# Python: Get number of years that have passed from date string

Given that I start with a string, like `'3/6/2011'` which is month/day/year, and the current day is 3/13/2011 (7 days later), how can I find the number of years that have passed since that time (7/365 = `0.0191780821917808`) in Python?

Note that I want to be able to handle any input date. Not any format though, you can assume the format above.

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You can get the `timedelta` by subtracting two `datetime`s, which gives you a lot of cool ways to operate on the time difference.

``````>>> import datetime
>>> before = datetime.datetime.strptime('3/6/2011','%m/%d/%Y')
>>> now = datetime.datetime.now()
>>> type(now-before)
<type 'datetime.timedelta'>
>>> (now-before).days
7
>>> float((now-before).days)/365
0.019178082191780823
``````

EDIT: Wow, who would've thought there was so much depth to this simple question. Take a look at the answer with the most votes on this question. Dealing with leap years is a "hard" problem. (Credit to @kriegar)

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I'd then divide (now-before).days by 365 to get the fractional year. –  John Percival Hackworth Mar 14 '11 at 3:15
aren't leap years are a problem with this solution? –  DTing Mar 14 '11 at 3:25
I'm already going to have some margin of error for my application, so leap years probably aren't all that much of a worry, since the inaccuracy from this is < 1%. Thanks for the solution –  Muhd Mar 14 '11 at 3:53
``````>>> import datetime
>>> datestring = "3/6/2011"
>>> (datetime.date.today() - datetime.datetime.strptime(datestring, "%m/%d/%Y").date()).days / 365.0
0.019178082191780823
``````
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All the answers above don't take into account leap years. And it looks like this question has discussion that is relevant to your question.

Pythonic difference between two dates in years?

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To be fair, he did ask in his question for the `x/365` answer. –  Chris W. Mar 14 '11 at 3:27
+1 but i wanted to make the point that fractional years using 365 is fishy –  DTing Mar 14 '11 at 3:29
Excellent point. And after reading your link, it's clear that that is a much harder problem than it would seem at first--basically because we think of "years" to be a very consistent measurement of time, but actually its variable depending on which year you're talking about. –  Chris W. Mar 14 '11 at 3:38