Let L be the language consisting of strings over alphabet {0,1} that contain an equal number of 1s and 0s.
For example:
000111
10010011
10
1010101010
How can you show that L isn't a regular language?
Let L be the language consisting of strings over alphabet {0,1} that contain an equal number of 1s and 0s. For example:
How can you show that L isn't a regular language? 

I think you can use the exact same argument that is used to show that {0^n 1^n: n > 0} is not regular, since you are free to choose the string that will contradict the pumping lemma. Assume L is regular. So it must satisfy the pumping lemma for some integer n (the pumping length). Take the string 


The formal proof can be given using the pumping lemma for regular languages as follows: Suppose the language is regular. So it must satisfy the pumping lemma for a const integer p. Let Let me divide the string as follows:
Now, if i "pump down" the string by taking Thus we have reached a contradiction as we earlier assumed L to be regular. Therefore, it is not regular. If it was a little hard understanding the above part, consider an example.
Let p be an integer 5. Let Note: the example was just a sample to make you understand the logic. One cannot decide the value of p randomly. 


I don't know about a formal proof, but the intuition is that you cannot construct a DFA to recognize this language (consider that it would require an unobounded number of states to keep track of strings of the form 


count
, notsum
. – Kobi May 20 '12 at 11:34