IV. E X A M P L E S A N D C O N U N D R U M S In all the examples below, the tableau will be given here in the text as best as can be done within the limits of the character set. For those who want to see the positions more graphically via the program, each example also starts with a line of apparent garbage that, if selected, can be read using the [File: Resume from Selection] command to display the position. (The line is quite long and may wrap around onto more than one line when you display it; you have to select it all to restore the position.) Some of these examples are extremely complex. Novice players may wish to step through just the first example, to get an idea of how to play, and save the other examples for later. The final example is a deck that is especially easy to win with (unless you're trying to win with all eight suits still in the tableau), so you might try that one to boost your confidence if you're having a lot of trouble getting anywhere. =========================================================================== J6m\ZM^3>gU82j]`LGMFl8o0WeDimHa;d^1QcHGKQdQAZ6l;oK/QmbbBhNhiMiWe=FOHD >Kg74/^ YoT[/6 HCcF/P \MNXm/Q EK25/k 9^0M/c KF0@W/N \JHY/: 9GLR/L \W8hH/2. Here, to start you off, is an example of the beginning of a game. We'll step through it and look at the rationale behind the recommended moves. Here's the initial tableau: -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- 10d As -- 3h 9s -- Jh Qh -- 6d 4s 3c 7c The two primary rules of thumb to bear in mind throughout the game, and particularly at the start, are (1) try to get a space, and (2) keep your options open. The first rule should be fairly clear; the second leads to a few common strategic decisions. First, given the choice, make a "natural" move instead of an "unnatural" one, where a natural move is one that brings together two cards of the same suit. This keeps our options open by allowing us to move the newly combined cards as a unit should we turn up an appropriate card. Second, given the choice, move a card (or pile) that has more than one place it can go. This keeps our options open by allowing us to move it to the other place if for some reason we want to dig into the pile sitting in the first location. Third, work from the top down. Thus we move a 9 onto a 10 before moving an 8 onto the 9 (unless the latter move is natural while the former is not), since once we move an unnatural 8 onto the 9 we won't be able to move the 9. Now, with these ideas in mind, let's look at the play of the above tableau. Our highest-ranking move is Jack onto Queen, and it's also our only natural move, so it wins for sure. We move the Jh from column 8 to column 9, and in this particular game we chance to turn up a 6s in column 8. Now we have no natural moves. We could try for the space by moving the 6s to column 10, but that move isn't going to go away, so instead we go from the top down by moving the 10d from 2 to 9. This time we turn up a 4c. No hesitation about this one! We move the 3c from 7 to 2. (Note that we still have the 4s onto which we can, eventually, move the 3h, so we're not giving up our option of digging into pile 5. But even if we didn't have the other 4, making the natural move would be the better play.) In column 7 the card turned up is a 2c, which we promptly move to column 2, turning up a 10h. The tableau is now: -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- 4c -- -- -- -- 10h 6s -- -- -- 3c As -- 3h 9s Qh -- 6d 2c 4s Jh 7c 10d Having once again run out of natural moves, we revert to working from the top down, and move the 9s from 6 to 9. This also follows the rule of moving a pile that has more than one place to go; if we find ourselves interested in digging through column 9 we can move the 9s to column 7 instead. But for now, since column 7 looks like a more likely place to dig, we'll bury column 9 a bit more. In column 6 we turn up a Kc. Since we have no place to move the 10d from column 9, we are unable to get pile 9 moved onto the newly revealed King. Them's the breaks. Continuing from the top down, we decide it's time to move a 6 onto the 7c. Which 6 should we move? Neither is natural, but the one in column 8 looks like a better one to move since we're only 3 cards away from getting a space in that column. So we move the 6s from 8 to 10 and turn up a 6c. We're getting low on things to do now; we can move the 3h or the As. Going by the top-down rule, we move the 3h from 5 to 4, turning up a 2h, which we move onto the 3h (now in column 4). This time we turn up a 9d: -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- 9d -- -- 6c -- -- -- 4c -- -- Kc 10h -- -- -- 3c As -- Qh -- 6d 2c 4s Jh 7c 3h 10d 6s 2h 9s We could now move the 9d from 5 to 7, but instead we choose to move the As from column 3, since there are two places to put it. Column 4 is already unnatural, so we'll move it there. The card turned up is the other As. We could move this Ace onto the other deuce, but this would lose us our option of moving the first Ace there should we want to dig into column 4, so we'll let the top-down rule take precedence and move the 9d. But let's not be hasty! Instead of moving the 9d from 5 to 7, we'll move the 9s from 9 to 7 and then move the 9d from 5 to 9; this puts the 9d with a 10d, which it can't hurt to do. This time we turn up a Qh. Since we're so close to a space now, we keep going by moving the Qh from 5 to 6, turning up a 10d: -- -- -- -- 10d -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- 6c -- -- -- 4c As -- Kc 10h -- -- -- 3c -- Qh 9s Qh -- 6d 2c 4s Jh 7c 3h 10d 6s 2h 9d As Only one move left to try: we move the As from 3 to 2, turning up a 7h. Once again, we shuffle things around a bit so keep as many piles natural as possible; we move the 6s from 10 to 3 and the 6c from 8 to 10, turning up a 5d. We move the 5d from 8 to 1 (natural) and turn up a 3s: -- -- -- -- 10d -- -- 3s -- -- -- -- -- -- -- -- -- -- -- -- 7h -- -- -- -- -- -- 4c 6s -- Kc 10h -- -- -- 3c -- Qh 9s Qh -- 6d 2c 4s Jh 7c 5d As 3h 10d 6c 2h 9d As We have no more moves (aside from useless maneuvers such as moving the 9d from 9 to 5), so it's now time to deal a new round. We never did get a space, but we got two piles down to a single card each, so we are quite likely to get a space soon after the new deal. This game is going somewhat better than average and will very likely be won with proper play. If you actually do get a space in the first round, you're doing particularly well. =========================================================================== 1;]mcD96:2o6j1J7Fj>N/\j?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?P O DLV/7V[ N=^cfil 8_/R<3d9NC4I^SDY?F\bfKl16[ k;]>Hhn ak\k/Z\2O[<@FkLPWZ[;>CdINS 9A C L75/1;\aFJo. Now, for your first "Spider problem", here is a relatively simple position. In the tableau shown below, what should you do? First off, what are your options? On what should you base your choice? (After the tableau is the "solution", so don't read further until you're ready!) 10h (sp) -- Ad -- Qc -- 3s Qh -- -- 7d -- Jh -- 2s -- -- 6d Kh 10d -- -- 8s 5d Qc 6c -- 7d 7s Qs Jc 4c Qd 6d 6s Js 10c 3d Jd 5d 10d 9c 2d 10h 4d 8c Js 3d 7c 10s 2c 6c 9s As 5c 8h 4c 7h 3c 6h 2c 5h Ac 4s Qd 3h 10c 10s 9c 8c 8s 7h 7s 6h 6s 5h 5s 4h 4s 3h 3s 2h 2s Ah Solution: First, the options. There's no way to get through column 5 or 7 to turn up a new 5card. (This should be pretty obvious; we'll save detailed analyses of this sort of thing for cases where it's not as clear.) Nor does it do us any good to dig into column 4 or 6. We don't have any complete suits showing, so there's no way we can try to put one together. That leaves three fairly simple options: (1) we could move the 8-6s from column 3 into the space, turning up a new card, (2) we could dig through column 10 (moving the Ace onto a deuce, the 2c into the space, 5-3d onto the 6s in column 3, 2c out of the space and back onto the 5-3d, and finally the 7-6d into the space) and turn up a new card there, or (3) we could fill in the space and deal a new round. It's usually a good idea to turn up more cards when possible rather than bury everything under a new deal, so we'll discount the third option. That leaves us with the choice of which column to dig through, 3 or 10. The two are equally close to becoming new spaces (three face-down cards each), so that's not a consideration here. Let's consider what the face-down card might be that will be revealed. If it's a Jack, 4, or King, we can get back the space (which we'll have lost in the process of getting to the new card). If it's a 9 or 8, we MIGHT get the space back right away; it depends on whether we moved the 8 (from column 3) or the 7 (from column 10) into the space. Looking at the tableau, we see there are five 8's visible, but only three 9's. Thus it's more likely we'll turn up a 9, so we should go for column 3. (Sorry for all this gory detail, but this is after all intended as an introductory example.) So it looks like the best thing to do is move the 8-6s from column 3 into the space. But wait! Suppose the card turned up isn't a Jack, 4, King, or 9, and