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About Developing Winners

It is incredibly hard to start learning bridge. You are instantly bombarded with too much to grasp: the laws, mechanics, bidding, card play, and more. Not surprisingly, the holy grail of teaching bridge has been to find ways of breaking down this bewildering array of information into smaller units that can be learned one bit at a time.

A significant breakthrough has been the introduction of mini bridge, which initially removed the complex art of bidding from the equation until the learner had come to terms with following suit, dummy, and elementary card play. However, even basic card play by itself requires a huge amount of skill.

The poor beginner was thrown in at the deep end: told to count winners, count losers, look for ways of developing winners that were not immediately cashable, consider communications, and much more. As the learner tried to faithfully put all this into practice, time ticked away and there was the danger that rigor mortis might set in for the other three players.

Card play needed to be broken down into more easily manageable chunks, and in my new series All You Need to Know About Card Play, I start by considering single suit combinations, which are the building blocks of card play. First master how to handle 13 cards in a single suit, then when you are reasonably familiar with this, try to put it into practice with the whole deal of 52 cards.

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In no trumps the maximum number of tricks you can make in a suit is the number of cards held by the longer holding.

Assume there are no trumps. The diagram for each suit shows the declarer holding and dummy. Try to play these combinations to make as many tricks as possible. Assume you can lead from either hand.

You might find it helpful to construct the combinations from a pack, randomly dealing the missing cards to East and West.

The spade and heart holdings each provide three tricks. Your heart holding in Suit B appears to be more sturdy than your spade holding in Suit A, but despite having the top six hearts you cannot expect to take more than three heart tricks.

To see why, try playing this combination. Suppose you start with the ♥️A. The rules force you to continually play two of your “winners” on the same trick. All your winners disappear after just three tricks.

In the minor suits shown in Suits C and D you hold the same cards as in hearts, but if you have the diamonds shown in Suit C you can make four tricks. Admittedly there will be wastage on the first two tricks, but dummy’s last two diamonds will be able to take tricks separately.

Note also that in playing diamonds it is correct to start with the ♦️K, allowing you to take the second diamond trick in dummy and persevere with the suit.

Start by cashing the high cards from the shorter holding.

In the clubs shown in Suit D there is even less wastage and you can make five tricks. Start with the ♣️K and overtake it with dummy’s ♣️A, leaving you with the lead in the right hand to continue playing clubs.

These tricks, being immediately cashable, are called top tricks.

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The maximum number of tricks you can make in a suit is the number of cards held by the longer holding minus the number of top cards you must force out.

Now try to work out how many potential tricks you have with these holdings.


With Suit E you have all of the top spades except the ace. This reduces the number of tricks by one, leaving you with two. Suppose you immediately play on spades. A defender takes the ♠️A and leads another suit which you can win. You now have two spade tricks to cash.

Similarly, in Suit F with hearts, once you have dislodged the ♥️A you have three tricks for the taking.

In the minor suits you have two top cards missing, the ace and the king. If you need to develop tricks, you must patiently play on the suit, forcing out these missing honours and regaining the lead in other suits.

The diamonds in Suit G give you one trick and the clubs in Suit H provide three.


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You must be prepared to lose the lead temporarily in order to develop tricks.

You will have seen that with the suits in E to G you must lose the lead before you can enjoy your winners. It is worth mentioning that it is natural for inexperienced players to have a great fear of giving up the lead. They fear that the opponents can do something dreadful.

Much of the time this fear is misplaced. For example, consider Layouts J and K. In each case you are in 3NT and West leads the ♥️K.


In Layout J the following facts are relevant:

  1. Although you have the top eight diamonds between the two hands, you can never make more than four diamond tricks (the number of cards held by the longer holding).
  2. You have the potential to make two spade tricks after driving out the ♠️A.
  3. You have only seven top tricks: the ♥️A, four diamonds and the ♣️A K. Therefore, you need to develop your two spade tricks.
  4. If you lose the lead, the defenders may be able to cash enough heart tricks to defeat you. However, if that is the case, there is nothing you can do about it.

When you take your ♥️A, you can safely cash four diamond tricks (in case defenders make careless discards). But now the moment of truth has come. You must now play on spades, whatever the risk.

If you start by cashing the top hearts, the defenders can cash four hearts to defeat you. In Layout K you are lucky enough to have enough top tricks to fulfil your contract without taking any risk, but Layout J is more common.

In most contracts you need to develop tricks from cards that are not immediately winners. It is losing bridge to run away from the problem. The beginner with Layout J cashes seven tricks and then wonders where the next two are coming from. He loses the last six tricks.

Trick 13 counts as much as trick 1.


So far, I have concentrated on developing tricks by brute force. Now, I turn my attention to developing length winners.


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In no trumps a lowly two is a winning card if nobody else has a card left in the suit.

How many tricks do you expect to make with these combinations?



With Suit L you cannot be sure. Consider this spade suit. There are five spades missing: the ♠️J 10 9 8 7. Suppose they are distributed as in diagram Layout Q below.



Bridge January 2017

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