How many bits are sufficient to hash a webpage in english ? [closed]

Recently I came by a question which asked , how many bits are sufficient to hash a webpage with these assumptions :

1.There are 1 billion web pages 2.The average length of web pages is 300 words 3.We have 250,000 words in English 4.The pages are in ASCII

Apparently there is no one right answer to this problem , but the aim of the question is to see how the general method works

Thanks

Arian

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closed as not constructive by Walter, Ken White, rene, Martin Buberl, ServyOct 11 '12 at 20:52

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You haven't defined what it means to “hash a webpage”; that phrase appears in this question and in a couple of other pages on Internet. In those other pages it is used to mean computing a checksum (for example with `sha1sum`) to verify that content is intact. If that's what you mean, then you need all the bits of any page that's to be “hashed”; on average, that is 300 * 8 * average English word length. The question doesn't specify the average English word length, but if it is five letters plus a space, the average number of bits per page is 6*300*8 or 14400.
An ideal cryptographic hash function is sensitive to single-bit changes. A function like `sha1sum` can be used to compute signatures to allow detection of duplicate pages, but cannot be used to detect similar webpages. Let `P=sha1sum(original page)`, and for any modification at all, `Q=sha1sum(modified page)`. On average I'd expect P to differ from Q in about half of its 160 bit positions. –  jwpat7 Oct 11 '12 at 5:48