The mean time to failure for a circulation pump is 1000 hours and the time to...
The mean time to failure for a circulation pump is 1000 hours and the time to failure has an exponential distribution. If the pump has already been operating 600 hours, what is the probability that it will fail within the next 1400 hours? State your answer rounded to three decimal places.
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The mean time to failure for a circulation pump is 1000 hours
and the time to...
A type of lightbulb is labeled as having an average lifetime of 1000 hours.
(a)A type of lightbulb is labeled as having an average lifetime of 1000 hours. It's reasonable to model the probability of failure of these bulbs by an exponential density function with mean μ = 1000. (i) Use this model to find the probability that a bulb fails within the first 500 hours (Round your answer to three decimal places.) (ii) Use this model to find the probability that a bulb bums for more than 700 hours. (b) What is the median lifetime of...
A seal on a brand of pump will fail eventually due to leakage, and the time...
A seal on a brand of pump will fail eventually due to leakage, and the time to failure for a given seal can be viewed as a random variable X. Evidence has shown that the time to failure of the seal can be modelled via an exponential distribution. Additionally, 20% of seals on this brand of pump fail within the first 2 years. (a) What value of A should be used in modelling X exp(4)? (4 marks] (b) What is...
The time to failure of a component in an electronic device has an exponential distribution with...
The time to failure of a component in an electronic device has an exponential distribution with a mean of 7 hours. Calculate the median time to failure. Round answer to 3 decimal places
3. The time to failure (Y , measured in hours) of fans in a laptop computer...
3. The time to failure (Y , measured in hours) of fans in a laptop computer is modeled using an exponential distribution with λ = 0.0002. (a) Graph the pdf of Y . Compute E(Y ) and var(Y ). Place an “×” on the pdf indicating where E(Y ) is. (b) What is the probability that a fan will fail before 6,000 hours? will survive at least 12,000 hours? (c) Only 1 percent of all fans’ lifetimes will exceed which...
1. The average time to failure of a circuit board is 20,000 hours. what is the...
1. The average time to failure of a circuit board is 20,000 hours. what is the probability that it will fail within 19,800 hours? 2. The mean width of a steal beams produced by WTQ company has been 24.00 mm. with a standard deviation of .20 mm. If a sample of 400 steel beams is taken, what is the probability that the sample mean would be less than 23.90 mm?
FULL SCREEN PRINTER VERSION BACK NEXT Question 14 The time to failure (in hours) for a...
FULL SCREEN PRINTER VERSION BACK NEXT Question 14 The time to failure (in hours) for a laser in a cytometry machine is modeled by an exponential distribution with 1 0 .00004. Round the answers to 3 decimal places. (a) What is the probability that the laser will last at least 20028 hours? (b) What is the probability that the laser will last at most 30375 hours? (c) What is the probability that the laser will last between 20028 and 30375...
QUESTION 6 The time to failure (in hours) of fans in a personal computer can be...
QUESTION 6 The time to failure (in hours) of fans in a personal computer can be modeled by an exponential distribution with rate 0.0005. Round your answers to 4 decimal places. (a) What proportion of fans will last at least 10000 hours? (b) What proportion of fans will last at most 8000 hours? QUESTION 7 Given the probability density function f(x)=(0.02^9 x^8*e^(-0.02x))/8! for x>0 and f(x)=0 otherwise. Determine the mean and variance of the distribution. Round the answers to the...
(a) A lamp has two bulbs of a type with an average lifetime of 1300 hours.
(a) A lamp has two bulbs of a type with an average lifetime of 1300 hours. Assuming that we can model the probability of failure of these bulbs by an exponential density function with mean u = 1300, find the probability that both of the lamp's bulbs fail within 1500 hours. (Round your answer to four decimal places.) (b) Another lamp has just one bulb of the same type as in part (a). If one bulb burns out and is replaced...
Question 7 The mean time between failures (often called MTBF) of the battery of a particular...
Question 7 The mean time between failures (often called MTBF) of the battery of a particular brand of computers is 450 hours. Assume that the time between failures is governed by an exponential distribution. What is the probability that the battery will fail (a) within 300 hours? (b) will last at least 500 hours? (c) will fail between 300 to 600 hours?
Benny's Arcade has five video game machines. The average time between machine failures is 50 hours....
Benny's Arcade has five video game machines. The average time between machine failures is 50 hours. Jimmy, the maintenance engineer, can repair a machine in 15 hours on average.The machines have an exponential failure distribution, and Jimmy has an exponential service-time distribution. a. Jimmy's utilization is . (Enter your response rounded to three decimal places.) b. The average number of machines out of service, that is, waiting to be repaired or being repaired is nothing machines. (Enter your response rounded...
A seal on a brand of pump will fail eventually due to leakage, and the time to failure for a given seal can be viewed as a random variable X. Evidence has shown that the time to failure of the seal can be modelled via an exponential distribution. Additionally, 20% of seals on this brand of pump fail within the first 2 years. (a) What value of A should be used in modelling X exp(4)? (4 marks] (b) What is...
The time to failure of a component in an electronic device has an exponential distribution with a mean of 7 hours. Calculate the median time to failure. Round answer to 3 decimal places
FULL SCREEN PRINTER VERSION BACK NEXT Question 14 The time to failure (in hours) for a laser in a cytometry machine is modeled by an exponential distribution with 1 0 .00004. Round the answers to 3 decimal places. (a) What is the probability that the laser will last at least 20028 hours? (b) What is the probability that the laser will last at most 30375 hours? (c) What is the probability that the laser will last between 20028 and 30375...
QUESTION 6 The time to failure (in hours) of fans in a personal computer can be modeled by an exponential distribution with rate 0.0005. Round your answers to 4 decimal places. (a) What proportion of fans will last at least 10000 hours? (b) What proportion of fans will last at most 8000 hours? QUESTION 7 Given the probability density function f(x)=(0.02^9 x^8*e^(-0.02x))/8! for x>0 and f(x)=0 otherwise. Determine the mean and variance of the distribution. Round the answers to the...
Question 7 The mean time between failures (often called MTBF) of the battery of a particular brand of computers is 450 hours. Assume that the time between failures is governed by an exponential distribution. What is the probability that the battery will fail (a) within 300 hours? (b) will last at least 500 hours? (c) will fail between 300 to 600 hours?
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