If the burning time of a certain lamp is an exponential random variable with parameter theta - 30 hours, what is the probability that the average burning time of 100 of theses lamps will be within 6 h...
If the burning time of a certain lamp is an exponential random variable with parameter theta - 30 hours, what is the probability that the average burning time of 100 of theses lamps will be within 6 hours of 30 hours?
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If the burning time of a certain lamp is an exponential random variable with parameter theta - 30 hours, what is the probability that the average burning time of 100 of theses lamps will be within 6 h...
The time, in hours, required to fix a machine is an exponential variable with parameter λ...
The time, in hours, required to fix a machine is an exponential variable with parameter λ = 1/2 (a) What is the probability that the repair time exceeds 2 hours? (b) What is the conditional probability that the repair time exceeds 10 hours, assuming it takes at least 9 hours?
7 out of the first 9 problems and the problem 10. Show U owyou required to repair a machine is an exponential distributed random variable with parameter 2 1/2. What is a) The probability that a repai...
7 out of the first 9 problems and the problem 10. Show U owyou required to repair a machine is an exponential distributed random variable with parameter 2 1/2. What is a) The probability that a repair time exceeds 2 hours? b) The conditional probability that a repair takes at least 10 hours, given duration exceeds 9 hours? that its
7 out of the first 9 problems and the problem 10. Show U owyou required to repair a machine is...
The time until the next call to a tech support hotline is an exponential random variable...
The time until the next call to a tech support hotline is an exponential random variable with a rate parameter of 4 calls per hour. a) What is the expected value of the time until the next call? b)What is the probability of exactly 3 calls during a one hour period?
Suppose that the time (in hours) required to repair a machine is an exponentially distributed random variable with parameter λ (lambda) = 0.5
Suppose that the time (in hours) required to repair a machine is an exponentially distributed random variable with parameter λ (lambda) = 0.5.What's the probability that a repair takes less than 5 hours? AND what's the conditional probability that a repair takes at least 11 hours, given that it takes more than 8 hours?
6. The exponential distribution Consider the random variable x that follows an exponential distribution, with p...
6. The exponential distribution Consider the random variable x that follows an exponential distribution, with p - 10. The standard deviation of X is o = The parameter of the exponential distribution of X is A - What is the probability that X is less than 7? OP(X < 7) = 0.3935 OP(X < 7) = 0.5034 OP(X < 7) = 0.4908 OPIX < 7) = 7981 What is the probability that X is between 12 and 20? O P...
James gets headaches. The time between one headache and the next is an exponential random variable....
James gets headaches. The time between one headache and the next is an exponential random variable. He has noticed that, after having a headache, there is a 50% chance of having another headache within the next 4 days. James has not had a headache in 5 days. What is the probability that he will go for at least 5 more days before the next headache?
Recall that a discrete random variable X has Poisson distribution with parameter λ if the probability...
Recall that a discrete random variable X has Poisson
distribution with parameter λ if the probability mass function of
X
Recall that a discrete random variable X has Poisson distribution with parameter λ if the probability mass function of X is r E 0,1,2,...) This distribution is often used to model the number of events which will occur in a given time span, given that λ such events occur on average a) Prove by direct computation that the mean of...
Suppose that the time, in hours, required to repair a heat pump is a random variable...
Suppose that the time, in hours, required to repair a heat pump is a random variable X that has a gamma distribution with the parameters α = 4 and β = 2. What is the probability that the average time to repair the following 40 pumps be more than 7.5 hrs? Write the result with up to 4 decimals.
6-2: Problem 2 Previous Problem Problem ListNext Problem (1 point) Suppose that the time (in hours)...
6-2: Problem 2 Previous Problem Problem ListNext Problem (1 point) Suppose that the time (in hours) required to repair a machine is an exponentially distributed random variable with parameter λ (a) the probability that a repair time exceeds 10 hours? (b) the conditional probability that a repair takes at least 6 hours, given that it takes more than 3 hours? 0.3. What is
Exercise 6-53 Algo Assume a Poisson random variable has a mean of 5 successes over a...
Exercise 6-53 Algo Assume a Poisson random variable has a mean of 5 successes over a 125-minute period. a. Find the mean of the random variable, defined by the time between successes. b. What is the rate parameter of the appropriate exponential distribution? (Round your answer to 2 decimal places.) c. Find the probability that the time to success will be more than 70 minutes. (Round intermediate calculations to at least 4 decimal places and final answer to 4 decimal...
7 out of the first 9 problems and the problem 10. Show U owyou required to repair a machine is an exponential distributed random variable with parameter 2 1/2. What is a) The probability that a repair time exceeds 2 hours? b) The conditional probability that a repair takes at least 10 hours, given duration exceeds 9 hours? that its
7 out of the first 9 problems and the problem 10. Show U owyou required to repair a machine is...
6. The exponential distribution Consider the random variable x that follows an exponential distribution, with p - 10. The standard deviation of X is o = The parameter of the exponential distribution of X is A - What is the probability that X is less than 7? OP(X < 7) = 0.3935 OP(X < 7) = 0.5034 OP(X < 7) = 0.4908 OPIX < 7) = 7981 What is the probability that X is between 12 and 20? O P...
Recall that a discrete random variable X has Poisson
distribution with parameter λ if the probability mass function of
X
Recall that a discrete random variable X has Poisson distribution with parameter λ if the probability mass function of X is r E 0,1,2,...) This distribution is often used to model the number of events which will occur in a given time span, given that λ such events occur on average a) Prove by direct computation that the mean of...
6-2: Problem 2 Previous Problem Problem ListNext Problem (1 point) Suppose that the time (in hours) required to repair a machine is an exponentially distributed random variable with parameter λ (a) the probability that a repair time exceeds 10 hours? (b) the conditional probability that a repair takes at least 6 hours, given that it takes more than 3 hours? 0.3. What is
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