Proof of Nuprl Lemma : binomial

Step * 2 of Lemma binomial_q

1. ∀[a,b:ℚ]. ∀[n:ℕ].

     (q-rng-nexp(a + b;n) = Σ0 ≤ i < n + 1. choose(n;i) ⋅<ℚ+*> (q-rng-nexp(a;i) * q-rng-nexp(b;n - i)) ∈ ℚ)

⊢ ∀[a,b:ℚ]. ∀[n:ℕ].  (a + b ↑ n = Σ0 ≤ i < n + 1. choose(n;i) ⋅<ℚ+*> (a ↑ i * b ↑ n - i) ∈ ℚ)

BY
{ RepeatFor 3 (ParallelLast') }

1
1. a : ℚ
2. b : ℚ
3. n : ℕ

4. q-rng-nexp(a + b;n) = Σ0 ≤ i < n + 1. choose(n;i) ⋅<ℚ+*> (q-rng-nexp(a;i) * q-rng-nexp(b;n - i)) ∈ ℚ

⊢ a + b ↑ n = Σ0 ≤ i < n + 1. choose(n;i) ⋅<ℚ+*> (a ↑ i * b ↑ n - i) ∈ ℚ

Latex:

Latex:
1. \mforall{}[a,b:\mBbbQ{}]. \mforall{}[n:\mBbbN{}]. (q-rng-nexp(a + b;n) = \mSigma{}0 \mleq{} i < n + 1. choose(n;i) \mcdot{}<\mBbbQ{}+*> (q-rng-nexp(a;i) * q-rng-nexp(b;n - i))) \mvdash{} \mforall{}[a,b:\mBbbQ{}]. \mforall{}[n:\mBbbN{}]. (a + b \muparrow{} n = \mSigma{}0 \mleq{} i < n + 1. choose(n;i) \mcdot{}<\mBbbQ{}+*> (a \muparrow{} i * b \muparrow{} n - i)) By Latex: RepeatFor 3 (ParallelLast') Home Index