Is it possible to get the same number twice if you random a number between 0-infinity?
Is it possible to get the same number twice if you random a number between 0-infinity?
Hunter Price
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Blake Clark
The chances of it happening would be the first number divided by the second number, or
[eqn]0/∞[/eqn]
Henry Morales
There's zero probability but it's not impossible.
Isaac Gomez
The chance of that happening is almost zero bt not exactly zero. Suppose there is a number, n
If u want to get that number again, the chance of that happening is n/∞ which is almost zero bt not exactly zero
Jonathan Lopez
Are you both just trolling?
Use the range 0 through 3 and note how neither of your methods would give you the right answer. The first method of A/B would be 0/3 which is 0% and obviously wrong, while the second method of N/B would give you either 0/3 (0%),1/3 (33.33%),2/3 (66.67%), or 3/3 (100%), all of which are also wrong.
What you actually do is take 1 divided by the range, so 1/4 in the 0 through 3 case or 1/(infinity+1) for the 0 through infinity range
Kayden Stewart
Hey, fuck you. That's not the number 1.
Bentley Jones
Is that there some sorta delta epsilon shit
Landon Powell
baby, you know you want to delta my epsilon. That's what we call anal sex/pron.
Grayson Bell
Consider the following probability distribution:
[math]P(X = n) = \frac{1}{(2^{n + 1})},\ \ \ \ \ n = 0, \ldots, \infty,[/math]
where [math]P(x = n)[/math] is the probability to draw number [math]n[/math] randomly.
Now, the probability to draw number 0 twice is [math]\frac{1}{4}[/math].
Andrew Nguyen
>tfw Veeky Forums is full of fucking brainlets
If you're drawing uniformly, then the probability of drawing the same number twice is exactly 0, because the probability of drawing any given number is exactly 0
Charles Myers
That the probability is 0 doesn't mean it's impossible. It means it almost surely won't happen.
Evan Thomas
What probability measure do you want to define on [math](0,\infty)[/math]?
Hudson Barnes
THIS
Leo Sanders
teh only answer you will be able to get is by normal counting.
so the answer is 1/n for however big n is.
if you want a better defined answer just make n bigger.
i.e answer = limit n 0 -> inf: 1/n
Jordan Ortiz
infinity doesn't exist
Daniel Harris
*zeno's laterally*
Julian Ortiz
Yes.
Jace Flores
yes if you have infinite time
Josiah Kelly
Yes it is possible. It probably wouldn't happen, but nevertheless you shouldn't be surprised if it does happen.
Lucas Jenkins
Goddamnit this fucking board. One of these days Veeky Forums really needs to learn how infinities work.
The probability of selecting something at random from a defined number of possible choices is dependent on the number of choices.
The probability of selecting something at random from an undefined number of possible choices is an undefined probability.
The amount of numbers between 0 and infinity is infinite. An infinite amount of things is an undefined amount of things.
The answer to your question is therefore that the probability is not defined. What can be said is that as the range is increased, the probability of selecting the same number twice decreases. As the range tends to infinity, the probability tends to zero. The probability would never reach zero for the same reason that a defined range cannot actually become infinite.
Luke Lee
-The concept of infinity doesn't map to anything in reality, and likely cannot. Because it doesn't and cannot exist. ie, it is not a thing the universe allows. ie, our universe doesn't work that way.
-Logically, the answer is yes. If the selection is truly random all states have an equal probability. The chance is infinitely close to zero, but nonetheless, non-zero.
Ian Roberts
your a retard.
theres nothing wrong with having an infinite probability space, the probability to get the same number is 0, you will 'almost surely' get a different number.
Brody Barnes
>infinity
No such thing.