Thanks! Got one! //@Anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 04:51 PM EDT
This is true in general. However, for this specific problem with only two possible outcomes (success or failure) as defined by the raffle result. A zero probability does mean impossible. Thus "very close zero" could be a better answer. //@Anonymous: Speaking like a true statistician //@Anonymous: Technically speaking, a zero probability event does not mean an impossible event... //@Anonymous: zero //@anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 01:18 PM EDT
Speaking like a true statistician //@Anonymous: Technically speaking, a zero probability event does not mean an impossible event... //@Anonymous: zero //@anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 12:46 PM EDT
And why is that? //@Anonymous: Technically speaking, a zero probability event does not mean an impossible event... //@Anonymous: zero //@anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 11:00 AM EDT
near zero, to be more accurate //@Anonymous: zero //@anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 10:47 AM EDT
Technically speaking, a zero probability event does not mean an impossible event... //@Anonymous: zero //@anonymous: what's the probability of the raffle?
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By anonymous on 06/10/2021, 10:23 AM EDT
zero //@anonymous: what's the probability of the raffle?
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