study notes
- Thread starter DavidM
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In the 2011 Study Notes, p18
Multivariate, bullet 3:
Independence => Zero-correlation, but not vice-versa?
Standard Normal Distribution: for the critical values, I find this table more intuitive:
two-tailed one-tailed Critical Value
68% 84% 1.00
90% 95% 1.65
95% 97.5% 1.96
98% 99% 2.33
99% 99.5% 2.58
Multivariate, bullet 3:
Independence => Zero-correlation, but not vice-versa?
Standard Normal Distribution: for the critical values, I find this table more intuitive:
two-tailed one-tailed Critical Value
68% 84% 1.00
90% 95% 1.65
95% 97.5% 1.96
98% 99% 2.33
99% 99.5% 2.58
de -
Property #3 is from the assigned Stock & Watson. You are right to question it; it is not true in general. In general zero correlation/covariance does not imply independence. But here:
"If X and Y are jointly normally distributed, then the converse is also true. This result--that zero covariance implies independence--is a special property of the multivariate normal distribution that is not true in general."
(you were just commenting on the critical Z table-yes? no problem with it?)
Thanks, David
Property #3 is from the assigned Stock & Watson. You are right to question it; it is not true in general. In general zero correlation/covariance does not imply independence. But here:
"If X and Y are jointly normally distributed, then the converse is also true. This result--that zero covariance implies independence--is a special property of the multivariate normal distribution that is not true in general."
(you were just commenting on the critical Z table-yes? no problem with it?)
Thanks, David
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