Min_number = ( 0 ) ; Max_number = ( 5 )
In original model number_of_states = ( 35 ); number_of_transition = ( 70 ) 

Original Transition
0 --- 1  -> (x)
0 --- 4  -> ((-1)*x+(1))
1 --- 2  -> (p11)
1 --- 31  -> ((-1)*p11+(1))
2 --- 7  -> (p21)
2 --- 27  -> ((-1)*p21+(1))
3 --- 6  -> (p31)
3 --- 23  -> ((-1)*p31+(1))
4 --- 8  -> (p41)
4 --- 19  -> ((-1)*p41+(1))
5 --- 6  -> (p51)
5 --- 15  -> ((-1)*p51+(1))
6 --- 10  -> (p61)
6 --- 11  -> ((-1)*p61+(1))
7 --- 1  -> (y2)
7 --- 3  -> ((-1)*y1-y2+(1))
7 --- 5  -> (y1)
8 --- 0  -> (z2)
8 --- 4  -> ((-1)*z1-z2+(1))
8 --- 5  -> (z1)
9 --- 9  -> (1)
10 --- 0  -> (1)
11 --- 10  -> (p62)
11 --- 12  -> ((-1)*p62+(1))
12 --- 10  -> (p63)
12 --- 13  -> ((-1)*p63+(1))
13 --- 10  -> (p64)
13 --- 14  -> ((-1)*p64+(1))
14 --- 9  -> ((-1)*p65+(1))
14 --- 10  -> (p65)
15 --- 6  -> (p52)
15 --- 16  -> ((-1)*p52+(1))
16 --- 6  -> (p53)
16 --- 17  -> ((-1)*p53+(1))
17 --- 6  -> (p54)
17 --- 18  -> ((-1)*p54+(1))
18 --- 6  -> (p55)
18 --- 9  -> ((-1)*p55+(1))
19 --- 8  -> (p42)
19 --- 20  -> ((-1)*p42+(1))
20 --- 8  -> (p43)
20 --- 21  -> ((-1)*p43+(1))
21 --- 8  -> (p44)
21 --- 22  -> ((-1)*p44+(1))
22 --- 8  -> (p45)
22 --- 9  -> ((-1)*p45+(1))
23 --- 6  -> (p32)
23 --- 24  -> ((-1)*p32+(1))
24 --- 6  -> (p33)
24 --- 25  -> ((-1)*p33+(1))
25 --- 6  -> (p34)
25 --- 26  -> ((-1)*p34+(1))
26 --- 6  -> (p35)
26 --- 9  -> ((-1)*p35+(1))
27 --- 7  -> (p22)
27 --- 28  -> ((-1)*p22+(1))
28 --- 7  -> (p23)
28 --- 29  -> ((-1)*p23+(1))
29 --- 7  -> (p24)
29 --- 30  -> ((-1)*p24+(1))
30 --- 7  -> (p25)
30 --- 9  -> ((-1)*p25+(1))
31 --- 2  -> (p12)
31 --- 32  -> ((-1)*p12+(1))
32 --- 2  -> (p13)
32 --- 33  -> ((-1)*p13+(1))
33 --- 2  -> (p14)
33 --- 34  -> ((-1)*p14+(1))
34 --- 2  -> (p15)
34 --- 9  -> ((-1)*p15+(1))


In New Model number of states = ( 47 ); number of transition = ( 84 ) 

