Solution,
x = 79 in.
z-score = 3.74
The player's height is 3.74 standard deviation (s) above the mean.
A successful basketball player has a height of 6 feet 7 inches, or 201 cm. Based...
successful basketball player has a height of 6 feet 22 inches, or 188188 cm. Based on statistics from a data set, his height converts to the z score of 1.951.95. How many standard deviations is his height above the mean? The player's height is nothing standard deviation(s) above the mean. (Round to two decimal places as needed.)
3.3.1 Question Help A successful basketball player has a height of 6 feet 10 inches, or 208 cm. Based on statistics from a data set, his height converts to the z score of 4 81 How many standard deviations is his height above the mean? The player's height is standard deviation(s) above the mean (Round to two decimal places as needed)
need help answering these questions please A successful basketball player has a height of 6 feet 9 inches, or 206 cm. Based on statistics from a data set, his height converts to the z score of 4.45. How many standard deviations is his height above the mean? The player's height is standard deviation(s) above the mean, (Round to two decimal places as needed)
An 86- kg basketball player has a height of 6 feet 8 inches and runs 15 miles per hour. Express his height in centimeters and micrometers, his mass in pounds, and his speed in m/s.
Basketball player heights are normally distributed with a mean of 195 cm. and a standard deviation of 20 cm. What is the probability that a randomly selected player's height is less than 180 cm? Show your work.
92 81 65.5 Question 17 (1 point) The mean height of a basketball team is 6 feet with a standard deviation of 0.2 feet. The team's center is 6.9 feet tall. Find the center's z score. Is his score unusual? 3.83, no 4.95, yes 4.5, yes 4, no Question 18 (1 point) Saved If your score on your next statistics test is converted to a z score, which of these z scores would you prefer? 1.00
I get questions a and be but don't understand how they got the answers for c, d and e. Please explain The heights of adult men in a certain country are normally distributed with a mean of 69.1 inches and a standard deviation of 2.6 inches. Complete parts (a) through (e) below. a. What are the standard score and percentile of a height of 74 inches? The standard score is z= 1.88. (Round to two decimal places as needed.) The...
I can understand questions a through d but cant seem to figure out question e. Please help me solve this and explain how its done please The heights of adult men in a certain country are normally distributed with a mean of 70.1 inches and a standard deviation of 2.9 inches. Complete parts (a) through (e) below. a. What are the standard score and percentile of a height of 72 inches? The standard score is z= .66. (Round to two...
Height data, collected from a statistics class, has a mean, X = 68.21 inches, and a standard deviation of s=4.01 inches. The sample size of the data was n = 36. Suppose the data collected could be considered a random sample of WCU students. Calculate the lower boundary of a 99% confidence z-interval. Give your answer as a decimal number rounded to 2 decimal places. INinto nu can use the calculator to find this solution or do this by hand)...
With a height of 64 in, Nelson was the shortest president of a particular club in the past century. The club presidents of the past century have a mean height of 73.2 in and a standard deviation of 2 2 in. a. What is the positive difference between Nelson's height and the mean? b. How many standard deviations is that [the difference found in part (a)]? c. Convert Nelson's height to a z score d. If we consider "usual" heights...