Consider a manufacturing process.The failure rate of the process follows an exponential distribution with a failure...

a)Consider a manufacturing process . The failure rate of the process follows an exponential distribution with...

a)Consider a manufacturing process . The failure rate of the process follows an exponential distribution with a failure rate of 0.1 failures per year. Determine what is the probability to have a failure after the first 20 years B)Consider a manufacturing process . The failure rate of the process follows an exponential distribution with a failure rate of 0.1 failures per year. Determine what is the probability to have a failure between year 10 and year 15

The time for a failure to occur in a mechanic arm follows an exponential distribution, typically...

The time for a failure to occur in a mechanic arm follows an exponential distribution, typically a failure occurs every 500 hours. A. What is the probability that the mechanic arm doesn't fail during the first 150 hours? B. What is the probability of having 2 failures in less than 800 hours?

"SUPERCALIFRAGILISTICOEXPIALIDOSO" is a manufacturing company of resistors which are known to have an exponential failure rate...

"SUPERCALIFRAGILISTICOEXPIALIDOSO" is a manufacturing company of resistors which are known to have an exponential failure rate distribution. Failure rate = 9.09 x 10^-5 a) Given that a resistor has been working for 4,500 hours, what would be the probability that it would survive 2000 hours more of use? b) What is the probability any resistor will still be working after 6000 hours of use? c) At what point in time will 20% of these resistors be expected to still be...

"SUPERCALIFRAGILISTICOEXPIALIDOSO" is a manufacturing company of resistors which are known to have an exponential failure rate...

"SUPERCALIFRAGILISTICOEXPIALIDOSO" is a manufacturing company of resistors which are known to have an exponential failure rate distribution failure rate= 9.09 x10 -5 exponent A-what is the probability any resistor will still be working after 6000 hours of use B- given that a resistor has been working for 4,500 hours, what would be the probability that it would survive 2000 hours more of use C- what is the probability it will fail within 5,500 hours of use

1. The process time of oil change in a car follows an exponential distribution with a...

1. The process time of oil change in a car follows an exponential distribution with a mean of 5 minutes. What is the probability that a process of oil change takes more than 6 minutes? 2. What is the probability that a process of oil change takes between 3 and 5 minutes?

The lifetime of a car follows the Weibull distribution with a failure rate of 0.1 per...

The lifetime of a car follows the Weibull distribution with a failure rate of 0.1 per year and parameter a = 0.5. What is the time to which 25% of the cars will last?

The exponential distribution Consider the random variable X that follows an exponential distribution, with μ =...

The exponential distribution Consider the random variable X that follows an exponential distribution, with μ = 40. The standard deviation of X is σ = a. 40 b.0.0006 c. 6.321 d. 0.0250 . The parameter of the exponential distribution of X is λ = a.40 b. 0.0250 b. 6.321 d. 0.0006 . What is the probability that X is less than 27? P(X < 27) = 0.2212 P(X < 27) = 0.5034 P(X < 27) = 0.4908 P(X < 27)...

5. A) A VCR has an exponential failure time distribution, with an average time of 20,000...

5. A) A VCR has an exponential failure time distribution, with an average time of 20,000 hours. If the VCR has lasted 20,000 hours, then the probability that it will fail at 30,000 hours or earlier is: B) Of the following normal curves, with the parameters indicated, the one that most closely resembles the curve with parameters ϻ = 10 and σ = 5 and it is: C) The service time at the window of a certain bank follows an...

Suppose that a system has a component whose time in years until failure is nicely modeled...

Suppose that a system has a component whose time in years until failure is nicely modeled by an exponential distribution. Assume there is a 60% chance that the component will not fail for 5 years. a) Find the expected time until failure. b) Find the probability that the component will fail within 10 years. c) What is the probability that there will be 2 to 5 failures of the components in 10 years.

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...