Proof of Nuprl Lemma : massoc_imp_unit

Step * 1 1 1 of Lemma massoc_imp_unit_diff

1. g : IAbMonoid
2. ∀[u,v,w:|g|]. u = v ∈ |g| supposing (w * u) = (w * v) ∈ |g|
3. a : |g|
4. b : |g|
5. c1 : |g|
6. b = (a * c1) ∈ |g|
7. c : |g|
8. a = (b * c) ∈ |g|
⊢ ∃u:|g|. ((g-unit(u)) c∧ (a = (u * b) ∈ |g|))
BY
{ CopyToHyp 9 8 }

1
1. g : IAbMonoid
2. ∀[u,v,w:|g|]. u = v ∈ |g| supposing (w * u) = (w * v) ∈ |g|
3. a : |g|
4. b : |g|
5. c1 : |g|
6. b = (a * c1) ∈ |g|
7. c : |g|
8. a = (b * c) ∈ |g|
9. a = (b * c) ∈ |g|
⊢ ∃u:|g|. ((g-unit(u)) c∧ (a = (u * b) ∈ |g|))

Latex:

Latex:
1. g : IAbMonoid 2. \mforall{}[u,v,w:|g|]. u = v supposing (w * u) = (w * v) 3. a : |g| 4. b : |g| 5. c1 : |g| 6. b = (a * c1) 7. c : |g| 8. a = (b * c) \mvdash{} \mexists{}u:|g|. ((g-unit(u)) c\mwedge{} (a = (u * b))) By Latex: CopyToHyp 9 8 Home Index