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RiichiBook1-ch4-five.tex
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RiichiBook1-ch4-five.tex
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%~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
% riichi Book 1, Chapter 4: Five block method
%~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
\chapter{The five-block method} \label{ch:five}
\thispagestyle{empty}
In introducing basic building blocks of riichi mahjong in the previous chapter, I have also touched upon a number of important tile efficiency principles ---
e.g., superiority of side-wait protoruns, the value of having two pairs in a hand rather than three, and the value of stretched single or bulging float shapes, to name a few.
\bigskip
These principles are all important, but trying to take all of the important principles into consideration at once could be a daunting task. We have to make our discard choice in a limited amount of time,\footnote{Recall that, on regular (slower) tables on {\jap Tenhou}, each discard choice must be made within 5 seconds. In offline games, we should make choices even faster so as not to irritate your fellow players.} and tile efficiency is not the only factor we need to consider in making a discard choice.
Moreover, some of the tile efficiency principles can at times clash with one another, requiring us to make a judgement call about which principle to follow. For example, we may at times wonder whether to retain a bulging float shape or to retain two pairs in a hand, when we have to discard one of the two.
\bigskip
The {\bf five-block method} I introduce in this chapter will help us prioritize between competing principles and find the most efficient discard choice quickly.\footnote{As I mentioned in the Preface, the exposition of this chapter is based on Makoto Fukuchi's books. In particular, I am indebted to Makoto Fukuchi 2015 \textit{Haikouritsu Nyumon Doriru 76}, Yousensha. ISBN978-4-8003-0634-0.}
The core idea of the five-block method is deceptively simple; we first identify five tile blocks in a hand --- four groups + one head, or their candidates --- and try to complete each block.
\index{Fukuchi@Fukuchi, Makoto}
\section{Finding a redundant tile}
\index{five-block method}
We all understand that a standard hand
%\footnote{Of course, non-standard hands --- {\jap chiitoitsu} (Seven pairs) and {\jap kokushimusou} (Thirteen Orphans) --- are exceptions.}
must have five blocks of tiles --- four groups and one head --- to win.
The five-block method encourages us to be always conscious about five tile blocks in a hand.
Consider the following hand. What would you discard and why?
\bp
\wan{5}\wan{5}\wan{7}\wan{8}\tong{2}\tong{4}\tong{5}\tong{5}\suo{1}\suo{3}\suo{3}\zhong\zhong\zhong
\ep
To figure out which tile is the least useful in this hand, let's divide the hand into tile blocks, as follows.
\bmj{\Huge
$
\underbrace{\text{\wan{5}\wan{5}}}
\underbrace{\text{\wan{7}\wan{8}}}\underbrace{\text{\tong{2}\tong{4}\tong{5}\tong{5}}}\underbrace{\text{\suo{1}\suo{3}\suo{3}}}\underbrace{\text{\zhong\zhong\zhong}} \label{five:411a}
$
}\emj
Notice that, although we do not know which block is going to be the head and which blocks are going to be four groups at the moment, the hand already has five tile blocks. This means that there is no need to increase or decrease the number of blocks from here.
\bigskip
Looking at each of the five blocks, the pair of {\LARGE\wan{5}}, the protorun {\LARGE\wan{7}\wan{8}}, and the set of {\LARGE\zhong} are all self-sufficient; we keep them as they are. Our discard choice should thus be from the third or the fourth blocks, {\LARGE\tong{2}\tong{4}\tong{5}\tong{5}} or {\LARGE\suo{1}\suo{3}\suo{3}}.
Let's now compare these two closed-wait blocks. While {\LARGE\suo{1}} is being useful within the block it belongs to, enabling the hand to accept {\LARGE\suo{2}}, {\LARGE\tong{2}} is completely redundant; the hand can accept {\LARGE\tong{3}} without having {\LARGE\tong{2}}. Therefore, the ideal discard here is {\LARGE\tong{2}}.
\bigskip
There are two key points to remember in applying the five-block method.
First, we should not make any one of the five blocks ``too weak.''\footnote{Basically, any block that is weaker than a side-wait protorun is a weak block.} In the current example, if we discard {\LARGE\suo{3}}, the {\LARGE\suo{1}\suo{3}\suo{3}} block becomes an isolated closed-wait protorun, which is too weak compared with the other blocks. Likewise, if we discard {\LARGE\suo{1}}, this block becomes a pair of {\LARGE\suo{3}}. Since this hand already has two other pairs, having a third pair makes all the pairs in the hand too weak.
\bigskip
Second, each of the five tile blocks should ideally have three tiles. In the current example, the {\LARGE\suo{1}\suo{3}\suo{3}} block has exactly three tiles and so we should not choose a discard from this block. On the other hand, the {\LARGE\tong{2}\tong{4}\tong{5}\tong{5}} block currently has four tiles so we should discard one from this block to make this a three-tile block.