New transition
0 --- 1  -> (x)
0 --- 4  -> ((-1)*x+(1))
1 --- 2  -> (p11)
1 --- 31  -> ((-1)*p11+(1))
2 --- 7  -> (p21)
2 --- 27  -> ((-1)*p21+(1))
3 --- 6  -> (p31)
3 --- 23  -> ((-1)*p31+(1))
4 --- 8  -> (p41)
4 --- 19  -> ((-1)*p41+(1))
5 --- 6  -> (p51)
5 --- 15  -> ((-1)*p51+(1))
6 --- 11  -> ((-1)*p61+(1))
7 --- 1  -> (y2)
7 --- 5  -> (y1)
9 --- 9  -> (1)
10 --- 0  -> (1)
11 --- 10  -> (p62)
11 --- 12  -> ((-1)*p62+(1))
12 --- 13  -> ((-1)*p63+(1))
13 --- 10  -> (p64)
13 --- 14  -> ((-1)*p64+(1))
14 --- 9  -> ((-1)*p65+(1))
14 --- 10  -> (p65)
15 --- 16  -> ((-1)*p52+(1))
16 --- 17  -> ((-1)*p53+(1))
17 --- 6  -> (p54)
17 --- 18  -> ((-1)*p54+(1))
18 --- 6  -> (p55)
18 --- 9  -> ((-1)*p55+(1))
19 --- 8  -> (p42)
19 --- 20  -> ((-1)*p42+(1))
20 --- 21  -> ((-1)*p43+(1))
21 --- 8  -> (p44)
21 --- 22  -> ((-1)*p44+(1))
22 --- 8  -> (p45)
22 --- 9  -> ((-1)*p45+(1))
23 --- 6  -> (p32)
23 --- 24  -> ((-1)*p32+(1))
24 --- 6  -> (p33)
24 --- 25  -> ((-1)*p33+(1))
25 --- 6  -> (p34)
25 --- 26  -> ((-1)*p34+(1))
26 --- 6  -> (p35)
26 --- 9  -> ((-1)*p35+(1))
27 --- 7  -> (p22)
27 --- 28  -> ((-1)*p22+(1))
28 --- 7  -> (p23)
28 --- 29  -> ((-1)*p23+(1))
29 --- 7  -> (p24)
29 --- 30  -> ((-1)*p24+(1))
30 --- 7  -> (p25)
31 --- 2  -> (p12)
31 --- 32  -> ((-1)*p12+(1))
32 --- 2  -> (p13)
32 --- 33  -> ((-1)*p13+(1))
33 --- 2  -> (p14)
33 --- 34  -> ((-1)*p14+(1))
34 --- 2  -> (p15)
8 --- 8  -> ( ((-1)*z1-z2+(1)) ) * ( (p41) )
7 --- 35  -> ((-1)*y1-y2+(1))
35 --- 3  -> 1
30 --- 36  -> ((-1)*p25+(1))
36 --- 9  -> 1
34 --- 37  -> ((-1)*p15+(1))
37 --- 9  -> 1
6 --- 38  -> (p61)
38 --- 10  -> 1
8 --- 39  -> (z2)
39 --- 0  -> 1
8 --- 40  -> ( (z1) ) * ( (p51) )
40 --- 6  -> 1
15 --- 41  -> (p52)
41 --- 6  -> 1
8 --- 42  -> ( ((-1)*z1-z2+(1)) ) * ( ((-1)*p41+(1)) )
42 --- 19  -> 1
8 --- 43  -> ( (z1) ) * ( ((-1)*p51+(1)) )
43 --- 15  -> 1
12 --- 44  -> (p63)
44 --- 10  -> 1
16 --- 45  -> (p53)
45 --- 6  -> 1
20 --- 46  -> (p43)
46 --- 8  -> 1


