Revision as of 19:58, 27 June 2024 by Admin (Created page with "'''Solution: E''' Let <math>\sigma^2 </math> equals the variance of a single measurement error. A quick calculation gives <math>\sigma^2 = 2</math>. The average measurement is the sum of the measurements divided by 18, and is approximately normally distributed with mean 200 and variance <math>\sigma^2/18 = 1/9</math>, and the approximate probability that the average measurement is between 199 and 201 equals <math display = "block"> P(Z \in \pm 3 ) = 0.9973 </math> w...")
Exercise
ABy Admin
Jun 27'24
Answer
Solution: E
Let [math]\sigma^2 [/math] equals the variance of a single measurement error. A quick calculation gives [math]\sigma^2 = 2[/math]. The average measurement is the sum of the measurements divided by 18, and is approximately normally distributed with mean 200 and variance [math]\sigma^2/18 = 1/9[/math], and the approximate probability that the average measurement is between 199 and 201 equals
[[math]]
P(Z \in \pm 3 ) = 0.9973
[[/math]]
where [math]Z[/math] is a standard normal variable.