A battery has a time to full discharge that is exponentially distributed with a mean of...

LED light bulbs have an expected life that is exponentially distributed with a mean of 5,000...

LED light bulbs have an expected life that is exponentially distributed with a mean of 5,000 hours. Determine the probability that one these lights will last: a- -  At least 6,000 hours b- - No longer than 1,000 hours c- - Between 1,000 and 6,000 hours

The time between the arrivals of electronic messages at your computer, ?, is exponentially distributed with...

The time between the arrivals of electronic messages at your computer, ?, is exponentially distributed with a mean of two hours. a) What is the probability that you do not receive a message during a two-hour period? b) If you have not had a message in the last four hours, what is the probability that you do not receive a message in the next two hours? c) What is the expected time between your fifth and sixth messages? d) Find...

The time between the arrivals of electronic messages at your computer is exponentially distributed with a...

The time between the arrivals of electronic messages at your computer is exponentially distributed with a mean of two hours. a) What is the probability that you do not receive a message during a two-hour period? Solve by using exponential distribution. b) If you have not had a message in the last four hours, what is the probability that you do not receive a message in the next two hours?

The time between arrivals of taxis at a busy intersection is exponentially distributed with a mean...

The time between arrivals of taxis at a busy intersection is exponentially distributed with a mean of 10 minutes. (i) What is the probability that you wait longer than one hour for a taxi? (ii) Suppose that you have already been waiting for one hour for a taxi. What is the probability that one arrives within the next 10 minutes? (iii) Determine x such that the probability that you wait more than x minutes is 0.10. (iv) Determine x such...

Suppose that the time (in hours) required to repair a machine is an exponentially distributed random...

Suppose that the time (in hours) required to repair a machine is an exponentially distributed random variable with parameter λ=0.2. What is (a) the probability that a repair takes less than 3 hours?   (b) the conditional probability that a repair takes at least 11hours, given that it takes more than 8 hours?

Two turtles are racing. Turtle A’s time is exponentially distributed with mean 2 minutes. Turtle B’s...

Two turtles are racing. Turtle A’s time is exponentially distributed with mean 2 minutes. Turtle B’s time is exponentially distributed with mean 3 minutes. Assume that their times are independent. a) What is the probability that turtle A wins? b) What is the expected time of the winner? What is its variance? c) What is the pdf of the time difference between the loser and the winner (by how much the faster turtle wins)?

The life of a fully-charged cell phone battery is normally distributed with a mean of 14...

The life of a fully-charged cell phone battery is normally distributed with a mean of 14 hours with a standard deviation of 3 hours. What is the probability that 25 batteries last less than 16 hours?

The lifetime of a certain type of battery is normally distributed with a mean of 1000...

The lifetime of a certain type of battery is normally distributed with a mean of 1000 hours and a standard deviation of 100 hours. Find the probability that a randomly selected battery will last between 950 and 1050 hours

Battery life follows a normal continuous probability distribution with a population mean = 300 hours and...

Battery life follows a normal continuous probability distribution with a population mean = 300 hours and a population standard deviation of 30 hours. a. What is probability that a battery tested will last for less than 270 hours? b. What is probability that a battery tested will last between 270 and 330 hours?

For a certain type of computers, the length of time between charges of the battery is...

For a certain type of computers, the length of time between charges of the battery is normally distributed with a mean of 42 hours and a standard deviation of 18 hours. a. If 20 computers are randomly selected, what is the probability that the mean charging time of their batteries is more than 45 hours? b. If 38 computers are randomly selected, what is the probability that the mean charging time of their batteries is between 37 and 40 hours?...