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What's a boy to do?
"Kevin Vang" wrote:
Two darts could conceivable land equidistant from the center; however, the probability of that happening is 0. Explaining why will require a bit of less than elementary probability theory, with integral calculus as a prerequisite. We can go there, if you are up to it... Kevin I was wondering when you would pop up. We could let it go with an "It's intuitively obvious and not important in solving the problem at hand". In practice, we're talking about physical objects which are not made up of infinitesimal particles, but a finite set of rather large (relatively) molecules of stuff, so the set of positions where a dart could penetrate is a very small subset (albeit a very large set) of the set of points on a circle through the location of any dart. In practice, I would prefer to find an approximation to the solution through Monte Carlo simulation (with real darts, not a computer model), accompanied by large quantities of fermented malt. In which case I'd hazard (hah!) a guess that the probability approaches 1 as the amount of malt consumed approaches unconsciousness. -- Stan from the applied side. |
What's a boy to do?
"riverman" wrote in news:1162440298.459352.48600
@e3g2000cwe.googlegroups.com: The combinatoric arrangement merely gives all the arrangements. Yes, and has next to nothing to do with the probability of any outcomes. In five years, there are two possible outcomes to the experiment "Who has more money, me, or Donald Trump". I could have more money, or he can have more money. By your logic, I therefore have a 50% chance of having more money than The Donald. Good to know. -- Scott Reverse name to reply |
What's a boy to do?
"Stan Gula" wrote in message news:Fik2h.10075$gf5.7278@trndny01... "Kevin Vang" wrote: Two darts could conceivable land equidistant from the center; however, the probability of that happening is 0. Explaining why will require a bit of less than elementary probability theory, with integral calculus as a prerequisite. We can go there, if you are up to it... Kevin I was wondering when you would pop up. We could let it go with an "It's intuitively obvious and not important in solving the problem at hand". In practice, we're talking about physical objects which are not made up of infinitesimal particles, but a finite set of rather large (relatively) molecules of stuff, so the set of positions where a dart could penetrate is a very small subset (albeit a very large set) of the set of points on a circle through the location of any dart. In practice, I would prefer to find an approximation to the solution through Monte Carlo simulation (with real darts, not a computer model), accompanied by large quantities of fermented malt. In which case I'd hazard (hah!) a guess that the probability approaches 1 as the amount of malt consumed approaches unconsciousness. -- Stan from the applied side. I concur. But I was also about to propose to Jon (who IS a computer geek) to write a computer simulation and run it a few hundred million times. --riverman |
What's a boy to do?
On 2 Nov 2006 12:37:19 GMT, Scott Seidman wrote:
"riverman" wrote in news:1162440298.459352.48600 : The combinatoric arrangement merely gives all the arrangements. Yes, and has next to nothing to do with the probability of any outcomes. In five years, there are two possible outcomes to the experiment "Who has more money, me, or Donald Trump". I could have more money, or he can have more money. By your logic, I therefore have a 50% chance of having more money than The Donald. Good to know. You might as well run for president, too. You have a 50% chance of being elected. -- Charlie... http://www.chocphoto.com |
What's a boy to do?
"Scott Seidman" wrote in message . 1.4... "riverman" wrote in news:1162440298.459352.48600 @e3g2000cwe.googlegroups.com: The combinatoric arrangement merely gives all the arrangements. Yes, and has next to nothing to do with the probability of any outcomes. In five years, there are two possible outcomes to the experiment "Who has more money, me, or Donald Trump". I could have more money, or he can have more money. By your logic, I therefore have a 50% chance of having more money than The Donald. Good to know. That's a seriously lame strawman argument. Speaking of straws....put three straws in your hand...one short, one medium, one long. What's the probability of drawing the shortest one last? And what's the probability of drawing the longest one first, and the shortest one after that? --riverman |
What's a boy to do?
"riverman" wrote in :
And what's the probability of drawing the longest one first, and the shortest one after that? --riverman Yes, that problem is a matter of combinatorials, but that isn't the problem you posed. You toss three darts at a target. Dart A misses the target, then Dart B misses by even more. What is the probability that Dart C will miss by more than Dart A? I just need to know the distribution of dart C, and the location of Dart A. I don't even care if darts A,B, and C are independent. It is not a combinatorial problem. If dart A is 1mm from the target, the probability is very good that dart C will miss by more. If dart A is a mile from the target, the probability is very poor. You could ask your question in a different way, to get the answer you want, which is "you are going to throw three darts at a target. What is the probability that the third dart will miss by more than the first dart?" This is a VERY different question, but the answer is the one you are describing. -- Scott Reverse name to reply |
What's a boy to do?
Scott Seidman wrote in
. 1.4: If dart A is 1mm from the target, the probability is very good that dart C will miss by more. If dart A is a mile from the target, the probability is very poor. To express this better, the location of the dart is a continuous random variable, but you aren't treating it that way. -- Scott Reverse name to reply |
What's a boy to do?
"Scott Seidman" wrote in message . 1.4... "riverman" wrote in : And what's the probability of drawing the longest one first, and the shortest one after that? --riverman Yes, that problem is a matter of combinatorials, but that isn't the problem you posed. You toss three darts at a target. Dart A misses the target, then Dart B misses by even more. What is the probability that Dart C will miss by more than Dart A? I just need to know the distribution of dart C, and the location of Dart A. I don't even care if darts A,B, and C are independent. It is not a combinatorial problem. If dart A is 1mm from the target, the probability is very good that dart C will miss by more. If dart A is a mile from the target, the probability is very poor. You're getting close. Considering that dart A and dart C have the same distribution, then either dart can occupy whatever spot the other dart occupies (minus the situation where they occupy the same point). As you said, the probability changes according to the location of dart A. Whatever high probability exists if A is close is countered by the low probability if A is far. Thus, all the possible positions of A and C equal all the possible positions of C and A....its a combinatoric problem. Specifically because I DON'T give the position of dart A. If its any comfort, I'm not making this problem up. --riverman |
choc tr
"Charlie Choc" wrote in message -- joe responds glad to see you returned --don"t we get a trip report about your western summer? even if no fishing is included--most of the messages here do not. spent a couple of day in Graham co last week with Jeff----then Dene and I spent a week bumming around snowbird area--one big rain so tried to improve my nymphing ability with slight success, but did dig out one big rainbow in big pool just upstream from snowbird cabin. They call them steelhead up that way as they come into streams from lakes to lay eggs. Went to eye doctor yesterday and after he said I was still 20/20 I explained that tennis balls I once returned now go flying by, and Jeff had to tie on small flies for me. Dr said perhaps I need to clean my glasses and gave me a bill for $121 Kayaking in backwater salt most every day--not catching much but just cannot say inside and do homework when Carolina in Oct is smiling Indian Joe |
What's a boy to do?
"riverman" wrote in :
Thus, all the possible positions of A and C equal all the possible positions of C and A... But the question as you pose it has nothing to do with all the possible positions of dart A-- it has to do with one specific position of dart A! Let's say that A is 5cm away. Then you are looking for p(C5), which has a value that depends only on the distribution of dart C. Whatever high probability exists if A is close is countered by the low probability if A is far. True before dart A is thrown, but not after dart A is thrown. Now, you have a real honest to goodness value for dart A. Thus, all the possible positions of A and C equal all the possible positions of C and A....its a combinatoric problem. Specifically because I DON'T give the position of dart A. This doesn't mean that you can just ignore the fact that Dart A is stuck at a precise location in the dartboard, and it's why there isn't enough info to offer a p-value. If its any comfort, I'm not making this problem up. Then the person who did got it wrong. -- Scott Reverse name to reply |
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