cpython/Doc/tut/tut.tex

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\documentstyle[twoside,11pt,myformat]{report}
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\title{Python Tutorial}
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\input{boilerplate}
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\begin{document}
\pagenumbering{roman}
\maketitle
\input{copyright}
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\begin{abstract}
\noindent
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Python is a simple, yet powerful programming language that bridges the
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gap between C and shell programming, and is thus ideally suited for
``throw-away programming''
and rapid prototyping. Its syntax is put
together from constructs borrowed from a variety of other languages;
most prominent are influences from ABC, C, Modula-3 and Icon.
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The Python interpreter is easily extended with new functions and data
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types implemented in C. Python is also suitable as an extension
language for highly customizable C applications such as editors or
window managers.
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Python is available for various operating systems, amongst which
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several flavors of {\UNIX}, Amoeba, the Apple Macintosh O.S.,
and MS-DOS.
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This tutorial introduces the reader informally to the basic concepts
and features of the Python language and system. It helps to have a
Python interpreter handy for hands-on experience, but as the examples
are self-contained, the tutorial can be read off-line as well.
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For a description of standard objects and modules, see the {\em Python
Library Reference} document. The {\em Python Reference Manual} gives
a more formal definition of the language.
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\end{abstract}
\pagebreak
{
\parskip = 0mm
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\tableofcontents
}
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\pagebreak
\pagenumbering{arabic}
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\chapter{Whetting Your Appetite}
If you ever wrote a large shell script, you probably know this
feeling: you'd love to add yet another feature, but it's already so
slow, and so big, and so complicated; or the feature involves a system
call or other function that is only accessible from C \ldots Usually
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the problem at hand isn't serious enough to warrant rewriting the
script in C; perhaps because the problem requires variable-length
strings or other data types (like sorted lists of file names) that are
easy in the shell but lots of work to implement in C; or perhaps just
because you're not sufficiently familiar with C.
In such cases, Python may be just the language for you. Python is
simple to use, but it is a real programming language, offering much
more structure and support for large programs than the shell has. On
the other hand, it also offers much more error checking than C, and,
being a {\em very-high-level language}, it has high-level data types
built in, such as flexible arrays and dictionaries that would cost you
days to implement efficiently in C. Because of its more general data
types Python is applicable to a much larger problem domain than {\em
Awk} or even {\em Perl}, yet many things are at least as easy in
Python as in those languages.
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Python allows you to split up your program in modules that can be
reused in other Python programs. It comes with a large collection of
standard modules that you can use as the basis of your programs --- or
as examples to start learning to program in Python. There are also
built-in modules that provide things like file I/O, system calls,
sockets, and even a generic interface to window systems (STDWIN).
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Python is an interpreted language, which can save you considerable time
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during program development because no compilation and linking is
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necessary. The interpreter can be used interactively, which makes it
easy to experiment with features of the language, to write throw-away
programs, or to test functions during bottom-up program development.
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It is also a handy desk calculator.
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Python allows writing very compact and readable programs. Programs
written in Python are typically much shorter than equivalent C
programs, for several reasons:
\begin{itemize}
\item
the high-level data types allow you to express complex operations in a
single statement;
\item
statement grouping is done by indentation instead of begin/end
brackets;
\item
no variable or argument declarations are necessary.
\end{itemize}
Python is {\em extensible}: if you know how to program in C it is easy
to add a new built-in
function or
module to the interpreter, either to
perform critical operations at maximum speed, or to link Python
programs to libraries that may only be available in binary form (such
as a vendor-specific graphics library). Once you are really hooked,
you can link the Python interpreter into an application written in C
and use it as an extension or command language for that application.
By the way, the language is named after the BBC show ``Monty
Python's Flying Circus'' and has nothing to do with nasty reptiles...
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\section{Where From Here}
Now that you are all excited about Python, you'll want to examine it
in some more detail. Since the best way to learn a language is
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using it, you are invited here to do so.
In the next chapter, the mechanics of using the interpreter are
explained. This is rather mundane information, but essential for
trying out the examples shown later.
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The rest of the tutorial introduces various features of the Python
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language and system though examples, beginning with simple
expressions, statements and data types, through functions and modules,
and finally touching upon advanced concepts like exceptions
and user-defined classes.
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When you're through with the tutorial (or just getting bored), you
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should read the Library Reference, which gives complete (though terse)
reference material about built-in and standard types, functions and
modules that can save you a lot of time when writing Python programs.
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\chapter{Using the Python Interpreter}
\section{Invoking the Interpreter}
The Python interpreter is usually installed as {\tt /usr/local/bin/python}
on those machines where it is available; putting {\tt /usr/local/bin} in
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your {\UNIX} shell's search path makes it possible to start it by
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typing the command
\bcode\begin{verbatim}
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python
\end{verbatim}\ecode
%
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to the shell. Since the choice of the directory where the interpreter
lives is an installation option, other places are possible; check with
your local Python guru or system administrator. (E.g., {\tt
/usr/local/python} is a popular alternative location.)
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The interpreter operates somewhat like the {\UNIX} shell: when called
with standard input connected to a tty device, it reads and executes
commands interactively; when called with a file name argument or with
a file as standard input, it reads and executes a {\em script} from
that file.
A third way of starting the interpreter is
``{\tt python -c command [arg] ...}'', which
executes the statement(s) in {\tt command}, analogous to the shell's
{\tt -c} option. Since Python statements often contain spaces or other
characters that are special to the shell, it is best to quote {\tt
command} in its entirety with double quotes.
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Note that there is a difference between ``{\tt python file}'' and
``{\tt python $<$file}''. In the latter case, input requests from the
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program, such as calls to {\tt input()} and {\tt raw_input()}, are
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satisfied from {\em file}. Since this file has already been read
until the end by the parser before the program starts executing, the
program will encounter EOF immediately. In the former case (which is
usually what you want) they are satisfied from whatever file or device
is connected to standard input of the Python interpreter.
When a script file is used, it is sometimes useful to be able to run
the script and enter interactive mode afterwards. This can be done by
passing {\tt -i} before the script. (This does not work if the script
is read from standard input, for the same reason as explained in the
previous paragraph.)
\subsection{Argument Passing}
When known to the interpreter, the script name and additional
arguments thereafter are passed to the script in the variable {\tt
sys.argv}, which is a list of strings. Its length is at least one;
when no script and no arguments are given, {\tt sys.argv[0]} is an
empty string. When the script name is given as {\tt '-'} (meaning
standard input), {\tt sys.argv[0]} is set to {\tt '-'}. When {\tt -c
command} is used, {\tt sys.argv[0]} is set to {\tt '-c'}. Options
found after {\tt -c command} are not consumed by the Python
interpreter's option processing but left in {\tt sys.argv} for the
command to handle.
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\subsection{Interactive Mode}
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When commands are read from a tty, the interpreter is said to be in
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{\em interactive\ mode}. In this mode it prompts for the next command
with the {\em primary\ prompt}, usually three greater-than signs ({\tt
>>>}); for continuation lines it prompts with the {\em secondary\
prompt}, by default three dots ({\tt ...}). Typing an EOF (Control-D)
at the primary prompt causes the interpreter to exit with a zero exit
status.
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The interpreter prints a welcome message stating its version number
and a copyright notice before printing the first prompt, e.g.:
\bcode\begin{verbatim}
python
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Python 1.1 (Oct 6 1994)
Copyright 1991-1994 Stichting Mathematisch Centrum, Amsterdam
>>>
\end{verbatim}\ecode
\section{The Interpreter and its Environment}
\subsection{Error Handling}
When an error occurs, the interpreter prints an error
message and a stack trace. In interactive mode, it then returns to
the primary prompt; when input came from a file, it exits with a
nonzero exit status after printing
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the stack trace. (Exceptions handled by an {\tt except} clause in a
{\tt try} statement are not errors in this context.) Some errors are
unconditionally fatal and cause an exit with a nonzero exit; this
applies to internal inconsistencies and some cases of running out of
memory. All error messages are written to the standard error stream;
normal output from the executed commands is written to standard
output.
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Typing the interrupt character (usually Control-C or DEL) to the
primary or secondary prompt cancels the input and returns to the
primary prompt.%
\footnote{
A problem with the GNU Readline package may prevent this.
}
Typing an interrupt while a command is executing raises the {\tt
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KeyboardInterrupt} exception, which may be handled by a {\tt try}
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statement.
\subsection{The Module Search Path}
When a module named {\tt foo} is imported, the interpreter searches
for a file named {\tt foo.py} in the list of directories specified by
the environment variable {\tt PYTHONPATH}. It has the same syntax as
the {\UNIX} shell variable {\tt PATH}, i.e., a list of colon-separated
directory names. When {\tt PYTHONPATH} is not set, or when the file
is not found there, the search continues in an installation-dependent
default path, usually {\tt .:/usr/local/lib/python}.
Actually, modules are searched in the list of directories given by the
variable {\tt sys.path} which is initialized from {\tt PYTHONPATH} and
the installation-dependent default. This allows Python programs that
know what they're doing to modify or replace the module search path.
See the section on Standard Modules later.
\subsection{``Compiled'' Python files}
As an important speed-up of the start-up time for short programs that
use a lot of standard modules, if a file called {\tt foo.pyc} exists
in the directory where {\tt foo.py} is found, this is assumed to
contain an already-``compiled'' version of the module {\tt foo}. The
modification time of the version of {\tt foo.py} used to create {\tt
foo.pyc} is recorded in {\tt foo.pyc}, and the file is ignored if
these don't match.
Whenever {\tt foo.py} is successfully compiled, an attempt is made to
write the compiled version to {\tt foo.pyc}. It is not an error if
this attempt fails; if for any reason the file is not written
completely, the resulting {\tt foo.pyc} file will be recognized as
invalid and thus ignored later.
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\subsection{Executable Python scripts}
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On BSD'ish {\UNIX} systems, Python scripts can be made directly
executable, like shell scripts, by putting the line
\bcode\begin{verbatim}
#! /usr/local/bin/python
\end{verbatim}\ecode
%
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(assuming that's the name of the interpreter) at the beginning of the
script and giving the file an executable mode. The {\tt \#!} must be
the first two characters of the file.
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\subsection{The Interactive Startup File}
When you use Python interactively, it is frequently handy to have some
standard commands executed every time the interpreter is started. You
can do this by setting an environment variable named {\tt
PYTHONSTARTUP} to the name of a file containing your start-up
commands. This is similar to the {\tt .profile} feature of the UNIX
shells.
This file is only read in interactive sessions, not when Python reads
commands from a script, and not when {\tt /dev/tty} is given as the
explicit source of commands (which otherwise behaves like an
interactive session). It is executed in the same name space where
interactive commands are executed, so that objects that it defines or
imports can be used without qualification in the interactive session.
You can also change the prompts {\tt sys.ps1} and {\tt sys.ps2} in
this file.
If you want to read an additional start-up file from the current
directory, you can program this in the global start-up file, e.g.
\verb\execfile('.pythonrc')\. If you want to use the startup file
in a script, you must write this explicitly in the script, e.g.
\verb\import os;\ \verb\execfile(os.environ['PYTHONSTARTUP'])\.
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\section{Interactive Input Editing and History Substitution}
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Some versions of the Python interpreter support editing of the current
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input line and history substitution, similar to facilities found in
the Korn shell and the GNU Bash shell. This is implemented using the
{\em GNU\ Readline} library, which supports Emacs-style and vi-style
editing. This library has its own documentation which I won't
duplicate here; however, the basics are easily explained.
Perhaps the quickest check to see whether command line editing is
supported is typing Control-P to the first Python prompt you get. If
it beeps, you have command line editing. If nothing appears to
happen, or if \verb/^P/ is echoed, you can skip the rest of this
section.
\subsection{Line Editing}
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If supported, input line editing is active whenever the interpreter
prints a primary or secondary prompt. The current line can be edited
using the conventional Emacs control characters. The most important
of these are: C-A (Control-A) moves the cursor to the beginning of the
line, C-E to the end, C-B moves it one position to the left, C-F to
the right. Backspace erases the character to the left of the cursor,
C-D the character to its right. C-K kills (erases) the rest of the
line to the right of the cursor, C-Y yanks back the last killed
string. C-underscore undoes the last change you made; it can be
repeated for cumulative effect.
\subsection{History Substitution}
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History substitution works as follows. All non-empty input lines
issued are saved in a history buffer, and when a new prompt is given
you are positioned on a new line at the bottom of this buffer. C-P
moves one line up (back) in the history buffer, C-N moves one down.
