===================================================================
RCS file: /home/cvs/OpenXM/src/cfep/Doc/Intro/next2.tex,v
retrieving revision 1.4
retrieving revision 1.5
diff -u -p -r1.4 -r1.5
--- OpenXM/src/cfep/Doc/Intro/next2.tex	2008/09/26 02:54:23	1.4
+++ OpenXM/src/cfep/Doc/Intro/next2.tex	2009/09/19 05:33:50	1.5
@@ -18,7 +18,7 @@
 
 \title{ {\bf $BD6F~Lg(B Cfep/asir (MacOS X)} }
 \author{  $B9b;3?.5#(B }
-\date{ 2006$BG/(B($BJ?@.(B18$BG/(B), 3$B7n(B12$BF|HG(B(cfep 1.1). 2008-09-26 $B=$@5(B \\ $B%3%a%s%H$O(B takayama@math.kobe-u.ac.jp $B$^$G(B}
+\date{ 2006$BG/(B($BJ?@.(B18$BG/(B), 3$B7n(B12$BF|HG(B(cfep 1.1). 2008-09-26, 2009-09-19 $B=$@5(B \\ $B%3%a%s%H$O(B takayama@math.kobe-u.ac.jp $B$^$G(B}
 \makeindex
 
 \begin{document}
@@ -759,9 +759,6 @@ for $B%k!<%W$H8F$P$l$k(B.
 %en A similar expression
 %en ``{\tt K>=N}'' implies that ``${\tt K} \geq {\tt N}$ holds''
 %en The expression ``{\tt K<N}'' means that ``${\tt K} < {\tt N}$''.
-\item \verb@ ++K @ $B$d(B \verb@ K++ @ $B$O(B {\tt K} $B$r(B 1 $BA}$d$;$H$$$&0UL#$G$"$k(B.
-\verb@ K = K+1 @ $B$H=q$$$F$b$h$$(B.
-$BF1$8$/(B, \verb@ --K @ $B$d(B \verb@ K-- @ $B$O(B {\tt K} $B$r(B 1 $B8:$i$;$H$$$&0UL#$G$"$k(B.
 %en \item The expressions \verb@ ++K @ and \verb@ K++ @ mean increasing 
 %en {\tt K} by $1$.
 %en In this example, it has the same meaning with \verb@ K = K+1 @.
@@ -1141,7 +1138,21 @@ $y$$B:BI8$O2hLL$,2<$X$$$/$[$IBg$-$/$J$k(B.
 16$B?J?t$K$D$$$F$O(B ``asir $B%I%j%k(B'' $B$r;2>H(B.
 $B$3$NNc$G$O(B, R $B@.J,$,(B ff $B$J$N$G(B, $B@V$N@~$r$R$/$3$H$H$J$k(B.
 $B$J$*(B, $B4X?t(B {\tt glib\_putpixel} $B$bF1$8$h$&$K$7$F(B, $B?'$r;XDj$G$-$k(B.
+16$B?J?t$rCN$i$J$$?MMQ$K(B, $B?'$H$=$N(B16$B?J?t$K$h$kI=8=$NBP1~I=$r$"$2$F$*$/(B.
 
+\begin{tabular}{|l|l|}
+\hline 
+0xffffff  & $BGr(B \\ \hline 
+0xffff00  & $B2+(B \\ \hline
+0xff0000  & $B@V(B \\ \hline
+0x00ff00  & $BNP(B \\ \hline 
+0x0000ff  & $B@D(B \\ \hline 
+0x000000  & $B9u(B \\ \hline 
+\end{tabular}
+
+\noindent
+($B$"$H$O;n$7$F2<$5$$(B)
+
 $B$5$F(B, $B?^(B \ref{figure:cond:coord} $B$G8+$?$h$&$K%3%s%T%e!<%?%W%m%0%i%`$N(B
 $B@$3&$G$O(B, $B2hLL$N:8>e$r86E@$K$7$F(B, $B2<$X$$$/$K=>$$(B, $y$ $B:BI8$,A}$($k$h$&$J(B
 $B:BI87O$r$H$k$3$H$,B?$$(B.
@@ -1208,7 +1219,7 @@ for (T=0; T<=deval(2*@pi); T = T+E) {
 \end{screen}
 -----$B%W%m%0%i%`$N2r@b$O$^$@=q$$$F$J$$(B.
 
