miércoles, 27 de julio de 2011

EL METODO ALGORITMO DE SIMPLES PARTE 5


13.Max  Z  =  60X1 + 40X2 + 35X3
            S.a.
                        2X1 +   X2 +   5X3  ≤  200
                        6X1 + 5X2 +   3X3  ≤  84
                        5X1 + 5X2 +   4X3  ≤  100
                                 X1 , X2 , X3    ≥  0
Forma Estandarizada :
         Max  Z  =  60X1 + 40X2 + 35X3 + 0S1 + 0S2 + 0S3
            S.a.
                        2X1 +   X2 +   5X3 + S1                    =  200
                        6X2 + 5X2 +   3X3         + S2            =  84
                        5X3 + 5X2 +   4X3                  + S3   =  100
                                            X1, X2, X3, S1, S2, S3   ≥  0

CJ
60
40
35
0
0
0

CB
XB
Bi
X1
X2
X3
S1
S2
S3
θK
0
S1
200
2
1
5
1
0
0
100
0
S2
84
6
5
3
0
1
0
14
0
S3
100
5
5
4
0
0
1
20

ZJ
0
0
0
0
0
0
0


ZJ         +
CJ
-60
-40
-35
0
0
0

0
S1
172
0
-2/3
4
1
-1/3
0
43
60
X1
14
1
5/6
1/2
0
1/6
0
28
0
S3
30
0
5/6
3/2
0
-5/6
1
20

ZJ
840
60
50
30
0
10
0


ZJ         +
CJ
0
10
-5
0
10
0

0
S1
92
0
-26/9
0
1
17/9
-8/3

60
X1
4
1
5/9
0
0
4/9
-1/3

35
X3
20
0
5/9
1
0
-5/9
2/3


ZJ
940
60
475/9
35
0
65/9
10/3


ZJ         +
CJ
0
115/9
0
0
65/9
10/3

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EL METODO ALGORITMO DE SIMPLES PARTE 4


10.-      Max Z  =  2X1 +  4X2 + X3
S.a.
              X1 + 2X2   X3    5
                        2X1   X2 + 2X3  =  2
                        -X1 + 2X2 + 2X3    1
                           X1 , X2 , X3         0
Forma Estandarizada :
            Max Z  =  2X1 + 4X2 + X3 + 0S1 + 0S3 – MA2 – MA3
S.a.

                          X1 + 2X2   X3 + S1                          =  5
                        2X1   X2 + 2X3        + A2                  =  2
                        -X1 + 2X2 + 2X3                - S3 + A3    =  1
    



CJ
2
4
1
0
0
-M
-M

CB
XB
bI
X1
X2
X3
S3
S1
A1
A2
θ  K
0
S1
5
1
2
-1
0
1
0
0
-
-M
A1
2
2
-1
2
0
0
1
0
1
-M
A2
1
-1
2
2
-1
0
0
1
1/2

ZJ
-3M
-M
-M
-4M
M
0
-M
-M


ZJ     +
CJ
-M - 2
-M - 4
-4M - 1
-M
0
0
0

0
S1
11/2
1/2
3
0
-1/2
1
0
1/2
11
-M
A1
1
3
-3
0
1
0
1
-1
1/3
1
X3
1/2
-1/2
1
1
-1/2
0
0
1/2
-

ZJ
-M +1/2
-3M-1/2
3M+1
1
-M-1/2
0
-M
M+1/2


ZJ     +
CJ
-3M-5/2
3M-3
0
-M-1/2
0
0
2M+1/2
 
0
S1
16/3
0
7/2
0
-2/3
1
-1/6
2/3
32/21
2
X1
1/3
1
-1
0
1/3
0
1/3
-1/3
-
1
X3
2/3
0
1/2
1
-1/3
0
1/6
1/3
4/3

ZJ
4/3
2
-3/2
1
1/3
0
5/6
-1/3


ZJ     +
CJ
0
-11/2
0
1/3
0
M + 5/6
M – 1/3

0
S1
2/3
0
0
-7
5/3
1
-4/3
-5/3
2/5
2
X1
5/3
1
0
2
-1/3
0
2/3
1/3
-
4
X2
4/3
0
1
2
-2/3
0
1/3
2/3
-

ZJ
26/3
2
4
12
-10/3
0
8/3
10/3


ZJ     +
CJ
0
0
11
-10/3
0
M + 8/3
M + 10/3

0
S3
2/5
0
0
-21/5
1
-3/5
-4/5
-1
-
2
X1
9/5
1
0
3/5
0
1/5
2/5
0
3
4
X2
8/5
0
1
-4/5
0
2/5
-1/5
0
-

ZJ
10
2
4
-2
0
2
0
0


ZJ     +
CJ
0
0
-3
0
2
M
M

0
S3
13
7
0
0
8
2
2
-8

1
X3
3
5/3
0
1
0
1/3
2/3
0

4
X2
4
4/3
1
0
0
2/3
1/3
0


ZJ
19
7
4
1
0
3
2
0


ZJ     +
CJ
5
0
0
0
3
M + 2
M

X2 = 4        X3 = 3          S3 = 13       Z  =  19

Max Z  =  2(0) + 4(4) + 1(3) + 0(S1) + 0(13) – M(0) – M(0)  =  19
Max Z  =  19

11.-Max X        =  X1 + 2X2
            S.a.
                            X1 – 4X2    1
                        -3X1 + 2X2    6
                               X1 , X2    0
Forma Estandarizada:
            Max  Z  =  X1 + 2X2 + 0S1 + 0S2
S.a.
               X1 – 4X2 +0S1             =  1
            -3X1 +2X2           +0S2   =  6
                        X1 , X2 , S1 , S2     0

CJ
1
2
0
0

CB
XB
bi
X1
X2
S1
S2
θ K
0
S1
1
1
-4
1
0
-
0
S2
6
-3
2
0
1
3

ZJ
0
0
0
0
0


ZJ    +

CJ
-1
-2
0
0

0
S1
13
-5
0
1
2
-
2
X2
3
-3/2
1
0
1/2
-

ZJ
6
-3
2
0
1


ZJ   +

CJ
-4
0
0
1

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