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Any line in the history buffer can be edited; an asterisk appears in
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front of the prompt to mark a line as modified. Pressing the Return
key passes the current line to the interpreter. C-R starts an
incremental reverse search; C-S starts a forward search.
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\subsection{Key Bindings}
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The key bindings and some other parameters of the Readline library can
be customized by placing commands in an initialization file called
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{\tt \$HOME/.inputrc}. Key bindings have the form
\bcode\begin{verbatim}
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key-name: function-name
\end{verbatim}\ecode
%
or
\bcode\begin{verbatim}
"string": function-name
\end{verbatim}\ecode
%
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and options can be set with
\bcode\begin{verbatim}
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set option-name value
\end{verbatim}\ecode
%
For example:
\bcode\begin{verbatim}
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# I prefer vi-style editing:
set editing-mode vi
# Edit using a single line:
set horizontal-scroll-mode On
# Rebind some keys:
Meta-h: backward-kill-word
"\C-u": universal-argument
"\C-x\C-r": re-read-init-file
\end{verbatim}\ecode
%
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Note that the default binding for TAB in Python is to insert a TAB
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instead of Readline's default filename completion function. If you
insist, you can override this by putting
\bcode\begin{verbatim}
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TAB: complete
\end{verbatim}\ecode
%
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in your {\tt \$HOME/.inputrc}. (Of course, this makes it hard to type
indented continuation lines...)
\subsection{Commentary}
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This facility is an enormous step forward compared to previous
versions of the interpreter; however, some wishes are left: It would
be nice if the proper indentation were suggested on continuation lines
(the parser knows if an indent token is required next). The
completion mechanism might use the interpreter's symbol table. A
command to check (or even suggest) matching parentheses, quotes etc.
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would also be useful.
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\chapter{An Informal Introduction to Python}
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In the following examples, input and output are distinguished by the
presence or absence of prompts ({\tt >>>} and {\tt ...}): to repeat
the example, you must type everything after the prompt, when the
prompt appears; lines that do not begin with a prompt are output from
the interpreter.%
\footnote{
I'd prefer to use different fonts to distinguish input
from output, but the amount of LaTeX hacking that would require
is currently beyond my ability.
}
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Note that a secondary prompt on a line by itself in an example means
you must type a blank line; this is used to end a multi-line command.
\section{Using Python as a Calculator}
Let's try some simple Python commands. Start the interpreter and wait
for the primary prompt, {\tt >>>}. (It shouldn't take long.)
\subsection{Numbers}
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The interpreter acts as a simple calculator: you can type an
expression at it and it will write the value. Expression syntax is
straightforward: the operators {\tt +}, {\tt -}, {\tt *} and {\tt /}
work just like in most other languages (e.g., Pascal or C); parentheses
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can be used for grouping. For example:
\bcode\begin{verbatim}
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>>> 2+2
4
>>> # This is a comment
... 2+2
4
>>> 2+2 # and a comment on the same line as code
4
>>> (50-5*6)/4
5
>>> # Integer division returns the floor:
... 7/3
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2
>>> 7/-3
-3
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>>>
\end{verbatim}\ecode
%
Like in C, the equal sign ({\tt =}) is used to assign a value to a
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variable. The value of an assignment is not written:
\bcode\begin{verbatim}
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>>> width = 20
>>> height = 5*9
>>> width * height
900
>>>
\end{verbatim}\ecode
%
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A value can be assigned to several variables simultaneously:
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\bcode\begin{verbatim}
>>> x = y = z = 0 # Zero x, y and z
>>> x
0
>>> y
0
>>> z
0
>>>
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\end{verbatim}\ecode
%
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There is full support for floating point; operators with mixed type
operands convert the integer operand to floating point:
\bcode\begin{verbatim}
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>>> 4 * 2.5 / 3.3
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3.0303030303
>>> 7.0 / 2
3.5
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>>>
\end{verbatim}\ecode
\subsection{Strings}
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Besides numbers, Python can also manipulate strings, enclosed in
single quotes or double quotes:
\bcode\begin{verbatim}
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>>> 'foo bar'
'foo bar'
>>> 'doesn\'t'
"doesn't"
>>> "doesn't"
"doesn't"
>>> '"Yes," he said.'
'"Yes," he said.'
>>> "\"Yes,\" he said."
'"Yes," he said.'
>>> '"Isn\'t," she said.'
'"Isn\'t," she said.'
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>>>
\end{verbatim}\ecode
%
Strings are written the same way as they are typed for input: inside
quotes and with quotes and other funny characters escaped by backslashes,
to show the precise value. The string is enclosed in double quotes if
the string contains a single quote and no double quotes, else it's
enclosed in single quotes. (The {\tt print} statement, described later,
can be used to write strings without quotes or escapes.)
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Strings can be concatenated (glued together) with the {\tt +}
operator, and repeated with {\tt *}:
\bcode\begin{verbatim}
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>>> word = 'Help' + 'A'
>>> word
'HelpA'
>>> '<' + word*5 + '>'
'<HelpAHelpAHelpAHelpAHelpA>'
>>>
\end{verbatim}\ecode
%
Strings can be subscripted (indexed); like in C, the first character of
a string has subscript (index) 0.
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There is no separate character type; a character is simply a string of
size one. Like in Icon, substrings can be specified with the {\em
slice} notation: two indices separated by a colon.
\bcode\begin{verbatim}
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>>> word[4]
'A'
>>> word[0:2]
'He'
>>> word[2:4]
'lp'
>>>
\end{verbatim}\ecode
%
Slice indices have useful defaults; an omitted first index defaults to
zero, an omitted second index defaults to the size of the string being
sliced.
\bcode\begin{verbatim}
>>> word[:2] # The first two characters
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'He'
>>> word[2:] # All but the first two characters
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'lpA'
>>>
\end{verbatim}\ecode
%
Here's a useful invariant of slice operations: \verb\s[:i] + s[i:]\
equals \verb\s\.
\bcode\begin{verbatim}
>>> word[:2] + word[2:]
'HelpA'
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>>> word[:3] + word[3:]
'HelpA'
>>>
\end{verbatim}\ecode
%
Degenerate slice indices are handled gracefully: an index that is too
large is replaced by the string size, an upper bound smaller than the
lower bound returns an empty string.
\bcode\begin{verbatim}
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>>> word[1:100]
'elpA'
>>> word[10:]
''
>>> word[2:1]
''
>>>
\end{verbatim}\ecode
%
Indices may be negative numbers, to start counting from the right.
For example:
\bcode\begin{verbatim}
>>> word[-1] # The last character
'A'
>>> word[-2] # The last-but-one character
'p'
>>> word[-2:] # The last two characters
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'pA'
>>> word[:-2] # All but the last two characters
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'Hel'
>>>
\end{verbatim}\ecode
%
But note that -0 is really the same as 0, so it does not count from
the right!
\bcode\begin{verbatim}
>>> word[-0] # (since -0 equals 0)
'H'
>>>
\end{verbatim}\ecode
%
Out-of-range negative slice indices are truncated, but don't try this
for single-element (non-slice) indices:
\bcode\begin{verbatim}
>>> word[-100:]
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'HelpA'
>>> word[-10] # error
Traceback (innermost last):
File "<stdin>", line 1
IndexError: string index out of range
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>>>
\end{verbatim}\ecode
%
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The best way to remember how slices work is to think of the indices as
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pointing {\em between} characters, with the left edge of the first
character numbered 0. Then the right edge of the last character of a
string of {\tt n} characters has index {\tt n}, for example:
\bcode\begin{verbatim}
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+---+---+---+---+---+
| H | e | l | p | A |
+---+---+---+---+---+
0 1 2 3 4 5
-5 -4 -3 -2 -1
\end{verbatim}\ecode
%
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The first row of numbers gives the position of the indices 0...5 in
the string; the second row gives the corresponding negative indices.
The slice from \verb\i\ to \verb\j\ consists of all characters between
the edges labeled \verb\i\ and \verb\j\, respectively.
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For nonnegative indices, the length of a slice is the difference of
the indices, if both are within bounds, e.g., the length of
\verb\word[1:3]\ is 2.
The built-in function {\tt len()} returns the length of a string:
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\bcode\begin{verbatim}
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>>> s = 'supercalifragilisticexpialidocious'
>>> len(s)
34
>>>
\end{verbatim}\ecode
\subsection{Lists}
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Python knows a number of {\em compound} data types, used to group
together other values. The most versatile is the {\em list}, which
can be written as a list of comma-separated values (items) between
square brackets. List items need not all have the same type.
\bcode\begin{verbatim}
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>>> a = ['foo', 'bar', 100, 1234]
>>> a
['foo', 'bar', 100, 1234]
>>>
\end{verbatim}\ecode
%
Like string indices, list indices start at 0, and lists can be sliced,
concatenated and so on:
\bcode\begin{verbatim}
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>>> a[0]
'foo'
>>> a[3]
1234
>>> a[-2]
100
>>> a[1:-1]
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['bar', 100]
>>> a[:2] + ['bletch', 2*2]
['foo', 'bar', 'bletch', 4]
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>>> 3*a[:3] + ['Boe!']
['foo', 'bar', 100, 'foo', 'bar', 100, 'foo', 'bar', 100, 'Boe!']
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>>>
\end{verbatim}\ecode
%
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Unlike strings, which are {\em immutable}, it is possible to change
individual elements of a list:
\bcode\begin{verbatim}
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>>> a
['foo', 'bar', 100, 1234]
>>> a[2] = a[2] + 23
>>> a
['foo', 'bar', 123, 1234]
>>>
\end{verbatim}\ecode
%
Assignment to slices is also possible, and this can even change the size
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of the list:
\bcode\begin{verbatim}
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>>> # Replace some items:
... a[0:2] = [1, 12]
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>>> a
[1, 12, 123, 1234]
>>> # Remove some:
... a[0:2] = []
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>>> a
[123, 1234]
>>> # Insert some:
... a[1:1] = ['bletch', 'xyzzy']
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>>> a
[123, 'bletch', 'xyzzy', 1234]
>>> a[:0] = a # Insert (a copy of) itself at the beginning
>>> a
[123, 'bletch', 'xyzzy', 1234, 123, 'bletch', 'xyzzy', 1234]
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>>>
\end{verbatim}\ecode
%
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The built-in function {\tt len()} also applies to lists:
\bcode\begin{verbatim}
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>>> len(a)
8
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>>>
\end{verbatim}\ecode
%
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It is possible to nest lists (create lists containing other lists),
for example:
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\bcode\begin{verbatim}
>>> q = [2, 3]
>>> p = [1, q, 4]
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>>> len(p)
3
>>> p[1]
[2, 3]
>>> p[1][0]
2
>>> p[1].append('xtra') # See section 5.1
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>>> p
[1, [2, 3, 'xtra'], 4]
>>> q
[2, 3, 'xtra']
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>>>
\end{verbatim}\ecode
%
Note that in the last example, {\tt p[1]} and {\tt q} really refer to
the same object! We'll come back to {\em object semantics} later.
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\section{First Steps Towards Programming}
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Of course, we can use Python for more complicated tasks than adding
two and two together. For instance, we can write an initial
subsequence of the {\em Fibonacci} series as follows:
\bcode\begin{verbatim}
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>>> # Fibonacci series:
... # the sum of two elements defines the next
... a, b = 0, 1
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>>> while b < 10:
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... print b
... a, b = b, a+b
...
1
1
2
3
5
8
>>>
\end{verbatim}\ecode
%
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This example introduces several new features.
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\begin{itemize}
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\item
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The first line contains a {\em multiple assignment}: the variables
{\tt a} and {\tt b} simultaneously get the new values 0 and 1. On the
last line this is used again, demonstrating that the expressions on
the right-hand side are all evaluated first before any of the
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assignments take place.
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\item
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The {\tt while} loop executes as long as the condition (here: {\tt b <
10}) remains true. In Python, like in C, any non-zero integer value is
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true; zero is false. The condition may also be a string or list value,
in fact any sequence; anything with a non-zero length is true, empty
sequences are false. The test used in the example is a simple
comparison. The standard comparison operators are written the same as
in C: {\tt <}, {\tt >}, {\tt ==}, {\tt <=}, {\tt >=} and {\tt !=}.