State--Fragment Number--visited--startingPoint--endingPoint
   0          1          true        true          false
   1          1          true        false          false
   2          1          true        false          false
   3          12          true        true          true
   4          1          true        false          true
   5          1          true        false          true
   6          2          true        true          false
   7          1          true        false          false
   8          4          true        true          false
   9          13          true        true          true
   10          14          true        true          true
   11          2          true        false          true
   12          5          true        true          false
   13          5          true        false          true
   14          6          true        true          true
   15          15          true        true          true
   16          7          true        true          false
   17          7          true        false          true
   18          8          true        true          true
   19          16          true        true          true
   20          9          true        true          false
   21          9          true        false          true
   22          10          true        true          true
   23          17          true        true          true
   24          18          true        true          true
   25          19          true        true          true
   26          20          true        true          true
   27          1          true        false          false
   28          1          true        false          false
   29          1          true        false          false
   30          1          true        false          false
   31          1          true        false          false
   32          1          true        false          false
   33          1          true        false          false
   34          1          true        false          false
   35          1          true        false          true
   36          1          true        false          true
   37          1          true        false          true
   38          2          true        false          true
   39          4          true        false          true
   40          4          true        false          true
   41          11          true        true          true
   42          4          true        false          true
   43          4          true        false          true
   44          5          true        false          true
   45          7          true        false          true
   46          9          true        false          true

This is transition in Fragment (1) 
    [0, 1]  (x)
    [0, 4]  ((-1)*x+(1))
    [1, 2]  (p11)
    [1, 31]  ((-1)*p11+(1))
    [2, 7]  (p21)
    [2, 27]  ((-1)*p21+(1))
    [7, 1]  (y2)
    [7, 5]  (y1)
    [27, 7]  (p22)
    [27, 28]  ((-1)*p22+(1))
    [28, 7]  (p23)
    [28, 29]  ((-1)*p23+(1))
    [29, 7]  (p24)
    [29, 30]  ((-1)*p24+(1))
    [30, 7]  (p25)
    [31, 2]  (p12)
    [31, 32]  ((-1)*p12+(1))
    [32, 2]  (p13)
    [32, 33]  ((-1)*p13+(1))
    [33, 2]  (p14)
    [33, 34]  ((-1)*p14+(1))
    [34, 2]  (p15)
    [7, 35]  ((-1)*y1-y2+(1))
    [30, 36]  ((-1)*p25+(1))
    [34, 37]  ((-1)*p15+(1))
    [4, 4]  1
    [5, 5]  1
    [35, 35]  1
    [36, 36]  1
    [37, 37]  1

This is transition in Fragment (2) 
    [6, 11]  ((-1)*p61+(1))
    [6, 38]  (p61)
    [11, 11]  1
    [38, 38]  1

This is transition in Fragment (3) 

This is transition in Fragment (4) 
    [8, 8]  ( ((-1)*z1-z2+(1)) ) * ( (p41) )
    [8, 39]  (z2)
    [8, 40]  ( (z1) ) * ( (p51) )
    [8, 42]  ( ((-1)*z1-z2+(1)) ) * ( ((-1)*p41+(1)) )
    [8, 43]  ( (z1) ) * ( ((-1)*p51+(1)) )
    [39, 39]  1
    [40, 40]  1
    [42, 42]  1
    [43, 43]  1

This is transition in Fragment (5) 
    [12, 13]  ((-1)*p63+(1))
    [12, 44]  (p63)
    [13, 13]  1
    [44, 44]  1

This is transition in Fragment (6) 
    [14, 14]  1

This is transition in Fragment (7) 
    [16, 17]  ((-1)*p53+(1))
    [16, 45]  (p53)
    [17, 17]  1
    [45, 45]  1

This is transition in Fragment (8) 
    [18, 18]  1

This is transition in Fragment (9) 
    [20, 21]  ((-1)*p43+(1))
    [20, 46]  (p43)
    [21, 21]  1
    [46, 46]  1

