It seems that you're looking for the row with the greatest standard deviation, which is basically a measure of how much the values vary from the average.

If you want to ignore zero elements, use Shai's useful suggestion to replace zero elements to `NaN`

. Indeed, some of MATLAB's built-in functions allow ignoring them:

```
Arr2 = Arr;
Arr2(~Arr) = NaN;
```

To find the standard deviation we'll employ `nanstd`

(not `std`

, because it doesn't ignore `NaN`

values) along the rows, *i.e.* the 2^{nd} dimension:

```
nanstd(Arr2, 0, 2)
```

To find the greatest standard deviation and it's corresponding row index, we'll apply `nanmax`

and obtain both output variables:

```
[stdmax, idx] = nanmax(nanstd(Arr2, 0, 2));
```

Now `idx`

holds hold the index of the desired row.

### Example

Let's run this code on the input that you provided in your question:

```
Arr = [0.1 0 0.33 0 0.55 0;
0.01 0 0.10 0 0.2 0;
1 0.1 0 0 0 0;
0.55 0 0.33 0 0.15 0;
0.17 0.17 0.17 0.17 0.17 0.17];
Arr2 = Arr;
Arr2(~Arr) = NaN;
[maxstd, idx] = nanmax(nanstd(Arr2, 0, 2))
idx =
3
```

Note that the values in row #3 differ one from another much more than those in row #1, and therefore the standard deviation of row #3 is greater. This also corresponds to your comment:

*... ergo a row with 3 zero and 3 non-zero but close values is worse than a row with 4 zeros and 2 very different values.*

For this reason I believe that in this case `3`

is indeed the correct answer.

i.ehow do you prioritize that? – Eitan T Jan 3 '13 at 12:34