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 


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 


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. 


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