This is transition in Fragment (10) 
    [22, 22]  1

This is transition in Fragment (11) 
    [41, 41]  1

This is transition in Fragment (12) 
    [3, 3]  1

This is transition in Fragment (13) 
    [9, 9]  1

This is transition in Fragment (14) 
    [10, 10]  1

This is transition in Fragment (15) 
    [15, 15]  1

This is transition in Fragment (16) 
    [19, 19]  1

This is transition in Fragment (17) 
    [23, 23]  1

This is transition in Fragment (18) 
    [24, 24]  1

This is transition in Fragment (19) 
    [25, 25]  1

This is transition for abstract model 
    [3, 6]  (p31)
    [3, 23]  ((-1)*p31+(1))
    [4, 8]  ( (p41) ) * ( prob_f1_s4 )
    [4, 19]  ( ((-1)*p41+(1)) ) * ( prob_f1_s4 )
    [5, 6]  ( (p51) ) * ( prob_f1_s5 )
    [5, 15]  ( ((-1)*p51+(1)) ) * ( prob_f1_s5 )
    [9, 9]  (1)
    [10, 0]  (1)
    [11, 10]  ( (p62) ) * ( prob_f2_s11 )
    [11, 12]  ( ((-1)*p62+(1)) ) * ( prob_f2_s11 )
    [13, 10]  ( (p64) ) * ( prob_f5_s13 )
    [13, 14]  ( ((-1)*p64+(1)) ) * ( prob_f5_s13 )
    [14, 9]  ((-1)*p65+(1))
    [14, 10]  (p65)
    [15, 16]  ((-1)*p52+(1))
    [17, 6]  ( (p54) ) * ( prob_f7_s17 )
    [17, 18]  ( ((-1)*p54+(1)) ) * ( prob_f7_s17 )
    [18, 6]  (p55)
    [18, 9]  ((-1)*p55+(1))
    [19, 8]  (p42)
    [19, 20]  ((-1)*p42+(1))
    [21, 8]  ( (p44) ) * ( prob_f9_s21 )
    [21, 22]  ( ((-1)*p44+(1)) ) * ( prob_f9_s21 )
    [22, 8]  (p45)
    [22, 9]  ((-1)*p45+(1))
    [23, 6]  (p32)
    [23, 24]  ((-1)*p32+(1))
    [24, 6]  (p33)
    [24, 25]  ((-1)*p33+(1))
    [25, 6]  (p34)
    [25, 26]  ((-1)*p34+(1))
    [26, 6]  (p35)
    [26, 9]  ((-1)*p35+(1))
    [35, 3]  ( 1 ) * ( prob_f1_s35 )
    [36, 9]  ( 1 ) * ( prob_f1_s36 )
    [37, 9]  ( 1 ) * ( prob_f1_s37 )
    [38, 10]  ( 1 ) * ( prob_f2_s38 )
    [39, 0]  ( 1 ) * ( prob_f4_s39 )
    [40, 6]  ( 1 ) * ( prob_f4_s40 )
    [15, 41]  (p52)
    [41, 6]  1
    [42, 19]  ( 1 ) * ( prob_f4_s42 )
    [43, 15]  ( 1 ) * ( prob_f4_s43 )
    [44, 10]  ( 1 ) * ( prob_f5_s44 )
    [45, 6]  ( 1 ) * ( prob_f7_s45 )
    [46, 8]  ( 1 ) * ( prob_f9_s46 )
****************************The expressions start from here; Copying following expressions to MATLAB; Providing values for the parameters needed; Checking the result of <Output_abstract_model> ******
P1_0_1 = ((x)); 
P1_0_2 = (((-1)*x+(1))); 
P1_1_3 = ((p11)); 
P1_1_4 = (((-1)*p11+(1))); 
P1_2_5 = ((p21)); 
P1_2_6 = (((-1)*p21+(1))); 
P1_7_7 = ((y2)); 
P1_7_8 = ((y1)); 
P1_7_23 = (((-1)*y1-y2+(1))); 
P1_27_9 = ((p22)); 
P1_27_10 = (((-1)*p22+(1))); 
P1_28_11 = ((p23)); 
P1_28_12 = (((-1)*p23+(1))); 
P1_29_13 = ((p24)); 
P1_29_14 = (((-1)*p24+(1))); 
P1_30_15 = ((p25)); 
P1_30_24 = (((-1)*p25+(1))); 
P1_31_16 = ((p12)); 
P1_31_17 = (((-1)*p12+(1))); 
P1_32_18 = ((p13)); 
P1_32_19 = (((-1)*p13+(1))); 
P1_33_20 = ((p14)); 
P1_33_21 = (((-1)*p14+(1))); 
P1_34_22 = ((p15)); 
P1_34_25 = (((-1)*p15+(1))); 