\vfill
\color{MyRed}
\begin{itembox}[c]{Five-block method}\normalcolor
Identify five tile blocks in a hand. Try to make sure:
\bi\itemsep.1pt
\i[] (1) there is no block that is too weak; and
\i[] (2) each block has at most three tiles.
\ei
\end{itembox}\normalcolor
\newpage
Let's see another example.
\bp
\wan{3}\wan{5}\wan{7}\tong{4}\tong{5}\tong{6}\tong{6}\tong{7}\suo{4}\suo{6}\suo{6}\suo{8}\bai\bai~\bai\\
\hfill\footnotesize{{\jap Dora}~~~~~~~~~~~~}
\ep
We can easily see that there is one block in {\jap manzu} (cracks), two blocks in {\jap pinzu} (dots), and a pair of white dragons, giving us four blocks. This means that we need to have only one more block in {\jap souzu} (bamboos). Therefore, we divide the hand as follows.
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{5}\wan{7}}}
\underbrace{\text{\tong{4}\tong{5}\tong{6}}} \underbrace{\text{\tong{6}\tong{7}}}\underbrace{\text{\suo{4}\suo{6}\suo{6}\suo{8}}}\underbrace{\text{\bai\bai}} \label{five:411b}
$
}\emj
Since we should not create a block that is too weak, discarding {\LARGE\wan{3}} or {\LARGE\wan{7}} is not an option. Notice that the block in {\jap souzu} (bamboos) has four tiles. We should thus discard one from this block. In case the pair of white dragon later becomes a set, we should keep the pair of {\LARGE\suo{6}}, leaving {\LARGE\suo{4}} or {\LARGE\suo{8}} as a discard candidate. Given that {\LARGE\suo{4}} has a higher chance of creating a side-wait protorun, we should discard {\LARGE\suo{8}}.
Then, none of the five blocks is too weak, and each block has at most three tiles.
\bigskip
In the two examples we saw above, you might have been able to identify the redundant tiles without really thinking too hard. If so, that was probably because you have implicitly and unconsciously applied the five-block method in your mind. The goal of this chapter is to train our mind further, so that it becomes our second nature to identify five tile blocks in a hand.
\section{Alternative configurations}
Consider the following hand. What would you discard and why?
\bp
\wan{3}\wan{3}\wan{4}\wan{6}\tong{2}\tong{2}\tong{4}\tong{5}\tong{6}\tong{6}\tong{7}\zhong\zhong\zhong
\ep
Let's first divide the hand into five tile blocks.
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{3}\wan{4}\wan{6}}}
\underbrace{\text{\tong{2}\tong{2}}}\underbrace{\text{\tong{4}\tong{5}\tong{6}}}\underbrace{\text{\tong{6}\tong{7}}}\underbrace{\text{\zhong\zhong\zhong}} \label{five:421a}
$
}\emj
This makes it clearer that, just like the previous example, {\LARGE\wan{6}} is creating a redundant closed-wait protorun, so we should discard it. Also, discarding {\LARGE\wan{6}} makes this a three-tile block.
\bigskip
However, there is an alternative way to divide this hand into five blocks, and situational changes may call for such an alternative configuration.
Suppose that your opponents have already discarded all four tiles of {\LARGE\wan{2}}. Suppose also that {\LARGE\tong{3}} seems live in the wall. Or, suppose {\LARGE\wan{3}-\wan{6}} tiles seem too dangerous to discard against an opponent. Then, we might want to divide the hand in the following way instead.
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{3}}}
\underbrace{\text{\wan{4}\wan{6}}}\underbrace{\text{\tong{2}\tong{2}\tong{4}\tong{5}\tong{6}\tong{6}\tong{7}}}_{\text{\small 2}}\underbrace{\text{\zhong\zhong\zhong}} \label{five:421b}
$
}\emj
That is, we aim to make the pair of {\LARGE\wan{3}} the head of this hand, and we seek to have two runs in {\jap pinzu} (dots). If we discard {\LARGE\tong{2}}, this block becomes {\LARGE\tong{2}\tong{4}\tong{5}\tong{6}\tong{6}\tong{7}}.
Recall that a block like this can be split into {\LARGE\tong{2}\tong{4}\tong{6} + \tong{5}\tong{6}\tong{7}} (recall the discussion of double closed shape in Section \ref{sec:ryankan}). Therefore, this block can accept {\LARGE\tong{3}} as well as {\LARGE\tong{5}-\tong{8}} to make two runs in {\jap pinzu}. The block in {\jap pinzu} will have six tiles, but this is OK because this block is worth two.
