9 9 64 ## 32 sets of 2MOLS(9) demonstrating every possible parity
fihabgcde
bacdefghi
gedhicabf
ihacdbefg
cdfegahib
egbfhidca
afeichbgd
hbigadfec
dcgbfeiah

acbfdeigh
bacdefghi
cbaefdhig
hgibcadef
gihabcfde
ihgcabefd
edfghicab
dfeighbca
fedhigabc

acbfdeigh
bacdefghi
cbaefdhig
hgibcadef
gihabcfde
ihgcabefd
edfghicab
dfeighbca
fedhigabc

fihabgcde
bacdefghi
gedhicabf
ihacdbefg
cdfegahib
egbfhidca
afeichbgd
hbigadfec
dcgbfeiah

deghiafcb
bacdefghi
ghfcbiade
cfdeghiba
fiabdcegh
ichgadbef
ageicbhfd
ebifhgdac
hdbafecig

fdighaebc
abcdefghi
hidabgcef
iabcdefgh
cegiahbfd
dgfeichab
echbfdaig
gfahcbide
bhefgidca

fdighaebc
abcdefghi
hidabgcef
iabcdefgh
cegiahbfd
dgfeichab
echbfdaig
gfahcbide
bhefgidca

deghiafcb
bacdefghi
ghfcbiade
cfdeghiba
fiabdcegh
ichgadbef
ageicbhfd
ebifhgdac
hdbafecig

acbefdhig
bacdefghi
cbafdeigh
fdeghibac
defhigacb
efdighcba
higbacdef
ighacbefd
ghicbafde

fhibgadec
abcdefghi
degchifab
bcdefghia
egaibhcfd
hifadcbge
gdbfaeich
cfehibadg
iahgcdebf

fhibgadec
abcdefghi
degchifab
bcdefghia
egaibhcfd
hifadcbge
gdbfaeich
cfehibadg
iahgcdebf

acbefdhig
bacdefghi
cbafdeigh
fdeghibac
defhigacb
efdighcba
higbacdef
ighacbefd
ghicbafde

dbgcfiaeh
eahficgbd
gcfdaheib
hdcebgifa
iebgdachf
afihcdbge
fgaiebhdc
chdbgefai
bieahfdcg

fahicdegb
dbiaegcfh
icdbgfhae
gdaciebhf
hebdaifcg
afgehcdbi
egcfbhaid
bhegfaidc
cifhdbgea

fahicdegb
dbiaegcfh
icdbgfhae
gdaciebhf
hebdaifcg
afgehcdbi
egcfbhaid
bhegfaidc
cifhdbgea

dbgcfiaeh
eahficgbd
gcfdaheib
hdcebgifa
iebgdachf
afihcdbge
fgaiebhdc
chdbgefai
bieahfdcg

biefgahcd
dbgaehfic
hdbcifega
cgdbfiahe
echdbgiaf
ahfgdbcei
geciadbfh
faihcedbg
ifaehcgdb

bhfiadegc
fageibcdh
idcfbhaeg
ciedgahfb
dbhgecfia
agdbhfice
heacfigbd
eciadgbhf
gfbhcedai

abcfdehig
cabdefigh
bcaefdghi
edfghibac
fedhigacb
dfeighcba
hgibacdef
ihgacbefd
gihcbafde

fadbehgci
hbecgidfa
icgdafbeh
bdceiafhg
gehfbdaic
afighcebd
dgfhcbiae
ehaifgcdb
cibadehgf

fadbehgci
hbecgidfa
icgdafbeh
bdceiafhg
gehfbdaic
afighcebd
dgfhcbiae
ehaifgcdb
cibadehgf

abcfdehig
cabdefigh
bcaefdghi
edfghibac
fedhigacb
dfeighcba
hgibacdef
ihgacbefd
gihcbafde

bdhceagfi
ibdgcheaf
egbdhfcia
facbdgihe
geifbdach
ahfigbdec
hfeaicbdg
cighaefbd
dcaefihgb

bficdaheg
hadibgecf
fgcehdaib
iefdgbcah
aibgehfdc
dbhacfige
ecahfigbd
gdeficbha
chgbaedfi

bacdefghi
ifhbagcde
egdhicbaf
hibcdaefg
dcfegbhia
geafhidcb
fbeichagd
ahigbdfec
cdgafeibh

abcdefghi
cabfdeigh
bcaefdhig
ghibcadef
ighabcfde
higcabefd
defghicab
fdeighbca
efdhigabc

bacdefghi
edghibfca
hgfcaibde
fcdeghiab
ifbadcegh
cihgbdaef
gbeicahfd
aeifhgdbc
dhabfecig

bacdefghi
dfighaebc
ihdabgcef
aibcdefgh
ecgiahbfd
gdfeichab
cehbfdaig
fgahcbide
hbefgidca

bacdefghi
dfighaebc
ihdabgcef
aibcdefgh
ecgiahbfd
gdfeichab
cehbfdaig
fgahcbide
hbefgidca

bacdefghi
edghibfca
hgfcaibde
fcdeghiab
ifbadcegh
cihgbdaef
gbeicahfd
aeifhgdbc
dhabfecig

behficgad
adgcfibeh
cgfdbheia
dhceagifb
eiagdbchf
fbihcdage
gfbieahdc
hcdagefbi
iaebhfdcg

bdiaegcfh
afhicdegb
cidbgfhae
dgaciebhf
ehbdaifcg
fagehcdbi
gecfbhaid
hbegfaidc
icfhdbgea