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\item
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The {\em body} of the loop is {\em indented}: indentation is Python's
way of grouping statements. Python does not (yet!) provide an
intelligent input line editing facility, so you have to type a tab or
space(s) for each indented line. In practice you will prepare more
complicated input for Python with a text editor; most text editors have
an auto-indent facility. When a compound statement is entered
interactively, it must be followed by a blank line to indicate
completion (since the parser cannot guess when you have typed the last
line).
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\item
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The {\tt print} statement writes the value of the expression(s) it is
given. It differs from just writing the expression you want to write
(as we did earlier in the calculator examples) in the way it handles
multiple expressions and strings. Strings are printed without quotes,
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and a space is inserted between items, so you can format things nicely,
like this:
\bcode\begin{verbatim}
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>>> i = 256*256
>>> print 'The value of i is', i
The value of i is 65536
>>>
\end{verbatim}\ecode
%
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A trailing comma avoids the newline after the output:
\bcode\begin{verbatim}
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>>> a, b = 0, 1
>>> while b < 1000:
... print b,
... a, b = b, a+b
...
1 1 2 3 5 8 13 21 34 55 89 144 233 377 610 987
>>>
\end{verbatim}\ecode
%
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Note that the interpreter inserts a newline before it prints the next
prompt if the last line was not completed.
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\end{itemize}
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\chapter{More Control Flow Tools}
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Besides the {\tt while} statement just introduced, Python knows the
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usual control flow statements known from other languages, with some
twists.
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\section{If Statements}
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Perhaps the most well-known statement type is the {\tt if} statement.
For example:
\bcode\begin{verbatim}
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>>> if x < 0:
... x = 0
... print 'Negative changed to zero'
... elif x == 0:
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... print 'Zero'
... elif x == 1:
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... print 'Single'
... else:
... print 'More'
...
\end{verbatim}\ecode
%
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There can be zero or more {\tt elif} parts, and the {\tt else} part is
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optional. The keyword `{\tt elif}' is short for `{\tt else if}', and is
useful to avoid excessive indentation. An {\tt if...elif...elif...}
sequence is a substitute for the {\em switch} or {\em case} statements
found in other languages.
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\section{For Statements}
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The {\tt for} statement in Python differs a bit from what you may be
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used to in C or Pascal. Rather than always iterating over an
arithmetic progression of numbers (like in Pascal), or leaving the user
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completely free in the iteration test and step (as C), Python's {\tt
for} statement iterates over the items of any sequence (e.g., a list
or a string), in the order that they appear in the sequence. For
example (no pun intended):
\bcode\begin{verbatim}
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>>> # Measure some strings:
... a = ['cat', 'window', 'defenestrate']
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>>> for x in a:
... print x, len(x)
...
cat 3
window 6
defenestrate 12
>>>
\end{verbatim}\ecode
%
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It is not safe to modify the sequence being iterated over in the loop
(this can only happen for mutable sequence types, i.e., lists). If
you need to modify the list you are iterating over, e.g., duplicate
selected items, you must iterate over a copy. The slice notation
makes this particularly convenient:
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\bcode\begin{verbatim}
>>> for x in a[:]: # make a slice copy of the entire list
... if len(x) > 6: a.insert(0, x)
...
>>> a
['defenestrate', 'cat', 'window', 'defenestrate']
>>>
\end{verbatim}\ecode
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\section{The {\tt range()} Function}
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If you do need to iterate over a sequence of numbers, the built-in
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function {\tt range()} comes in handy. It generates lists containing
arithmetic progressions, e.g.:
\bcode\begin{verbatim}
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>>> range(10)
[0, 1, 2, 3, 4, 5, 6, 7, 8, 9]
>>>
\end{verbatim}\ecode
%
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The given end point is never part of the generated list; {\tt range(10)}
generates a list of 10 values, exactly the legal indices for items of a
sequence of length 10. It is possible to let the range start at another
number, or to specify a different increment (even negative):
\bcode\begin{verbatim}
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>>> range(5, 10)
[5, 6, 7, 8, 9]
>>> range(0, 10, 3)
[0, 3, 6, 9]
>>> range(-10, -100, -30)
[-10, -40, -70]
>>>
\end{verbatim}\ecode
%
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To iterate over the indices of a sequence, combine {\tt range()} and
{\tt len()} as follows:
\bcode\begin{verbatim}
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>>> a = ['Mary', 'had', 'a', 'little', 'lamb']
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>>> for i in range(len(a)):
... print i, a[i]
...
0 Mary
1 had
2 a
3 little
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4 lamb
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>>>
\end{verbatim}\ecode
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\section{Break and Continue Statements, and Else Clauses on Loops}
The {\tt break} statement, like in C, breaks out of the smallest
enclosing {\tt for} or {\tt while} loop.
The {\tt continue} statement, also borrowed from C, continues with the
next iteration of the loop.
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Loop statements may have an {\tt else} clause; it is executed when the
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loop terminates through exhaustion of the list (with {\tt for}) or when
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the condition becomes false (with {\tt while}), but not when the loop is
terminated by a {\tt break} statement. This is exemplified by the
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following loop, which searches for prime numbers:
\bcode\begin{verbatim}
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>>> for n in range(2, 10):
... for x in range(2, n):
... if n % x == 0:
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... print n, 'equals', x, '*', n/x
... break
... else:
... print n, 'is a prime number'
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...
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2 is a prime number
3 is a prime number
4 equals 2 * 2
5 is a prime number
6 equals 2 * 3
7 is a prime number
8 equals 2 * 4
9 equals 3 * 3
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>>>
\end{verbatim}\ecode
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\section{Pass Statements}
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The {\tt pass} statement does nothing.
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It can be used when a statement is required syntactically but the
program requires no action.
For example:
\bcode\begin{verbatim}
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>>> while 1:
... pass # Busy-wait for keyboard interrupt
...
\end{verbatim}\ecode
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\section{Defining Functions}
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We can create a function that writes the Fibonacci series to an
arbitrary boundary:
\bcode\begin{verbatim}
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>>> def fib(n): # write Fibonacci series up to n
... a, b = 0, 1
... while b < n:
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... print b,
... a, b = b, a+b
...
>>> # Now call the function we just defined:
... fib(2000)
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1 1 2 3 5 8 13 21 34 55 89 144 233 377 610 987 1597
>>>
\end{verbatim}\ecode
%
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The keyword {\tt def} introduces a function {\em definition}. It must
be followed by the function name and the parenthesized list of formal
parameters. The statements that form the body of the function starts at
the next line, indented by a tab stop.
The {\em execution} of a function introduces a new symbol table used
for the local variables of the function. More precisely, all variable
assignments in a function store the value in the local symbol table;
whereas
variable references first look in the local symbol table, then
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in the global symbol table, and then in the table of built-in names.
Thus,
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global variables cannot be directly assigned a value within a
function (unless named in a {\tt global} statement), although
they may be referenced.
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The actual parameters (arguments) to a function call are introduced in
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the local symbol table of the called function when it is called; thus,
arguments are passed using {\em call\ by\ value}.%
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\footnote{
Actually, {\em call by object reference} would be a better
description, since if a mutable object is passed, the caller
will see any changes the callee makes to it (e.g., items
inserted into a list).
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}
When a function calls another function, a new local symbol table is
created for that call.
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A function definition introduces the function name in the
current
symbol table. The value
of the function name
has a type that is recognized by the interpreter as a user-defined
function. This value can be assigned to another name which can then
also be used as a function. This serves as a general renaming
mechanism:
\bcode\begin{verbatim}
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>>> fib
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<function object at 10042ed0>
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>>> f = fib
>>> f(100)
1 1 2 3 5 8 13 21 34 55 89
>>>
\end{verbatim}\ecode
%
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You might object that {\tt fib} is not a function but a procedure. In
Python, like in C, procedures are just functions that don't return a
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value. In fact, technically speaking, procedures do return a value,
albeit a rather boring one. This value is called {\tt None} (it's a
built-in name). Writing the value {\tt None} is normally suppressed by
the interpreter if it would be the only value written. You can see it
if you really want to:
\bcode\begin{verbatim}
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>>> print fib(0)
None
>>>
\end{verbatim}\ecode
%
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It is simple to write a function that returns a list of the numbers of
the Fibonacci series, instead of printing it:
\bcode\begin{verbatim}
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>>> def fib2(n): # return Fibonacci series up to n
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... result = []
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... a, b = 0, 1
... while b < n:
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... result.append(b) # see below
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... a, b = b, a+b
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... return result
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...
>>> f100 = fib2(100) # call it
>>> f100 # write the result
[1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89]
>>>
\end{verbatim}\ecode
%
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This example, as usual, demonstrates some new Python features:
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\begin{itemize}
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\item
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The {\tt return} statement returns with a value from a function. {\tt
return} without an expression argument is used to return from the middle
of a procedure (falling off the end also returns from a procedure), in
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which case the {\tt None} value is returned.
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\item
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The statement {\tt result.append(b)} calls a {\em method} of the list
object {\tt result}. A method is a function that `belongs' to an
object and is named {\tt obj.methodname}, where {\tt obj} is some
object (this may be an expression), and {\tt methodname} is the name
of a method that is defined by the object's type. Different types
define different methods. Methods of different types may have the
same name without causing ambiguity. (It is possible to define your
own object types and methods, using {\em classes}, as discussed later
in this tutorial.)
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The method {\tt append} shown in the example, is defined for
list objects; it adds a new element at the end of the list. In this
example
it is equivalent to {\tt result = result + [b]}, but more efficient.
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\end{itemize}
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\chapter{Odds and Ends}
This chapter describes some things you've learned about already in
more detail, and adds some new things as well.
\section{More on Lists}
The list data type has some more methods. Here are all of the methods
of lists objects:
\begin{description}
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\item[{\tt insert(i, x)}]
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Insert an item at a given position. The first argument is the index of
the element before which to insert, so {\tt a.insert(0, x)} inserts at
the front of the list, and {\tt a.insert(len(a), x)} is equivalent to
{\tt a.append(x)}.
\item[{\tt append(x)}]
Equivalent to {\tt a.insert(len(a), x)}.
\item[{\tt index(x)}]
Return the index in the list of the first item whose value is {\tt x}.
It is an error if there is no such item.
\item[{\tt remove(x)}]
Remove the first item from the list whose value is {\tt x}.
It is an error if there is no such item.
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\item[{\tt sort()}]
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Sort the items of the list, in place.
\item[{\tt reverse()}]
Reverse the elements of the list, in place.
\item[{\tt count(x)}]
Return the number of times {\tt x} appears in the list.
\end{description}
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An example that uses all list methods:
\bcode\begin{verbatim}
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>>> a = [66.6, 333, 333, 1, 1234.5]
>>> print a.count(333), a.count(66.6), a.count('x')
2 1 0
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>>> a.insert(2, -1)
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>>> a.append(333)
>>> a
[66.6, 333, -1, 333, 1, 1234.5, 333]
>>> a.index(333)
1
>>> a.remove(333)
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>>> a
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[66.6, -1, 333, 1, 1234.5, 333]
>>> a.reverse()
>>> a
[333, 1234.5, 1, 333, -1, 66.6]
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>>> a.sort()
>>> a
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[-1, 1, 66.6, 333, 333, 1234.5]
>>>
\end{verbatim}\ecode
\section{The {\tt del} statement}
There is a way to remove an item from a list given its index instead
of its value: the {\tt del} statement. This can also be used to
remove slices from a list (which we did earlier by assignment of an
empty list to the slice). For example:
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\bcode\begin{verbatim}
>>> a
[-1, 1, 66.6, 333, 333, 1234.5]
>>> del a[0]
>>> a
[1, 66.6, 333, 333, 1234.5]
>>> del a[2:4]
>>> a
[1, 66.6, 1234.5]
>>>
\end{verbatim}\ecode
%
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{\tt del} can also be used to delete entire variables:
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\bcode\begin{verbatim}
>>> del a
>>>
\end{verbatim}\ecode
%
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Referencing the name {\tt a} hereafter is an error (at least until
another value is assigned to it). We'll find other uses for {\tt del}
later.
\section{Tuples and Sequences}
We saw that lists and strings have many common properties, e.g.,
indexing and slicing operations. They are two examples of {\em
sequence} data types. Since Python is an evolving language, other
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sequence data types may be added. There is also another standard
sequence data type: the {\em tuple}.
A tuple consists of a number of values separated by commas, for
instance:
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\bcode\begin{verbatim}
>>> t = 12345, 54321, 'hello!'