\bigskip
To master the five-block method, we need to be able to instantaneously envision the first block configuration (\ref{five:421a}) the moment we see this hand. However, that is not enough. We should also be able to imagine an alternative configuration (\ref{five:421b}) at the same time.
In the game of mahjong, situations change very quickly each time a new tile gets drawn or a new tile gets discarded. Therefore, the ideal five-block configuration would also change accordingly as situations evolve. We thus need to develop our skills to picture many possible five-block configurations and to prepare for possible situational changes that would call for a change in the configuration.
\bigskip
I provide several exercises in the following pages. The answer key to each exercise is provided on the next page. Try not to look at the answers before you actually derive your own answer.
\vfill
\subsection*{Exercises: finding a redundant tile}
\bigskip
\begin{itembox}[l]{Exercise 1}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{3}\wan{4}\wan{6}\wan{6}\tong{3}\tong{4}\tong{5}\suo{3}\suo{3}\suo{5}\suo{6}\suo{7}\suo{7}~\suo{4}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 1}
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{4}}}%
\underbrace{\text{\wan{6}\wan{6}}}~
\underbrace{\text{\tong{3}\tong{4}\tong{5}}}~\underbrace{\text{\suo{3}\suo{3}\suo{4}\suo{5}\suo{6}\suo{7}\suo{7}}}_{\text{\small 2}} \nonumber
$
}\emj
With the draw of {\LARGE\suo{4}}, we now have a 3-way side-wait block in {\jap souzu} (bamboos). {\LARGE\suo{3}} or {\LARGE\suo{7}} could be our back-up candidate for the head, in case we draw another {\LARGE\wan{6}}. Since there is a potential for {\jap sanshoku} (Mixed Triple Chow) of 345, we discard {\LARGE\suo{3}}.
\end{itembox}
\vfill
\begin{itembox}[l]{Exercise 2}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{5}\wan{7}\tong{1}\tong{1}\tong{2}\tong{3}\tong{4}\tong{4}\tong{5}\tong{7}\suo{3}\suo{5}\suo{5}~\tong{4}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
%=====================
\bigskip
\begin{itembox}[r]{Answer 2}
\bmj{\Huge
$
\underbrace{\text{\wan{5}\wan{7}}}\text{\tong{1}}
\underbrace{\text{\tong{1}\tong{2}\tong{3}}}\underbrace{\text{\tong{4}\tong{4}\tong{4}}}\underbrace{\text{\tong{5}\tong{7}}}\underbrace{\text{\suo{3}\suo{5}\suo{5}}}
\nonumber
$
}\emj
Before we drew the third {\LARGE\tong{4}}, the {\jap pinzu} (dots) tiles were {\LARGE\tong{1}\tong{1} + \tong{2}\tong{3}\tong{4} + \tong{4}\tong{5}}, so the {\LARGE\tong{7}} was simply a floating tile. Now that we have another {\LARGE\tong{4}}, the five-block configuration changes accordingly. The ideal discard is {\LARGE\tong{1}}, as this has become redundant.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 3}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{4}\wan{4}\wan{6}\wan{6}\wan{7}\wan{8}\tong{2}\tong{3}\suo{3}\suo{4}\suo{6}\suo{6}\suo{7}~\wan{3}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 3}
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{4}\wan{4}}}\text{\wan{6}}
\underbrace{\text{\wan{6}\wan{7}\wan{8}}}\underbrace{\text{\tong{2}\tong{3}}}\underbrace{\text{\suo{3}\suo{4}}}\underbrace{\text{\suo{6}\suo{6}\suo{7}}}
\nonumber
$
}\emj
There are two ``side wait plus one'' shapes, {\LARGE\wan{3}\wan{4}\wan{4}} and {\LARGE\suo{6}\suo{6}\suo{7}}, that might later become the head or a run. At this point, however, we cannot determine which one will be which, so we should keep them as they are.
One of the two {\LARGE\wan{6}} has become an obvious redundancy so we should discard one.
