# How to find an index at which a new item can be inserted into sorted list and keep it sorted?

``````a = 132

b = [0, 10, 30, 60, 100, 150, 210, 280, 340, 480, 530]
``````

I want to know that `a` should be in the 6th position in ordered list `b`.

What's the most pythonic way to do so?

• `a` will actually be in the 6th position in `b`, not the 4th. And as @madjar noted, used the `bisect` module. `bisect.bisect(b, a)` to get the position (or `bisect_[left|right]`) and for insertion `bisect.insort(b, a)` or `insort[left|right]`. – Christian Witts Jul 2 '12 at 9:15

Use bisect. It's not the most beautiful API, but it's exactly what you need.

You'll want to use `bisect.bisect`, which returns exactly what you want.

• Why is it "not the most beautiful API"? – Tanmay Jul 29 '16 at 17:01

`bisect` is a module in the Python Standard Library that is perfect for this task. The function `bisect` in the module `bisect` will give you the index of the insertion point for the value.

Let me give a code example for `bisect`

``````from bisect import bisect
a = 132
b = [0, 10, 30, 60, 100, 150, 210, 280, 340, 480, 530]
print(bisect(b, a))
``````

The result will be `5` because the list is 0-based, so in fact it is the 6th position.

What you can do know is to use the result for an `insert`.

``````index = bisect(b, a)
b.insert(index, a)
``````

or without the intermediate variable

``````b.insert(bisect(b, a), a)
``````

Now `b` will be `[0, 10, 30, 60, 100, 132, 150, 210, 280, 340, 480, 530]`.

• thanks! But @madjar answered first, so upvote for you! – est Jul 2 '12 at 9:33
• That's OK. I upvoted madjar. :-) – Matthias Jul 2 '12 at 10:30

There is further concern with edge cases. For example, suppose you want to select the elements in the aforementioned `b` in the range of `(a, c)` and you pick them out using

``````b[idx_a:idx_c]
``````

then you need to think about the case where `a, c` are actually elements of `b`. Note that

``````bisect.bisect(b, 10)
bisect.bisect(b, 11)
``````

would both give index 2. Thus if `a=10` we need to lower the index by 1. Fortunately, there is a function `bisect.bisect_left` which does exactly this, i.e., in our example

``````bisect.bisect_left(b, 10)
``````

gives 1.

Overall, the left index should be computed using `bisect.bisect_left()` and the right index `bisect.bisect_right()` (which is the same as `bisect.bisect()`).