Proof of Nuprl Lemma : Euler-Fermat

Step * 1 1 of Lemma Euler-Fermat

.....assertion.....
1. n : {2...}
2. a : ℕ⁺
3. CoPrime(n,a)
4. Πx ∈ map(λi.(ai mod n);residues-mod(n)). x = Πx ∈ residues-mod(n). x ∈ ℤ
5. Πx ∈ residues-mod(n). (ax mod n) = Πx ∈ residues-mod(n). x ∈ ℤ
⊢ (Πx ∈ residues-mod(n). x * a^totient(n)) ≡ (Πx ∈ residues-mod(n). x * 1) mod n
BY

{ Assert ⌜(Πx ∈ residues-mod(n). x * a^totient(n)) ≡ Πx ∈ residues-mod(n). (ax mod n) mod n⌝⋅ }

1
.....assertion.....
1. n : {2...}
2. a : ℕ⁺
3. CoPrime(n,a)
4. Πx ∈ map(λi.(ai mod n);residues-mod(n)). x = Πx ∈ residues-mod(n). x ∈ ℤ
5. Πx ∈ residues-mod(n). (ax mod n) = Πx ∈ residues-mod(n). x ∈ ℤ
⊢ (Πx ∈ residues-mod(n). x * a^totient(n)) ≡ Πx ∈ residues-mod(n). (ax mod n) mod n

2
1. n : {2...}
2. a : ℕ⁺
3. CoPrime(n,a)
4. Πx ∈ map(λi.(ai mod n);residues-mod(n)). x = Πx ∈ residues-mod(n). x ∈ ℤ
5. Πx ∈ residues-mod(n). (ax mod n) = Πx ∈ residues-mod(n). x ∈ ℤ
6. (Πx ∈ residues-mod(n). x * a^totient(n)) ≡ Πx ∈ residues-mod(n). (ax mod n) mod n
⊢ (Πx ∈ residues-mod(n). x * a^totient(n)) ≡ (Πx ∈ residues-mod(n). x * 1) mod n

Latex:

Latex:
.....assertion..... 1. n : \{2...\} 2. a : \mBbbN{}\msupplus{} 3. CoPrime(n,a) 4. \mPi{}x \mmember{} map(\mlambda{}i.(ai mod n);residues-mod(n)). x = \mPi{}x \mmember{} residues-mod(n). x 5. \mPi{}x \mmember{} residues-mod(n). (ax mod n) = \mPi{}x \mmember{} residues-mod(n). x \mvdash{} (\mPi{}x \mmember{} residues-mod(n). x * a\^{}totient(n)) \mequiv{} (\mPi{}x \mmember{} residues-mod(n). x * 1) mod n By Latex: Assert \mkleeneopen{}(\mPi{}x \mmember{} residues-mod(n). x * a\^{}totient(n)) \mequiv{} \mPi{}x \mmember{} residues-mod(n). (ax mod n) mod n\mkleeneclose{}\mcdot{} Home Index