furthermore isn't an Ace or 5 (which we would be able to move elsewhere immediately)? Is there anything we can do ahead of time to hedge our bets? Yes! We can move the spade Ace from column 10 to column 5, then use the space to swap the deuces in columns 6 and 10 (move one deuce into the space, move the other deuce to the other column, and move the first deuce out of the space). Now column 10 contains just the 7 through deuce of diamonds, and if we chance to turn up an 8 in column 3 we can move the 7-2d onto it. Note that we have to do this BEFORE we move the 8-6s into the space, since we need the space to swap the deuces. In fact, in the game where this particular tableau arose, the card turned up in column 3 was the diamond 8. The preparations made in column 10 eventually produced not one but TWO spaces! (Play it out using the program and see for yourself.) =========================================================================== ?jT\Ne61gU/3`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?P LF^Q/lLQ7[]`8Qe^_ B\^CO9M@4I] Q=Lh/C;aS2o D0/b6;[MEXM. Turn up another face-down card WITHOUT dealing more cards or "using up" the space. (You may, of course, use the space, so long as you are sure you can get it back no matter what the card turned up turns out to be.) Note that there are enough clubs and hearts showing to form complete sets of those suits. Here's the tableau (again, the solution follows the tableau): -- -- (sp) -- Qh -- -- -- -- -- -- -- Ks Jh -- Jc -- -- -- -- -- 2s 7h -- 8h -- -- Kh -- -- As As 7h Kc -- Qc Jc Kd 9h 9h Qc Kc Jh 10h 9d 8d 8s Jd 7s Js 9c 8d 7c 5s 6s 3d 8s 7d 6c 4h Qh 2c 7d 3h 5c 3c Js Ad 6h 2h 4h 2c 8c 8h 5d Ah 3s Ac 3d 2d 2s 10s 2d 5c 9s Ah 6d 8c 9s 5h 7s 10c 6s 5s 4c Solution: First, we ascertain that we can't get a second space. The only place where we might be able to do so is column 5, and to move the Q-Jh we need to find a King that doesn't already have a Queen on it. (We'll call this a "free King", for short.) There are three free Kings, but the one in column 9 is useless since we need another free King to get to it, and those in columns 2 and 4 are inaccessible since there are no free 3's. Hence, whatever we do, we have to do it using only the one space. Next, can we remove a complete set of clubs or hearts? Well, hearts are out, because the only Kh showing is in column 10, and the only 10h is in column 1, and getting to each of them requires that we move a 3 onto a free 4. Since there's only one free 4 (in column 8), we lose. How about clubs? They don't work out, either, but the proof is trickier. The only 9c is in column 1 and getting to it will require our sole free 4. Thus we can't use the Qc in column 10, and must instead use the Qc from column 8. To reach it we need a free 6; we have exactly one free 6, namely in column 9. We CAN get to this 6, without losing the space, by a fairly convoluted sequence of moves. You may want to figure out how it can be done before reading on. . . . Ready? Okay, proceed as follows: 7h from 5 to 10, 10c from 1 to 5, 8c from 9 to 1, Js from 9 to 3 (into the space), 10c from 5 to 3, Jh from 5 to 9, 10c from 3 to 9, Js from 3 to 5, 10c from 9 to 5, Q-Jh from 9 to 3, 7-6s from 9 to 4, and finally Q-Jh from 3 to 9, getting the space back. Having determined that we can, if desired, obtain a free 6, let's get back to the question of the clubs. The only 7c is in column 6, and getting to it requires a free 6. But we need the free 6 to get to the Qc as well. So we again lose. We are thus reduced to uncovering a card without removing any suits and without getting any more spaces. Which column is it to be? It obviously can't be a column containing a King, since (given that we can't remove any completed suits) the only place a King can go is into the space. And it can't be column 1 or 7, since that would require a free Queen, and there isn't any. So it must be column 6. We can get through that column by first digging through to the free 6 as described earlier, and then playing: 5h from 6 to 4, 6d from 6 to 10, 5c from 6 to 10, 3-2s from 6 to 3, 4h from 6 to 4, 3-2s from 3 to 4, 7-5c from 6 to 1. The tableau now looks like this: -- -- (sp) -- Qh -- -- -- -- -- -- -- Ks Js -- Jc -- -- -- -- -- 2s 10c -- 8h -- -- Kh -- -- As As 7h Kc -- Qc Jc Kd 9h 9h Qc Kc Jh 10h 9d 8d 8s Jd Qh Js 9c 8d 7s 5s Jh 3d 8s 7d 6s 4h 2c 7d 3h 5h 3c Ad 6h 2h 4h 2c 8h 5d Ah 3s Ac 7h 3d 2d 2s 10s 6d 2d 9s 5c Ah 8c 9s 7s 8c 6s 7c 5s 6c 4c 5c Once again, it's time to make contingency plans. If we just move the 9h-8s onto the 10c and the As onto