I thought this may not be a "NaN" issue, rather it might be quantile failing to handle even-numbered data sets (i.e. where the median must be calculated as the mean of the two central numbers). However, after testing with dataframes with both even and odd-numbers of rows I saw that quantile handled these situations properly. The problem seems to arise only when NaN values are present in the dataframe.

I would like to use quntile to calculate the rolling q1/q3 values in my dataframe, however, this will not work with NaN's present. Can anyone provide a solution to this issue?

`df.dropna()`

?`data[data<med].median()`

and not`data[data<=med].median()`

?