Mathematics, 12.12.2019 03:31 pearljammarow6ujs
Let x1; x2; be i. i.d. expo(1). (a) let n = min : xn be the index of the xj to exceed 1. find the distribution of (give the name and parameters), and hence nd e(n). (b) let m = min: x1 + x2 + + xn be the number of xj's we observe until their sum exceeds 10 for the rst time. find the distribution of (give the name and parameters), and hence nd e(m). hint: consider a poisson process. (c) let x n = (x1 + + xn)=n. find the exact distribution of x n (give the name and parameters), as well as the approximate distribution of x n for n large (give the name and parameters).
Answers: 1
Mathematics, 21.06.2019 14:00
Describe the symmetry of the figure. identify lines of symmetry, if any. find the angle and the order of any rotational symmetry.
Answers: 2
Mathematics, 21.06.2019 22:30
Julie was able to walk 16 km through the zoo in 6 hours. how long will it take her to walk 24 km through the zoo?
Answers: 2
Let x1; x2; be i. i.d. expo(1). (a) let n = min : xn be the index of the xj to exceed 1. find the...
English, 15.01.2021 14:00
English, 15.01.2021 14:00
History, 15.01.2021 14:00
Mathematics, 15.01.2021 14:00
Computers and Technology, 15.01.2021 14:00
English, 15.01.2021 14:00
English, 15.01.2021 14:00
Chemistry, 15.01.2021 14:00
Mathematics, 15.01.2021 14:00
English, 15.01.2021 14:00