0 | ContFunc(C 0) |
27. Fin = (Fin 0)
0 | Fin(C 0) |
28. Perf ("") , .
0 | Perf(C 0) |
29.Result ("") ...:
0 | Result(C 0) |
30. Fact (. factum "") , (" "); Fact C 0:
0 | Fact(C 0) |
31. Real , (, C 0); Real C 0:
0 | Real(C 0) |
32. Prepar (. preparare "") , ..; Prepar C 0:
0 | Prepar(C 0) |
33. Degrad ("") , ; Degrad 0:
0 | Degrad(C 0) |
34. Imper ("") "":
0 | Imper(C 0) |
! | |
35. Son (. sonum "") 0 (Son C 0):
0 | Son(C 0) |
36. Destr (. destruere "") "" 0: , .
37. (. caput "", "") : , , .
38. Equip : , .
39. Doc : .
40. Attr ("") 0:
0 | Attr(C 0) |
.
AntiReal: , .
AntiMagn: , .
AntiVer: , .
IncepOper: , .
CausOper: , .
LiquOper: , .
IncepFunc: .
LiquFunc: , .
, : , , , , .. .. , , , ( ) , .. . , .
|
|
.
- , . . , .
( ) :
1) , . () , .. ;
2) , , , .. " " (, ); , 1, 2, 3, 4, 5, = 1, 2 D = B 3, B 4, B 5, D;
3) . , . .
.
, ; , , .
(, : 1 , 2 ), .
, .
-
.
1.1 + 2.1 | |||
1. S | 1. S | ||
2. | 2. |
[] ; ; ; [, ]
: .
Gener: [];
V0: ;
S instr: ~ ; ~ [ , . , ];
1: ~ [ ~ , ..]; , [S ] [= Able 1 ()];
Magn: , , , , [ ];
AntiMagn: , , ;
Func (Magn+.): [S ];
Caus Plus: ~ [S], [S ]; ~ [S], [S ] D 1 (Caus Plus) ;
|
|
IncepPlus: , ;
IncepMinus: , ;
Ver: ;
Bon: , , ;
Oper: ~, , ~
( . AntiMagn); -
( . , Magn, Ver, Bon);
CausOper: , ~ [S];
Caus Oper1: ~ [S];
LiguOper: ~ [S];
FinOper: , ~;
: ~ ;
Func: [S]; , [S]; . Anti Magn;
CausFunc: ~ [S], [S]; ~ ; [S];
LiquFunc: , ~ [S] [ ];
IncepFunc: , [S ];
Fin Func: , , [S];
Func: [S];
Fact: , [S]; [S];
AntiFact: , , [S]
CausFact: ~ [S]
Caus Fact: , ~ ( );
LiquFact: ~ [S];
IncepFact: , [S];
FinFact: [S], [S] [ " "];
PerfFact: [S];
Fact: [S], [S];
AntiFact: [S];
Real1: , ~ ;
Real 2: ~ ( , );
AntiReal2: ~ .
., : .
[, ] . [, ] [ ]. . [, , ]. [, ]. [] ; . , , ! [= ]... [] . [, ] . . - : . .
, ?
, ,
.
.
[ ~ ]