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One of the essential pieces of NumPy is the ability to perform quick element-wise operations, both with basic arithmetic (addition, subtraction, multiplication, etc.) and with more sophisticated operations (trigonometric functions, exponential and logarithmic functions, etc.). Pandas inherits much of this functionality from NumPy, and the ufuncs that we introduced in Computation on NumPy Arrays: Universal Functions are key to this.
Pandas includes a couple useful twists, however: for unary operations like negation and trigonometric functions, these ufuncs will preserve index and column labels in the output, and for binary operations such as addition and multiplication, Pandas will automatically align indices when passing the objects to the ufunc.
This means that keeping the context of data and combining data from different sources–both potentially error-prone tasks with raw NumPy arrays–become essentially foolproof ones with Pandas.
We will additionally see that there are well-defined operations between one-dimensional Series
structures and two-dimensional DataFrame
structures.
In [1]:
import pandas as pd
import numpy as np
In [2]:
rng = np.random.RandomState(42)
ser = pd.Series(rng.randint(0, 10, 4))
ser
Out[2]:
In [3]:
df = pd.DataFrame(rng.randint(0, 10, (3, 4)),
columns=['A', 'B', 'C', 'D'])
df
Out[3]:
If we apply a NumPy ufunc on either of these objects, the result will be another Pandas object with the indices preserved:
In [4]:
np.exp(ser)
Out[4]:
Or, for a slightly more complex calculation:
In [5]:
np.sin(df * np.pi / 4)
Out[5]:
Any of the ufuncs discussed in Computation on NumPy Arrays: Universal Functions can be used in a similar manner.
In [6]:
area = pd.Series({'Alaska': 1723337, 'Texas': 695662,
'California': 423967}, name='area')
population = pd.Series({'California': 38332521, 'Texas': 26448193,
'New York': 19651127}, name='population')
Let's see what happens when we divide these to compute the population density:
In [7]:
population / area
Out[7]:
The resulting array contains the union of indices of the two input arrays, which could be determined using standard Python set arithmetic on these indices:
In [8]:
area.index | population.index
Out[8]:
Any item for which one or the other does not have an entry is marked with NaN
, or "Not a Number," which is how Pandas marks missing data (see further discussion of missing data in Handling Missing Data).
This index matching is implemented this way for any of Python's built-in arithmetic expressions; any missing values are filled in with NaN by default:
In [9]:
A = pd.Series([2, 4, 6], index=[0, 1, 2])
B = pd.Series([1, 3, 5], index=[1, 2, 3])
A + B
Out[9]:
If using NaN values is not the desired behavior, the fill value can be modified using appropriate object methods in place of the operators.
For example, calling A.add(B)
is equivalent to calling A + B
, but allows optional explicit specification of the fill value for any elements in A
or B
that might be missing:
In [10]:
A.add(B, fill_value=0)
Out[10]:
In [11]:
A = pd.DataFrame(rng.randint(0, 20, (2, 2)),
columns=list('AB'))
A
Out[11]:
In [12]:
B = pd.DataFrame(rng.randint(0, 10, (3, 3)),
columns=list('BAC'))
B
Out[12]:
In [13]:
A + B
Out[13]:
Notice that indices are aligned correctly irrespective of their order in the two objects, and indices in the result are sorted.
As was the case with Series
, we can use the associated object's arithmetic method and pass any desired fill_value
to be used in place of missing entries.
Here we'll fill with the mean of all values in A
(computed by first stacking the rows of A
):
In [14]:
fill = A.stack().mean()
A.add(B, fill_value=fill)
Out[14]:
The following table lists Python operators and their equivalent Pandas object methods:
Python Operator | Pandas Method(s) |
---|---|
+ |
add() |
- |
sub() , subtract() |
* |
mul() , multiply() |
/ |
truediv() , div() , divide() |
// |
floordiv() |
% |
mod() |
** |
pow() |
When performing operations between a DataFrame
and a Series
, the index and column alignment is similarly maintained.
Operations between a DataFrame
and a Series
are similar to operations between a two-dimensional and one-dimensional NumPy array.
Consider one common operation, where we find the difference of a two-dimensional array and one of its rows:
In [15]:
A = rng.randint(10, size=(3, 4))
A
Out[15]:
In [16]:
A - A[0]
Out[16]:
According to NumPy's broadcasting rules (see Computation on Arrays: Broadcasting), subtraction between a two-dimensional array and one of its rows is applied row-wise.
In Pandas, the convention similarly operates row-wise by default:
In [17]:
df = pd.DataFrame(A, columns=list('QRST'))
df - df.iloc[0]
Out[17]:
If you would instead like to operate column-wise, you can use the object methods mentioned earlier, while specifying the axis
keyword:
In [18]:
df.subtract(df['R'], axis=0)
Out[18]:
Note that these DataFrame
/Series
operations, like the operations discussed above, will automatically align indices between the two elements:
In [19]:
halfrow = df.iloc[0, ::2]
halfrow
Out[19]:
In [20]:
df - halfrow
Out[20]:
This preservation and alignment of indices and columns means that operations on data in Pandas will always maintain the data context, which prevents the types of silly errors that might come up when working with heterogeneous and/or misaligned data in raw NumPy arrays.