>>> t[0]
12345
>>> t
(12345, 54321, 'hello!')
>>> # Tuples may be nested:
... u = t, (1, 2, 3, 4, 5)
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>>> u
((12345, 54321, 'hello!'), (1, 2, 3, 4, 5))
>>>
\end{verbatim}\ecode
%
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As you see, on output tuples are alway enclosed in parentheses, so
that nested tuples are interpreted correctly; they may be input with
or without surrounding parentheses, although often parentheses are
necessary anyway (if the tuple is part of a larger expression).
Tuples have many uses, e.g., (x, y) coordinate pairs, employee records
from a database, etc. Tuples, like strings, are immutable: it is not
possible to assign to the individual items of a tuple (you can
simulate much of the same effect with slicing and concatenation,
though).
A special problem is the construction of tuples containing 0 or 1
items: the syntax has some extra quirks to accommodate these. Empty
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tuples are constructed by an empty pair of parentheses; a tuple with
one item is constructed by following a value with a comma
(it is not sufficient to enclose a single value in parentheses).
Ugly, but effective. For example:
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\bcode\begin{verbatim}
>>> empty = ()
>>> singleton = 'hello', # <-- note trailing comma
>>> len(empty)
0
>>> len(singleton)
1
>>> singleton
('hello',)
>>>
\end{verbatim}\ecode
%
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The statement {\tt t = 12345, 54321, 'hello!'} is an example of {\em
tuple packing}: the values {\tt 12345}, {\tt 54321} and {\tt 'hello!'}
are packed together in a tuple. The reverse operation is also
possible, e.g.:
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\bcode\begin{verbatim}
>>> x, y, z = t
>>>
\end{verbatim}\ecode
%
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This is called, appropriately enough, {\em tuple unpacking}. Tuple
unpacking requires that the list of variables on the left has the same
number of elements as the length of the tuple. Note that multiple
assignment is really just a combination of tuple packing and tuple
unpacking!
Occasionally, the corresponding operation on lists is useful: {\em list
unpacking}. This is supported by enclosing the list of variables in
square brackets:
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\bcode\begin{verbatim}
>>> a = ['foo', 'bar', 100, 1234]
>>> [a1, a2, a3, a4] = a
>>>
\end{verbatim}\ecode
\section{Dictionaries}
Another useful data type built into Python is the {\em dictionary}.
Dictionaries are sometimes found in other languages as ``associative
memories'' or ``associative arrays''. Unlike sequences, which are
indexed by a range of numbers, dictionaries are indexed by {\em keys},
which are strings (the use of non-string values as keys
is supported, but beyond the scope of this tutorial).
It is best to think of a dictionary as an unordered set of
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{\em key:value} pairs, with the requirement that the keys are unique
(within one dictionary).
A pair of braces creates an empty dictionary: \verb/{}/.
Placing a comma-separated list of key:value pairs within the
braces adds initial key:value pairs to the dictionary; this is also the
way dictionaries are written on output.
The main operations on a dictionary are storing a value with some key
and extracting the value given the key. It is also possible to delete
a key:value pair
with {\tt del}.
If you store using a key that is already in use, the old value
associated with that key is forgotten. It is an error to extract a
value using a non-existent key.
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The {\tt keys()} method of a dictionary object returns a list of all the
keys used in the dictionary, in random order (if you want it sorted,
just apply the {\tt sort()} method to the list of keys). To check
whether a single key is in the dictionary, use the \verb/has_key()/
method of the dictionary.
Here is a small example using a dictionary:
\bcode\begin{verbatim}
>>> tel = {'jack': 4098, 'sape': 4139}
>>> tel['guido'] = 4127
>>> tel
{'sape': 4139, 'guido': 4127, 'jack': 4098}
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>>> tel['jack']
4098
>>> del tel['sape']
>>> tel['irv'] = 4127
>>> tel
{'guido': 4127, 'irv': 4127, 'jack': 4098}
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>>> tel.keys()
['guido', 'irv', 'jack']
>>> tel.has_key('guido')
1
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>>>
\end{verbatim}\ecode
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\section{More on Conditions}
The conditions used in {\tt while} and {\tt if} statements above can
contain other operators besides comparisons.
The comparison operators {\tt in} and {\tt not in} check whether a value
occurs (does not occur) in a sequence. The operators {\tt is} and {\tt
is not} compare whether two objects are really the same object; this
only matters for mutable objects like lists. All comparison operators
have the same priority, which is lower than that of all numerical
operators.
Comparisons can be chained: e.g., {\tt a < b == c} tests whether {\tt a}
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is less than {\tt b} and moreover {\tt b} equals {\tt c}.
Comparisons may be combined by the Boolean operators {\tt and} and {\tt
or}, and the outcome of a comparison (or of any other Boolean
expression) may be negated with {\tt not}. These all have lower
priorities than comparison operators again; between them, {\tt not} has
the highest priority, and {\tt or} the lowest, so that
{\tt A and not B or C} is equivalent to {\tt (A and (not B)) or C}. Of
course, parentheses can be used to express the desired composition.
The Boolean operators {\tt and} and {\tt or} are so-called {\em
shortcut} operators: their arguments are evaluated from left to right,
and evaluation stops as soon as the outcome is determined. E.g., if
{\tt A} and {\tt C} are true but {\tt B} is false, {\tt A and B and C}
does not evaluate the expression C. In general, the return value of a
shortcut operator, when used as a general value and not as a Boolean, is
the last evaluated argument.
It is possible to assign the result of a comparison or other Boolean
expression to a variable. For example,
\bcode\begin{verbatim}
>>> string1, string2, string3 = '', 'Trondheim', 'Hammer Dance'
>>> non_null = string1 or string2 or string3
>>> non_null
'Trondheim'
>>>
\end{verbatim}\ecode
%
Note that in Python, unlike C, assignment cannot occur inside expressions.
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\section{Comparing Sequences and Other Types}
Sequence objects may be compared to other objects with the same
sequence type. The comparison uses {\em lexicographical} ordering:
first the first two items are compared, and if they differ this
determines the outcome of the comparison; if they are equal, the next
two items are compared, and so on, until either sequence is exhausted.
If two items to be compared are themselves sequences of the same type,
the lexicographical comparison is carried out recursively. If all
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items of two sequences compare equal, the sequences are considered
equal. If one sequence is an initial subsequence of the other, the
shorted sequence is the smaller one. Lexicographical ordering for
strings uses the ASCII ordering for individual characters. Some
examples of comparisons between sequences with the same types:
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\bcode\begin{verbatim}
(1, 2, 3) < (1, 2, 4)
[1, 2, 3] < [1, 2, 4]
'ABC' < 'C' < 'Pascal' < 'Python'
(1, 2, 3, 4) < (1, 2, 4)
(1, 2) < (1, 2, -1)
(1, 2, 3) = (1.0, 2.0, 3.0)
(1, 2, ('aa', 'ab')) < (1, 2, ('abc', 'a'), 4)
\end{verbatim}\ecode
%
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Note that comparing objects of different types is legal. The outcome
is deterministic but arbitrary: the types are ordered by their name.
Thus, a list is always smaller than a string, a string is always
smaller than a tuple, etc. Mixed numeric types are compared according
to their numeric value, so 0 equals 0.0, etc.%
\footnote{
The rules for comparing objects of different types should
not be relied upon; they may change in a future version of
the language.
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}
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\chapter{Modules}
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If you quit from the Python interpreter and enter it again, the
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definitions you have made (functions and variables) are lost.
Therefore, if you want to write a somewhat longer program, you are
better off using a text editor to prepare the input for the interpreter
and running it with that file as input instead. This is known as creating a
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{\em script}. As your program gets longer, you may want to split it
into several files for easier maintenance. You may also want to use a
handy function that you've written in several programs without copying
its definition into each program.
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To support this, Python has a way to put definitions in a file and use
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them in a script or in an interactive instance of the interpreter.
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Such a file is called a {\em module}; definitions from a module can be
{\em imported} into other modules or into the {\em main} module (the
collection of variables that you have access to in a script
executed at the top level
and in calculator mode).
A module is a file containing Python definitions and statements. The
file name is the module name with the suffix {\tt .py} appended. Within
a module, the module's name (as a string) is available as the value of
the global variable {\tt __name__}. For instance, use your favorite text
editor to create a file called {\tt fibo.py} in the current directory
with the following contents:
\bcode\begin{verbatim}
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# Fibonacci numbers module
def fib(n): # write Fibonacci series up to n
a, b = 0, 1
while b < n:
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print b,
a, b = b, a+b
def fib2(n): # return Fibonacci series up to n
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result = []
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a, b = 0, 1
while b < n:
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result.append(b)
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a, b = b, a+b
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return result
\end{verbatim}\ecode
%
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Now enter the Python interpreter and import this module with the
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following command:
\bcode\begin{verbatim}
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>>> import fibo
>>>
\end{verbatim}\ecode
%
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This does not enter the names of the functions defined in
{\tt fibo}
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directly in the current symbol table; it only enters the module name
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{\tt fibo}
there.
Using the module name you can access the functions:
\bcode\begin{verbatim}
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>>> fibo.fib(1000)
1 1 2 3 5 8 13 21 34 55 89 144 233 377 610 987
>>> fibo.fib2(100)
[1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89]
>>> fibo.__name__
'fibo'
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>>>
\end{verbatim}\ecode
%
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If you intend to use a function often you can assign it to a local name:
\bcode\begin{verbatim}
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>>> fib = fibo.fib
>>> fib(500)
1 1 2 3 5 8 13 21 34 55 89 144 233 377
>>>
\end{verbatim}\ecode
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\section{More on Modules}
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A module can contain executable statements as well as function
definitions.
These statements are intended to initialize the module.
They are executed only the
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{\em first}
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time the module is imported somewhere.%
\footnote{
In fact function definitions are also `statements' that are
`executed'; the execution enters the function name in the
module's global symbol table.
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}
Each module has its own private symbol table, which is used as the
global symbol table by all functions defined in the module.
Thus, the author of a module can use global variables in the module
without worrying about accidental clashes with a user's global
variables.
On the other hand, if you know what you are doing you can touch a
module's global variables with the same notation used to refer to its
functions,
{\tt modname.itemname}.
Modules can import other modules.
It is customary but not required to place all
{\tt import}
statements at the beginning of a module (or script, for that matter).
The imported module names are placed in the importing module's global
symbol table.
There is a variant of the
{\tt import}
statement that imports names from a module directly into the importing
module's symbol table.
For example:
\bcode\begin{verbatim}
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>>> from fibo import fib, fib2
>>> fib(500)
1 1 2 3 5 8 13 21 34 55 89 144 233 377
>>>
\end{verbatim}\ecode
%
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This does not introduce the module name from which the imports are taken
in the local symbol table (so in the example, {\tt fibo} is not
defined).
There is even a variant to import all names that a module defines:
\bcode\begin{verbatim}
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>>> from fibo import *
>>> fib(500)
1 1 2 3 5 8 13 21 34 55 89 144 233 377
>>>
\end{verbatim}\ecode
%
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This imports all names except those beginning with an underscore
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({\tt _}).
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\section{Standard Modules}
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Python comes with a library of standard modules, described in a separate
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document (Python Library Reference). Some modules are built into the
interpreter; these provide access to operations that are not part of the
core of the language but are nevertheless built in, either for
efficiency or to provide access to operating system primitives such as
system calls. The set of such modules is a configuration option; e.g.,
the {\tt amoeba} module is only provided on systems that somehow support
Amoeba primitives. One particular module deserves some attention: {\tt
sys}, which is built into every Python interpreter. The variables {\tt
sys.ps1} and {\tt sys.ps2} define the strings used as primary and
secondary prompts:
\bcode\begin{verbatim}
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>>> import sys
>>> sys.ps1
'>>> '
>>> sys.ps2
'... '
>>> sys.ps1 = 'C> '
C> print 'Yuck!'
Yuck!
C>
\end{verbatim}\ecode
%
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These two variables are only defined if the interpreter is in
interactive mode.
The variable
{\tt sys.path}
is a list of strings that determine the interpreter's search path for
modules.
It is initialized to a default path taken from the environment variable
{\tt PYTHONPATH},
or from a built-in default if
{\tt PYTHONPATH}
is not set.
