Proof of Nuprl Lemma : power-sum-product

Step * 2 1 1 1 of Lemma power-sum-product

.....equality.....
1. x : ℤ
2. n : ℤ
3. 0 < n
4. a : ℕn + 1 ⟶ ℤ
5. m : ℕ
6. b : ℕm + 1 ⟶ ℤ
7. (Σ(a[i] * x^i | i < (n - 1) + 1) * Σ(b[i] * x^i | i < m + 1))

= Σ(Σ(if j ≤z n - 1 then a[j] else 0 fi  * if i - j ≤z m then b[i - j] else 0 fi  | j < i + 1) * x^i | i < ((n - 1) + m)

+ 1)
∈ ℤ

⊢ (Σ(a[x@0] * x^x@0 | x@0 < (n + 1) - 1) + (a[(n + 1) - 1] * x^((n + 1) - 1))) * Σ(b[i] * x^i | i < m + 1) ~ (Σ(a[x@0]

* x^x@0 | x@0 < (n + 1) - 1)
* Σ(b[i] * x^i | i < m + 1))
+ ((a[(n + 1) - 1] * x^((n + 1) - 1)) * Σ(b[i] * x^i | i < m + 1))
BY
{ Auto }

Latex:

Latex:
.....equality..... 1. x : \mBbbZ{} 2. n : \mBbbZ{} 3. 0 < n 4. a : \mBbbN{}n + 1 {}\mrightarrow{} \mBbbZ{} 5. m : \mBbbN{} 6. b : \mBbbN{}m + 1 {}\mrightarrow{} \mBbbZ{} 7. (\mSigma{}(a[i] * x\^{}i | i < (n - 1) + 1) * \mSigma{}(b[i] * x\^{}i | i < m + 1)) = \mSigma{}(\mSigma{}(if j \mleq{}z n - 1 then a[j] else 0 fi * if i - j \mleq{}z m then b[i - j] else 0 fi | j < i + 1) * x\^{}i | i < ((n - 1) + m) + 1) \mvdash{} (\mSigma{}(a[x@0] * x\^{}x@0 | x@0 < (n + 1) - 1) + (a[(n + 1) - 1] * x\^{}((n + 1) - 1))) * \mSigma{}(b[i] * x\^{}i | i < m + 1) \msim{} (\mSigma{}(a[x@0] * x\^{}x@0 | x@0 < (n + 1) - 1) * \mSigma{}(b[i] * x\^{}i | i < m + 1)) + ((a[(n + 1) - 1] * x\^{}((n + 1) - 1)) * \mSigma{}(b[i] * x\^{}i | i < m + 1)) By Latex: Auto Home Index