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Codo, on 2012-September-26, 04:28, said:
I red more that once that the danger of losing the match was the reason to pull.
So lets look at the numbers:
Lets assume that they always double 6 ♥ and will never bid 6♠. If you want to calculate other cases too, do it.
If we make 6 ♥ and they make 5 ♠, we will lose 18 imps by passing 5 ♠ and 20 if we pass 5 ♠ XX.
If we make 6♥ and they fail in 5♠, we will lose 15 imps by passing 5 ♠ and 13 if we pass 5 ♠ XX
If we fail by one trick and they make, pasing will lose 11 imps w/o and 15 imps with the XX.
If we fail by two tricks and they make,passing lose lose 8 imps w/o and 14 imps with the XX.
If we make 6 ♥ and they fail to make 5 ♠,passing will lose 15 imps at 5 ♠, 13 imps while passing 5 ♠XX.
If we fail one trick and they do to, passing will win 5 imps without the redouble and 11 imps with it.
If we fail two tricks and they one, passing will win 9 imps without the XX but 12 with it.
So to bid 6 ♥ over 5 ♠ has a variance between +18 and -9 imps. If we face the same descission after the XX, the possible outcomes are between + 20 and -12 imps. No big deal. And this is true for any given scenario. The descission to bid 6 ♥ is crutial, but it had been crutial before the XX, imp wise the XX did not changed a lot.
East already passed 5 ♠ for a reason. He belived that defending 5 ♠ is the winning strategy. Most of us don't share this view. But as East made the descission to pass 5 ♠, he already took the risk to lose the match. If his descission was wrong, he had lost, it is as simple as that. His descission was very important when he had a descission to make over 5 ♠. Now the descission is just a little more important. The difference in total imps is very small- if you lose 32 or 29 imps because of a wrong descission does not make a big difference at all.
So you may say, that these are the wrong numbers to compute, you need to decide between -650 and -1200. (11 imps) No sorry, you don't. You need to compare the result of your descission with the one at the other table. So whatever will happen there- whether it is right to sacrifice or not- must be compared with or without the XX. And the XX makes at most a difference of 6 imps.
So, for someone for whom a pass of 5 ♠ was not just an LA but the correct bid, the XX simply does not change his imps expectations so much.
But if I am right with this numbers, the "I may lose the match if I pass" argument is simply wrong- at least not convincing enough to disregard pass as a LA.
So lets look at the numbers:
Lets assume that they always double 6 ♥ and will never bid 6♠. If you want to calculate other cases too, do it.
If we make 6 ♥ and they make 5 ♠, we will lose 18 imps by passing 5 ♠ and 20 if we pass 5 ♠ XX.
If we make 6♥ and they fail in 5♠, we will lose 15 imps by passing 5 ♠ and 13 if we pass 5 ♠ XX
If we fail by one trick and they make, pasing will lose 11 imps w/o and 15 imps with the XX.
If we fail by two tricks and they make,passing lose lose 8 imps w/o and 14 imps with the XX.
If we make 6 ♥ and they fail to make 5 ♠,passing will lose 15 imps at 5 ♠, 13 imps while passing 5 ♠XX.
If we fail one trick and they do to, passing will win 5 imps without the redouble and 11 imps with it.
If we fail two tricks and they one, passing will win 9 imps without the XX but 12 with it.
So to bid 6 ♥ over 5 ♠ has a variance between +18 and -9 imps. If we face the same descission after the XX, the possible outcomes are between + 20 and -12 imps. No big deal. And this is true for any given scenario. The descission to bid 6 ♥ is crutial, but it had been crutial before the XX, imp wise the XX did not changed a lot.
East already passed 5 ♠ for a reason. He belived that defending 5 ♠ is the winning strategy. Most of us don't share this view. But as East made the descission to pass 5 ♠, he already took the risk to lose the match. If his descission was wrong, he had lost, it is as simple as that. His descission was very important when he had a descission to make over 5 ♠. Now the descission is just a little more important. The difference in total imps is very small- if you lose 32 or 29 imps because of a wrong descission does not make a big difference at all.
So you may say, that these are the wrong numbers to compute, you need to decide between -650 and -1200. (11 imps) No sorry, you don't. You need to compare the result of your descission with the one at the other table. So whatever will happen there- whether it is right to sacrifice or not- must be compared with or without the XX. And the XX makes at most a difference of 6 imps.
So, for someone for whom a pass of 5 ♠ was not just an LA but the correct bid, the XX simply does not change his imps expectations so much.
But if I am right with this numbers, the "I may lose the match if I pass" argument is simply wrong- at least not convincing enough to disregard pass as a LA.
This looks like a very detailed analysis, but you seem to have missed a more simple argument.
When one team is 20 IMPs up, a flat board is fine. If West believed (however misguided that belief may be) that the contract in the other room might well be 4♠ or 5♠ undoubled, then defending 5♠ undoubled in her room is ideal, assuming that the same number of tricks will be made in each room.
Apparently West told the TD that she would have passed 5♠x if it had not been redoubled (although it's not clear whether she was making this statement in the context of the UI- did she think that passing 5♠x was the correct call, or merely that it was a logical alternative she'd be forced to select after the slow double? Perhaps she reasoned that whilst conceding 5♠x is not ideal, it could still be a flat board or only -5 IMPs if 5♠ undoubled is declared in the other room.
However, once 5♠ is redoubled, she knows that the contract in the other room is highly unlikely to be the same and there is virtually certain to be a significant swing. She has an obvious way to reduce this volatility by bidding 6♥.
lamford said:
I also find that the vast majority of people that I give the hand to would pull, maybe 12 out of 13 so far. But they would have all bid on the previous round. The problem is that I need to find people that would a) open 1H, b) pass over 5S and c) pass over a double of 5S (without a redouble). They seem as scarce as hen's teeth, but included my team-mate who conceded -850 and would have pulled a redouble!
I agree. I'm sure that the TD would have polled people with this bidding style if he'd thought he could have easily found some.