You can modify it using standard list operations, e.g.:
\bcode\begin{verbatim}
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>>> import sys
>>> sys.path.append('/ufs/guido/lib/python')
>>>
\end{verbatim}\ecode
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\section{The {\tt dir()} function}
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The built-in function {\tt dir} is used to find out which names a module
defines. It returns a sorted list of strings:
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\bcode\begin{verbatim}
>>> import fibo, sys
>>> dir(fibo)
['__name__', 'fib', 'fib2']
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>>> dir(sys)
['__name__', 'argv', 'builtin_module_names', 'copyright', 'exit',
'maxint', 'modules', 'path', 'ps1', 'ps2', 'setprofile', 'settrace',
'stderr', 'stdin', 'stdout', 'version']
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>>>
\end{verbatim}\ecode
%
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Without arguments, {\tt dir()} lists the names you have defined currently:
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\bcode\begin{verbatim}
>>> a = [1, 2, 3, 4, 5]
>>> import fibo, sys
>>> fib = fibo.fib
>>> dir()
['__name__', 'a', 'fib', 'fibo', 'sys']
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>>>
\end{verbatim}\ecode
%
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Note that it lists all types of names: variables, modules, functions, etc.
{\tt dir()} does not list the names of built-in functions and variables.
If you want a list of those, they are defined in the standard module
{\tt __builtin__}:
\bcode\begin{verbatim}
>>> import __builtin__
>>> dir(__builtin__)
['AccessError', 'AttributeError', 'ConflictError', 'EOFError', 'IOError',
'ImportError', 'IndexError', 'KeyError', 'KeyboardInterrupt',
'MemoryError', 'NameError', 'None', 'OverflowError', 'RuntimeError',
'SyntaxError', 'SystemError', 'SystemExit', 'TypeError', 'ValueError',
'ZeroDivisionError', '__name__', 'abs', 'apply', 'chr', 'cmp', 'coerce',
'compile', 'dir', 'divmod', 'eval', 'execfile', 'filter', 'float',
'getattr', 'hasattr', 'hash', 'hex', 'id', 'input', 'int', 'len', 'long',
'map', 'max', 'min', 'oct', 'open', 'ord', 'pow', 'range', 'raw_input',
'reduce', 'reload', 'repr', 'round', 'setattr', 'str', 'type', 'xrange']
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>>>
\end{verbatim}\ecode
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\chapter{Output Formatting}
So far we've encountered two ways of writing values: {\em expression
statements} and the {\tt print} statement. (A third way is using the
{\tt write} method of file objects; the standard output file can be
referenced as {\tt sys.stdout}. See the Library Reference for more
information on this.)
Often you'll want more control over the formatting of your output than
simply printing space-separated values. The key to nice formatting in
Python is to do all the string handling yourself; using string slicing
and concatenation operations you can create any lay-out you can imagine.
The standard module {\tt string} contains some useful operations for
padding strings to a given column width; these will be discussed shortly.
Finally, the \code{\%} operator (modulo) with a string left argument
interprets this string as a C sprintf format string to be applied to the
right argument, and returns the string resulting from this formatting
operation.
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One question remains, of course: how do you convert values to strings?
Luckily, Python has a way to convert any value to a string: just write
the value between reverse quotes (\verb/``/). Some examples:
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\bcode\begin{verbatim}
>>> x = 10 * 3.14
>>> y = 200*200
>>> s = 'The value of x is ' + `x` + ', and y is ' + `y` + '...'
>>> print s
The value of x is 31.4, and y is 40000...
>>> # Reverse quotes work on other types besides numbers:
... p = [x, y]
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>>> ps = `p`
>>> ps
'[31.4, 40000]'
>>> # Converting a string adds string quotes and backslashes:
... hello = 'hello, world\n'
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>>> hellos = `hello`
>>> print hellos
'hello, world\012'
>>> # The argument of reverse quotes may be a tuple:
... `x, y, ('foo', 'bar')`
"(31.4, 40000, ('foo', 'bar'))"
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>>>
\end{verbatim}\ecode
%
Here are two ways to write a table of squares and cubes:
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\bcode\begin{verbatim}
>>> import string
>>> for x in range(1, 11):
... print string.rjust(`x`, 2), string.rjust(`x*x`, 3),
... # Note trailing comma on previous line
... print string.rjust(`x*x*x`, 4)
...
1 1 1
2 4 8
3 9 27
4 16 64
5 25 125
6 36 216
7 49 343
8 64 512
9 81 729
10 100 1000
>>> for x in range(1,11):
... print '%2d %3d %4d' % (x, x*x, x*x*x)
...
1 1 1
2 4 8
3 9 27
4 16 64
5 25 125
6 36 216
7 49 343
8 64 512
9 81 729
10 100 1000
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>>>
\end{verbatim}\ecode
%
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(Note that one space between each column was added by the way {\tt print}
works: it always adds spaces between its arguments.)
This example demonstrates the function {\tt string.rjust()}, which
right-justifies a string in a field of a given width by padding it with
spaces on the left. There are similar functions {\tt string.ljust()}
and {\tt string.center()}. These functions do not write anything, they
just return a new string. If the input string is too long, they don't
truncate it, but return it unchanged; this will mess up your column
lay-out but that's usually better than the alternative, which would be
lying about a value. (If you really want truncation you can always add
a slice operation, as in {\tt string.ljust(x,~n)[0:n]}.)
There is another function, {\tt string.zfill}, which pads a numeric
string on the left with zeros. It understands about plus and minus
signs:
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\bcode\begin{verbatim}
>>> string.zfill('12', 5)
'00012'
>>> string.zfill('-3.14', 7)
'-003.14'
>>> string.zfill('3.14159265359', 5)
'3.14159265359'
>>>
\end{verbatim}\ecode
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\chapter{Errors and Exceptions}
Until now error messages haven't been more than mentioned, but if you
have tried out the examples you have probably seen some. There are
(at least) two distinguishable kinds of errors: {\em syntax\ errors}
and {\em exceptions}.
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\section{Syntax Errors}
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Syntax errors, also known as parsing errors, are perhaps the most common
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kind of complaint you get while you are still learning Python:
\bcode\begin{verbatim}
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>>> while 1 print 'Hello world'
File "<stdin>", line 1
while 1 print 'Hello world'
^
SyntaxError: invalid syntax
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>>>
\end{verbatim}\ecode
%
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The parser repeats the offending line and displays a little `arrow'
pointing at the earliest point in the line where the error was detected.
The error is caused by (or at least detected at) the token
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{\em preceding}
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the arrow: in the example, the error is detected at the keyword
{\tt print}, since a colon ({\tt :}) is missing before it.
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File name and line number are printed so you know where to look in case
the input came from a script.
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\section{Exceptions}
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Even if a statement or expression is syntactically correct, it may
cause an error when an attempt is made to execute it.
Errors detected during execution are called {\em exceptions} and are
not unconditionally fatal: you will soon learn how to handle them in
Python programs. Most exceptions are not handled by programs,
however, and result in error messages as shown here:
\bcode\small\begin{verbatim}
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>>> 10 * (1/0)
Traceback (innermost last):
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File "<stdin>", line 1
ZeroDivisionError: integer division or modulo
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>>> 4 + foo*3
Traceback (innermost last):
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File "<stdin>", line 1
NameError: foo
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>>> '2' + 2
Traceback (innermost last):
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File "<stdin>", line 1
TypeError: illegal argument type for built-in operation
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>>>
\end{verbatim}\ecode
%
The last line of the error message indicates what happened.
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Exceptions come in different types, and the type is printed as part of
the message: the types in the example are
{\tt ZeroDivisionError},
{\tt NameError}
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and
{\tt TypeError}.
The string printed as the exception type is the name of the built-in
name for the exception that occurred. This is true for all built-in
exceptions, but need not be true for user-defined exceptions (although
it is a useful convention).
Standard exception names are built-in identifiers (not reserved
keywords).
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The rest of the line is a detail whose interpretation depends on the
exception type; its meaning is dependent on the exception type.
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The preceding part of the error message shows the context where the
exception happened, in the form of a stack backtrace.
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In general it contains a stack backtrace listing source lines; however,
it will not display lines read from standard input.
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The Python library reference manual lists the built-in exceptions and
their meanings.
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\section{Handling Exceptions}
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It is possible to write programs that handle selected exceptions.
Look at the following example, which prints a table of inverses of
some floating point numbers:
\bcode\begin{verbatim}
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>>> numbers = [0.3333, 2.5, 0, 10]
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>>> for x in numbers:
... print x,
... try:
... print 1.0 / x
... except ZeroDivisionError:
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... print '*** has no inverse ***'
...
0.3333 3.00030003
2.5 0.4
0 *** has no inverse ***
10 0.1
>>>
\end{verbatim}\ecode
%
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The {\tt try} statement works as follows.
\begin{itemize}
\item
First, the
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{\em try\ clause}
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(the statement(s) between the {\tt try} and {\tt except} keywords) is
executed.
\item
If no exception occurs, the
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{\em except\ clause}
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is skipped and execution of the {\tt try} statement is finished.
\item
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If an exception occurs during execution of the try clause,
the rest of the clause is skipped. Then if
its type matches the exception named after the {\tt except} keyword,
the rest of the try clause is skipped, the except clause is executed,
and then execution continues after the {\tt try} statement.
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\item
If an exception occurs which does not match the exception named in the
except clause, it is passed on to outer try statements; if no handler is
found, it is an
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{\em unhandled\ exception}
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and execution stops with a message as shown above.
\end{itemize}
A {\tt try} statement may have more than one except clause, to specify
handlers for different exceptions.
At most one handler will be executed.
Handlers only handle exceptions that occur in the corresponding try
clause, not in other handlers of the same {\tt try} statement.
An except clause may name multiple exceptions as a parenthesized list,
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e.g.:
\bcode\begin{verbatim}
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... except (RuntimeError, TypeError, NameError):
... pass
\end{verbatim}\ecode
%
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The last except clause may omit the exception name(s), to serve as a
wildcard.
Use this with extreme caution, since it is easy to mask a real
programming error in this way!
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When an exception occurs, it may have an associated value, also known as
the exceptions's
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{\em argument}.
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The presence and type of the argument depend on the exception type.
For exception types which have an argument, the except clause may
specify a variable after the exception name (or list) to receive the
argument's value, as follows:
\bcode\begin{verbatim}
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>>> try:
... foo()
... except NameError, x:
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... print 'name', x, 'undefined'
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...
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name foo undefined
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>>>
\end{verbatim}\ecode
%
If an exception has an argument, it is printed as the last part
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(`detail') of the message for unhandled exceptions.
Exception handlers don't just handle exceptions if they occur
immediately in the try clause, but also if they occur inside functions
that are called (even indirectly) in the try clause.
For example:
\bcode\begin{verbatim}
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>>> def this_fails():
... x = 1/0
...
>>> try:
... this_fails()
... except ZeroDivisionError, detail:
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... print 'Handling run-time error:', detail
...
Handling run-time error: integer division or modulo
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>>>
\end{verbatim}\ecode
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\section{Raising Exceptions}
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The {\tt raise} statement allows the programmer to force a specified
exception to occur.
For example:
\bcode\begin{verbatim}
>>> raise NameError, 'HiThere'
Traceback (innermost last):
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File "<stdin>", line 1
NameError: HiThere
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>>>
\end{verbatim}\ecode
%
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The first argument to {\tt raise} names the exception to be raised.
The optional second argument specifies the exception's argument.
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\section{User-defined Exceptions}
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Programs may name their own exceptions by assigning a string to a
variable.
For example:
\bcode\begin{verbatim}
>>> my_exc = 'my_exc'
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>>> try:
... raise my_exc, 2*2
... except my_exc, val:
... print 'My exception occurred, value:', val
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...
My exception occurred, value: 4
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>>> raise my_exc, 1
Traceback (innermost last):
File "<stdin>", line 1
my_exc: 1
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>>>
\end{verbatim}\ecode
%
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Many standard modules use this to report errors that may occur in
functions they define.
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\section{Defining Clean-up Actions}
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The {\tt try} statement has another optional clause which is intended to
define clean-up actions that must be executed under all circumstances.
For example:
\bcode\begin{verbatim}
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>>> try:
... raise KeyboardInterrupt
... finally:
... print 'Goodbye, world!'
...
Goodbye, world!
Traceback (innermost last):
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File "<stdin>", line 2
KeyboardInterrupt
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>>>
\end{verbatim}\ecode
%
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A {\tt finally} clause is executed whether or not an exception has
occurred in the {\tt try} clause. When an exception has occurred, it
is re-raised after the {\tt finally} clause is executed. The
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{\tt finally} clause is also executed ``on the way out'' when the
{\tt try} statement is left via a {\tt break} or {\tt return}
statement.
