Supplement to Health impact assessment and cost‒benefit analysis: Exploring complementarities of methods to assess the impacts of regulations on food consumption

In[1]:= p1T 10.4
p2S 2.7
qT 60144810
qS 19665319
BT 1.11 qT p1T
GG 0.02 qS p1T
AT qT BT p1T GG p2S
BSS 1.23 qS p2S
ASS qS BSS p2S GG p1T
Valx Simpli ya , be , g, as, bes.
Sol eAT  a bes as g

bes be g2,BT bes

bes be g2,GG g

bes be g2,
ASS  as be a g

bes be g2, BSS  be

bes be g2,a , be , g, as, bes;
a Valx1, 1
be Valx1, 2
gValx1, 3
as Valx1, 4
bes Valx1, 5
deH 0.19
delR 0.12
HdeH p2S
RdelR p1T
pT 10.4;
pS 2.7;
MEATCONSUMERSONLY
qBB 1018757395
BTmm 1.11 qBB p1T
zzGE BTmm GG BT
AMz qBB BTmm p1T zzGE p2S
BLL BTmm BSS BT
ALLz 0BLL p2S zzGE p1T
Mxx Simpli yamm, bmm, gmm, ale, ble.
Sol eAMz  amm ble ale gmm

ble bmm gmm2, BTmm  ble

ble bmm gmm2, zzGE  gmm

ble bmm gmm2,
ALLz  ale bmm amm gmm

ble bmm gmm2, BLL  bmm

ble bmm gmm2,amm, bmm, gmm, ale, ble;
amm Mxx1, 1
bmm Mxx1, 2
gmm Mxx1, 3
ale Mxx1, 4
ble Mxx1, 5
Wel a eViandeLen ille
e 2 as xeqS pS sxeqS bes xeqS2

2
a xeqT 
pT  xeqT be xeqT2

2
g xeqT xeqS HxeqS RxeqT;
ee1i a be xT gxS;
Ma hema ica-Mea -Len illes-OK.nb 1
ee2i as bes xS gxT;
uxi Simpli yxT, xS. Sol eee1i pT  , ee2i pS s,xT, xS;
Weli Simpli ye 2 .xeqT  uxi1, 1, xeqS  uxi1, 2;
Wel a e o Mea Only
e 33 ale xeqSUU pS sxeqSUU ble xeqSUU2

2
amm xeqTXX 
pT  xeqTXX bmm xeqTXX2

2
gmm xeqTXX xeqSUU HxeqSUU RxeqTXX;
ee1Y amm bmm xT gmm xSs;
ee2Y ale ble xSs gmm xT ;
uxiVV Simpli yxT , xSs. Sol eee1Y pT  , ee2Y pS s,xT , xSs;
Weli33 Simpli ye 33 .xeqTXX  uxiVV1, 1, xeqSUU  uxiVV1, 2;
Budge
ax1  uxi1, 1  uxiVV1, 1 suxi1, 2 suxiVV1, 2
Wel a e
welp Simpli yWeli Weli33  ax1
ECOWELFARE
Op iTAXSub en ion
uSp  , s. Sol eDwelp , 0, Dwelp , s0, , s
wel a e axe
welFIFI Nwelp . R, s H
Wel a esans ien
welFx Nwelp . 0, s 0
Va ia ion Quan i e
ian Nuxi1, 1 uxiVV1, 1 . R, s H;
len Nuxi1, 2 uxiVV1, 2 . R, s H;
iande
a i iande  ian qT qBB
ela  a i iande qT qBB
len ille
a ilen len qS
ela2  a ilen qS
Va ia ionwel a e
del NwelFIFI welFx
al33 del welFx
Wel a eDaly
xeqTyy qT 0.7;
xeqSyy qS qT 0.3;
e 2yy as xeqSyy pSxeqSyy bes xeqSyy2

