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We obviously have a bunch of mathematicians in our midst, so can you help?
Peter and Quentin have a pub quiz book and, every so often, they meet up and quiz each other. There are 1000 questions in the book, and they decide that they should randomly pick the question that is asked (the book is split into different difficulty ratings and subjects, so they don't want to be able to choose which questions to have from knowledge of how the book is arranged).
So they get a pack of cards and get Ace to 10 of each suit in three separate piles (they discard the fourth suit). To pick a number, they pull a card from one of the piles which represents the unit, from another pile to represent the tens and from another pile to represent the hundreds. (The Ace is 1, the numbers 2-9 are 2-9, and 10 is zero.) They pick the digits in reverse order so as to keep in suspense which part of the book the quesition is from.
Thus, each question number has an equal chance of coming up - from 1 (when 0,0,1 are chosen) to 999 (where 9,9,9 are chosen) and 1000 (which is taken as 0,0,0).
However, as time goes on, they realise that the same numbers are coming up again and, frankly, the book is far too difficult and they're embarrassed at their apparent ignorance.
So they buy another book. Thing is, this book has 1500 questions rather that 1000.
So what they do is carry on with the three piles of cards A-10, and introduce a fourth pile containing just an Ace and a 10 of the fourth suit which before had been discarded.
Again they pick the units first, then the tens and then the hundreds. But if the three digit number produced is between 0,0,1 and 5,0,0, they pick one of the two in the fourth pile. (If 0,0,0 comes out this is taken as 1000; all other combinations are as they read.)
The question is – is there still an absolute equal chance of all the numbers having an equal chance of coming out?
Peter and Quentin have a pub quiz book and, every so often, they meet up and quiz each other. There are 1000 questions in the book, and they decide that they should randomly pick the question that is asked (the book is split into different difficulty ratings and subjects, so they don't want to be able to choose which questions to have from knowledge of how the book is arranged).
So they get a pack of cards and get Ace to 10 of each suit in three separate piles (they discard the fourth suit). To pick a number, they pull a card from one of the piles which represents the unit, from another pile to represent the tens and from another pile to represent the hundreds. (The Ace is 1, the numbers 2-9 are 2-9, and 10 is zero.) They pick the digits in reverse order so as to keep in suspense which part of the book the quesition is from.
Thus, each question number has an equal chance of coming up - from 1 (when 0,0,1 are chosen) to 999 (where 9,9,9 are chosen) and 1000 (which is taken as 0,0,0).
However, as time goes on, they realise that the same numbers are coming up again and, frankly, the book is far too difficult and they're embarrassed at their apparent ignorance.
So they buy another book. Thing is, this book has 1500 questions rather that 1000.
So what they do is carry on with the three piles of cards A-10, and introduce a fourth pile containing just an Ace and a 10 of the fourth suit which before had been discarded.
Again they pick the units first, then the tens and then the hundreds. But if the three digit number produced is between 0,0,1 and 5,0,0, they pick one of the two in the fourth pile. (If 0,0,0 comes out this is taken as 1000; all other combinations are as they read.)
The question is – is there still an absolute equal chance of all the numbers having an equal chance of coming out?
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