A {\tt try} statement must either have one or more {\tt except}
clauses or one {\tt finally} clause, but not both.
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\chapter{Classes}
Python's class mechanism adds classes to the language with a minimum
of new syntax and semantics. It is a mixture of the class mechanisms
found in \Cpp{} and Modula-3. As is true for modules, classes in Python
do not put an absolute barrier between definition and user, but rather
rely on the politeness of the user not to ``break into the
definition.'' The most important features of classes are retained
with full power, however: the class inheritance mechanism allows
multiple base classes, a derived class can override any methods of its
base class(es), a method can call the method of a base class with the
same name. Objects can contain an arbitrary amount of private data.
In \Cpp{} terminology, all class members (including the data members) are
{\em public}, and all member functions are {\em virtual}. There are
no special constructors or destructors. As in Modula-3, there are no
shorthands for referencing the object's members from its methods: the
method function is declared with an explicit first argument
representing the object, which is provided implicitly by the call. As
in Smalltalk, classes themselves are objects, albeit in the wider
sense of the word: in Python, all data types are objects. This
provides semantics for importing and renaming. But, just like in \Cpp{}
or Modula-3, built-in types cannot be used as base classes for
extension by the user. Also, like in \Cpp{} but unlike in Modula-3, most
built-in operators with special syntax (arithmetic operators,
subscripting etc.) can be redefined for class members.
\section{A word about terminology}
Lacking universally accepted terminology to talk about classes, I'll
make occasional use of Smalltalk and \Cpp{} terms. (I'd use Modula-3
terms, since its object-oriented semantics are closer to those of
Python than \Cpp{}, but I expect that few readers have heard of it...)
I also have to warn you that there's a terminological pitfall for
object-oriented readers: the word ``object'' in Python does not
necessarily mean a class instance. Like \Cpp{} and Modula-3, and unlike
Smalltalk, not all types in Python are classes: the basic built-in
types like integers and lists aren't, and even somewhat more exotic
types like files aren't. However, {\em all} Python types share a little
bit of common semantics that is best described by using the word
object.
Objects have individuality, and multiple names (in multiple scopes)
can be bound to the same object. This is known as aliasing in other
languages. This is usually not appreciated on a first glance at
Python, and can be safely ignored when dealing with immutable basic
types (numbers, strings, tuples). However, aliasing has an
(intended!) effect on the semantics of Python code involving mutable
objects such as lists, dictionaries, and most types representing
entities outside the program (files, windows, etc.). This is usually
used to the benefit of the program, since aliases behave like pointers
in some respects. For example, passing an object is cheap since only
a pointer is passed by the implementation; and if a function modifies
an object passed as an argument, the caller will see the change --- this
obviates the need for two different argument passing mechanisms as in
Pascal.
\section{Python scopes and name spaces}
Before introducing classes, I first have to tell you something about
Python's scope rules. Class definitions play some neat tricks with
name spaces, and you need to know how scopes and name spaces work to
fully understand what's going on. Incidentally, knowledge about this
subject is useful for any advanced Python programmer.
Let's begin with some definitions.
A {\em name space} is a mapping from names to objects. Most name
spaces are currently implemented as Python dictionaries, but that's
normally not noticeable in any way (except for performance), and it
may change in the future. Examples of name spaces are: the set of
built-in names (functions such as \verb\abs()\, and built-in exception
names); the global names in a module; and the local names in a
function invocation. In a sense the set of attributes of an object
also form a name space. The important thing to know about name
spaces is that there is absolutely no relation between names in
different name spaces; for instance, two different modules may both
define a function ``maximize'' without confusion --- users of the
modules must prefix it with the module name.
By the way, I use the word {\em attribute} for any name following a
dot --- for example, in the expression \verb\z.real\, \verb\real\ is
an attribute of the object \verb\z\. Strictly speaking, references to
names in modules are attribute references: in the expression
\verb\modname.funcname\, \verb\modname\ is a module object and
\verb\funcname\ is an attribute of it. In this case there happens to
be a straightforward mapping between the module's attributes and the
global names defined in the module: they share the same name space!%
\footnote{
Except for one thing. Module objects have a secret read-only
attribute called {\tt __dict__} which returns the dictionary
used to implement the module's name space; the name
{\tt __dict__} is an attribute but not a global name.
Obviously, using this violates the abstraction of name space
implementation, and should be restricted to things like
post-mortem debuggers...
}
Attributes may be read-only or writable. In the latter case,
assignment to attributes is possible. Module attributes are writable:
you can write \verb\modname.the_answer = 42\. Writable attributes may
also be deleted with the del statement, e.g.
\verb\del modname.the_answer\.
Name spaces are created at different moments and have different
lifetimes. The name space containing the built-in names is created
when the Python interpreter starts up, and is never deleted. The
global name space for a module is created when the module definition
is read in; normally, module name spaces also last until the
interpreter quits. The statements executed by the top-level
invocation of the interpreter, either read from a script file or
interactively, are considered part of a module called \verb\__main__\,
so they have their own global name space. (The built-in names
actually also live in a module; this is called \verb\__builtin__\.)
The local name space for a function is created when the function is
called, and deleted when the function returns or raises an exception
that is not handled within the function. (Actually, forgetting would
be a better way to describe what actually happens.) Of course,
recursive invocations each have their own local name space.
A {\em scope} is a textual region of a Python program where a name space
is directly accessible. ``Directly accessible'' here means that an
unqualified reference to a name attempts to find the name in the name
space.
Although scopes are determined statically, they are used dynamically.
At any time during execution, exactly three nested scopes are in use
(i.e., exactly three name spaces are directly accessible): the
innermost scope, which is searched first, contains the local names,
the middle scope, searched next, contains the current module's global
names, and the outermost scope (searched last) is the name space
containing built-in names.
Usually, the local scope references the local names of the (textually)
current function. Outside of functions, the the local scope references
the same name space as the global scope: the module's name space.
Class definitions place yet another name space in the local scope.
It is important to realize that scopes are determined textually: the
global scope of a function defined in a module is that module's name
space, no matter from where or by what alias the function is called.
On the other hand, the actual search for names is done dynamically, at
run time --- however, the the language definition is evolving towards
static name resolution, at ``compile'' time, so don't rely on dynamic
name resolution! (In fact, local variables are already determined
statically.)
A special quirk of Python is that assignments always go into the
innermost scope. Assignments do not copy data --- they just
bind names to objects. The same is true for deletions: the statement
\verb\del x\ removes the binding of x from the name space referenced by the
local scope. In fact, all operations that introduce new names use the
local scope: in particular, import statements and function definitions
bind the module or function name in the local scope. (The
\verb\global\ statement can be used to indicate that particular
variables live in the global scope.)
\section{A first look at classes}
Classes introduce a little bit of new syntax, three new object types,
and some new semantics.
\subsection{Class definition syntax}
The simplest form of class definition looks like this:
\begin{verbatim}
class ClassName:
<statement-1>
.
.
.
<statement-N>
\end{verbatim}
Class definitions, like function definitions (\verb\def\ statements)
must be executed before they have any effect. (You could conceivably
place a class definition in a branch of an \verb\if\ statement, or
inside a function.)
In practice, the statements inside a class definition will usually be
function definitions, but other statements are allowed, and sometimes
useful --- we'll come back to this later. The function definitions
inside a class normally have a peculiar form of argument list,
dictated by the calling conventions for methods --- again, this is
explained later.
When a class definition is entered, a new name space is created, and
used as the local scope --- thus, all assignments to local variables
go into this new name space. In particular, function definitions bind
the name of the new function here.
When a class definition is left normally (via the end), a {\em class
object} is created. This is basically a wrapper around the contents
of the name space created by the class definition; we'll learn more
about class objects in the next section. The original local scope
(the one in effect just before the class definitions was entered) is
reinstated, and the class object is bound here to class name given in
the class definition header (ClassName in the example).
\subsection{Class objects}
Class objects support two kinds of operations: attribute references
and instantiation.
{\em Attribute references} use the standard syntax used for all
attribute references in Python: \verb\obj.name\. Valid attribute
names are all the names that were in the class's name space when the
class object was created. So, if the class definition looked like
this:
\begin{verbatim}
class MyClass:
i = 12345
def f(x):
return 'hello world'
\end{verbatim}
then \verb\MyClass.i\ and \verb\MyClass.f\ are valid attribute
references, returning an integer and a function object, respectively.
Class attributes can also be assigned to, so you can change the
value of \verb\MyClass.i\ by assignment.
Class {\em instantiation} uses function notation. Just pretend that
the class object is a parameterless function that returns a new
instance of the class. For example, (assuming the above class):
\begin{verbatim}
x = MyClass()
\end{verbatim}
creates a new {\em instance} of the class and assigns this object to
the local variable \verb\x\.
\subsection{Instance objects}
Now what can we do with instance objects? The only operations
understood by instance objects are attribute references. There are
two kinds of valid attribute names.
The first I'll call {\em data attributes}. These correspond to
``instance variables'' in Smalltalk, and to ``data members'' in \Cpp{}.
Data attributes need not be declared; like local variables, they
spring into existence when they are first assigned to. For example,
if \verb\x\ in the instance of \verb\MyClass\ created above, the
following piece of code will print the value 16, without leaving a
trace:
\begin{verbatim}
x.counter = 1
while x.counter < 10:
x.counter = x.counter * 2
print x.counter
del x.counter
\end{verbatim}
The second kind of attribute references understood by instance objects
are {\em methods}. A method is a function that ``belongs to'' an
object. (In Python, the term method is not unique to class instances:
other object types can have methods as well, e.g., list objects have
methods called append, insert, remove, sort, and so on. However,
below, we'll use the term method exclusively to mean methods of class
instance objects, unless explicitly stated otherwise.)
Valid method names of an instance object depend on its class. By
definition, all attributes of a class that are (user-defined) function
objects define corresponding methods of its instances. So in our
example, \verb\x.f\ is a valid method reference, since
\verb\MyClass.f\ is a function, but \verb\x.i\ is not, since
\verb\MyClass.i\ is not. But \verb\x.f\ is not the
same thing as \verb\MyClass.f\ --- it is a {\em method object}, not a
function object.
\subsection{Method objects}
Usually, a method is called immediately, e.g.:
\begin{verbatim}
x.f()
\end{verbatim}
In our example, this will return the string \verb\'hello world'\.
However, it is not necessary to call a method right away: \verb\x.f\
is a method object, and can be stored away and called at a later
moment, for example:
\begin{verbatim}
xf = x.f
while 1:
print xf()
\end{verbatim}
will continue to print \verb\hello world\ until the end of time.
What exactly happens when a method is called? You may have noticed
that \verb\x.f()\ was called without an argument above, even though
the function definition for \verb\f\ specified an argument. What
happened to the argument? Surely Python raises an exception when a
function that requires an argument is called without any --- even if
the argument isn't actually used...
Actually, you may have guessed the answer: the special thing about
methods is that the object is passed as the first argument of the
function. In our example, the call \verb\x.f()\ is exactly equivalent
to \verb\MyClass.f(x)\. In general, calling a method with a list of
{\em n} arguments is equivalent to calling the corresponding function
with an argument list that is created by inserting the method's object
before the first argument.
If you still don't understand how methods work, a look at the
implementation can perhaps clarify matters. When an instance
attribute is referenced that isn't a data attribute, its class is
searched. If the name denotes a valid class attribute that is a
function object, a method object is created by packing (pointers to)
the instance object and the function object just found together in an
abstract object: this is the method object. When the method object is
called with an argument list, it is unpacked again, a new argument
list is constructed from the instance object and the original argument
list, and the function object is called with this new argument list.
\section{Random remarks}
[These should perhaps be placed more carefully...]
Data attributes override method attributes with the same name; to
avoid accidental name conflicts, which may cause hard-to-find bugs in
large programs, it is wise to use some kind of convention that
minimizes the chance of conflicts, e.g., capitalize method names,
prefix data attribute names with a small unique string (perhaps just
an underscore), or use verbs for methods and nouns for data attributes.
Data attributes may be referenced by methods as well as by ordinary
users (``clients'') of an object. In other words, classes are not
usable to implement pure abstract data types. In fact, nothing in
Python makes it possible to enforce data hiding --- it is all based
upon convention. (On the other hand, the Python implementation,
written in C, can completely hide implementation details and control
access to an object if necessary; this can be used by extensions to
Python written in C.)