prob_f1_s4  =( (P1_0_2)/(1)); 
prob_f1_s5  =( (-1 * ((P1_0_1) * (P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_8*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_8*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_8+P1_1_4*P1_2_6*P1_31_16*P1_7_8*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_8*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_8*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_5*P1_31_17*P1_7_8*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_8*P1_27_9*P1_32_18+P1_1_3*P1_2_6*P1_7_8*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_3*P1_2_5*P1_7_8+P1_1_3*P1_2_6*P1_7_8*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_6*P1_7_8*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_8*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_8*P1_27_9)))/(P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_5*P1_7_7+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_7+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_21*P1_34_22+P1_1_3*P1_2_6*P1_7_7*P1_27_9+(-1))); 
prob_f1_s35  =( (-1 * ((P1_0_1) * (P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_23*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_23*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_23+P1_1_4*P1_2_6*P1_31_16*P1_7_23*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_23*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_23*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_5*P1_31_17*P1_7_23*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_23*P1_27_9*P1_32_18+P1_1_3*P1_2_6*P1_7_23*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_3*P1_2_5*P1_7_23+P1_1_3*P1_2_6*P1_7_23*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_6*P1_7_23*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_23*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_23*P1_27_9)))/(P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_5*P1_7_7+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_7+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_21*P1_34_22+P1_1_3*P1_2_6*P1_7_7*P1_27_9+(-1))); 
prob_f1_s36  =( (-1 * ((P1_0_1) * (P1_1_4*P1_2_6*P1_31_17*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_24+P1_1_4*P1_2_6*P1_31_17*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_24+P1_1_4*P1_2_6*P1_31_17*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_24+P1_1_3*P1_2_6*P1_27_10*P1_28_12*P1_29_14*P1_30_24+P1_1_4*P1_2_6*P1_31_16*P1_27_10*P1_28_12*P1_29_14*P1_30_24)))/(P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_5*P1_7_7+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_7+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_21*P1_34_22+P1_1_3*P1_2_6*P1_7_7*P1_27_9+(-1))); 
prob_f1_s37  =( (-1 * ((P1_0_1) * (P1_1_4*P1_31_17*P1_32_19*P1_33_21*P1_34_25)))/(P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_14*P1_34_22*P1_30_15+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_11+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_3*P1_2_5*P1_7_7+P1_1_3*P1_2_6*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_11+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_18+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_18*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_13+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_20+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_20*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_9+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_11+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_13+P1_1_4*P1_2_5*P1_31_16*P1_7_7+P1_1_4*P1_2_6*P1_31_16*P1_7_7*P1_27_10*P1_28_12*P1_29_14*P1_30_15+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_9*P1_32_19*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_11*P1_33_21*P1_34_22+P1_1_4*P1_2_6*P1_31_17*P1_7_7*P1_27_10*P1_32_19*P1_28_12*P1_33_21*P1_29_13*P1_34_22+P1_1_4*P1_2_5*P1_31_17*P1_7_7*P1_32_19*P1_33_21*P1_34_22+P1_1_3*P1_2_6*P1_7_7*P1_27_9+(-1))); 
P2_6_1 = (((-1)*p61+(1))); 
P2_6_2 = ((p61)); 

prob_f2_s11  =( (P2_6_1)/(1)); 
prob_f2_s38  =( (P2_6_2)/(1)); 
P4_8_1 = (( ((-1)*z1-z2+(1)) ) * ( (p41) )); 
P4_8_2 = ((z2)); 
P4_8_3 = (( (z1) ) * ( (p51) )); 
P4_8_4 = (( ((-1)*z1-z2+(1)) ) * ( ((-1)*p41+(1)) )); 
P4_8_5 = (( (z1) ) * ( ((-1)*p51+(1)) )); 

