Mathematics
Mathematics, 16.03.2020 20:04, alyssamiller401

The time that it takes to service a car is an exponential random variable with rate 1. If Lightning McQueen (L. M.) brings his car in at time 0 and Sally Carrera (S. C) brings her car in at time t, what is the probability that S. C.'s car is ready before L. M.'s car? Assume that service times are independent and service begins upon arrival of the car. Be sure to: 1) define all random variables used, 2) explain how independence of service times plays a part in your solution, 3) show all integration steps. If both cars are brought in at time 0, with work starting on S. C.'s car only when L. M.'s car has been completely serviced, what is the probability that S. C.'s car is ready before time 2?

answer
Answers: 1

Other questions on the subject: Mathematics

image
Mathematics, 21.06.2019 12:50, rntaran2002
Nneeedd 1.find the residual if you know the actual number is 5.2 and the predicted value is 4.8
Answers: 3
image
Mathematics, 21.06.2019 14:30, theworld58
Aswimming pool has an input pump for filling the pool and an output pump for emptying the pool. the input pump can fill the pool in 3 hours, and the output pump can drain the pool in 5 hours. as you go to bed, the pool is full, but a neighbor’s kid turns on the output pump. at midnight, you awake to find the pool half empty. immediately, you turn on the input pump, but you are sleepy and forget to turn off the output pump. at what time will the pool become full?
Answers: 1
image
Mathematics, 21.06.2019 15:00, BigElote
Which of the greatest common gcf of 32 and 48 a 16 b 96 c 8 d 32
Answers: 2
image
Mathematics, 21.06.2019 18:30, santiagobermeo32
What is the value of x in the following equation? -3x-2=2x+8
Answers: 1
Do you know the correct answer?
The time that it takes to service a car is an exponential random variable with rate 1. If Lightning...

Questions in other subjects:

Konu
Biology, 23.07.2019 11:30