\end{itembox}
\vfill
\begin{itembox}[l]{Exercise 4}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{2}\wan{3}\wan{5}\wan{6}\tong{4}\tong{4}\tong{6}\tong{8}\tong{9}\suo{3}\suo{4}\suo{5}\bei~\wan{4}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 4}
\bmj{\Huge
$
\underbrace{\text{\wan{2}\wan{3}\wan{4}\wan{5}\wan{6}}}_{\text{\small 2}}
\underbrace{\text{\tong{4}\tong{4}}}\underbrace{\text{\tong{6}\tong{8}}}\text{\tong{9}}\underbrace{\text{\suo{3}\suo{4}\suo{5}}}\text{\bei}
\nonumber
$
}\emj
The {\LARGE\bei} is obviously redundant, but {\LARGE\tong{9}} is also useless. Without {\LARGE\tong{9}}, the hand can accept {\LARGE\tong{7}}. Since honor tiles can be used as a safety tile (see Chapter \ref{ch:defense}), we discard {\LARGE\tong{9}} first.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 5}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{2}\wan{3}\wan{5}\wan{7}\wan{7}\tong{2}\tong{4}\tong{6}\tong{8}\suo{4}\suo{5}\suo{7}\suo{8}~\suo{8}~\tong{4}\\
\hfill\footnotesize{Draw~~{\jap Dora}~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 5}
\bmj{\Huge
$
\underbrace{\text{\wan{2}\wan{3}}}
\underbrace{\text{\wan{5}\wan{7}\wan{7}}}\underbrace{\text{\tong{2}\tong{4}\tong{6}\tong{8}}}\underbrace{\text{\suo{4}\suo{5}}}\underbrace{\text{\suo{7}\suo{8}\suo{8}}}
\nonumber
$
}\emj
This is a bit difficult, as there are so many closed-wait protoruns. Recall that each tile block should have at most three tiles and that pairs are most valuable when there are two of them in a hand.
The block in {\jap pinzu} (dots) has four tiles, so we discard one from this block. Since {\LARGE\tong{4}} is {\jap dora}, we discard {\LARGE\tong{8}}, leaving the double closed shape around {\jap dora}: {\LARGE\tong{2}\tong{4}\tong{6}}.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 6}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{2}\wan{3}\wan{4}\wan{4}\tong{3}\tong{4}\tong{5}\tong{6}\suo{4}\suo{5}\suo{5}\suo{6}\suo{6}~\tong{4}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 6}
\bmj{\Huge
$
\underbrace{\text{\wan{2}\wan{3}\wan{4}}}\text{\wan{4}}
\underbrace{\text{\tong{3}\tong{4}\tong{4}\tong{5}\tong{6}}}_{\text{\small 2}}
\underbrace{\text{\suo{4}\suo{5}\suo{5}\suo{6}\suo{6}}}_{\text{\small 2}}
\nonumber
$
}\emj
Finding the best discard by actually comparing tile acceptance counts for each possible discard candidate is super tedious. The five-block method simplifies the process quite a bit. Since we have two blocks in {\jap pinzu} (dots) and two blocks in {\jap souzu} (bamboos), we only need one block in {\jap manzu} (cracks), hence one {\LARGE\wan{4}} is redundant. If we discard {\LARGE\wan{4}}, the hand can be made ready with 11 kinds--34 tiles. If we discard {\LARGE\tong{3} \tong{4}} or {\LARGE\suo{5}}, the hand can be ready only with 6 kinds--19 tiles.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 7}
What would you discard?
\vspace{-10pt}
%How do you divide the hand into five tile blocks?
\bp
\wan{3}\wan{4}\wan{7}\tong{2}\tong{3}\tong{4}\tong{7}\tong{7}\tong{8}\suo{4}\suo{5}\suo{7}\suo{9}~\suo{6}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
%=====================
\begin{itembox}[r]{Answer 7}
\bmj{\Huge
$
\underbrace{\text{\wan{3}\wan{4}}}\text{\wan{7}}
\underbrace{\text{\tong{2}\tong{3}\tong{4}}}\underbrace{\text{\tong{7}\tong{7}\tong{8}}}\underbrace{\text{\suo{4}\suo{5}\suo{6}\suo{7}\suo{9}}}_{\text{\small 2}}\nonumber
$
}\emj
Do not discard the {\LARGE\suo{9}} just because it forms a closed wait or because discarding it gets us {\jap tanyao} (All Simples). Avoiding closed wait too much and being hung up on {\jap tanyao} are two pathologies common among intermediate players.
\bigskip
The block in {\jap souzu} (bamboos) is actually not too bad; this is a stretched single plus one, which can become either two runs immediately (if we draw {\LARGE\suo{8}}), one run plus one side-wait protorun (if we draw any of {\LARGE\suo{3}\suo{5}\suo{6}}), or one run plus the head (if we draw {\LARGE\suo{4}} or {\LARGE\suo{7}}). Note also that we need both {\LARGE\tong{7}} and {\LARGE\tong{8}}, because this part may become the head if we get two runs in {\jap souzu} (bamboos); when we get the head in {\jap souzu} (bamboos), we will treat this part as a side-wait protorun. We thus discard {\LARGE\wan{7}}.
\end{itembox}
%=====================
\newpage
\section{Selecting tile blocks}
All the hands we have seen so far in this chapter already have five tile blocks. In practice, however, this is not always the case. A hand can sometimes have fewer or more tile blocks. Since we need to have exactly five blocks to win a hand, we will need to bump up tile blocks by using a floating tile when we have fewer of them or to discard some blocks entirely when we have a plethora of them.