the 2s, we could be in trouble if we turn up a King. The lone space won't be sufficient for us to be able to move the stuff out of column 5 onto the King. So we undo some of what we did in the course of getting the free 6: Jh from 9 to 3, 10c from 5 to 3, Js from 5 to 9, 10c from 3 to 9, Jh from 3 to 5. While we're at it, it can't hurt to move the 4c from 8 to 1, and in a moment we'll match the 8s with a 9s, too. We now proceed: 8s from 6 to 3, 9h from 6 to 9, 8-5c from 1 to 9, 8s from 3 to 1, and finally As from 6 to 4. (Once again, preparation pays off; in the game where this took place, the card turned up was indeed a King.) =========================================================================== ?jT\Ne61gU/3`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?P LF^Q/lLR4Y^cDjm3 XCkS/QENCCAV`O 3 ]:na6K<1F[LAV =Dil1W9>CgJN b P 4:[/eQW8\afKl16 @J/8\QA7o279 C. Again, complete sets of clubs and hearts are available. Without dealing any more cards or turning up any face-down cards, remove a set of clubs AND a set of hearts (not necessarily in that order). Can you remove them in the other order? -- -- 8c Ks Kh 5c Kc -- (sp) -- -- -- Qh Qh -- -- -- -- Jc Jh -- Kh -- -- 10c 10c Kc Qc Jc Kd 9c 9h Qc Jh 10h 9d 8c 8d Jd Js 9s 8d 7c 7d 10h 3d 8s 7d 6c 6d 9h 2c 7s 3h 5c 5d 8h Ad 6s 2h 4c 4h 7h 8h 5s Ah 3c 3d 6h 7h 4s 2d 2c 2d 5h 3c Ah Ac 4h 2s 3h As Solution: The clubs look like the better bet, since the Jack through Ace are already assembled and there's a King-Queen in column 8. Let's see what can be done. Since there are no free 9's or 6's, we have to remove the first completed suit without the benefit of any additional spaces. Since we are also short on free 4's, this means we can't use the Qc in column 10. That seems okay; the one in column 8 looks easier to get to anyhow. All we have to do is move the Jd somewhere (along with the 10-3h). There are no free Queens, so the Jack will have to move into the space (or some other Jack must move into the space to free up a Queen). But we can't move the Jd anywhere while the hearts are there, and the only free Jack is in column 10 where we can't get at it. We could move the 10-3h into the space, but then what do we do with the Jack? Looks like the clubs aren't going to work after all. Let's try the hearts. It looks like we'll have the same problem, since we have to move the 10c from column 5 somewhere else to clear off the K-Jh. The only place we can move the 10c is the space, and to do that we have to do something about the 9h attached to the 10c. Since we don't have any free 10's, what can we do? The idea is to use the space to swap things around such that the sequences of a single suit are where we need them most. We do it as follows: First we get the 4h out of the way by moving 3-2d from 5 to 9, 4h from 5 to 6, and 3-2d from 9 to 6. Then we move 8-5d from 5 to 9, 8-3h from 8 to 5, 8-5d from 9 to 8, 9-3h from 5 to 9, 9-Ac from 4 to 5, 9-3h from 9 to 4, 8-5d from 8 to 9, 8-3h from 4 to 8, 8-5d from 9 to 4 (we certainly have made a mess of all those nice clubs in column 4, haven't we?), 10-Ac from 5 to 9, 10-3h from 8 to 5, 10-Ac from 9 to 8. Now we can move the Ah from 2 to 6, 2d from 2 to 9, and 2-Ah from 2 to 5 to complete the hearts. The 2d comes out of the space and back to column 2, and removing the hearts gives us a second space. With two spaces we have no trouble straightening the clubs back out and completing a set. Note that, rather than removing the completed set of clubs from column 8, we should pile a Q-Ac into column 7 and remove the suit from there. We can always move the Kc from column 8 into the newly created space in column 7 if we wish, but by getting the space we keep our options open. Note also that, had there been a 10d around, we might have been able to pull the same trick with the Jd in column 8 as we did with the 10c in column 5; since there wasn't, though, we had to go after the hearts first. =========================================================================== C576XV@Ra`MgY>9XFSnF/^j?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?Pe:O`5J_0EZo@Uj?P 3>0f9NC7I^ H=Zn HUUgKl1YC4I^SDYR PFeM2 B1D[ C:^>LPV;] MAK\1F[lAVk\QBCTSZ`23d9N@7I^SGYN 1Ti>Sd9Mc4IZ NM ZnhZM =1f9NFCfhOcV;\] UH8. 