% LaTeX produced by Fred L. Drake, Jr. , with an % example based on the PyModules FAQ entry by Aaron Watters % . \section{\module{bisect} --- Array bisection algorithms for binary searching.} \declaremodule{standard}{bisect} \modulesynopsis{Array bisection algorithms for binary searching.} This module provides support for maintaining a list in sorted order without having to sort the list after each insertion. For long lists of items with expensive comparison operations, this can be an improvement over the more common approach. The module is called \module{bisect} because it uses a basic bisection algorithm to do its work. The source code may be most useful as a working example of the algorithm (i.e., the boundary conditions are already right!). The following functions are provided: \begin{funcdesc}{bisect}{list, item\optional{, lo\optional{, hi}}} Locate the proper insertion point for \var{item} in \var{list} to maintain sorted order. The parameters \var{lo} and \var{hi} may be used to specify a subset of the list which should be considered. The return value is suitable for use as the first parameter to \code{\var{list}.insert()}. \end{funcdesc} \begin{funcdesc}{insort}{list, item\optional{, lo\optional{, hi}}} Insert \var{item} in \var{list} in sorted order. This is equivalent to \code{\var{list}.insert(bisect.bisect(\var{list}, \var{item}, \var{lo}, \var{hi}), \var{item})}. \end{funcdesc} \subsection{Example} \nodename{bisect-example} The \function{bisect()} function is generally useful for categorizing numeric data. This example uses \function{bisect()} to look up a letter grade for an exam total (say) based on a set of ordered numeric breakpoints: 85 and up is an `A', 75..84 is a `B', etc. \begin{verbatim} >>> grades = "FEDCBA" >>> breakpoints = [30, 44, 66, 75, 85] >>> from bisect import bisect >>> def grade(total): ... return grades[bisect(breakpoints, total)] ... >>> grade(66) 'C' >>> map(grade, [33, 99, 77, 44, 12, 88]) ['E', 'A', 'B', 'D', 'F', 'A'] \end{verbatim}