In a company, the mean wage of the employees is $42,500 and the standard deviation is $2000. What is the probability that the mean wage of 75 randomly selected employees will exceed $43,000
In a company, the mean wage of the employees is $42,500 and the standard deviation is...
The weights of employees in a large company are normally distributed with a mean of 88 kg and a standard deviation of 21 kg. What is the probability that the weight of a randomly selected employee is 89kg?
The average hourly pay for a company is $20 with a standard deviation of $3. Furthermore, it is known that the hourly pay rates are normally distributed. (a) [2] What is the probability that a randomly selected employee will have an hourly wage of at least $26? (b) [4] What are the minimum and the maximum hourly wages of the middle 90% of employees? (c) [4] If 15 of the employees have hourly pay rates less than $17, how many...
A company pays its employees an average wage of $15.90 an hour with a standard deviation of $1.50. If the wages are approximately normally distributed and paid to the nearest cent, (a) what percentage of the workers receive wages between $13.75 and $16.22 an hour inclusive? (b) the highest 5% of the employee hourly wages is greater than what amount?
The mean number of years employees stay with a company is 12 years with a population standard deviation 4 years. The distribution of years has a left skewed shape. The probability that the mean years of staying in the company for a randomly selected sample of 36 will be more than 14 years is? If the CLT holds, find this probability. If you do not believe the CLT holds, enter 0 as your answer.
8. Assume that SAT scores are normally distributed with mean 1518 and standard deviation 325. ROUND YOUR ANSWERS TO 4 DECIMAL PLACES a. If 100 SAT scores are randomly selected, find the probability that they have a mean less than 1500.___________ b. If 64 SAT scores are randomly selected, find the probability that they have a mean greater than 1600 c. If 25 SAT scores are randomly selected, find the probability that they have a mean between 1550 and 1575...
8. Assume that SAT scores are normally distributed with mean 1518 and standard deviation 325. ROUND YOUR ANSWERS TO 4 DECIMAL PLACES a. If 100 SAT scores are randomly selected, find the probability that they have a mean less than 1500.___________ b. If 64 SAT scores are randomly selected, find the probability that they have a mean greater than 1600 c. If 25 SAT scores are randomly selected, find the probability that they have a mean between 1550 and 1575...
IQ scores have a population mean of 100, a population standard deviation of 15, and are approximately Normally distributed. Use one of the StatCrunch outputs below to find the probability that a randomly selected person will have an IQ of 75 or above. State whether Figure (A) or Figure (B) is the correct representation of a person with an IQ of 75 or above. "use figure B to find the probability" Figure A Mean 100 std dev 15 prob (X<=...
One company produces movie trailers with mean 130 seconds and standard deviation 30 seconds, while a second company produces trailers with mean 110 seconds and standard deviation 20 seconds. Assume these trailers vary normally. What is the probability that two randomly selected trailers, one from each company, will combine to less than 250 seconds? Question 6 options: .46 .54 .31 .61
The mean daily rainfall in Los Angeles in December is 0.05 inches with a standard deviation of 0.02 inches. What is the probability that the total rainfall in Los Angeles for 35 randomly selected December days (possibly over several years) will exceed 2 inches? Carry your intermediate computations to at least four decimal places. Report your result to at least three decimal places.
The mean age of the employees at a large corporation is 35.2 years, and the standard deviation is 9.5 years. A random sample of 4 employees will be selected. What are the mean and standard deviation of the sampling distribution of the sample mean for samples of size 4 ? The mean is 35.2, and the standard deviation is 9.5. A The mean is 35.2, and the standard deviation is 9.549.54. B The mean is 35.2, and the standard deviation...