3^SD>\QBCTSZ`23d9N@7I^SGYN 1Ti>Sd9Mc4IZ NM ZnhZM =1f9NFCfhOcV;\] UH8. Can a set of spades be removed WITHOUT first getting a space or dealing any more cards? If so, how? If not, prove it! Would it make any difference if the Js in column 7 were swapped with the Jd in column 9? (The second "garbage" line above is for this modified tableau.) Finally, given that it can be done, remove a set of hearts (as usual, without dealing any more cards). What is the minimum number of other suits that must be removed in order to do so? Does the order of the two face-down cards matter? Kd Jc 9h 9c Qh 9d Qc Ks -- Qs Qd 10c 10s 8c Jc Qh Kc Js -- Kc Jd 9c 5s 10h Jh Qs 2d Jd 3c 10d 8c 7d 9h Ad Js Ac 7d 9d 7c Kd 8h 10d 7h 6h 8d 6c 6s 9s 5c 7h 5c 5s 8s 4h 6d 4s 4s 7s 3h 5d 3s 3s 6s 2d 4d 2s 2c Qd Ah 3d As 6h 4c 2h As 5d 3c Ah 4d 2c 8h 9s Ac 7c Solution: This is a complicated one, so take a deep breath! (If you didn't find it complicated, then perhaps you weren't thorough in your analysis. Unless you (a) decided the spades could not be removed without getting a space, (b) realised that swapping the Jacks affects this, and (c) considered the 9d in column 1 at some point in your proof, your analysis is incomplete.) First let's consider the problem of putting together a set of spades. We begin by finding all the pieces. The only Ks is in column 8; the only Qs we can possibly get to without a space is in column 7. (Actually, we shouldn't be too hasty; if we could remove a set of clubs without getting a space, we could reach the Qs in column 10. But in moving the Qs we'd create a space, whether we needed it or not; and besides, the only Qc is in column 7 with the other Kc in the way.) In digging to the Ks and Qs we'll reach both Jacks, so they shouldn't be a problem. The 10s is in column 3, and the remaining spades are at various depths in columns 2, 5, and 7. Can we pull all these cards together? To get to the Ks we need a free 8, a free 3, and a free Queen (even though we may end up using the Js from column 8, we need some place to put it in order to get to the King). The 8 in column 4 is inaccessible unless we can remove a set of diamonds, which in turn is impossible without a space since the 7d in column 4 is inaccessible and likewise for the 7d in column 9 due to the absence of free 5's. But we have a free 8 in column 1 and another in column 5 (if we can reach it), so there's no problem with that. We also have exactly one free 3, and one free Queen. So far so good. Can we reach the Qs in column 7? That requires a free King, which is no problem. It also requires someplace to move the 9-6s and the 10d. This should pose no problem either. Note that, though we need a free 10 and a free Jack for this, we don't "use up" those free cards by moving the 9-6s and 10d, since we uncover another 10 and Jack to become new free cards. However, notice that we're eventually going to have to reach the 5s in column 5, and this will use up the free 10. So we have to dig through column 7 before that. In fact, we have to move the 10d out of column 7 before moving the 9s out of column 5, because once we move the latter we'll have 9's on all the 10's, and the 10d won't be movable. Or will it? If we could put a 9d onto the 10d (freeing up a different 10), we could move the 9s onto the newly freed 10 and still be able to move the 10d. Let's assume for the moment that this is impossible (we'll prove it later, but don't want to digress too far here). To repeat, then, we need to move the 10d out of column 7 before moving the 9s out of column 5. Where does the 10d go? The free Jack in column 9 is inaccessible without a free 5, and the other free Jacks (in columns 6 and 8) each require a free deuce (even though the Jack in column 8 doesn't require us to use up the deuce permanently). The only free deuce is in column 5, and we can't get to it without moving the 9s. So we're stuck! Now let's follow out that digression and make sure we can't get a 9d onto the 10d. We certainly can't use the 9d in column 6, since that would create a space, which is verboten. In order to reach the 9d in column 1, we'd have to move the 8h. If we put it onto the 9s in column 5, we would then be unable to move that 9s later on (we have only one free 9 available; as we'll see later, we can't get to the one in column 3 without moving the 9s from column 5). If we moved the 8-6s from column 7 onto the 9s in column 5, and then moved the 8h onto the newly freed 9s, we wouldn't be able to move THAT 9s later, so we either wouldn't be able to reach the Qs (if we had left the 9s in column 7 when we put the 8h on it) or else we'd be unable to reach the 10s (if we had moved the 9s there first). So, although we might be able to get the 9d from column 1 onto the 10d in column 7, by the time we did so we'd have made a hopeless mess out of the spades. The conclusion from all this is that it's