2
a xeqTyy 
pTxeqTyy be xeqTyy2

2
g xeqTyy xeqSyy HxeqSyy RxeqTyy;
xeqTXXxx qBB 0.7;
xeqSUUxx qBB 0.3;
e 33yy ale xeqSUUxx pSxeqSUUxx ble xeqSUUxx2

2
amm xeqTXXxx 
pTxeqTXXxx bmm xeqTXXxx2

2
gmm xeqTXXxx xeqSUUxx HxeqSUUxx RxeqTXXxx;
WWW e 2yy e 33yy
Va ia ion Quan i e
iande
cc qT 0.3 qBB 0.3
Ma hema ica-Mea -Len illes-OK.nb 2
len ille
qT 0.3 qBB 0.3
ela  qS
Va ia ionwel a e
del 22 ExpandWWW welFx
ela del 22 welFx
Ou [1]= 10.4
Ou [2]= 2.7
Ou [3]= 60144810
Ou [4]= 19665319
Ou [5]= 6.4193 106
Ou [6]= 37817.9
Ou [7]= 1.26803 108
Ou [8]= 8.95865 106
Ou [9]= 4.34604 107
Ou [11]= 19.7825
Ou [12]= 1.55784 107
Ou [13]= 6.57625 1010
Ou [14]= 4.93473
Ou [15]= 1.11627 107
Ou [16]= 0.19
Ou [17]= 0.12
Ou [18]= 0.513
Ou [19]= 1.248
Ou [22]= MEATCONSUMERSONLY
Ou [23]= 1018757395
Ou [24]= 1.08733 108
Ou [25]= 640575.
Ou [26]= 2.14785 109
Ou [27]= 1.51745 108
Ou [28]= 4.0305 108
Ou [30]= 19.7696
Ma hema ica-Mea -Len illes-OK.nb 3
Ou [31]= 9.19709 109
Ou [32]= 3.88245 1011
Ou [33]= 2.73955
Ou [34]= 6.59016 109
Ou [35]= Wel a eViandeLen ille
Gene al::spell1:
Possible spelling e o : new symbol name "xeqT" is simila o exis ing symbol "xeqS". Plus…
Ou [41]= Wel a e o Mea Only
Ou [47]= Budge
Ou [48]= 1.01876 109640575. s 1.08733 108  6.01448 10737817.9 s 6.4193 106  
s1.96653 1078.95865 106s37817.9 
s8.52992 1091.51745 108s640575. 
Ou [49]= Wel a e
Ou [50]= 8.03519 107s2s8.32877 107678393. 5.7576 1079.40761  6.90557  
Ou [51]= ECOWELFARE
Ou [52]= Op iTAXSub en ion
Ou [53]= 1.248, 0.513
Ou [54]= wel a e axe
Ou [55]= 3.85168 109
Ou [56]= Wel a esans ien
Ou [57]= 3.74042 109
Gene al::spell1:
Possible spelling e o : new symbol name "Quan i e" is simila o exis ing symbol "Quan ile". Plus…
Ou [58]= Quan i e Va ia ion
Ou [61]= iande
Ou [62]= 1.44058 108
Ou [63]= 0.133523
Ou [64]= len ille
Ou [65]= 8.32877 107
Ou [66]= 4.23526
Ou [67]= Va ia ionwel a e
Ou [68]= 1.11255 108
Ou [69]= 0.0297441
Ou [70]= Wel a eDaly
Ma hema ica-Mea -Len illes-OK.nb 4
Gene al::spell1:
Possible spelling e o : new symbol name "xeqSyy" is simila o exis ing symbol "xeqTyy". Plus…
Ou [77]= 3.53339 109
Ou [78]= Quan i e Va ia ion
Ou [79]= iande
Ou [80]= 3.23671 108
Ou [81]= len ille
Ou [82]= 3.23671 108
Ou [83]= 16.459
Ou [84]= Va ia ionwel a e
Ou [85]= 2.07033 108
Ou [86]= 0.0553501
Ma hema ica-Mea -Len illes-OK.nb 5