prob_f4_s39  =( (-1 * (P4_8_2))/(P4_8_1+(-1))); 
prob_f4_s40  =( (-1 * (P4_8_3))/(P4_8_1+(-1))); 
prob_f4_s42  =( (-1 * (P4_8_4))/(P4_8_1+(-1))); 
prob_f4_s43  =( (-1 * (P4_8_5))/(P4_8_1+(-1))); 
P5_12_1 = (((-1)*p63+(1))); 
P5_12_2 = ((p63)); 

prob_f5_s13  =( (P5_12_1)/(1)); 
prob_f5_s44  =( (P5_12_2)/(1)); 
P7_16_1 = (((-1)*p53+(1))); 
P7_16_2 = ((p53)); 

prob_f7_s17  =( (P7_16_1)/(1)); 
prob_f7_s45  =( (P7_16_2)/(1)); 
P9_20_1 = (((-1)*p43+(1))); 
P9_20_2 = ((p43)); 

prob_f9_s21  =( (P9_20_1)/(1)); 
prob_f9_s46  =( (P9_20_2)/(1)); 
PX_0_3 = (( (p41) ) * ( prob_f1_s4 )); 
PX_0_4 = (( ((-1)*p41+(1)) ) * ( prob_f1_s4 ));
PX_0_5 = (( (p51) ) * ( prob_f1_s5 ));
PX_0_6 = (( ((-1)*p51+(1)) ) * ( prob_f1_s5 ));
PX_0_34 = (( 1 ) * ( prob_f1_s35 ));
PX_0_35 = ( ( 1 ) * ( prob_f1_s36 ) + ( 1 ) * ( prob_f1_s37 ) );
PX_1_9 = ( ( (p62) ) * ( prob_f2_s11 ) + ( 1 ) * ( prob_f2_s38 ) ); 
PX_1_10 = (( ((-1)*p62+(1)) ) * ( prob_f2_s11 ));
PX_3_36 = (( 1 ) * ( prob_f4_s39 )); 
PX_3_37 = (( 1 ) * ( prob_f4_s40 ));
PX_3_40 = (( 1 ) * ( prob_f4_s42 ));
PX_3_41 = (( 1 ) * ( prob_f4_s43 ));
PX_4_11 = ( ( (p64) ) * ( prob_f5_s13 ) + ( 1 ) * ( prob_f5_s44 ) ); 
PX_4_12 = (( ((-1)*p64+(1)) ) * ( prob_f5_s13 ));
PX_5_13 = (((-1)*p65+(1))); 
PX_5_14 = ((p65));
PX_6_16 = ( ( (p54) ) * ( prob_f7_s17 ) + ( 1 ) * ( prob_f7_s45 ) ); 
PX_6_17 = (( ((-1)*p54+(1)) ) * ( prob_f7_s17 ));
PX_7_18 = ((p55)); 
PX_7_19 = (((-1)*p55+(1)));
PX_8_22 = ( ( (p44) ) * ( prob_f9_s21 ) + ( 1 ) * ( prob_f9_s46 ) ); 
PX_8_23 = (( ((-1)*p44+(1)) ) * ( prob_f9_s21 ));
PX_9_24 = ((p45)); 
PX_9_25 = (((-1)*p45+(1)));
PX_10_39 = (1); 
PX_11_1 = ((p31)); 
PX_11_2 = (((-1)*p31+(1)));
PX_12_7 = ((1)); 
PX_13_8 = ((1)); 
PX_14_15 = (((-1)*p52+(1))); 
PX_14_38 = ((p52));
PX_15_20 = ((p42)); 
PX_15_21 = (((-1)*p42+(1)));
PX_16_26 = ((p32)); 
PX_16_27 = (((-1)*p32+(1)));
PX_17_28 = ((p33)); 
PX_17_29 = (((-1)*p33+(1)));
PX_18_30 = ((p34)); 
PX_18_31 = (((-1)*p34+(1)));
PX_19_32 = ((p35)); 
PX_19_33 = (((-1)*p35+(1)));

