Re: jointly gaussian


<unsettledinside@xxxxxxxxx> wrote in message
news:1156868114.626734.60270@xxxxxxxxxxxxxxxxxxxxxxxxxxxxxxx

can a bivariate normal distribution be only made up of 2 random
variables with normal distribution (and independent of each other)?

Yes and No. Yes, if two random variables have a bivariate normal
distribution, then they are normal random variables. No, the two
variables do not need to be independent of each other, assuming that
when you say independence you mean stochastic independence.

In other words can two random variables with some distribution other than
normal give rise to a jointly normal distribution?

No.

Or is it just that for 2 normal variables to have a jointly normal
distribution, they need to be independent of aech other?

No, they don't have to be independent of each other in the usual
sense of independence in probability theory. Your harping on this
point leads me to suspect that you mean something else by the
phrase "independent of each other"


.

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