Proof of Nuprl Lemma : real-binomial

Step * 2 1 1 of Lemma real-binomial

.....assertion.....
1. n : ℤ
2. 0 < n
3. ∀[a,b:ℝ]. (a + b^n - 1 = Σ{r(choose(n - 1;i)) * a^n - 1 - i * b^i | 0≤i≤n - 1})
4. a : ℝ
5. b : ℝ

⊢ Σ{(r(choose(n - 1;i)) * a^n - 1 - i * b^i) * a | 0≤i≤n - 1} = Σ{r(choose(n - 1;i)) * a^n - i * b^i | 0≤i≤n - 1}

BY
{ TACTIC:((BLemma `rsum_functionality` THEN Auto) THEN D 0 THEN Auto) }

1
1. n : ℤ
2. 0 < n
3. ∀[a,b:ℝ]. (a + b^n - 1 = Σ{r(choose(n - 1;i)) * a^n - 1 - i * b^i | 0≤i≤n - 1})
4. a : ℝ
5. b : ℝ
6. i : ℤ@i
7. 0 ≤ i
8. i ≤ (n - 1)
⊢ ((r(choose(n - 1;i)) * a^n - 1 - i * b^i) * a) = (r(choose(n - 1;i)) * a^n - i * b^i)

Latex:

Latex:
.....assertion..... 1. n : \mBbbZ{} 2. 0 < n 3. \mforall{}[a,b:\mBbbR{}]. (a + b\^{}n - 1 = \mSigma{}\{r(choose(n - 1;i)) * a\^{}n - 1 - i * b\^{}i | 0\mleq{}i\mleq{}n - 1\}) 4. a : \mBbbR{} 5. b : \mBbbR{} \mvdash{} \mSigma{}\{(r(choose(n - 1;i)) * a\^{}n - 1 - i * b\^{}i) * a | 0\mleq{}i\mleq{}n - 1\} = \mSigma{}\{r(choose(n - 1;i)) * a\^{}n - i * b\^{}i | 0\mleq{}i\mleq{}n - 1\} By Latex: TACTIC:((BLemma `rsum\_functionality` THEN Auto) THEN D 0 THEN Auto) Home Index