\bigskip
In selecting which tile blocks to keep and which ones to discard, we focus on a combination of the following three criteria:
\be
\i tile efficiency;
\i hand value;
\i the safety of tiles to be discarded.
\ee
As we will see below, we can sometimes find a block to discard based on all the three criteria.
Consider the following hand. How do we divide the hand into tile blocks, and what would you discard?
%\vspace{-20pt}
\bp
\hspace{120pt}{\footnotesize\color{red!75!black} Red}\\ \vspace{-16pt}
\wan{1}\wan{2}\wan{3}\tong{3}\tong{4}\tong{5}\tong{5}\tong{7}\tong{8}\suo{4}\rfs\suo{7}\suo{8}~\tong{2}\\
\hfill\footnotesize{Draw~~~~~~~~~~~~~~~}
\ep
We can see that the hand currently has six tile blocks, as follows.
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{2}\wan{3}}}
\underbrace{\text{\tong{2}\tong{3}\tong{4}}}
\underbrace{\text{\tong{5}\tong{5}}}
\underbrace{\text{\tong{7}\tong{8}}}
\underbrace{\text{\suo{4}\rfs}}
\underbrace{\text{\suo{7}\suo{8}}}
\nonumber
$
}\emj
Since the first two tile blocks are already complete and the third block is the head, our discard choice should be from the last three tile blocks, {\LARGE\tong{7}\tong{8}}, {\LARGE\suo{4}\rfs}, or {\LARGE\suo{7}\suo{8}}.
\bigskip
From a perspective of tile efficiency, discarding the {\LARGE\tong{7}\tong{8}} block means that we lose the ability to accept \emph{both} {\LARGE\tong{6}} and {\LARGE\tong{9}}. On the other hand, if we discard the {\LARGE\suo{7}\suo{8}} block, we only lose the ability to accept {\LARGE\suo{9}}; because of the {\LARGE\suo{4}\rfs} block, we can still accept {\LARGE\suo{6}}. We should thus choose between the two blocks in {\jap souzu} (bamboos).
Keeping the {\LARGE\rfs} is desirable from a perspective of hand value (it is a red five) as well as safety (discarding {\LARGE\suo{7}\suo{8}} is much safer than discarding {\LARGE\suo{4}\rfs}, generally speaking). Therefore, the three criteria collectively suggest that we should discard {\LARGE\suo{7}\suo{8}}.
\bigskip
In practice, however, satisfying all three criteria may not be feasible. A common tradeoff we face is between speed and hand value. That is, maximizing tile efficiency to gain speed often entails giving up possibilities of pursuing an expensive hand. Consider the following hand.
\bp
\wan{1}\wan{3}\wan{5}\wan{7}\wan{7}\tong{3}\tong{7}\tong{8}\suo{3}\suo{4}\suo{8}\suo{8}\suo{9}\suo{9}
\ep
Let's divide the hand into tile blocks. There are several ways to do this. One way to do this is to split it into the following blocks.
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}\wan{5}}}
\underbrace{\text{\wan{7}\wan{7}}}
\text{\tong{3}}
\underbrace{\text{\tong{7}\tong{8}}}
\underbrace{\text{\suo{3}\suo{4}}}
\underbrace{\text{\suo{8}\suo{8}}}
\underbrace{\text{\suo{9}\suo{9}}}
\nonumber
$
}\emj
If we simply maximize tile efficiency, we discard {\LARGE\tong{3}}, as we already have six tile blocks and we won't need any more floating tile.
\bigskip
However, as it stands, the hand has no {\jap yaku} and it is likely to be a very cheap riichi-only hand. Moreover, the hand has three pairs, which is not ideal as we saw in the previous chapter.
Therefore, we might want to split the hand into the following five blocks.
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}\wan{5}\wan{7}\wan{7}}}
\underbrace{\text{\tong{3}}}
\underbrace{\text{\tong{7}\tong{8}}}
\underbrace{\text{\suo{3}\suo{4}}}
\underbrace{\text{\suo{8}\suo{8}}}
\text{\suo{9}\suo{9}}
\nonumber
$
}\emj
We count the floating {\LARGE\tong{3}} as an independent block, hoping it to grow into a run. We also treat the tiles in {\jap manzu} (cracks) as a single block, hoping to get at least one group or the head out of it. We thus discard one {\LARGE\suo{9}} now, then another {\LARGE\suo{9}} in the next turn. Depending on what tile gets drawn, our five-block configuration will be different.
\bigskip
For example, suppose we draw {\LARGE\tong{4}} and then {\LARGE\suo{5}}. We will then have the following.
