Revision as of 21:57, 26 June 2024 by Admin (Created page with "'''Solution: E''' We need to calculate the probability that a normal random variable with mean 270 and standard deviation 10 lies outside the range [240,290]. This is equivalent to finding the probability that a standard normal variable <math>Z</math> lies outside the range [-3,2]. We have <math>P(Z <-3) = 0.001345 </math> and <math>P(Z > 2) = 0.02275</math>. Adding these probabilities gives 0.024095.")
Exercise
ABy Admin
Jun 26'24
Answer
Solution: E
We need to calculate the probability that a normal random variable with mean 270 and standard deviation 10 lies outside the range [240,290]. This is equivalent to finding the probability that a standard normal variable [math]Z[/math] lies outside the range [-3,2]. We have [math]P(Z \lt-3) = 0.001345 [/math] and [math]P(Z \gt 2) = 0.02275[/math]. Adding these probabilities gives 0.024095.