from
X
cons
X
n__from
s
X
2ndspos
0
Z
rnil
2ndspos
s
N
cons
X
Z
2ndspos
s
N
cons2
X
activate
Z
2ndspos
s
N
cons2
X
cons
Y
Z
rcons
posrecip
Y
2ndsneg
N
activate
Z
2ndsneg
0
Z
rnil
2ndsneg
s
N
cons
X
Z
2ndsneg
s
N
cons2
X
activate
Z
2ndsneg
s
N
cons2
X
cons
Y
Z
rcons
negrecip
Y
2ndspos
N
activate
Z
pi
X
2ndspos
X
from
0
plus
0
Y
Y
plus
s
X
Y
s
plus
X
Y
times
0
Y
0
times
s
X
Y
plus
Y
times
X
Y
square
X
times
X
X
from
X
n__from
X
activate
n__from
X
from
X
activate
X
X
2.2
2ndsneg
s
N
cons
X
Z
activate
Z
2ndsneg
s
N
cons2
X
cons
Y
Z
2ndspos
N
activate
Z
activate
n__from
X
from
X
2ndspos
s
N
cons
X
Z
2ndspos
s
N
cons2
X
activate
Z
pi
X
2ndspos
X
from
0
pi
X
from
0
2ndspos
s
N
cons2
X
cons
Y
Z
2ndsneg
N
activate
Z
2ndsneg
s
N
cons2
X
cons
Y
Z
activate
Z
2ndspos
s
N
cons
X
Z
activate
Z
times
s
X
Y
times
X
Y
square
X
times
X
X
2ndsneg
s
N
cons
X
Z
2ndsneg
s
N
cons2
X
activate
Z
plus
s
X
Y
plus
X
Y
2ndspos
s
N
cons2
X
cons
Y
Z
activate
Z
times
s
X
Y
plus
Y
times
X
Y
true
pi
X
from
0
false
square
X
times
X
X
false
pi
X
2ndspos
X
from
0
false
2ndspos
s
N
cons2
X
cons
Y
Z
2ndsneg
N
activate
Z
2ndsneg
s
N
cons
X
Z
2ndsneg
s
N
cons2
X
activate
Z
2ndspos
s
N
cons
X
Z
2ndspos
s
N
cons2
X
activate
Z
2ndsneg
s
N
cons2
X
cons
Y
Z
2ndspos
N
activate
Z
true
negrecip
1
0
s
1
1
1
2ndspos
2
0
activate
1
1
rnil
0
0
plus
2
0
n__from
1
1
3
square
1
0
activate
1
0
square
1
0
pi
1
0
rcons
2
0
times
2
0
0
0
0
from
1
2
times
2
0
2ndsneg
2
0
plus
2
0
2ndspos
2
1
0
cons2
2
2
0
from
1
0
cons
2
1
2
1
pi
1
0
2ndsneg
2
1
0
posrecip
1
0
2ndspos
s
N
cons
X
Z
2ndspos
s
N
cons2
X
activate
Z
2ndsneg
s
N
cons
X
Z
2ndsneg
s
N
cons2
X
activate
Z
2ndspos
s
N
cons
X
Z
2ndspos
s
N
cons2
X
activate
Z
false
2ndsneg
s
N
cons
X
Z
2ndsneg
s
N
cons2
X
activate
Z
false
2ndspos
s
N
cons2
X
cons
Y
Z
activate
Z
false
times
s
X
Y
times
X
Y
true
negrecip
1
0
s
1
1
1
2ndspos
2
0
activate
1
1
rnil
0
0
plus
2
0
n__from
1
1
3
square
1
0
activate
1
0
square
1
0
pi
1
0
rcons
2
0
times
2
1
0
0
0
0
from
1
2
times
2
0
2ndsneg
2
0
plus
2
0
2ndspos
2
0
cons2
2
2
0
from
1
0
cons
2
1
2
1
pi
1
0
2ndsneg
2
0
posrecip
1
0
times
s
X
Y
plus
Y
times
X
Y
false
plus
s
X
Y
plus
X
Y
true
negrecip
1
0
s
1
1
1
2ndspos
2
0
activate
1
1
rnil
0
0
plus
2
1
0
n__from
1
1
3
square
1
0
activate
1
0
square
1
0
pi
1
0
rcons
2
0
times
2
0
0
0
0
from
1
2
times
2
0
2ndsneg
2
0
plus
2
0
2ndspos
2
0
cons2
2
2
0
from
1
0
cons
2
1
2
1
pi
1
0
2ndsneg
2
0
posrecip
1
0
2ndspos
s
N
cons
X
Z
activate
Z
false
2ndsneg
s
N
cons2
X
cons
Y
Z
activate
Z
false
2ndsneg
s
N
cons
X
Z
activate
Z
false
activate
n__from
X
from
X
false
NaTT
certifiable-1.6