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I am starting this thread as an offshoot of the US Presidential thread where a discussion of money and lottery wins was initiated.
First, to reiterate the argument against gambling. When two people gamble where there is no house rake, the money total after a win is less than the amount the two started with. How is that possible? For the answer, we turn to economics - the law of marginal utility.
If you and I each have $1,000 to our name, and one of us loses it all to the other, the utility of the $1,000 won is far less than what was lost by the loser.
Thus if I lost my last $1,000, I have no money left to pay rent, buy food and pay bills (for which I may now be penalized - a fraction of the amount owing may be added to next months bill. I may now be willing to borrow a $1,000 from a loan shark and have to repay say $1,200 next month. Therefore when I lost $1,000, my cost was in fact $1,200.
Meanwhile the winner of my $1,000 has the extra money which is not as valuable as his initial $1,000.
Now let's look at the lotteries. Some months ago I sent an email to Lotto Ontario suggesting that instead of drawing one winning ticket for $50 million, they draw 100 tickets and invite those 100 to a finalist draw at the Royal York hotel for dinner after which the 100 tickets are placed in a bowl and the grand winner drawn for the $50 million. As for the other 99, "Thank You for playing Lottario, and better luck next time!"
However! Before the final Grand draw, each of the 100 ticket holders is offered $490,000 cash for their ticket. And in the event that one person holds out and says "No, I want a chance to win the $50 Mil. Well no problem, the hold-out ticket is placed in a bowl with 99 blanks and the hold-out still has the same chance at the Grand Prize, ie 1/100.
The argument for the above scenario is that far more social good would be achieved when 100 people walk away with $490,000 than in the case where one person wins $50 million. In other words, 100 happy people walk away with enough to pay off their mortgage, pay all their debts, pay the tuition to send the kids to college, etc. - that is instead of one person having
$50 Mil they won't know what to do with and who will be hounded by friends and relatives for a piece of the pie.
Finally, the Lottery people save $1 million as they only pay out $49 M (assuming there is no hold-out). And there is no loss to the Lottery with publicity and interest, as the final dinner and Grand Draw can be televised for even more publicity.
First, to reiterate the argument against gambling. When two people gamble where there is no house rake, the money total after a win is less than the amount the two started with. How is that possible? For the answer, we turn to economics - the law of marginal utility.
If you and I each have $1,000 to our name, and one of us loses it all to the other, the utility of the $1,000 won is far less than what was lost by the loser.
Thus if I lost my last $1,000, I have no money left to pay rent, buy food and pay bills (for which I may now be penalized - a fraction of the amount owing may be added to next months bill. I may now be willing to borrow a $1,000 from a loan shark and have to repay say $1,200 next month. Therefore when I lost $1,000, my cost was in fact $1,200.
Meanwhile the winner of my $1,000 has the extra money which is not as valuable as his initial $1,000.
Now let's look at the lotteries. Some months ago I sent an email to Lotto Ontario suggesting that instead of drawing one winning ticket for $50 million, they draw 100 tickets and invite those 100 to a finalist draw at the Royal York hotel for dinner after which the 100 tickets are placed in a bowl and the grand winner drawn for the $50 million. As for the other 99, "Thank You for playing Lottario, and better luck next time!"
However! Before the final Grand draw, each of the 100 ticket holders is offered $490,000 cash for their ticket. And in the event that one person holds out and says "No, I want a chance to win the $50 Mil. Well no problem, the hold-out ticket is placed in a bowl with 99 blanks and the hold-out still has the same chance at the Grand Prize, ie 1/100.
The argument for the above scenario is that far more social good would be achieved when 100 people walk away with $490,000 than in the case where one person wins $50 million. In other words, 100 happy people walk away with enough to pay off their mortgage, pay all their debts, pay the tuition to send the kids to college, etc. - that is instead of one person having
$50 Mil they won't know what to do with and who will be hounded by friends and relatives for a piece of the pie.
Finally, the Lottery people save $1 million as they only pay out $49 M (assuming there is no hold-out). And there is no loss to the Lottery with publicity and interest, as the final dinner and Grand Draw can be televised for even more publicity.
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