Output_abstract_model =( (PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_12*PX_6_17*PX_9_24*PX_5_14*PX_7_18+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_10*PX_8_22*PX_4_11+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_11*PX_6_16*PX_9_24+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_15*PX_4_11*PX_6_16+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_11*PX_6_16+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_38*PX_8_22*PX_4_11+(-1)*PX_0_6*PX_1_10*PX_14_38*PX_4_12*PX_5_14+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_38*PX_8_22*PX_4_12*PX_5_14+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_11*PX_6_17*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_15*PX_8_23*PX_6_16*PX_9_24+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_38*PX_8_23*PX_4_12*PX_9_24*PX_5_14+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_38*PX_4_12*PX_5_14+(-1)*PX_0_3*PX_3_37*PX_1_9+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_9*PX_8_23*PX_9_24+(-1)*PX_0_5*PX_1_10*PX_4_12*PX_5_14+PX_0_5*PX_3_40*PX_15_21*PX_1_10*PX_8_22*PX_4_12*PX_5_14+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_38*PX_8_23*PX_9_24+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_15*PX_8_23*PX_6_17*PX_9_24*PX_7_18+PX_0_5*PX_3_40*PX_15_21*PX_1_10*PX_8_23*PX_4_12*PX_9_24*PX_5_14+PX_0_5*PX_3_40*PX_15_20*PX_1_10*PX_4_12*PX_5_14+(-1)*PX_0_3*PX_3_37*PX_1_10*PX_4_11+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_11*PX_6_16*PX_9_24+(-1)*PX_0_6*PX_1_10*PX_14_15*PX_4_12*PX_6_16*PX_5_14+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_12*PX_6_16*PX_5_14+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_10*PX_8_23*PX_4_11*PX_9_24+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_38*PX_8_23*PX_4_11*PX_9_24+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_12*PX_6_16*PX_9_24*PX_5_14+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_15*PX_4_12*PX_6_16*PX_5_14+(-1)*PX_0_3*PX_3_41*PX_1_9*PX_14_38+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_11*PX_6_17*PX_9_24*PX_7_18+(-1)*PX_0_6*PX_1_9*PX_14_15*PX_6_17*PX_7_18+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_15*PX_8_22*PX_6_17*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_15*PX_4_12*PX_6_16*PX_5_14+(-1)*PX_0_4*PX_3_37*PX_15_20*PX_1_10*PX_4_12*PX_5_14+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_15*PX_8_23*PX_6_17*PX_9_24*PX_7_18+PX_0_6*PX_3_40*PX_15_20*PX_1_9*PX_14_15*PX_6_17*PX_7_18+(-1)*PX_0_3*PX_3_37*PX_1_10*PX_4_12*PX_5_14+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_38*PX_4_12*PX_5_14+(-1)*PX_0_6*PX_1_9*PX_14_38+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_38*PX_8_22+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_15*PX_4_12*PX_6_17*PX_5_14*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_9*PX_14_15*PX_6_16+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_38*PX_8_23*PX_9_24+PX_0_6*PX_3_40*PX_15_20*PX_1_9*PX_14_38+(-1)*PX_0_3*PX_3_41*PX_1_9*PX_14_15*PX_6_16+(-1)*PX_0_4*PX_3_37*PX_15_20*PX_1_9+(-1)*PX_0_5*PX_1_9+PX_0_5*PX_3_40*PX_15_21*PX_1_9*PX_8_22+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_9*PX_14_38+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_9*PX_14_15*PX_6_17*PX_7_18+PX_0_5*PX_3_40*PX_15