theorem eqtr2 (a b c: nat): $ a = b -> b = c -> c = a $;
| Step | Hyp | Ref | Expression |
|---|
| 1 |
|
eqcom |
a = c -> c = a |
| 2 |
|
eqtr |
a = b -> b = c -> a = c |
| 3 |
1, 2 |
syl6 |
a = b -> b = c -> c = a |
Axiom use
axs_prop_calc
(ax_1,
ax_2,
ax_3,
ax_mp),
axs_pred_calc
(ax_gen,
ax_4,
ax_5,
ax_6,
ax_7)