A distribution of measurements is relatively mound-shaped with a mean of 40 and a standard deviation...

A distribution of measurements is relatively mound-shaped with mean 50 and standard deviation 5. (a) What...

A distribution of measurements is relatively mound-shaped with mean 50 and standard deviation 5. (a) What proportion of the measurements will fall between 45 and 55? (b) What proportion of the measurements will fall between 40 and 60? 0.68 (c) What proportion of the measurements will fall between 40 and 55? (d) If a measurement is chosen at random from this distribution, what is the probability that it will be greater than 55?

A distribution of measurement is relatively mound-shaped with mean 50 and standard deviation 10. a.) What...

A distribution of measurement is relatively mound-shaped with mean 50 and standard deviation 10. a.) What proportion of the measurements will fall between 40 and 60? b.) What proportion of the measurements will fall between 30 and 70? c.) What proportion of the measurements will fall between 30 and 60?

Suppose x has a mound-shaped distribution. A random sample of size 16 has sample mean 10...

Suppose x has a mound-shaped distribution. A random sample of size 16 has sample mean 10 and sample standard deviation 2. (b) Find a 90% confidence interval for μ (c) Interpretation Explain the meaning of the confidence interval you computed.

The distribution of the lengths of long-stemmed roses is mound – shaped and symmetric with the...

The distribution of the lengths of long-stemmed roses is mound – shaped and symmetric with the mean stem length of 15 inches and standard deviation of 2 inches. According Empirical rule a. _______ percent of the long-stemmed roses have the lengths between 13 inches and 17 inches. b. _______ percent of long-stemmed roses have the lengths smaller than 13 inches. c. _______ percent of long-stemmed roses have the lengths between 11 inches and 17 inches.

Suppose that the distribution of scores on an exam is mound shaped and approximately symmetric. The...

Suppose that the distribution of scores on an exam is mound shaped and approximately symmetric. The exam scores have a mean of 100 and the 16th percentile is 75. (Use the Empirical Rule.) (a) What is the 84th percentile? (b) What is the approximate value of the standard deviation of exam scores? (c) What is the z-score for an exam score of 90? (d) What percentile corresponds to an exam score of 150? % (e) Do you think there were...

Confidence Interval: Suppose x has a mound-shaped distribution with  = 6. A random sample of...

Confidence Interval: Suppose x has a mound-shaped distribution with  = 6. A random sample of size 16 has sample mean 50. (a) Check Requirements: Is it appropriate to use a normal distribution to compute a confidence interval for the population mean µ? Explain. (b) Find a 90% confidence interval form. (c) Interpretation: Explain the meaning of the confidence interval you computed.

A random sample of 25 values is drawn from a mound-shaped and symmetrical distribution. The sample...

A random sample of 25 values is drawn from a mound-shaped and symmetrical distribution. The sample mean is 10 and the sample standard deviation is 2. Use a level of significance of 0.05 to conduct a two-tailed test of the claim that the population mean is 9.5. (a) Is it appropriate to use a Student’s t distribution? Explain. How many degrees of freedom do we use? (b) What are the hypotheses? (c) Calculate the sample test statistic t. (d) Estimate...

If a variable has a distribution that is? bell-shaped with mean 23 and standard deviation 3?,...

If a variable has a distribution that is? bell-shaped with mean 23 and standard deviation 3?, then according to the Empirical? Rule, what percent of the data will lie between 14 and 32??

Assume a binomial probability distribution with n=40 and π = .55. Compute the following: The mean...

Assume a binomial probability distribution with n=40 and π = .55. Compute the following: The mean and standard deviation of the random variable. The probability that X is 25 or greater The probability that X is 15 or less. The probability that X is between 15 and 25 inclusive.

a normal shaped distribution has a mean =200 and a standard deviation =30. What are the...

a normal shaped distribution has a mean =200 and a standard deviation =30. What are the z score values that form the boundaries for the middle 95% of the distribution?