(New page: An important part to figuring out part b is to understand why P(x=k) is 1/n: P(x = 1) = 1/n P(x = 2) = (n-1)/n * 1/(n-1) P(x = 3) = (n-1)/n * (n-2)/(n-1) * 1/n P(x = k) = (n-1)/n * ... * ...)
 
m (2b AJ Hartnett moved to 4.2b AJ Hartnett: Improperly named originally)
 
(2 intermediate revisions by one other user not shown)
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P(x = 1) = 1/n
 
P(x = 1) = 1/n
 +
 
P(x = 2) = (n-1)/n * 1/(n-1)
 
P(x = 2) = (n-1)/n * 1/(n-1)
 +
 
P(x = 3) = (n-1)/n * (n-2)/(n-1) * 1/n
 
P(x = 3) = (n-1)/n * (n-2)/(n-1) * 1/n
P(x = k) = (n-1)/n * ... * (n - (k-1))/(n-k) * 1/(n-(k-1))
+
 
 +
P(x = k) = (n-1)/n * ... * (n - (k-1))/(n-(k-2)) * 1/(n-(k-1))
 
         = [(n-1)*...*(n-k-1)] / [n*...*(n-k-1)]
 
         = [(n-1)*...*(n-k-1)] / [n*...*(n-k-1)]
 
         = [(n-1)!/(n-k)!]/[n!/(n-k)!]
 
         = [(n-1)!/(n-k)!]/[n!/(n-k)!]

Latest revision as of 06:47, 15 October 2008

An important part to figuring out part b is to understand why P(x=k) is 1/n:

P(x = 1) = 1/n

P(x = 2) = (n-1)/n * 1/(n-1)

P(x = 3) = (n-1)/n * (n-2)/(n-1) * 1/n

P(x = k) = (n-1)/n * ... * (n - (k-1))/(n-(k-2)) * 1/(n-(k-1))

        = [(n-1)*...*(n-k-1)] / [n*...*(n-k-1)]
        = [(n-1)!/(n-k)!]/[n!/(n-k)!]
        = [ (n-1)!/ (n!)]
        = 1/n

You can then use this probability while solving the rest of 2b.

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