A component's lifetime has an exponential distribution with an expectation of T = 4100 hours. What...

A particular circulation pump has a Weibull lifetime distribution with a rate parameter λ = 0.064...

A particular circulation pump has a Weibull lifetime distribution with a rate parameter λ = 0.064 per 1000 hours and a shape parameter β = 1.23. What is the probability that this pump will run for at least 1300 hours? Express your answer rounded to three decimal places.

Two light bulbs, have exponential lifetime where expected lifetime for bulb A is 500 hours and...

Two light bulbs, have exponential lifetime where expected lifetime for bulb A is 500 hours and expected lifetime for bulb B is 200 hours. a) What is the expected time until bulb A or bulb B malfunctions ? b) What is the probability that bulb A malfunctions before bulb B ?  

The failure time of a component is a random variable with an exponential distribution that has...

The failure time of a component is a random variable with an exponential distribution that has a mean of 777,6 hours. What is the probability that the component will still be working after 2014 hours ?

The lifetime of light bulbs produced by a company are normally distributed with mean 1500 hours...

The lifetime of light bulbs produced by a company are normally distributed with mean 1500 hours and standard deviation 125 hours. (c) If three new bulbs are installed at the same time, what is the probability that exactly two will be burning after 1400 hours? (d) If three new bulbs are installed at the same time, what is the probability that at least two will be burning after 1400 hours? Enter your answer as a decimal, not a percentage. Round...

If we have a random variable T distributed according to exponential distribution with mean 1.9 hours....

If we have a random variable T distributed according to exponential distribution with mean 1.9 hours. What is the probability that T will be greater than 69 minutes?

The time between arrivals of vehicles at a particular intersection follows an exponential probability distribution with...

The time between arrivals of vehicles at a particular intersection follows an exponential probability distribution with a mean of 10 seconds. (a) Sketch this exponential probability distribution. (b) What is the probability that the arrival time between vehicles is 10 seconds or less? (Round your answer to four decimal places.) (c) What is the probability that the arrival time between vehicles is 4 seconds or less? (Round your answer to four decimal places.) (d) What is the probability of 30...

Suppose that the average lifetime of a plane is 100 working hours and that the lifetime...

Suppose that the average lifetime of a plane is 100 working hours and that the lifetime distribution is exponential. (a) Estimate the probability that the plane will work at least 50 hours. (b) Given that the plane has functioned for 50 hours, what is the chance that it fails in the next 25 hours. (c) Suppose that two planes, one in active, the other in reserve (if the primary one malfunctions, the second will be used at once). What is...

Suppose that the average lifetime of a car is 100 working hours and that the lifetime...

Suppose that the average lifetime of a car is 100 working hours and that the lifetime distribution is exponential. (a) Estimate the probability that the car will work at least 50 hours. (b) Given that the car has functioned for 50 hours, what is the chance that it fails in the next 25 hours. (c) Suppose that two cars, one in active, the other in reserve (if the primary one malfunctions, the second will be used at once). What is...

Suppose that the average lifetime of a transistor is 100 working hours and that the lifetime...

Suppose that the average lifetime of a transistor is 100 working hours and that the lifetime distribution is exponential. (a) Estimate the probability that the transistor will work at least 30 hours. (b) Given that the transistor has functioned for 30 hours, what is the chance that it fails in the next 25 hours. (c) Suppose that two transistors, one in active, the other in reserve (if the primary one malfunctions, the second will be used at once). What is...

Suppose that the average lifetime of a plane is 100 working hours and that the lifetime...

Suppose that the average lifetime of a plane is 100 working hours and that the lifetime distribution is exponential. (a) Estimate the probability that the plane will work at least 50 hours. (b) Given that the plane has functioned for 50 hours, what is the chance that it fails in the next 25 hours. (c) Suppose that two planes, one in active, the other in reserve (if the primary one malfunctions, the second will be used at once). What is...