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).

she played for 18.75 hours.

step-by-step explanation:

if she played 2/4 of a hour on tuesday. and there is 60 minutes in an hour and 60 divided by 4 is 7.5. and she played 2/4 of an hour on thursday then again 60 divided by 4 is 7.5, you add 7.5+7.5=56.25. now you have to do 1/4 of an hour, it equals 3.75. now you have to add them all up. 3.75+7.5+7.5=18.75

i hope this and i hope you get it right. it took me a while to get this done for you. : )

the correct answer is x/3+10≥32

hope this !

step-by-step explanation:

answer: it is 8

step-by-step explanation:

you know why its 8