Theorem
ltneri
≪
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theorem ltneri (a b: nat): $ a < b $ > $ b != a $;
Step
Hyp
Ref
Expression
1
ltner
a < b -> b != a
2
hyp h
a < b
3
1
,
2
ax_mp
b != a
Axiom use
axs_prop_calc
(
ax_1
,
ax_2
,
ax_3
,
ax_mp
,
itru
)
,
axs_pred_calc
(
ax_gen
,
ax_4
,
ax_5
,
ax_6
,
ax_7
,
ax_10
,
ax_11
,
ax_12
)
,
axs_peano
(
peano1
,
peano2
,
peano5
,
addeq
,
add0
,
addS
)