bdiaegcfh
afhicdegb
cidbgfhae
dgaciebhf
ehbdaifcg
fagehcdbi
gecfbhaid
hbegfaidc
icfhdbgea

behficgad
adgcfibeh
cgfdbheia
dhceagifb
eiagdbchf
fbihcdage
gfbieahdc
hcdagefbi
iaebhfdcg

dagbehfic
aiefgbhcd
hdacifegb
cgdafibhe
echdagibf
bhfgdacei
gecibdafh
fbihcedag
ifbehcgda

fbgeiacdh
ahfibdegc
idcfahbeg
ciedgbhfa
dahgecfib
bgdahfice
hebcfigad
ecibdgahf
gfahcedbi

ifhabgcde
abcdefghi
egdhicabf
hiacdbefg
dcfegahib
gebfhidca
faeichbgd
bhigadfec
cdgbfeiah

cabfdeigh
abcdefghi
bcaefdhig
ghibcadef
ighabcfde
higcabefd
defghicab
fdeighbca
efdhigabc

cabfdeigh
abcdefghi
bcaefdhig
ghibcadef
ighabcfde
higcabefd
defghicab
fdeighbca
efdhigabc

ifhabgcde
abcdefghi
egdhicabf
hiacdbefg
dcfegahib
gebfhidca
faeichbgd
bhigadfec
cdgbfeiah

deghibfca
abcdefghi
ghfcaibde
cfdeghiab
fibadcegh
ichgbdaef
bgeicahfd
eaifhgdbc
hdabfecig

fdighaebc
abcdefghi
hidabgcef
iabcdefgh
cegiahbfd
dgfeichab
echbfdaig
gfahcbide
bhefgidca

fdighaebc
abcdefghi
hidabgcef
iabcdefgh
cegiahbfd
dgfeichab
echbfdaig
gfahcbide
bhefgidca

deghibfca
abcdefghi
ghfcaibde
cfdeghiab
fibadcegh
ichgbdaef
bgeicahfd
eaifhgdbc
hdabfecig

bcaefdhig
abcdefghi
cabfdeigh
fdeghiabc
defhigbca
efdighcab
higabcdef
ighbcaefd
ghicabfde

fhibgadec
abcdefghi
degchifab
bcdefghia
egaibhcfd
hifadcbge
gdbfaeich
cfehibadg
iahgcdebf

fhibgadec
abcdefghi
degchifab
bcdefghia
egaibhcfd
hifadcbge
gdbfaeich
cfehibadg
iahgcdebf

bcaefdhig
abcdefghi
cabfdeigh
fdeghiabc
defhigbca
efdighcab
higabcdef
ighbcaefd
ghicabfde

gfhaibdce
bacdefghi
ibdecghfa
egaihdcbf
dhgfbieac
hcbgfaied
cdfbgeaih
aiecdhfgb
feihacbdg

ahibdcefg
bacdefghi
ceahgibdf
ifeachdgb
gdhcabfie
fbdeighac
higfbdcea
dgbifeach
ecfghaibd

bacdefghi
gfhaibdce
ibdecghfa
egaihdcbf
dhgfbieac
hcbgfaied
cdfbgeaih
aiecdhfgb
feihacbdg

bacdefghi
ahibdcefg
ceahgibdf
ifeachdgb
gdhcabfie
fbdeighac
higfbdcea
dgbifeach
ecfghaibd

bgiedhcaf
afbghcdie
chdagbfei
daeifgbch
eichbfgda
fbgdiaehc
gdhceiafb
hcfbaeigd
ieafcdhbg

bacigfhde
ahefdbigc
ciaehdgbf
dbhacefig
edgcaibfh
fcihbgdea
gebdfhcai
hfdgiaecb
igfbecahd

hagedibfc
acfgibdeh
dfachgebi
bghacefid
iechafgdb
fbidgache
gidbehacf
edbifchag
chefbdiga

dbhgieafc
aebichfdg
edcabghif
bfidhcega
hagfeibcd
gcahdfieb
cidefagbh
igfbadche
fhecgbdai

dbhgieafc
aebichfdg
edcabghif
bfidhcega
hagfeibcd
gcahdfieb
cidefagbh
igfbadche
fhecgbdai

hagedibfc
acfgibdeh
dfachgebi
bghacefid
iechafgdb
fbidgache
gidbehacf
edbifchag
chefbdiga

fghbiadce
bacdefghi
aidecghfb
gebihdcaf
hdgfaiebc
chagfbied
dcfagebih
ibecdhfga
efihbcadg

haibdcefg
abcdefghi
ecahgibdf
fieachdgb
dghcabfie
bfdeighac
ihgfbdcea
gdbifeach
cefghaibd

haibdcefg
abcdefghi
ecahgibdf
fieachdgb
dghcabfie
bfdeighac
ihgfbdcea
gdbifeach
cefghaibd

fghbiadce
bacdefghi
aidecghfb
gebihdcaf
hdgfaiebc
chagfbied
dcfagebih
ibecdhfga
efihbcadg

bdfeghiac
abcdefghi
cgbhaiedf
diegcahfb
efdaigbch
haicdbfge
iegfhdcba
gchbfeaid
fhaibcdeg

gbaidcefh
bacdefghi
dhifabceg
ifhcbgade
aifhcedgb
ecdaghbif
hgbeiafcd
fegbhdiac
cdegfihba