Mathematics, 10.09.2019 04:20, kylee76
Ared light bulb has been flashing forever, according to a poisson process with rate r. similarly, a blue bulb has been flashing forever, according to an independent poisson process with rate b. let us fix t to be 12 o'clock.
1. what is the expected length of the interval that t belongs to? that is, find the expected length of the interval from the last event before t until the first event after t. here, an event refers to either bulb flashing.
2. what is the probability that t belongs to an rr interval? (that is, the first event before, as well as the first event after time t, are both red flashes.)
3. what is the probability that between t and t+1, we have exactly two events: a red flash followed by a blue flash?
Answers: 3
Mathematics, 21.06.2019 16:00, pringleosmond
65 8 7 4 5 6 8 4 3 2 1 9 5 6 4 2 1 6 5 1 5 1 3 2 3 5 multiply the third number in the first row by the seventh number in the third row. add this result to the fifth number in the second row. add to this total ten times the fourth number in the third row. subtract the eighth number in the first row from the result.
Answers: 3
Mathematics, 21.06.2019 18:00, puppylover72
Solve this and show youβre work step by step ! -5 3/4+3h< 9 1/4 -
Answers: 1
Ared light bulb has been flashing forever, according to a poisson process with rate r. similarly, a...
Mathematics, 04.11.2020 19:50
Mathematics, 04.11.2020 19:50
Chemistry, 04.11.2020 19:50
Chemistry, 04.11.2020 19:50
English, 04.11.2020 19:50
Mathematics, 04.11.2020 19:50
Mathematics, 04.11.2020 19:50