$B;X<($5$l$?(B anything $B$N%3!<%k$r(B, $B9=@.MWAG$N%Q!<%H$KJ,2r$7$^$9(B.
$B;X<($5$l$?%Q!<%H$NA0$^$G(B anything $B$N%3!<%k$rIaDL$K9T$$(B;
$B$=$7$F(B, $B;X<($5$l$?(B CONCEPT $B$G;X<($5$l$?%Q!<%H$r9T$$(B,
$B$=$7$F(B anything $B$N%3!<%k$N;D$j$N%Q!<%H$rIaDL$K9T$$$^$9(B.
$BCm
$B;X<($5$l$?(B CONCEPT $B$r;X<($5$l$?%Q!<%H$@$1$K;H$$$^$9(B. $B$9$J$o$A(B,
- Secondly: $B;X<($5$l$?%3%s%;%W%H$r(B 2 $BHVL\(B (second) $B$N%Q!<%H$@$1$K;H$$$^$9(B.
- Thirdly: $B;X<($5$l$?%3%s%;%W%H$r(B 3 $BHVL\(B (third) $B$N%Q!<%H$@$1$K;H$$$^$9(B.
- Fourthly: $B;X<($5$l$?%3%s%;%W%H$r(B 4 $BHVL\(B (fourth) $B$N%Q!<%H$@$1$K;H$$$^$9(B.
$B$^$?2DG=$G$9$,$[$H$s$I;H$o$l$J$$$b$N$H$7$F(B: Fifthly, Sixthly, Seventhly
($BNc$($P(B, Seventhly Twisted Eight Chain Thru) $B$,$"$j$^$9(B.
5 $B0J>e$N%Q!<%H$N%3!<%k$O(B, $B$H$F$b>/$J$$$G$9(B.
$B%3!<%k$r9T$$(B, $B;X<($5$l$?%Q!<%H$H$J$C$?$i(B, re-evaluate ($B:FI>2A(B, $B8+D>$9$3$H(B) $B$r$7(B,
$B;X<($5$l$?(B CONCEPT $B$G;X<($5$l$?%Q!<%H$r9T$$(B,
$B$=$7$F(B, $B7k2L$N(B formation $B$G$N<+J,$N0LCV$r(B re-evaluate $B$7$F(B,
$B%3!<%k$N;D$j$r9T$$$^$9(B.
Secondly | Thirdly | Fourthly $B$O(B Meta Concept $B$G$9(B.
Meta Concept $B$Nanything $B$,C1$J$k%3!<%k$N$H$-(B,
Secondly anything $B$H%3!<%k$9$k$3$H$O$G$-$^$;$s(B.
$B%3!<%i!<$O(B, Secondly $B$N8e$K(B concept $B$r;X<($7$J$1$l$P$J$j$^$;$s(B.
$B;X<($5$l$?(B concept $B$,(B concept $B$G$J$$$h$&$K46$8$k$3$H$b$"$j$^$9(B.
$BNc$($P(B, Secondly Boys $B$d(B Thirdly Twice $B$G$9(B.
Secondly|Thirdly|Fourthly $B$NL\E*$K$h$j(B,
$B%3!<%k$r=$>~$9$k$b$N$OA4$F(B concept $B$H9M$($^$9(B.
$B$3$l$i$K$O(B, $B?M$N;X<((B
($BNc$($P(B, Boys, Girls, Ends, Centers, Leaders, Trailers, Beaus, Belles, Heads, Sides);
formations ($BNc$($P(B, Triple Box); $B?t(B ($BNc$($P(B, twice, 1 & 1/2, 2/3);
$B$=$NB>(B ($BNc$($P(B, Transfer And, Tally Ho But) $B$J$I$,$"$j$^$9(B.
$B;X<($5$l$?%Q!<%H$NA0$HD>8e$G(B, $B;X<($5$l$?(B concept $B$K$h$j(B,
$B<+J,$N0LCV$r(B re-evaluate ($B:FI>2A(B, $B8+D>$9$3$H(B) $B$9$k$3$H$,Bg@Z$G$9(B.
$B9M$($b$D$+$J$$?M$d(B formation $B$GF0$/$3$H$K$J$k$3$H$,$"$j$^$9(B.
| Secondly Tandem Reset $B$NA0(B | |
| |
| |
| |
| 1/2 Zoom $B$N8e(B (1/4) | | Tandem Hinge $B$N8e(B (1/2) | | 1/2 Zoom $B$N8e(B (3/4) | | Hinge $B$N8e(B ($B=*$o$j(B) |
|
| Thirdly Tandem Reset $B$NA0(B | |
| |
| 1/2 Zoom $B$N8e(B (1/4) | | Hinge $B$N8e(B (1/2) | |
| |
| Tandem 1/2 Zoom $B$N8e(B (3/4) | | Hinge $B$N8e(B ($B=*$o$j(B) |
|
| |
| |
| Fourthly Tandem Swing The Fractions $B$NA0(B | | Right Arm Turn 1/4 $B$N8e(B (1/5) | | Left Arm Turn 1/2 $B$N8e(B (2/5) | |
| |
| |
| Right Arm Turn 3/4 $B$N8e(B (3/5) | | Tandem Left Arm Turn 1/2 $B$N8e(B (4/5) | | Right Arm Turn 1/4 $B$N8e(B ($B=*$o$j(B) |
|
Initially Concept [C3A] (Vic Ceder 1994):
$B;X<($5$l$?(B anything $B$N%3!<%k$N;O$a$N%Q!<%H$r(B,
$B;X<($5$l$?(B CONCEPT $B$G9T$$(B;
anything $B$N%3!<%k$N;D$j$O(B, $B;X<($5$l$?(B CONCEPT
$B$r;H$o$:$K9T$$$^$9(B.
Finally Concept [C3A] (Vic Ceder 1994):
$B;X<($5$l$?(B anything $B$N%3!<%k$NA4BN$r9T$$$^$9$,(B;
$B;X<($5$l$?(B CONCEPT $B$O(B,
$B;X<($5$l$?(B anything $B$N%3!<%k$N:G8e$N%Q!<%H$@$1$K;H$$$^$9(B.
Oddly Concept [C3B] (Vic Ceder):
$B;X<($5$l$?%3!<%k$N4q?t%Q!<%H$O(B, $B;X<($5$l$?(B CONCEPT $B$G9T$$(B;
$B6v?t$N%Q!<%H$OIaDL$K9T$$$^$9(B.
Evenly CONCEPT [C3B] (Vic Ceder):
$B;X<($5$l$?%3!<%k$N6v?t%Q!<%H$O(B, $B;X<($5$l$?(B CONCEPT $B$G9T$$(B;
$B4q?t$N%Q!<%H$OIaDL$K9T$$$^$9(B.
Initially | Secondly | etc Use A(n) anything1 For A(n) anything2 [C4]:
$B;X<($5$l$?(B anything2 $B$N%3!<%k$N;X<($5$l$?%Q!<%H$r(B,
$B;X<($5$l$?(B anything1 $B$N%3!<%k$G(B replace $B$7$^$9(B.
$BNc$($P(B, $B1&Thirdly Use An Ah So for a Swing The Fractions $B$O(B: all
Right Arm Turn 1/4; those who can left Arm Turn 1/2; everybody Ah So; those who
can Left Arm Turn 1/2; all Right Arm Turn 1/4 $B$G$9(B.
$BAppendix C: Calls with Parts