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}\wan{5}\wan{7}\wan{7}}}
\underbrace{\text{\tong{3}\tong{4}}}
\underbrace{\text{\tong{7}\tong{8}}}
\underbrace{\text{\suo{3}\suo{4}\suo{5}}}
\underbrace{\text{\suo{8}\suo{8}}}
\nonumber
$
}\emj
We will discard the {\LARGE\wan{1}} as a first step toward reducing the number of tiles in the {\jap manzu} (cracks) block to three. We can now see that this hand has a potential of getting {\jap sanshoku} of 345 as well as {\jap pinfu} and {\jap tanyao}.
\bigskip
On the other hand, if we draw {\LARGE\wan{6}} and then {\LARGE\wan{8}}, we can expect to have two groups in {\jap manzu} (cracks) so we will discard {\LARGE\tong{3}}.
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}\wan{5}\wan{6}\wan{7}\wan{7}\wan{8}}}_{\text{\small 2}}
\text{\tong{3}}
\underbrace{\text{\tong{7}\tong{8}}}
\underbrace{\text{\suo{3}\suo{4}}}
\underbrace{\text{\suo{8}\suo{8}}}
\nonumber
$
}\emj
\vspace{-10pt}
In selecting tile blocks, we should try to achieve the best balance between speed and hand value. Don't fantasize too much about getting an expensive hand. At the same time, don't fixate too much about tile efficiency at the cost of hand value. This is, of course, easier said than done; it is quite difficult even for advanced players.
\vfill
\subsection*{Exercises: selecting tile blocks}
\bigskip
\begin{itembox}[l]{Exercise 8}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{2}\wan{3}\wan{3}\wan{7}\wan{8}\tong{5}\tong{6}\suo{1}\suo{1}\suo{2}\suo{4}\suo{9}\suo{9}~\suo{9}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 8}
\bmj{\Huge
$
\underbrace{\text{\wan{2}\wan{3}\wan{3}}}
\underbrace{\text{\wan{7}\wan{8}}}
\underbrace{\text{\tong{5}\tong{6}}}
\underbrace{\text{\suo{1}\suo{1}}}
\underbrace{\text{\suo{2}\suo{4}}}
\underbrace{\text{\suo{9}\suo{9}\suo{9}}}
\nonumber
$
}\emj
The hand currently has six blocks so we need to get rid of one. The {\LARGE\suo{2}\suo{4}} block is the weakest -- it is the only closed-wait protorun -- so we should get rid of this one. We should discard {\LARGE\suo{4}} first; if we draw {\LARGE\suo{3}} we will discard {\LARGE\suo{1}} to leave the possibility of {\jap pinfu}. If not, we discard {\LARGE\suo{2}} next, and then {\LARGE\wan{3}}.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 9}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{2}\wan{4}\tong{7}\tong{8}\tong{9}\tong{9}\tong{9}\suo{2}\suo{2}\suo{6}\suo{7}\bai\bai~\wan{4}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 9}
\bmj{\Huge
$
\underbrace{\text{\wan{2}\wan{4}\wan{4}}}
\underbrace{\text{\tong{7}\tong{8}\tong{9}\tong{9}\tong{9}}}_{\text{\small 2}}
\underbrace{\text{\suo{2}\suo{2}}}
\underbrace{\text{\suo{6}\suo{7}}}
\underbrace{\text{\bai\bai}}
\nonumber
$
}\emj
We were planning to discard the {\LARGE\wan{2}\wan{4}} block because this was the weakest block among the six blocks in this hand. However, now that we drew another {\LARGE\wan{4}}, the {\LARGE\suo{2}\suo{2}} block is now the weakest. We thus discard {\LARGE\suo{2}}.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 10}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{1}\wan{3}\wan{5}\wan{6}\wan{7}\tong{1}\tong{3}\suo{3}\suo{4}\suo{7}\suo{8}\bei\bei~\suo{5}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 10}
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}}}
\underbrace{\text{\wan{5}\wan{6}\wan{7}}}
\underbrace{\text{\tong{1}\tong{3}}}
\underbrace{\text{\suo{3}\suo{4}\suo{5}}}
\underbrace{\text{\suo{7}\suo{8}}}
\underbrace{\text{\bei\bei}}
\nonumber
$
}\emj
The hand currently has six blocks so we need to get rid of one. Comparing the two closed-wait blocks {\LARGE\wan{1}\wan{3}} and {\LARGE\tong{1}\tong{3}}, the {\LARGE\wan{1}\wan{3}} block is more valuable because it is adjacent to a run. If we draw {\LARGE\wan{4}}, we will get a 3-way side-wait block. On the other hand, the {\LARGE\tong{1}\tong{3}} block will only become a 2-way side-wait block when we draw {\LARGE\tong{4}}. We should discard {\LARGE\tong{1}} first, not {\LARGE\tong{3}}, because if we draw {\LARGE\tong{4}} next, we will discard the {\LARGE\wan{1}\wan{3}} block.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 11}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\bp
\wan{5}\wan{7}\tong{1}\tong{1}\tong{3}\tong{7}\tong{7}\suo{1}\suo{1}\suo{4}\suo{5}\suo{6}\suo{7}~\suo{3}\\
\hfill\footnotesize{Draw~~~~~~~~~~~}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 11}
\bmj{\Huge
$
\underbrace{\text{\wan{5}\wan{7}}}
\underbrace{\text{\tong{1}\tong{1}\tong{3}}}
\underbrace{\text{\tong{7}\tong{7}}}
\underbrace{\text{\suo{1}\suo{1}}}
\underbrace{\text{\suo{3}\suo{4}\suo{5}\suo{6}\suo{7}}}_{\text{\small 2}}
\nonumber
$
}\emj
Now that we have a 3-way side-wait block in {\jap souzu} (bamboos), we should get rid of one block. Comparing a closed-wait block {\LARGE\wan{5}\wan{7}} and two pairs {\LARGE\tong{7}\tong{7}} and {\LARGE\suo{1}\suo{1}}, we should value the closed-wait block. This is because the hand has three pairs already so we should get rid of one of them. Since we see a (remote) possibility of {\jap sanshoku} of 567, we should discard {\LARGE\suo{1}}.
