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Misunderstanding of "random".
This is certainly not written in my language--I still don't quite know what you are saying, but if you're using it to prove that the probabilities of drawing specific cards from randomly shuffled decks is time-dependent, then it can't be right. Anyway, I thought you were leaving...
(dx)=52 what does the d stand for? This shouldn't be calculus or differential equations...P(n)/(dx)=(1/52)/t Why are we dividing a probability by time?(dy)=f(^x) what does the d stand for? This shouldn't be calculus or differential equations...P(n)/(dy)=σ2/t2 what is σ? is it a standard deviation of something?P(n)/(dx)≠P(n)/(dy) what does the d stand for? This shouldn't be calculus or differential equations...[x1∝x2]≠[y1≠y2] I don't understand this one at all. how can a proportionality statement and non-equality statement be related like this? what are x1, x2, y1 and y2?(dy)≠(dx) what does the d stand for? This shouldn't be calculus or differential equations...
(dy)≠(dx) what does the d stand for? This shouldn't be calculus or differential equations...
Quote from: Thebox on 21/08/2015 18:00:08(dx)=52 what does the d stand for? This shouldn't be calculus or differential equations...P(n)/(dx)=(1/52)/t Why are we dividing a probability by time?distribution over continuous time time(dy)=f(^x) what does the d stand for? This shouldn't be calculus or differential equations...it isnt,its a linear expanded to the power offa function of the power of x P(n)/(dy)=σ2/t2 what is σ? is it a standard deviation of something?variance of population valuesP(n)/(dx)≠P(n)/(dy) what does the d stand for? This shouldn't be calculus or differential equations...[x1∝x2]≠[y1≠y2] I don't understand this one at all. how can a proportionality statement and non-equality statement be related like this? what are x1, x2, y1 and y2?x1 and x2 are rows, y is colums made by the shuffling of the rows, alignment of a y axis.(dy)≠(dx) what does the d stand for? This shouldn't be calculus or differential equations...
(dx)=52 what does the d stand for? This shouldn't be calculus or differential equations...P(n)/(dx)=(1/52)/t Why are we dividing a probability by time?distribution over continuous time time(dy)=f(^x) what does the d stand for? This shouldn't be calculus or differential equations...it isnt,its a linear expanded to the power offa function of the power of x P(n)/(dy)=σ2/t2 what is σ? is it a standard deviation of something?variance of population valuesP(n)/(dx)≠P(n)/(dy) what does the d stand for? This shouldn't be calculus or differential equations...[x1∝x2]≠[y1≠y2] I don't understand this one at all. how can a proportionality statement and non-equality statement be related like this? what are x1, x2, y1 and y2?x1 and x2 are rows, y is colums made by the shuffling of the rows, alignment of a y axis.(dy)≠(dx) what does the d stand for? This shouldn't be calculus or differential equations...
I did leave, but I can not rest when I know I am correct 100%.
argue the maths please Alan, my maths , your same maths tells me I am correct whether you believe it or not.
Quote from: Thebox on 21/08/2015 18:51:12argue the maths please Alan, my maths , your same maths tells me I am correct whether you believe it or not.Exactly. "Random" is a mathematical term. You must understand its implications before deploying it.
It is impossible to do this 'maths' because it isn't maths, it is symbol gibberish.If you truly believe this proves you are right and everyone else is wrong then you will be able to walk away and leave it at that.You have learnt a lot since being on this forum and it's been to good to see you arguing with some of the new theories.Wishing you all the best for the future, there have been times when it has been good knowing you.
........where as the y axis is absolute random and like you said impossible to calculate.
I see no errors in my maths where do you see an error?
scenario - take 100 lottery draw machines , each machine releases one ball of 59 balls, you pick 6 of these balls that have been drawndo you think the lottery would still work?
We can write the maths this way if you like -
All these are incorrect. Do you want us to lie to you and say you are right? Would that be honourable of us?As I said, if you truly believe you are right you will be able to walk away from this forum secure in that knowledge.Best of luck for the future.GoodbyeColin
Time for an experimental verification. If you honestly believe what you are saying, put your money where your mouth is, and make a fortune playing games of pure chance - like the national lottery. Don't come back with tales of great winnings at poker because that involves the unquantifiable skill of the other players, but show us that you can consistently beat the odds in roulette or a one-arm bandit. Or just throwing dice.