impossible to remove a set of spades without first getting a space. Now, what if the Jacks were swapped as described? In that case, we wouldn't need a free Jack on which to park the 10d; we could move the J-10d as a unit. So the plan is to move the Qd out of column 7, followed by the 9-6s and J-10d. Then we can use up the free 10 by moving the 9s out of column 5 and finish bringing together the spades. The complete sequence is: Qd from 7 to 4, 9-6s from 7 to 3, J-10d from 7 to 4, 9s from 5 to 4, 5-4d from 5 to 3, 7h from 8 to 1, 6h from 5 to 1, 5-4d from 3 to 1, 2c from 5 to 10, 5-3s from 5 to 3, Ac from 8 to 10, and now we have to be careful not to move the 2d from column 8 onto the spades in column 3, so instead we move 3s from 3 to 1, 2d from 8 to 1, Js from 8 to 7, Q-Js from 7 to 8, 10-4s from 3 to 8, As from 2 to 1, and 3-As from 2 to 8. Voila! That was for warm-up; what about removing the set of hearts? The first step is easy: we look around to see where all the hearts are and find that the King and 5 are missing. Hence these must be the two face-down cards. It remains to be seen whether their order is significant. In the course of discussing the spades, we observed that we cannot remove a set of diamonds or clubs without first getting a space, and we also proved the same thing for the spades. Since we can't get past the 4c in column 9 without a space, it looks like our first order of business is getting one. Columns 1, 4, 7, 8, 9, and 10 are out, for obvious reasons. Column 3 looks like the best bet, but in order to move the 10s we need a free Jack, and that in turn requires a free deuce, and THAT requires that we move the 9s from column 5 onto the 10s. Thus, by the time we manage to move the 10s, we'll no longer have a free 10 on which to put the 9h to get the space. Column 6 is similarly hopeless; in order to move the Ad we need to use up the free 10. Column 2 is out of the question since there's no place to put the 4-As. That leaves column 5. To get through column 5 we need to use up a 10, two 7's, and a King, and we also need temporary use of a 6, 3, Jack, and Queen. Getting the Jack will be no trouble once we've gotten to the 2c, and getting the 6 just needs another free King, which we can get from either column 8 or column 10. Let's use the one in column 10; the only thing we have to watch out for is that if we wait too long to uncover that King (in particular, if we wait until we need it to put the Qh on to clear the space), we may find the 3c is immovable due to our having moved stuff onto it in the meanwhile. So we have to move the 3c onto the 4d at some early opportunity. Here we go: 9s from 5 to 3, Qd from 7 to 4, 5-4d from 5 to 7, 6h from 5 to 8, 2c from 5 to 10, 6-3s from 5 to 9, 3-2c from 10 to 7, Ad from 6 to 7, 10-8h from 5 to 6, Jc from 5 to 4, and finally Qh from 5 to 10. The tableau now looks like this: Kd Jc 9h 9c (sp) 9d Qc Ks -- Qs Qd 10c 10s 8c Qh Kc Js -- Kc Jd 9c 9s 5s Jh Qs 2d Jd Qh 10d 8c 7d 10h Js Ac 7d 9d 7c Kd 9h 10d 7h 6h 8d 6c Qd 8h 9s 6h 5c 7h 5c Jc 8s 4h 6d 4s 7s 3h 5d 3s 6s 2d 4d 2s 5d Ah 3d As 4d 4c 2h As 3c 3c Ah 2c 2c 8h Ad Ac 7c 6s 5s 4s 3s Where do we go from here? Well, we're trying to minimise the number of suits (other than hearts) removed, so let's see if we can get the hearts out right away. We would need to dig through column 9; to do that we would have to move the 4-Ac into the space (or onto a free 5; we'll come back to this), after which we would have no place to move the 4-3h. If we could get a free 5 without using up the space, we might fare better, but the only free 5 is in column 4, and to get to it we must put the Kd into the space (remember we're assuming we're not going to remove any other suits) and we have no free 10 with which to restore the space via column 4. Nor can we get any more spaces; all columns contain Kings or 9's or Aces, and there are no free 10's or deuces, so digging through any pile would cost us the space, and would get us at most one space in return. Thus we conclude that we must remove another suit before the hearts. Which suit is it to be? It can't be clubs. To reach the 10c (in column 2) we must move the first As into the space, since there are no free deuces anywhere. Having done so, we have no place to move the 4-As. (We have already noted that getting to the free 5 costs us the space.) On the other hand, we CAN remove either diamonds or spades. (If you thought you HAD to remove the diamonds, you might want to take a moment to study the above tableau and figure out how to remove the spades