Proof of Nuprl Lemma : residue-mul-inverse

Step * 1 2 2 2 2 3 of Lemma residue-mul-inverse

.....wf.....
1. n : {2...}
2. a : ℕ
3. CoPrime(n,a)
4. 1 ∈ residue(n)
5. b : ℤ
6. (ba mod n) = 1 ∈ ℤ
7. (ab mod n) = 1 ∈ ℤ
8. CoPrime(n,b)
9. ∀i:residue(n). ((b(ai mod n) mod n) = i ∈ residue(n))
10. ∀i:residue(n). ((a(bi mod n) mod n) = i ∈ residue(n))
11. b1 : ℤ
⊢ istype(CoPrime(n,b1)
∧ (∀i:residue(n)
     ((((b1a mod n) = 1 ∈ residue(n)) ∧ ((ab1 mod n) = 1 ∈ residue(n)))
     ∧ ((b1(ai mod n) mod n) = i ∈ residue(n))
     ∧ ((a(b1i mod n) mod n) = i ∈ residue(n)))))
BY

{ (Auto THEN DVar `i' THEN Unhide THEN Auto THEN GenConclAtAddr [2] THEN D (-2) THEN Unhide THEN Auto) }

Latex:

Latex:
.....wf..... 1. n : \{2...\} 2. a : \mBbbN{} 3. CoPrime(n,a) 4. 1 \mmember{} residue(n) 5. b : \mBbbZ{} 6. (ba mod n) = 1 7. (ab mod n) = 1 8. CoPrime(n,b) 9. \mforall{}i:residue(n). ((b(ai mod n) mod n) = i) 10. \mforall{}i:residue(n). ((a(bi mod n) mod n) = i) 11. b1 : \mBbbZ{} \mvdash{} istype(CoPrime(n,b1) \mwedge{} (\mforall{}i:residue(n) ((((b1a mod n) = 1) \mwedge{} ((ab1 mod n) = 1)) \mwedge{} ((b1(ai mod n) mod n) = i) \mwedge{} ((a(b1i mod n) mod n) = i)))) By Latex: (Auto THEN DVar `i' THEN Unhide THEN Auto THEN GenConclAtAddr [2] THEN D (-2) THEN Unhide THEN Auto) Home Index