3. the time required for a student to complete the exam is uniformly distributed with a...

The amount of time it takes for a student to complete a statistics exam is given...

The amount of time it takes for a student to complete a statistics exam is given by a random variable that is uniformly distributed between 35 and 74 mins A student is selected randomly. Find the probability of the following. Each answer or round to at least three decimal places. A. The student's time was between 41 and 47 mins B. The student's less than 41 mins. C. The student was more than 70 mins D. The student was more...

A) The amount of time it takes students to complete a quiz is uniformly distributed between...

A) The amount of time it takes students to complete a quiz is uniformly distributed between 35 to 65 minutes. One student is selected at random. Find the following events: a. The probability density function (pdf) of amount of time taken for the quiz. b. The probability that the student requires more than 50 minutes to complete the quiz.(1 mark) c. The probability that completed quiz time is between 45 and 55 minutes. (1 mark) d. The probability that the...

The average time to complete the quiz for all students in the class is uniformly distributed...

The average time to complete the quiz for all students in the class is uniformly distributed between 90 minutes and 150 minutes. Define x Write the notation for the distribution that defines x. x~ Find the mean and interpret the results Find the probability that a student finishes in less than 95 minutes Find the probability that a student takes at least 135 minutes to finish the quiz

Time T to complete a quiz in class is uniformly distributed from 7 minutes to 14...

Time T to complete a quiz in class is uniformly distributed from 7 minutes to 14 minutes. (a) Write the pdf and sketch it f(t) = Graph of pdf f(t) What is the probability that a randomly selected student takes (b) no more than 9 minutes? (c) between 10 to 14 minutes? (d) Find the mean time µT = (e) Find the variance σ 2 T =

The amount of time it takes for a student to complete a statistics exam is given...

The amount of time it takes for a student to complete a statistics exam is given by a random variable that is uniformly distributed between 32 and 65 minutes. A student is selected at random. Find the probability of the following events. In each case, give exact answers or round to at least three decimal places. The student’s time was between 38 and 44 minutes equation editor Equation Editor The student’s time was less than 38 minutes equation editor Equation...

The time needed to complete a final examination in a particular college course is normally distributed...

The time needed to complete a final examination in a particular college course is normally distributed with a mean of 77 minutes and a standard deviation of 12 minutes. Answer the following questions. a. what is the probability of completing the exam in one hour or less (to 4 decimals) b. what is the probability that a student will complete the exam in more than 60 minutes but less than 75 minutes (to 4 decimals) c. assume that the class...

The time to complete a standardized exam is normally distributed with a mean of 55.8 minutes...

The time to complete a standardized exam is normally distributed with a mean of 55.8 minutes and a standard deviation of 9.3 minutes. The designers of the exam want to set a time limit where only 14% of the people taking the exam do not finish. What should this time limit be? Please explain where each number goes! I have to show full work!

The amount of time all students in a very large undergraduate statistics course take to complete...

The amount of time all students in a very large undergraduate statistics course take to complete an examination is distributed continuously and normally. The probability a student selected at random takes at least 55.50 minutes to complete the examination equals 0.6915. The probability a student selected at random takes no more than 71.52 minutes to complete the examination equals 0.8997. a. Determine the value for the mean (μ) of the associated distribution. b. Determine the value for the standard deviation...

Suppose the wait time for dino nuggets to be microwaved is uniformly distributed from 5 minutes...

Suppose the wait time for dino nuggets to be microwaved is uniformly distributed from 5 minutes to 12 minutes. (a) Is the wait time for dino nuggets to be done in the microwave a discrete or a continuous random variable? (b) What is the probability we have to wait between 8 to 10 minutes for the nuggets to be done? (c) what is the probability that we have to wait exactly 6 minutes? I'm having a hard time understanding how...

The length of time it takes a college student to find a parking spot in the...

The length of time it takes a college student to find a parking spot in the student center parking lot follows a non-normal distribution with a mean of 3.0 minutes and a standard deviation of 1 minute. Find the probability that the mean time to find a parking spot in the student center parking lot is less than 2.0 minutes for a randomly selected sample of 100 students