instead.) Let's look at the diamonds first. Most of them are already in column 1; all we need to dredge up are the 7, 2, and Ace. We'll ignore the diamonds in column 9 (we know we can't reach the 7d there, and the 2d is less accessible than that in column 8), and proceed thusly: 7-6h from 8 to 6, Ac from 8 to 5, Ad from 7 to 8, Ac from 5 to 7, 8h from 1 to 3, 2-Ah from 1 to 9, 2-Ad from 8 to 1, Jc from 4 to 10, K-Qd from 4 to 5, 6-Ad from 1 to 4, 7h from 1 to 3, and 7-Ad from 4 to 1. Removing the diamonds from column 1 would give us this position: (sp) Jc 9h 9c Kd 9d Qc Ks -- Qs 10c 10s 8c Qd Qh Kc Js -- Kc 9c 9s 5s Jh Qs Jd Qh 8c 8h 10h Js 7d Jc 7c 7h 9h 10d 6h 6c 8h 9s 5c 5c 7h 8s 4h 4s 6h 7s 3h 3s 6s 2d 2s 5d Ah As 4d 4c As 3c 3c 2c 2c Ac Ac 7c 6s 5s 4s 3s 2h Ah Now, before we pursue this any further, let's go back and see how we can remove the spades instead. If we try to do so in the straightforward manner, we run into trouble. Presumably we would uncover the Ks in column 8 by moving the 7-6h onto an 8 and the 2d-Ac onto a 3 (probably swapping the Ac/Ad as we did in the previous paragraph). We would then move the Js out of column 8 and bring in a pile of spades from columns 7 (Q-J, 8-6), 3 (10-9), and 9 (5-3), piling them all onto the King. But then we'd be unable to get to the 2s in column 2. (Once we moved the first As into the space, we'd be unable to swap the 2-As with the 2-Ad (or whatever) blocking off the 3s in column 8.) The way out of this bind is to wait until the last minute to move anything onto the 3s, such that when we do it's the 2-As, and thus we won't need the space afterward. Here's how we can do it: 7-6h from 8 to 6, Ac from 8 to 5, Ad from 7 to 8, Ac from 5 to 7, 3-Ac from 7 to 5, 5-4d from 7 to 6, 3-Ac from 5 to 6, 8-6s from 7 to 3, 9s from 7 to 5, 10d from 7 to 4, 9s from 5 to 4, 10-6s from 3 to 7, 5-3s from 9 to 7. Now we're ready to go: As from 2 to 5, 2-As from 2 to 7, 2-Ad from 8 to 2, Js from 8 to 10, and Q-As from 7 to 8. Removing the suit gives this tableau: Kd Jc 9h 9c As 9d Qc (sp) -- Qs Qd 10c 8c Qh Kc -- Kc Jd 9c 5s Jh Jd Qh 10d 8c 7d 10h 7d Js 9d 7c Kd 9h 6h 8d 6c Qd 8h 5c 7h 5c Jc 7h 4h 6d 4s 10d 6h 3h 5d 3s 9s 5d 2d 4d 2d 4d Ah 3d Ad 3c 4c 2h 2c 3c Ah Ac 2c 8h Ac 7c 6s Now, which of these two positions (resulting from removing either diamonds or spades) is better with regard to our ultimate goal -- the hearts? Well, in the tableau immediately above (with the spades removed), we still can't get through column 9 (same reasoning as before), nor can we get any more spaces (column 2 is the only chance, but we can't get through it). And since we can't get through column 2, we can't remove a set of clubs yet, so all we can do is remove a set of diamonds. If that's the case, we might as well have removed the diamonds first and then seen whether we could do without removing the spades! So we'll use the earlier tableau and proceed from there. Now we can dig through column 9 and turn up a new card, but we'll lose the space in the process, because we've got only one free 8 left. Furthermore, to get to that free 8 we must use up our only free 6, so no matter which heart gets turned up we won't be able to move it, nor can it possibly get us the space back. Furthermore, we still can't get any additional spaces (short of removing more suits) due to the lack of free 10's and deuces. Thus we can't get out a set of hearts yet, but we're getting closer! What next? We can now remove either spades or clubs. Either way we end up getting a new space. Removing the clubs has the advantage that it digs all the way to the 4-Ac in column 9, so let's try that approach. We'll start by dredging out the Qc: 3-Ac from 7 to 1, 5-4d from 7 to 6, 3-Ac from 1 to 6, 9-6s from 7 to 1, 10d from 7 to 10, 9-6s from 1 to 10, Js from 8 to 5, Q-Js from 7 to 8, Kc from 7 to 1, Qc from 7 to 1. Now we finish the job: As from 2 to 7, 4-As from 2 to 4, J-5c from 2 to 1, 2-Ah from 9 to 2, 6-3s from 9 to 3, 2-Ah from 2 to 3, 5-As from 4 to 10, 7c from 9 to 4, 4-Ac from 9 to 1. Removing the clubs from column 1 yields: (sp) (sp) 9h 9c Kd 9d As Ks -- Qs 10s 8c Qd Qh Qs -- Kc 9s 7c Js Jh Js Jd Qh 8h 10h 7d Jc 7h 9h 6h 10d 6s 8h 5c 9s 5s 7h 4h 8s 4s 6h 3h 7s 3s 5d 2d 6s 2h 4d Ah 5s Ah 3c 4s 2c 3s Ac 2s As Surely two spaces will suffice! Except that now we've used up the last of the free 8's, so both the 7d and the Jd will cost us spaces (we can move the Jd onto the Qs in column 10, but that too costs us a space). If the 5h turns up, we'll be stuck, but what if we get the Kh? Then, with a bit of