Minor wording and spacing nits.
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@ -135,12 +135,10 @@ deque(['c', 'b', 'a'])
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This section shows various approaches to working with deques.
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The \method{rotate()} method provides a way to implement \class{deque}
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slicing and deletion:
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This pure python implementation of \code{del d[n]} shows how to use the
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\method{rotate()} method as a building block for implementing a variety
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of class{deque} operations:
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slicing and deletion. For example, a pure python implementation of
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\code{del d[n]} relies on the \method{rotate()} method to position
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elements to be popped:
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\begin{verbatim}
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def delete_nth(d, n):
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d.rotate(-n)
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@ -188,9 +186,9 @@ h
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Multi-pass data reduction algorithms can be succinctly expressed and
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efficiently coded by extracting elements using multiple calls to
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\method{popleft()}, applying the reduction function, and using
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\method{append()} for adding the result back to the queue.
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efficiently coded by extracting elements with multiple calls to
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\method{popleft()}, applying the reduction function, and calling
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\method{append()} to add the result back to the queue.
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For example, building a balanced binary tree of nested lists entails
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reducing two adjacent nodes into one by grouping them in a list:
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@ -476,7 +476,6 @@ def padnone(seq):
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"""Returns the sequence elements and then returns None indefinitely.
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Useful for emulating the behavior of the built-in map() function.
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"""
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return chain(seq, repeat(None))
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@ -494,7 +493,6 @@ def repeatfunc(func, times=None, *args):
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"""Repeat calls to func with specified arguments.
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Example: repeatfunc(random.random)
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"""
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if times is None:
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return starmap(func, repeat(args))
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