Mathematics, 19.12.2019 19:31 bankroll42
Let x1, . . be independent random variables with the common distribution function f, and suppose they are independent of n, a geometric random variable with parameter p. let m = max(x1, . . ,xn). (a) find p{m … x} by conditioning on n. (b) find p{m … x|n = 1}. (c) find p{m … x|n > 1}. (d) use (b) and (c) to rederive the probability you found in (a).
Answers: 2
Mathematics, 21.06.2019 17:10
Consider the following equation -167 + 37 = 49 - 21p select the equation that has the same solution as the given equation. o a. p - 5 + ip = 7 - p ob. +55 + 12p = 5p + 16 c. 2 + 1.25p = -3.75p + 10 d. -14 + 6p = -9 - 6p reset next
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Mathematics, 21.06.2019 17:40
Find the value of ax 4 ; a = 2, x = 1. select one: a. 2 b. 4 c. 1 d. 8
Answers: 2
Let x1, . . be independent random variables with the common distribution function f, and suppose th...
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