-$B>e$N%W%m%0%i%`$G$O(B $cos$, $sin$ $B$rMQ$$$F1_$rIA$$$F$$$k(B.
+$B>e$N%W%m%0%i%`$G$O(B $\cos$, $\sin$ $B$rMQ$$$F1_$rIA$$$F$$$k(B.
 $BCf?4(B, $BH>7B$rJQ99$7$?$j(B, $B?'$rJQ99$7$?$j$7$J$,$i$?$/$5$s$N1_$rIA$/$K$O(B,
 $B$I$N$h$&$K$9$l$P$h$$$G$"$m$&$+(B?
 ``$B4X?t(B'' $B$rMQ$$$k$H$=$l$,MF0W$K$G$-$k(B.
@@ -1303,7 +1314,7 @@ $a$ $B$r@5$N?t$H$9$k$H$-(B,
 \end{eqnarray*}
 $B$G$-$^$k?tNs(B $x_0, x_1, x_2, \ldots $ 
 $B$O(B $\sqrt{a}$ $B$K$I$s$I$s6aIU$/$3$H(B($B<}B+$9$k$3$H(B)$B$,CN$i$l$F$$$k(B.
-$a=2$ $B$N;~(B, $x_1, x_2, \ldots, x_4$ $B$r7W;;$9$k%W%m%0%i%`$r=q$$$F$_$h$&(B.
+$a=2$ $B$N;~(B, $x_1, x_2, \ldots, x_4, x_5$ $B$r7W;;$9$k%W%m%0%i%`$r=q$$$F$_$h$&(B.
 %%Prog: cfep/tests/2006-03-11-sqrt.rr
 \begin{screen}
 \begin{verbatim}
@@ -1354,6 +1365,18 @@ $$  \mbox{{\bf $BJQ?tL>(B}} {\tt = }  \mbox{{\bf $B
 $B$3$l$,$O$C$-$jM}2r$G$-(B, $B1~MQLdBj$,<+M3$K2r$1$k$h$&$K$J$C$?(B, $BD6F~LgB46H$G$"$k(B.
 \index{$B$@$$$K$e$&(B@$BBeF~(B}
 
+\begin{problem} \rm
+$BJQ?t(B {\tt I}, {\tt X}, {\tt Y} $B$NCM$O(B {\tt for} $B%k!<%WFb$G$I$N$h$&$K(B
+$BJQ2=$9$k$+(B?
+{\tt Y= (X+A/X)/2} $B$N9T$,<B9T$5$l$kA0$N$3$l$i$NJQ?t$NCM$rI=$K$7$F(B
+$B$^$H$a$h(B.  {\tt print([I,X,Y])} $B$r$O$5$`$3$H$K$h$j$3$NI=$,@5$7$$$3$H$r(B
+$B$?$7$+$a$h(B.
+\end{problem}
+
+\begin{problem} \rm
+$B%W%m%0%i%`$N%P%0(B(bug)$B$H$O$J$K$+(B? 
+\end{problem}
+
 \section{$B1_$rIA$/?tNs(B}
 
 $B?tNs$N7W;;$rMQ$$$k$H(B, $\cos$ $B$d(B $\sin$ $B$N7W;;$r$d$i$:$K1_$rIA$/$3$H$,(B
@@ -1389,10 +1412,20 @@ for (T=0; T<=deval(2*@pi); T = T+E) {
 
 -----$B%W%m%0%i%`$N2r@b$^$@=q$$$F$J$$(B.
 
+$B%R%s%H(B: 
+$BHyJ,J}Dx<0(B $d^2 x/dt^2 = -x, d^2 y/dt^2 = -y$ $B$r(B $t$ $B$r%i%8%"%s$H$7$F(B
+$B:9J,K!$G6a;wE*$K2r$$$F$$$k(B.
+
 $B$3$NOCBj$O(B, $B?tNs$N7W;;$H:9J,J}Dx<0$K$h$k%7%_%e%l!<%7%g%s$KB3$/(B.
 $B$3$l$K$D$$$F$O$^$?9F$r$"$i$?$a$F=q$$$F$_$?$$(B.
 
 $B0J>e$GD6F~Lg$O=*N;$G$"$k(B.  $BB3$-$O(B ``Asir $B%I%j%k(B'' $B$rFI$s$G$M(B. 
+$BFC$KG[Ns$H4X?t$r%^%9%?!<$9$k$H?t3X%W%m%0%i%`$K$O=EJu$9$k(B.
+
+\begin{problem} \rm
+($B%l%]!<%HLdBj$NNc(B) \\
+$B$J$K$+?^$rIA$/%W%m%0%i%`$r=q$-$J$5$$(B. ($BDjHV%I%i%(%b%s$G$b$h$$(B)
+\end{problem}
 
 \chapter{cfep $B>e5iJT(B}