# time complexity for most programming language?

I read about time complexity modular arithmetic in many books . there is thing I don't understood . I read in some books the following

For any a mod N, a has a multiplicative inverse modulo N if and only if it is relatively prime to N. When this inverse exists, it can be found in time O(n^3) (where as usual n denotes the number of bits of N) by running the extended Euclid algorithm. My question revolves around *extended Euclid algorithm* *is has O(n^3)*

when I write in java integrated with netbeans or C# or C++ program this line

``````A = B.modInverse(N) //here by java syntax
``````

In general. Can I say usually this line has time complexity O(n^3).

or necessary write the same steps extended Euclid algorithm.

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I think this is offtopic, it belongs to one of the computer science sites. –  sharp12345 Feb 15 '13 at 22:44
The question will be best suited here cs.stackexchange.com –  Luiggi Mendoza Feb 15 '13 at 22:46
No. The question, once you unpick it, is about the implementation of modInverse() in Java and C#. –  EJP Feb 15 '13 at 22:55

Unless the documentation of the `modInverse` method makes an explicit guarantee about its time complexity, you generally can't make any assumptions about its running time. The implementation could be completely different depending on the runtime/library or even the version of the runtime.
That said, it's highly probable that popular libraries for arbitrary-precision arithmetic use the best known algorithms for basic operations like `modInverse`.