(Chapter 03, Example 05) The National Collegiate Athletic Association (NCAA) uses a sliding scale for eligibility for Division I athletes. Those students with a 2.5 high school GPA must score at least 820 on the combined mathematics and critical reading parts of the SAT to compete in their first college year. The combined scores of the almost 1.7 million high school seniors taking the SAT in 2012 were approximately Normal with mean 1010 and standard deviation 214. What percent (± ± 0.1) of high school seniors meet this SAT requirement of a combined score of 820 or better? Use software to calculations.
(Chapter 03, Example 05) The National Collegiate Athletic Association (NCAA) uses a sliding scale for eligibility...
can someome explain how to do the problem 1.106 and 1.108 please and thanks 7 re) > 1.77 (d)-2.25 - 1.77 1.106 ) Find the number such that the proportion of observations that are less than in a standard Normal distribution is 0.8. (b) Find the number z such that 35% of all observations from a standard Normal distribution are greater than z. 1.107 NCAA rules for athletes. The National Collegiate Athletic Association (NCAA) requires Division I athletes to score...
Please answer the following questions below. You must include your work or no credit will be given. Keep at least 4 decimal places. The National Collegiate Athletic Association (NCAA) requires Division II athletes to score at least 820 on the combined mathematics and reading parts of the SAT in order to compete in their first college year. The scores of the 1.5 million high school seniors taking the SAT last year are approximately Normal with mean 1026 and standard deviation...
Ch.15-18 Due: Nov. 7 Please answer the following questions below. You must include your work or no credit will be given. Keep at least 4 decimal places. The National Collegiate Athletic Association (NCAA) requires Division II athletes to score at least 820 on the combined mathematics and reading parts of the SAT in order to compete in their first college year. The scores of the 1.5 million high school seniors taking the SAT last year are approximately Normal with mean...