_21*PX_1_9*PX_8_23*PX_9_24+PX_0_5*PX_3_40*PX_15_20*PX_1_9+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_38*PX_4_11+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_15*PX_4_11*PX_6_16+(-1)*PX_0_6*PX_1_9*PX_14_15*PX_6_16+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_15*PX_8_22*PX_6_16+(-1)*PX_0_4*PX_3_37*PX_15_20*PX_1_10*PX_4_11+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_38*PX_4_11+PX_0_6*PX_3_40*PX_15_21*PX_1_9*PX_14_15*PX_8_23*PX_6_16*PX_9_24+PX_0_6*PX_3_40*PX_15_20*PX_1_9*PX_14_15*PX_6_16+(-1)*PX_0_3*PX_3_41*PX_1_9*PX_14_15*PX_6_17*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_20*PX_1_10*PX_14_15*PX_4_11*PX_6_17*PX_7_18+(-1)*PX_0_6*PX_1_10*PX_14_15*PX_4_11*PX_6_17*PX_7_18+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_11*PX_6_17*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_12*PX_6_16*PX_5_14+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_10*PX_8_22*PX_4_12*PX_5_14+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_11*PX_6_17*PX_9_24*PX_7_18+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_15*PX_4_11*PX_6_17*PX_7_18+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_15*PX_4_11*PX_6_16+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_38*PX_8_22*PX_4_12*PX_5_14+(-1)*PX_0_6*PX_1_10*PX_14_38*PX_4_11+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_38*PX_8_22*PX_4_11+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_12*PX_6_17*PX_5_14*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_15*PX_8_22*PX_6_16+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_38*PX_8_23*PX_4_11*PX_9_24+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_38*PX_4_11+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_38*PX_4_12*PX_5_14+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_9*PX_8_22+(-1)*PX_0_5*PX_1_10*PX_4_11+PX_0_5*PX_3_40*PX_15_21*PX_1_10*PX_8_22*PX_4_11+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_38*PX_8_22+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_9*PX_14_15*PX_8_22*PX_6_17*PX_7_18+PX_0_5*PX_3_40*PX_15_21*PX_1_10*PX_8_23*PX_4_11*PX_9_24+PX_0_5*PX_3_40*PX_15_20*PX_1_10*PX_4_11+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_15*PX_4_11*PX_6_17*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_12*PX_6_16*PX_9_24*PX_5_14+(-1)*PX_0_6*PX_1_10*PX_14_15*PX_4_12*PX_6_17*PX_5_14*PX_7_18+PX_0_6*PX_3_40*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_12*PX_6_17*PX_5_14*PX_7_18+(-1)*PX_0_4*PX_3_37*PX_15_21*PX_1_10*PX_8_23*PX_4_12*PX_9_24*PX_5_14+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_38*PX_8_23*PX_4_12*PX_9_24*PX_5_14+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_22*PX_4_11*PX_6_16+PX_0_6*PX_3_40*PX_15_20*PX_1_10*PX_14_15*PX_4_12*PX_6_17*PX_5_14*PX_7_18+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_15*PX_4_12*PX_6_16*PX_5_14+(-1)*PX_0_6*PX_1_10*PX_14_15*PX_4_11*PX_6_16+(-1)*PX_0_3*PX_3_41*PX_1_10*PX_14_15*PX_4_12*PX_6_17*PX_5_14*PX_7_18+(-1)*PX_0_4*PX_3_41*PX_15_21*PX_1_10*PX_14_15*PX_8_23*PX_4_12*PX_6_17*PX_9_24*PX_5_14*PX_7_18)/(PX_0_4*PX_3_36*PX_15_21*PX_8_23*PX_9_24+PX_0_3*PX_3_36+PX_3_40*PX_15_20+PX_3_40*PX_15_21*PX_8_23*PX_9_24+PX_0_4*PX_3_36*PX_15_21*PX_8_22+PX_0_4*PX_3_36*PX_15_20+PX_3_40*PX_15_21*PX_8_22+(-1))); 