Clients should use data attributes with care --- clients may mess up
invariants maintained by the methods by stamping on their data
attributes. Note that clients may add data attributes of their own to
an instance object without affecting the validity of the methods, as
long as name conflicts are avoided --- again, a naming convention can
save a lot of headaches here.
There is no shorthand for referencing data attributes (or other
methods!) from within methods. I find that this actually increases
the readability of methods: there is no chance of confusing local
variables and instance variables when glancing through a method.
Conventionally, the first argument of methods is often called
\verb\self\. This is nothing more than a convention: the name
\verb\self\ has absolutely no special meaning to Python. (Note,
however, that by not following the convention your code may be less
readable by other Python programmers, and it is also conceivable that
a {\em class browser} program be written which relies upon such a
convention.)
Any function object that is a class attribute defines a method for
instances of that class. It is not necessary that the function
definition is textually enclosed in the class definition: assigning a
function object to a local variable in the class is also ok. For
example:
\begin{verbatim}
# Function defined outside the class
def f1(self, x, y):
return min(x, x+y)
class C:
f = f1
def g(self):
return 'hello world'
h = g
\end{verbatim}
Now \verb\f\, \verb\g\ and \verb\h\ are all attributes of class
\verb\C\ that refer to function objects, and consequently they are all
methods of instances of \verb\C\ --- \verb\h\ being exactly equivalent
to \verb\g\. Note that this practice usually only serves to confuse
the reader of a program.
Methods may call other methods by using method attributes of the
\verb\self\ argument, e.g.:
\begin{verbatim}
class Bag:
def empty(self):
self.data = []
def add(self, x):
self.data.append(x)
def addtwice(self, x):
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self.add(x)
self.add(x)
\end{verbatim}
The instantiation operation (``calling'' a class object) creates an
empty object. Many classes like to create objects in a known initial
state. Therefore a class may define a special method named
\verb\__init__\, like this:
\begin{verbatim}
def __init__(self):
self.empty()
\end{verbatim}
When a class defines an \verb\__init__\ method, class instantiation
automatically invokes \verb\__init__\ for the newly-created class
instance. So in the \verb\Bag\ example, a new and initialized instance
can be obtained by:
\begin{verbatim}
x = Bag()
\end{verbatim}
Of course, the \verb\__init__\ method may have arguments for greater
flexibility. In that case, arguments given to the class instantiation
operator are passed on to \verb\__init__\. For example,
\bcode\begin{verbatim}
>>> class Complex:
... def __init__(self, realpart, imagpart):
... self.r = realpart
... self.i = imagpart
...
>>> x = Complex(3.0,-4.5)
>>> x.r, x.i
(3.0, -4.5)
>>>
\end{verbatim}\ecode
%
Methods may reference global names in the same way as ordinary
functions. The global scope associated with a method is the module
containing the class definition. (The class itself is never used as a
global scope!) While one rarely encounters a good reason for using
global data in a method, there are many legitimate uses of the global
scope: for one thing, functions and modules imported into the global
scope can be used by methods, as well as functions and classes defined
in it. Usually, the class containing the method is itself defined in
this global scope, and in the next section we'll find some good
reasons why a method would want to reference its own class!
\section{Inheritance}
Of course, a language feature would not be worthy of the name ``class''
without supporting inheritance. The syntax for a derived class
definition looks as follows:
\begin{verbatim}
class DerivedClassName(BaseClassName):
<statement-1>
.
.
.
<statement-N>
\end{verbatim}
The name \verb\BaseClassName\ must be defined in a scope containing
the derived class definition. Instead of a base class name, an
expression is also allowed. This is useful when the base class is
defined in another module, e.g.,
\begin{verbatim}
class DerivedClassName(modname.BaseClassName):
\end{verbatim}
Execution of a derived class definition proceeds the same as for a
base class. When the class object is constructed, the base class is
remembered. This is used for resolving attribute references: if a
requested attribute is not found in the class, it is searched in the
base class. This rule is applied recursively if the base class itself
is derived from some other class.
There's nothing special about instantiation of derived classes:
\verb\DerivedClassName()\ creates a new instance of the class. Method
references are resolved as follows: the corresponding class attribute
is searched, descending down the chain of base classes if necessary,
and the method reference is valid if this yields a function object.
Derived classes may override methods of their base classes. Because
methods have no special privileges when calling other methods of the
same object, a method of a base class that calls another method
defined in the same base class, may in fact end up calling a method of
a derived class that overrides it. (For \Cpp{} programmers: all methods
in Python are ``virtual functions''.)
An overriding method in a derived class may in fact want to extend
rather than simply replace the base class method of the same name.
There is a simple way to call the base class method directly: just
call \verb\BaseClassName.methodname(self, arguments)\. This is
occasionally useful to clients as well. (Note that this only works if
the base class is defined or imported directly in the global scope.)
\subsection{Multiple inheritance}
Python supports a limited form of multiple inheritance as well. A
class definition with multiple base classes looks as follows:
\begin{verbatim}
class DerivedClassName(Base1, Base2, Base3):
<statement-1>
.
.
.
<statement-N>
\end{verbatim}
The only rule necessary to explain the semantics is the resolution
rule used for class attribute references. This is depth-first,
left-to-right. Thus, if an attribute is not found in
\verb\DerivedClassName\, it is searched in \verb\Base1\, then
(recursively) in the base classes of \verb\Base1\, and only if it is
not found there, it is searched in \verb\Base2\, and so on.
(To some people breadth first---searching \verb\Base2\ and
\verb\Base3\ before the base classes of \verb\Base1\---looks more
natural. However, this would require you to know whether a particular
attribute of \verb\Base1\ is actually defined in \verb\Base1\ or in
one of its base classes before you can figure out the consequences of
a name conflict with an attribute of \verb\Base2\. The depth-first
rule makes no differences between direct and inherited attributes of
\verb\Base1\.)
It is clear that indiscriminate use of multiple inheritance is a
maintenance nightmare, given the reliance in Python on conventions to
avoid accidental name conflicts. A well-known problem with multiple
inheritance is a class derived from two classes that happen to have a
common base class. While it is easy enough to figure out what happens
in this case (the instance will have a single copy of ``instance
variables'' or data attributes used by the common base class), it is
not clear that these semantics are in any way useful.
\section{Odds and ends}
Sometimes it is useful to have a data type similar to the Pascal
``record'' or C ``struct'', bundling together a couple of named data
items. An empty class definition will do nicely, e.g.:
\begin{verbatim}
class Employee:
pass
john = Employee() # Create an empty employee record
# Fill the fields of the record
john.name = 'John Doe'
john.dept = 'computer lab'
john.salary = 1000
\end{verbatim}
A piece of Python code that expects a particular abstract data type
can often be passed a class that emulates the methods of that data
type instead. For instance, if you have a function that formats some
data from a file object, you can define a class with methods
\verb\read()\ and \verb\readline()\ that gets the data from a string
buffer instead, and pass it as an argument. (Unfortunately, this
technique has its limitations: a class can't define operations that
are accessed by special syntax such as sequence subscripting or
arithmetic operators, and assigning such a ``pseudo-file'' to
\verb\sys.stdin\ will not cause the interpreter to read further input
from it.)
Instance method objects have attributes, too: \verb\m.im_self\ is the
object of which the method is an instance, and \verb\m.im_func\ is the
function object corresponding to the method.
\chapter{Recent Additions}
Python is an evolving language. Since this tutorial was last
thoroughly revised, several new features have been added to the
language. While ideally I should revise the tutorial to incorporate
them in the mainline of the text, lack of time currently requires me
to take a more modest approach. In this chapter I will briefly list the
most important improvements to the language and how you can use them
to your benefit.
\section{The Last Printed Expression}
In interactive mode, the last printed expression is assigned to the
variable \code\_. This means that when you are using Python as a
desk calculator, it is somewhat easier to continue calculations, for
example:
\begin{verbatim}
>>> tax = 17.5 / 100
>>> price = 3.50
>>> price * tax
0.6125
>>> price + _
4.1125
>>> round(_, 2)
4.11
>>>
\end{verbatim}
\section{String Literals}
\subsection{Double Quotes}
Python can now also use double quotes to surround string literals,
e.g. \verb\"this doesn't hurt a bit"\.
\subsection{Continuation Of String Literals}
String literals can span multiple lines by escaping newlines with
backslashes, e.g.
\begin{verbatim}
hello = "This is a rather long string containing\n\
several lines of text just as you would do in C.\n\
Note that whitespace at the beginning of the line is\
significant.\n"
print hello
\end{verbatim}
which would print the following:
\begin{verbatim}
This is a rather long string containing
several lines of text just as you would do in C.
Note that whitespace at the beginning of the line is significant.
\end{verbatim}
\subsection{Triple-quoted strings}
In some cases, when you need to include really long strings (e.g.
containing several paragraphs of informational text), it is annoying
that you have to terminate each line with \verb@\n\@, especially if
you would like to reformat the text occasionally with a powerful text
editor like Emacs. For such situations, ``triple-quoted'' strings can
be used, e.g.
\begin{verbatim}
hello = """
This string is bounded by triple double quotes (3 times ").
Newlines in the string are retained, though \
it is still possible\nto use all normal escape sequences.
Whitespace at the beginning of a line is
significant. If you need to include three opening quotes
you have to escape at least one of them, e.g. \""".
This string ends in a newline.
"""
\end{verbatim}
Note that there is no semantic difference between strings quoted with
single quotes (\verb/'/) or double quotes (\verb\"\).
\subsection{String Literal Juxtaposition}
One final twist: you can juxtapose multiple string literals. Two or
more adjacent string literals (but not arbitrary expressions!)
separated only by whitespace will be concatenated (without intervening
whitespace) into a single string object at compile time. This makes
it possible to continue a long string on the next line without
sacrificing indentation or performance, unlike the use of the string
concatenation operator \verb\+\ or the continuation of the literal
itself on the next line (since leading whitespace is significant
inside all types of string literals). Note that this feature, like
all string features except triple-quoted strings, is borrowed from
Standard C.
\section{The Formatting Operator}
\subsection{Basic Usage}
The chapter on output formatting is really out of date: there is now
an almost complete interface to C-style printf formats. This is done
by overloading the modulo operator (\verb\%\) for a left operand
which is a string, e.g.
\begin{verbatim}
>>> import math
>>> print 'The value of PI is approximately %5.3f.' % math.pi
The value of PI is approximately 3.142.
>>>
\end{verbatim}
If there is more than one format in the string you pass a tuple as
right operand, e.g.
\begin{verbatim}
>>> table = {'Sjoerd': 4127, 'Jack': 4098, 'Dcab': 8637678}
>>> for name, phone in table.items():
... print '%-10s ==> %10d' % (name, phone)
...
Jack ==> 4098
Dcab ==> 8637678
Sjoerd ==> 4127
>>>
\end{verbatim}
Most formats work exactly as in C and require that you pass the proper
type (however, if you don't you get an exception, not a core dump).
The \verb\%s\ format is more relaxed: if the corresponding argument is
not a string object, it is converted to string using the \verb\str()\
built-in function. Using \verb\*\ to pass the width or precision in
as a separate (integer) argument is supported. The C formats
\verb\%n\ and \verb\%p\ are not supported.
\subsection{Referencing Variables By Name}
If you have a really long format string that you don't want to split
up, it would be nice if you could reference the variables to be
formatted by name instead of by position. This can be done by using
an extension of C formats using the form \verb\%(name)format\, e.g.
\begin{verbatim}
>>> table = {'Sjoerd': 4127, 'Jack': 4098, 'Dcab': 8637678}
>>> print 'Jack: %(Jack)d; Sjoerd: %(Sjoerd)d; Dcab: %(Dcab)d' % table
Jack: 4098; Sjoerd: 4127; Dcab: 8637678
>>>
\end{verbatim}
This is particularly useful in combination with the new built-in
\verb\vars()\ function, which returns a dictionary containing all
local variables.
\section{Optional Function Arguments}
It is now possible to define functions with a variable number of
arguments. There are two forms, which can be combined.
