Just curious but what is the probability of matching a Guid?
Say a Guid from SQL server: 5AC7E650CFC34534803CE7E5BBE29B3D
is it a factorial?: (36*32)! = (1152)!
discuss =D
Just curious but what is the probability of matching a Guid? Say a Guid from SQL server: 5AC7E650CFC34534803CE7E5BBE29B3D is it a factorial?: (36*32)! = (1152)! discuss =D 


It's not clear what you're asking. I see two ways to interpret your question. The first is, given a guid The second interpretation is, let's say that we are generating a collection of guids. What is the likelihood of a collision? That is, what is the likelihood that we generate two guids with the same value? This is the birthday paradox. If you generate a sequence of n GUIDs randomly, then the probability of at least one collision is approximately p(n) = 1  exp(n^2 / 2 * 2^128) (this is the birthday problem with the number of possible birthdays being 2^128).
So, even if you generate 2^60 guids, the odds of a collision are extremely small. If you can generate one billion guids per second, it would still take 36 years to have a 1.95e03 chance of a collision. 


The number of possible GUIDs (128bit value) is 2^128 or 3.4×10^38 — roughly 2 trillion per cubic millimeter of the entire volume of the Earth. In other words, kind of low. (Source for Earth volume reference: WikiPedia) 


Depends on the type of GUID generation algorithm. Current algorithms use 124 random bits so the probability is 1 in 2^124. With older algorithms (that use time and MAC address) the probability is much higher. 


There are a number of things wrong with your calculations. First off, 36*32 implies that any alphanumeric character can be part of the GUID. This is not the case; only HEX characters are allowed. Secondly, the calculation for the number of unique GUIDs is Number of Valid Characters (16: 09, AF) ^ length of GUID (32 characters ) So we have 16^32 ==> 2^(4^32) ==> 2^128 The odds of guessing any one GUID is 1 / 2^128. 


It is 1 / (number of unique numbers possible with the given UID length). In the above example we see 16 bytes, or 128 bits. 2^128, so the probability of a match is 1 / 2^128. 


It depends on how many GUIDs are generated. This is similar to the birthday problem in statistics. See Wikipedia and http://betterexplained.com/articles/understandingthebirthdayparadox/ (this one specifically has a GUID example) In general, the probability of a collision for generating M guids over N possible guids is 