judicious planning, we can move the Qs out of column 10 onto the Kh. (The planning involves putting a Js on the Qs so the Jd can go elsewhere.) But the lone space won't be enough to get the Kh off of column 9, once the Q-Js are placed with it. So we must plan even further and leave a Q-Jh to be picked up by the Kh. This is our only hope of getting the hearts out (without removing the spades), so let's see how it works out: 9-As from 10 to 1, 10d from 10 to 5, 9-As from 1 to 5, 3-Ac from 6 to 1, 5-4d from 6 to 2, 10-6h from 6 to 8, 3-Ac from 1 to 2, Jc from 10 to 1, Jh from 6 to 10, Jc from 1 to 6. Now we've got the Jh with the Qh that we can move. (We can't move the Qh in column 6 since that would cost us a space.) Continuing: 5-As from 5 to 8, 3-Ac from 2 to 1, 5-4d from 2 to 5, 3-Ac from 1 to 5, Ah from 9 to 1, 2d from 9 to 2, 2-Ah from 3 to 9, 2d from 2 to 3, Ah from 1 to 3, 4-Ah from 9 to 1, 5c from 9 to 2, 6h from 9 to 4, 5c from 2 to 4, 4-Ah from 1 to 4, Q-Jh from 10 to 1, Kc from 10 to 2, Qs from 10 to 2, 7d from 9 to 10, Jd from 9 to 2, and we assume the Kh is turned up. We move Q-Jh from 1 to 9 and reach the following position: (sp) Kc 9h 9c Kd 9d As Ks -- 7d Qs 10s 8c Qd Qh Qs Kh Jd 9s 7c Js Jc Js Qh 8h 6h 10d 10h Jh 7h 5c 9s 9h 6s 4h 8s 8h 5s 3h 7s 7h 4s 2h 6s 6h 3s Ah 5d 5s 2d 4d 4s Ah 3c 3s 2c 2s Ac As Unfortunately, despite our best preparations, we will be unable to combine the hearts once we move the K-Jh into the space and turn up the 5h. We could go back and try removing the spades instead of the clubs earlier, but it wouldn't help. We must remove both the spades AND the clubs (and the diamonds) before removing the hearts. We can't get the spades together starting with the above tableau -- we can't get through column 3 with only one space. So we'll back up to the previous tableau and proceed thusly: 2-Ah from 3 to 1, 6-3s from 3 to 4, 8-7h from 3 to 2, 10-9s from 3 to 8, 8-7h from 2 to 3, Ah from 9 to 2, 2d from 9 to 4, Ah from 2 to 4, 2-Ah from 1 to 9, 8-As from 10 to 8, and remove the spades. We now have this: (sp) (sp) 9h 9c Kd 9d As (sp) -- Qs 8h 8c Qd Qh -- Kc 7h 7c Js Jh Jd Qh 6s 10h 7d Jc 5s 9h 6h 10d 4s 8h 5c 9s 3s 7h 4h 2d 6h 3h Ah 5d 2h 4d Ah 3c 2c Ac With THREE spaces we should have no trouble! Then again, considering how careful we had to be to even come close using two spaces, perhaps we should be cautious! If we just start dumping things into spaces we may find we don't have enough spaces to move things around once we know what we want moved. So we'll start by gathering what hearts we have: 3-Ac from 6 to 1, 5-4d from 6 to 2, 6h from 6 to 3, 5-4d from 2 to 3, 3-Ac from 1 to 3, 4-Ah from 9 to 1, 5c from 9 to 2, 6h from 9 to 6, 5c from 2 to 6, 4-Ah from 1 to 6. Now, if we stuff the 7d and Jd from column 9 into a pair of spaces, and the 5h turns up, we can move 4-Ah from 6 to 9, 5c from 6 to 8, 5-Ah from 9 to 6, and Q-Ah from 6 onto the newly revealed Kh. But if the Kh is the first card turned up, we'll be in rough shape. So let's prepare for that contingency just as we did in our earlier attempt. We move 9s from 10 to 1, 10d from 10 to 5, 9s from 1 to 5, 4-Ah from 6 to 1, 5c from 6 to 2, J-6h from 6 to 8, Jc from 10 to 6, J-6h from 8 to 10, 10-6h from 10 to 6, 5c from 2 to 6, 4-Ah from 1 to 6, Q-Jh from 10 to 8, Kc from 10 to 1, Qs from 10 to 1, 7d from 9 to 10, and here we are: Kc (sp) 9h 9c Kd 9d As Qh -- 7d Qs 8h 8c Qd Qh Jh -- 7h 7c Js Jc Jd 6h 6s 10d 10h 5d 5s 9s 9h 4d 4s 8h 3c 3s 7h 2c 2d 6h Ac Ah 5c 4h 3h 2h Ah No matter which heart is revealed when we move the Jd from 9 to 1, we will be able to finish combining the hearts. =========================================================================== Ae[bFBe`0XjJA71dJjS2;b0Q9[YT01:>4HQoE;]7OIIXJIB432/DZcKfD>>CSO_H>Zgi[ed:5NPgamO?=mKT\gBR^c=Gd@O^@TM>]QdcD :gKni/^ f15K/8 LRb;/e 8f=HX/D UPH2/> J?B>/H Pa?n0/o ggKE/R oQfL/j ?`9Al/^. In case you're wondering what it takes to finish a game with all eight completed suits still sitting in the tableau, here's a deck (again, encountered in actual play) that makes it possible. The "solution" is left as an exercise. This deck can also be useful as a confidence boost for novices who are having trouble winning at all, since it is relatively easy to win from this position if you are willing to remove suits as you complete them. -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- -- 9s Kd -- 4s 8h -- Qd 7s -- 10d Jd Qh 9d =========================================================================== [Copyright (c) 1989, Donald R. Woods and Sun Microsystems, Inc.]