\subsection{Default Argument Values}
The most useful form is to specify a default value for one or more
arguments. This creates a function that can be called with fewer
arguments than it is defined, e.g.
\begin{verbatim}
def ask_ok(prompt, retries = 4, complaint = 'Yes or no, please!'):
while 1:
ok = raw_input(prompt)
if ok in ('y', 'ye', 'yes'): return 1
if ok in ('n', 'no', 'nop', 'nope'): return 0
retries = retries - 1
if retries < 0: raise IOError, 'refusenik user'
print complaint
\end{verbatim}
This function can be called either like this:
\verb\ask_ok('Do you really want to quit?')\ or like this:
\verb\ask_ok('OK to overwrite the file?', 2)\.
The default values are evaluated at the point of function definition
in the {\em defining} scope, so that e.g.
\begin{verbatim}
i = 5
def f(arg = i): print arg
i = 6
f()
\end{verbatim}
will print \verb\5\.
\subsection{Arbitrary Argument Lists}
It is also possible to specify that a function can be called with an
arbitrary number of arguments. These arguments will be wrapped up in
a tuple. Before the variable number of arguments, zero or more normal
arguments may occur, e.g.
\begin{verbatim}
def fprintf(file, format, *args):
file.write(format % args)
\end{verbatim}
This feature may be combined with the previous, e.g.
\begin{verbatim}
def but_is_it_useful(required, optional = None, *remains):
print "I don't know"
\end{verbatim}
\section{Lambda And Functional Programming Tools}
\subsection{Lambda Forms}
By popular demand, a few features commonly found in functional
programming languages and Lisp have been added to Python. With the
\verb\lambda\ keyword, small anonymous functions can be created.
Here's a function that returns the sum of its two arguments:
\verb\lambda a, b: a+b\. Lambda forms can be used wherever function
objects are required. They are syntactically restricted to a single
expression. Semantically, they are just syntactic sugar for a normal
function definition. Like nested function definitions, lambda forms
cannot reference variables from the containing scope, but this can be
overcome through the judicious use of default argument values, e.g.
\begin{verbatim}
def make_incrementor(n):
return lambda x, incr=n: x+incr
\end{verbatim}
\subsection{Map, Reduce and Filter}
Three new built-in functions on sequences are good candidate to pass
lambda forms.
\subsubsection{Map.}
\verb\map(function, sequence)\ calls \verb\function(item)\ for each of
the sequence's items and returns a list of the return values. For
example, to compute some cubes:
\begin{verbatim}
>>> map(lambda x: x*x*x, range(1, 11))
[1, 8, 27, 64, 125, 216, 343, 512, 729, 1000]
>>>
\end{verbatim}
More than one sequence may be passed; the function must then have as
many arguments as there are sequences and is called with the
corresponding item from each sequence (or \verb\None\ if some sequence
is shorter than another). If \verb\None\ is passed for the function,
a function returning its argument(s) is substituted.
Combining these two special cases, we see that
\verb\map(None, list1, list2)\ is a convenient way of turning a pair
of lists into a list of pairs. For example:
\begin{verbatim}
>>> seq = range(8)
>>> map(None, seq, map(lambda x: x*x, seq))
[(0, 0), (1, 1), (2, 4), (3, 9), (4, 16), (5, 25), (6, 36), (7, 49)]
>>>
\end{verbatim}
\subsubsection{Filter.}
\verb\filter(function, sequence)\ returns a sequence (of the same
type, if possible) consisting of those items from the sequence for
which \verb\function(item)\ is true. For example, to compute some
primes:
\begin{verbatim}
>>> filter(lambda x: x%2 != 0 and x%3 != 0, range(2, 25))
[5, 7, 11, 13, 17, 19, 23]
>>>
\end{verbatim}
\subsubsection{Reduce.}
\verb\reduce(function, sequence)\ returns a single value constructed
by calling the (binary) function on the first two items of the
sequence, then on the result and the next item, and so on. For
example, to compute the sum of the numbers 1 through 10:
\begin{verbatim}
>>> reduce(lambda x, y: x+y, range(1, 11))
55
>>>
\end{verbatim}
If there's only one item in the sequence, its value is returned; if
the sequence is empty, an exception is raised.
A third argument can be passed to indicate the starting value. In this
case the starting value is returned for an empty sequence, and the
function is first applied to the starting value and the first sequence
item, then to the result and the next item, and so on. For example,
\begin{verbatim}
>>> def sum(seq):
... return reduce(lambda x, y: x+y, seq, 0)
...
>>> sum(range(1, 11))
55
>>> sum([])
0
>>>
\end{verbatim}
\section{Continuation Lines Without Backslashes}
While the general mechanism for continuation of a source line on the
next physical line remains to place a backslash on the end of the
line, expressions inside matched parentheses (or square brackets, or
curly braces) can now also be continued without using a backslash.
This is particularly useful for calls to functions with many
arguments, and for initializations of large tables.
For example:
\begin{verbatim}
month_names = ['Januari', 'Februari', 'Maart',
'April', 'Mei', 'Juni',
'Juli', 'Augustus', 'September',
'Oktober', 'November', 'December']
\end{verbatim}
and
\begin{verbatim}
CopyInternalHyperLinks(self.context.hyperlinks,
copy.context.hyperlinks,
uidremap)
\end{verbatim}
\section{Regular Expressions}
While C's printf-style output formats, transformed into Python, are
adequate for most output formatting jobs, C's scanf-style input
formats are not very powerful. Instead of scanf-style input, Python
offers Emacs-style regular expressions as a powerful input and
scanning mechanism. Read the corresponding section in the Library
Reference for a full description.
\section{Generalized Dictionaries}
The keys of dictionaries are no longer restricted to strings -- they
can be
any immutable basic type including strings,
numbers, tuples, or (certain) class instances. (Lists and
dictionaries are not acceptable as dictionary keys, in order to avoid
problems when the object used as a key is modified.)
Dictionaries have two new methods: \verb\d.values()\ returns a list of
the dictionary's values, and \verb\d.items()\ returns a list of the
dictionary's (key, value) pairs. Like \verb\d.keys()\, these
operations are slow for large dictionaries. Examples:
\begin{verbatim}
>>> d = {100: 'honderd', 1000: 'duizend', 10: 'tien'}
>>> d.keys()
[100, 10, 1000]
>>> d.values()
['honderd', 'tien', 'duizend']
>>> d.items()
[(100, 'honderd'), (10, 'tien'), (1000, 'duizend')]
>>>
\end{verbatim}
\section{Miscellaneous New Built-in Functions}
The function \verb\vars()\ returns a dictionary containing the current
local variables. With a module argument, it returns that module's
global variables. The old function \verb\dir(x)\ returns
\verb\vars(x).keys()\.
The function \verb\round(x)\ returns a floating point number rounded
to the nearest integer (but still expressed as a floating point
number). E.g. \verb\round(3.4) == 3.0\ and \verb\round(3.5) == 4.0\.
With a second argument it rounds to the specified number of digits,
e.g. \verb\round(math.pi, 4) == 3.1416\ or even
\verb\round(123.4, -2) == 100.0\.
The function \verb\hash(x)\ returns a hash value for an object.
All object types acceptable as dictionary keys have a hash value (and
it is this hash value that the dictionary implementation uses).
The function \verb\id(x)\ return a unique identifier for an object.
For two objects x and y, \verb\id(x) == id(y)\ if and only if
\verb\x is y\. (In fact the object's address is used.)
The function \verb\hasattr(x, name)\ returns whether an object has an
attribute with the given name (a string value). The function
\verb\getattr(x, name)\ returns the object's attribute with the given
name. The function \verb\setattr(x, name, value)\ assigns a value to
an object's attribute with the given name. These three functions are
useful if the attribute names are not known beforehand. Note that
\verb\getattr(x, 'foo')\ is equivalent to \verb\x.foo\, and
\verb\setattr(x, 'foo', y)\ is equivalent to \verb\x.foo = y\. By
definition, \verb\hasattr(x, name)\ returns true if and only if
\verb\getattr(x, name)\ returns without raising an exception.
\section{Else Clause For Try Statement}
The \verb\try...except\ statement now has an optional \verb\else\
clause, which must follow all \verb\except\ clauses. It is useful to
place code that must be executed if the \verb\try\ clause does not
raise an exception. For example:
\begin{verbatim}
for arg in sys.argv:
try:
f = open(arg, 'r')
except IOError:
print 'cannot open', arg
else:
print arg, 'has', len(f.readlines()), 'lines'
f.close()
\end{verbatim}
\section{New Class Features in Release 1.1}
1994-11-10 19:04:43 -04:00
Some changes have been made to classes: the operator overloading
mechanism is more flexible, providing more support for non-numeric use
of operators (including calling an object as if it were a function),
and it is possible to trap attribute accesses.
\subsection{New Operator Overloading}
It is no longer necessary to coerce both sides of an operator to the
same class or type. A class may still provide a \code{__coerce__}
method, but this method may return objects of different types or
classes if it feels like it. If no \code{__coerce__} is defined, any
argument type or class is acceptable.
In order to make it possible to implement binary operators where the
right-hand side is a class instance but the left-hand side is not,
without using coercions, right-hand versions of all binary operators
may be defined. These have an `r' prepended to their name,
e.g. \code{__radd__}.
For example, here's a very simple class for representing times. Times
are initialized from a number of seconds (like time.time()). Times
are printed like this: \code{Thu Oct 6 14:20:06 1994}. Subtracting
two Times gives their difference in seconds. Adding or subtracting a
Time and a number gives a new Time. You can't add two times, nor can
you subtract a Time from a number.
\begin{verbatim}
import time
class Time:
def __init__(self, seconds):
self.seconds = seconds
def __repr__(self):
return time.ctime(self.seconds)
def __add__(self, x):
return Time(self.seconds + x)
__radd__ = __add__ # support for x+t
def __sub__(self, x):
if hasattr(x, 'seconds'): # test if x could be a Time
return self.seconds - x.seconds
else:
return self.seconds - x
now = Time(time.time())
tomorrow = 24*3600 + now
yesterday = now - today
print tomorrow - yesterday # prints 172800
\end{verbatim}
\subsection{Trapping Attribute Access}
You can define three new ``magic'' methods in a class now:
\code{__getattr__(self, name)}, \code{__setattr__(self, name, value)}
and \code{__delattr__(self, name)}.
The \code{__getattr__} method is called when an attribute access fails,
i.e. when an attribute access would otherwise raise AttributeError --
this is {\em after} the instance's dictionary and its class hierarchy
have been searched for the named attribute. Note that if this method
attempts to access any undefined instance attribute it will be called
recursively!
The \code{__setattr__} and \code{__delattr__} methods are called when
assignment to, respectively deletion of an attribute are attempted.
They are called {\em instead} of the normal action (which is to insert
or delete the attribute in the instance dictionary). If either of
these methods most set or delete any attribute, they can only do so by
using the instance dictionary directly -- \code{self.__dict__} -- else
they would be called recursively.
For example, here's a near-universal ``Wrapper'' class that passes all
its attribute accesses to another object. Note how the
\code{__init__} method inserts the wrapped object in
\code{self.__dict__} in order to avoid endless recursion
(\code{__setattr__} would call \code{__getattr__} which would call
itself recursively).
\begin{verbatim}
class Wrapper:
def __init__(self, wrapped):
self.__dict__['wrapped'] = wrapped
def __getattr__(self, name):
return getattr(self.wrapped, name)
def __setattr__(self, name, value):
1994-11-10 19:04:43 -04:00
setattr(self.wrapped, name, value)
def __delattr__(self, name):
delattr(self.wrapped, name)
import sys
f = Wrapper(sys.stdout)
f.write('hello world\n') # prints 'hello world'
\end{verbatim}
A simpler example of \code{__getattr__} is an attribute that is
computed each time (or the first time) it it accessed. For instance:
\begin{verbatim}
from math import pi
class Circle:
def __init__(self, radius):
self.radius = radius
def __getattr__(self, name):
if name == 'circumference':
return 2 * pi * self.radius
if name == 'diameter':
return 2 * self.radius
if name == 'area':
return pi * pow(self.radius, 2)
raise AttributeError, name
\end{verbatim}
\subsection{Calling a Class Instance}
If a class defines a method \code{__call__} it is possible to call its
instances as if they were functions. For example:
\begin{verbatim}
class PresetSomeArguments:
def __init__(self, func, *args):
self.func, self.args = func, args
def __call__(self, *args):
return apply(self.func, self.args + args)
f = PresetSomeArguments(pow, 2) # f(i) computes powers of 2
for i in range(10): print f(i), # prints 1 2 4 8 16 32 64 128 256 512
print # append newline
\end{verbatim}
1991-01-11 12:35:08 -04:00
\end{document}