Answer:
Step-by-step explanation:
Given that SAT math score have a bell-shaped distribution with a mean of 515 and standard deviation of 114.
Since given that bell distribution we can assume that Sat math score is normal with N(515,114)
a) [tex]P(401<x<629)=P(}z}<\frac{114}{114} )\\=0.68[/tex]
i.e. 68% of SAT score is between 401 and 629
so 32% is either less than401 or >629
b) 743 is 2 std deviations from 515
Hence probability = 0.5-0.4772 =0.0228
i.e. 2.28%
