# How to formally prove that Geometric distribution is the discrete analogous of the Exponential one? [closed]

How to formally prove that Geometric distribution is the discrete analogous of the Exponential one?

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Welcome to SO! This site is a place for people to ask and answer programming questions (FAQ: stackoverflow.com/faq). For other sorts of questions, please see: meta.stackoverflow.com/questions/8401/… –  Shog9 Mar 8 '10 at 1:58
Did you mean "analogy", perhaps? –  dmckee Mar 8 '10 at 2:15
@dmckee. Poor kid comes in for help with math, gets an update on English grammar/vocabulary ;-) But yes, you are right, can't have an adjective there; `analogue` however would yet be the better noun to use. In general the whole sentence is badly constructed, but generally conveys a mathematical reality: Geometric and Exponential Distributions are essentially the same concept, for discrete and continuous variables respectively. –  mjv Mar 8 '10 at 2:40
@mjv: It was a serious question because I don't know that field of math and wasn't sure if "analogous" had a domain specific meaning I wasn't aware of of. No intent to be mean, and I offer my apologies if it came across that way. And you are right, "analogue" is better. –  dmckee Mar 8 '10 at 2:47
@dmckee. No worries, I've seen a few of your posts, and comments, and anything derogatory or mean would likely be accidental. No, I was just finding some humor in the fact that a math lesson turned, at least it so it appeared, to an English lesson, neither of which have their proper place here ;-) I personally decided not to help the OP, owing to the lack of apparent effort on his/her part and [to a lesser degree] to the NPR nature of the question. I'm sometimes disappointed when some very practical math issue get NPR-ed out, but the topic here does stray far from coding-at-large. –  mjv Mar 8 '10 at 3:27