\end{itembox}
%=====================
\section{Building a block}
When a hand has fewer than five blocks, we need to build a new block, possibly from a floating tile we already have in the hand. In doing so, we should envision the kind of {\jap yaku} that the hand is going to have eventually. Consider the following hand. Suppose you are the dealer and this is East-1. What would you discard?
\bp
\wan{6}\wan{7}\wan{7}\wan{8}\tong{3}\tong{3}\tong{4}\tong{9}\suo{4}\suo{7}\suo{8}\suo{9}\zhong\bei
\ep
As usual, we will split the hand into blocks. Notice that the hand has at most four blocks only.
\bmj{\Huge
$
\underbrace{\text{\wan{6}\wan{7}\wan{7}\wan{8}}}_{\text{\small 2}}
\underbrace{\text{\tong{3}\tong{3}\tong{4}}}
\text{\tong{9}}~\text{\suo{4}}
\underbrace{\text{\suo{7}\suo{8}\suo{9}}}
\text{\zhong~\bei}
\nonumber
$
}\emj \label{hand:head}
We should thus compare the four floating tiles {\LARGE\tong{9} \suo{4} \zhong ~\bei} in terms of their relative capabilities to grow into an independent block. Of these four tiles, {\LARGE\suo{4}} is the strongest candidate, because it can form a side-wait protorun with two kinds of tiles, \text{\suo{3}} and \text{\suo{5}}. Any simple tiles between 3 and 7 are a strong floating tile because of their ability to form a side-wait protorun. Terminals (1 and 9) will never become a side-wait protorun, and 2 and 8 can become a side-wait protorun when paired with only one kind of tiles (3 or 7). However, number tiles are still stronger than honor tiles because honor tiles can never form a run.
\bigskip
We should thus choose between the two honor tiles, {\LARGE\zhong} and {\LARGE\bei}. Which one should we discard? Notice that this hand is clearly a {\jap pinfu} hand and that it is currently lacking the head. Since value tiles can never be the head of a {\jap pinfu} hand, we should discard {\LARGE\zhong} rather than {\LARGE\bei}.
\bigskip
We may want to choose a discard from an existing block rather than discarding a floating tile in order to enhance the hand value. Consider the following hand.
\bp
\wan{5}\wan{6}\wan{6}\wan{8}\tong{1}\tong{2}\tong{2}\tong{6}\suo{1}\suo{1}\suo{4}\suo{5}\suo{6}\suo{7}
\ep
From a pure perspective of tile efficiency, the discard choice should be either {\LARGE\suo{4} \suo{7}} or {\LARGE\tong{6}}, for discarding either of the three will maximize tile acceptance. The block configuration behind such a decision is as follows.
\bmj{\Huge
$
\underbrace{\text{\wan{5}\wan{6}}}
\underbrace{\text{\wan{6}\wan{8}}}
\underbrace{\text{\tong{1}\tong{2}\tong{2}}}
\text{\tong{6}}
\underbrace{\text{\suo{1}\suo{1}}}
\underbrace{\text{\suo{4}\suo{5}\suo{6}\suo{7}}}
\nonumber
$
}\emj
However, doing so makes it almost inevitable that the hand ends up having a low score and/or a bad wait. Alternatively, we can expect the stretched single shape {\LARGE\suo{4}\suo{5}\suo{6}\suo{7}} to produce two runs, {\LARGE\tong{6}} to form a run, and the tiles in {\jap manzu} (cracks) to produce one run, as follows.
