Pumping Lemma's Condition 3 concept

I'm following one of the examples from my textbook on the Pumping Lemma:

``````Let C = {w | w has an equal number of 0s and 1s}

Condition 3 stipulates: |xy| <= p

If |xy| <= p, then y must consist only of 0s, so xyyz is not in C.
Therefore s cannot be pumped
``````

I'm having trouble understanding how condition 3 leads to the conclusion that "y must only consist of 0s, so xyyz is not in C"

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If you could add a few preceding lines from the book, it would help –  uba Mar 8 '13 at 4:46
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1 Answer

I guess the string chosen is 0p1p. Since |xy| <= p, and xyz = 0p1p, the string xy will be 0k where k <= p since the first p symbols of 0p1p are all 0's. Since xy consists of only 0's, y must also consist of only 0's

And learn to put your question in a proper manner. You cannot expect others to "predict" your question while you put half of the information

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Hi the string chosen was indeed 0p1p thank you I understand it now –  Locke McDonnell Mar 8 '13 at 5:35
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