- Input data are lists of 1-D numpy arrays e.g.
`x[0] = [ array([1.0,1.0,1.0]), array([2.0,2.0,2.0]), ...]`

`len(x)`

is on the order of a few thousand (rows) while`len(x[n])`

is a fixed number (columns), but may change from run to run (so I don't want to hard-code a number of columns).- Function
`f(x[n][col])`

transforms each`array`

into a single number - Desired result is a list of transformed columns

The lists are for plotting, so they could be a numpy data structure. Here is some code to set up test data and notional transformation:

```
import numpy
# create test data set
def datagen(number):
return numpy.array([number,number,number])
x=[]
for rows in range(20):
dataline = [ datagen(n) for n in range(5)]
x.append(dataline)
#define transformation of array to single number
def f(in_array):
return in_array.sum()
```

Desired result-- get in a numpy, pythonic sort of way:

```
[ array([0,0,0,...0]), array([3,3,3,....,3]), array([6,6,6,...,6]), ..etc]
```

where in this case each array has 20 elements (one for each row of data) and there are 5 arrays in the list (one for each column).

Here is my current solution:

```
trans = []
for dataline in x:
trans.append([f(a) for a in dataline])
trans = numpy.array(trans)
answer = [ trans[:,col] for col in range(len(x[0])) ]
```

Not too shabby but my head hurts and I have a feeling this can be done better. ???

In real life f(a) = `numpy.sqrt(numpy.vdot(a,a))`

.

`f`

look like? To vectorise a function, we need to know what the function does. – Sven Marnach May 3 '11 at 10:43`ndarray.sum`

can easily operate along a single axis.) – Joe Kington May 5 '11 at 1:40