\bmj{\Huge
$
\underbrace{\text{\wan{5}\wan{6}\wan{6}\wan{8}}}
\underbrace{\text{\tong{1}\tong{2}\tong{2}}}
\underbrace{\text{\text{\tong{6}}}}
\text{\suo{1}\suo{1}}
\underbrace{\text{\suo{4}\suo{5}\suo{6}\suo{7}}}_{\text{\small 2}}
\nonumber
$
}\emj
We should thus discard the {\LARGE\tong{1}} for now, anticipating to discard the pair of {\LARGE\suo{1}} eventually. That way, we can expect to have {\jap tanyao}, {\jap pinfu}, and possibly {\jap sanshoku}.
\vfill
\subsection*{Exercises: building a block}
\bigskip
\bigskip
\begin{itembox}[l]{Exercise 12}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\vspace{-30pt}
\bp
\hspace{-163pt}{\footnotesize\color{red!75!black} Red}\\ \vspace{-16pt}
\wan{1}\wan{3}\rfw\wan{8}\wan{9}\tong{3}\tong{4}\tong{4}\suo{2}\suo{2}\suo{3}\suo{5}\suo{6}\suo{7}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 12}
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}\rfw}}
\underbrace{\text{\wan{8}\wan{9}}}
\underbrace{\text{\tong{3}\tong{4}\tong{4}}}
\underbrace{\text{\suo{2}\suo{2}\suo{3}}}
\underbrace{\text{\suo{5}\suo{6}\suo{7}}}
\nonumber
$
}\emj
If we were to simply maximize tile acceptance, the discard choice should be either {\LARGE\wan{1}} or {\LARGE\rfw}. However, that would make the block in {\jap manzu} (cracks) too weak. Breaking the {\LARGE\tong{3}\tong{4}\tong{4}} or {\LARGE\suo{2}\suo{2}\suo{3}} is not ideal, as these blocks are very strong. We should therefore discard the {\LARGE\wan{9}} to get rid of this edge-wait block. This will temporarily reduce the number of blocks from five to four, but we can expect to get back to five soon with this hand.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 13}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\vspace{-30pt}
\bp
\hspace{-163pt}{\footnotesize\color{red!75!black} Red}\\ \vspace{-16pt}
\wan{1}\wan{3}\rfw\wan{5}\tong{3}\tong{4}\tong{4}\tong{5}\suo{2}\suo{2}\suo{3}\suo{5}\suo{6}\suo{7}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 13}
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{3}}}
\underbrace{\text{\rfw\wan{5}}}
\underbrace{\text{\tong{3}\tong{4}\tong{4}\tong{5}}}_{\text{\small 2}}
\underbrace{\text{\suo{2}\suo{2}\suo{3}}}
\underbrace{\text{\suo{5}\suo{6}\suo{7}}}
\nonumber
$
}\emj
Discarding {\LARGE\tong{4}} or {\LARGE\suo{2}} will make this hand 1-Away, so our choice is between these two options. Notice that the {\LARGE\wan{1}\wan{3}} block is weaker than the other four. As a back up, we should keep two {\LARGE\tong{4}} to maintain the bulging float block in {\jap pinzu} (dots) for now, hoping to get two runs out of it. If we draw {\LARGE\tong{2}-\tong{5}} or {\LARGE\tong{3}-\tong{6}} first, we will get rid of the {\LARGE\wan{1}\wan{3}} block. We should thus discard {\LARGE\suo{2}}. If we draw any of {\LARGE\suo{1}\suo{4}\wan{2}}, we should do insta-riichi.
\end{itembox}
%=====================
\vfill
\begin{itembox}[l]{Exercise 14}
What would you discard? \\
\vsp
How do you divide the hand into tile blocks?
\vspace{-30pt}
\bp
\hspace{-128pt}{\footnotesize\color{red!75!black} Red}\\ \vspace{-16pt}
\wan{1}\wan{1}\wan{3}\rfw\wan{5}\tong{3}\tong{4}\tong{4}\tong{5}\suo{2}\suo{3}\suo{5}\suo{6}\suo{7}
\ep
\end{itembox}
%=====================
\newpage
\begin{itembox}[r]{Answer 14}
\bmj{\Huge
$
\underbrace{\text{\wan{1}\wan{1}\wan{3}\rfw\wan{5}}}_{\text{\small 2}}
\underbrace{\text{\tong{3}\tong{4}\tong{4}\tong{5}}}
\underbrace{\text{\suo{2}\suo{3}}}
\underbrace{\text{\suo{5}\suo{6}\suo{7}}}
\nonumber
$
}\emj
As we drew another {\LARGE\wan{1}}, the block in {\jap manzu} (cracks) is now a decent shape. This can become one group and the head with a draw of {\LARGE\wan{1} \wan{2} \wan{4} \wan{5}}. Therefore, we should discard {\LARGE\tong{4}} to break the bulging float shape.
\end{itembox}
%=====================