Proof of Nuprl Lemma : Taylor-remainder-as-integral

Step * 2 2 2 of Lemma Taylor-remainder-as-integral

1. I : Interval
2. iproper(I)
3. a : {a:ℝ| a ∈ I}
4. b : {a:ℝ| a ∈ I}
5. [rmin(a;b), rmax(a;b)] ⊆ I
6. n : ℤ
7. 0 < n
8. ∀F:ℕ(n - 1) + 2 ⟶ I ⟶ℝ
     ((∀k:ℕ(n - 1) + 2. ∀x,y:{a:ℝ| a ∈ I} .  ((x = y) ⇒ (F[k;x] = F[k;y])))
     ⇒ finite-deriv-seq(I;(n - 1) + 1;i,x.F[i;x])
     ⇒

 (Taylor-remainder(I;n - 1;b;a;k,x.F[k;x]) = a_∫^-b (F[(n - 1) + 1;t]/r((n - 1)!)) * b - t^n - 1 dt))

9. F : ℕn + 2 ⟶ I ⟶ℝ
10. ∀k:ℕn + 2. ∀x,y:{a:ℝ| a ∈ I} . ((x = y) ⇒ (F[k;x] = F[k;y]))
11. finite-deriv-seq(I;n + 1;i,x.F[i;x])

12. λt.((F[n + 1;t]/r((n)!)) * b - t^n) ∈ {f:[rmin(a;b), rmax(a;b)] ⟶ℝ| ifun(f;[rmin(a;b), rmax(a;b)])}

13. a_∫^-b (F[n + 1;t]/r((n)!)) * b - t^n dt = a_∫^-b (b - t^n/r((n)!)) * F[n + 1;t] dt
⊢ Taylor-remainder(I;n;b;a;k,x.F[k;x]) = a_∫^-b (F[n + 1;t]/r((n)!)) * b - t^n dt
BY
{ (RWO "-1" 0 THENA Auto) }

1
1. I : Interval
2. iproper(I)
3. a : ℝ
4. a ∈ I
5. b : ℝ
6. b ∈ I
7. [rmin(a;b), rmax(a;b)] ⊆ I
8. n : ℤ
9. 0 < n
10. ∀F:ℕ(n - 1) + 2 ⟶ I ⟶ℝ
      ((∀k:ℕ(n - 1) + 2. ∀x,y:{a:ℝ| a ∈ I} .  ((x = y) ⇒ ((F k x) = (F k y))))
      ⇒ finite-deriv-seq(I;(n - 1) + 1;i,x.F i x)
      ⇒

 (Taylor-remainder(I;n - 1;b;a;k,x.F k x) = a_∫^-b (F ((n - 1) + 1) t/r((n - 1)!)) * b - t^n - 1 dt))

11. F : ℕn + 2 ⟶ I ⟶ℝ
12. ∀k:ℕn + 2. ∀x,y:{a:ℝ| a ∈ I} . ((x = y) ⇒ ((F k x) = (F k y)))
13. finite-deriv-seq(I;n + 1;i,x.F i x)

14. λt.((F (n + 1) t/r((n)!)) * b - t^n) ∈ {f:[rmin(a;b), rmax(a;b)] ⟶ℝ| ifun(f;[rmin(a;b), rmax(a;b)])}

15. a_∫^-b (F (n + 1) t/r((n)!)) * b - t^n dt = a_∫^-b (b - t^n/r((n)!)) * (F (n + 1) t) dt
16. x : {x:ℝ| x ∈ [rmin(a;b), rmax(a;b)]}
17. y : {x:ℝ| x ∈ [rmin(a;b), rmax(a;b)]}
18. x = y
⊢ ((b - y^n/r((n)!)) * (F (n + 1) x)) = ((b - y^n/r((n)!)) * (F (n + 1) y))

2
1. I : Interval
2. iproper(I)
3. a : {a:ℝ| a ∈ I}
4. b : {a:ℝ| a ∈ I}
5. [rmin(a;b), rmax(a;b)] ⊆ I
6. n : ℤ
7. 0 < n
8. ∀F:ℕ(n - 1) + 2 ⟶ I ⟶ℝ
     ((∀k:ℕ(n - 1) + 2. ∀x,y:{a:ℝ| a ∈ I} .  ((x = y) ⇒ (F[k;x] = F[k;y])))
     ⇒ finite-deriv-seq(I;(n - 1) + 1;i,x.F[i;x])
     ⇒

 (Taylor-remainder(I;n - 1;b;a;k,x.F[k;x]) = a_∫^-b (F[(n - 1) + 1;t]/r((n - 1)!)) * b - t^n - 1 dt))

9. F : ℕn + 2 ⟶ I ⟶ℝ
10. ∀k:ℕn + 2. ∀x,y:{a:ℝ| a ∈ I} . ((x = y) ⇒ (F[k;x] = F[k;y]))
11. finite-deriv-seq(I;n + 1;i,x.F[i;x])

12. λt.((F[n + 1;t]/r((n)!)) * b - t^n) ∈ {f:[rmin(a;b), rmax(a;b)] ⟶ℝ| ifun(f;[rmin(a;b), rmax(a;b)])}

13. a_∫^-b (F[n + 1;t]/r((n)!)) * b - t^n dt = a_∫^-b (b - t^n/r((n)!)) * F[n + 1;t] dt
⊢ Taylor-remainder(I;n;b;a;k,x.F[k;x]) = a_∫^-b (b - t^n/r((n)!)) * F[n + 1;t] dt

Latex:

Latex:
1. I : Interval 2. iproper(I) 3. a : \{a:\mBbbR{}| a \mmember{} I\} 4. b : \{a:\mBbbR{}| a \mmember{} I\} 5. [rmin(a;b), rmax(a;b)] \msubseteq{} I 6. n : \mBbbZ{} 7. 0 < n 8. \mforall{}F:\mBbbN{}(n - 1) + 2 {}\mrightarrow{} I {}\mrightarrow{}\mBbbR{} ((\mforall{}k:\mBbbN{}(n - 1) + 2. \mforall{}x,y:\{a:\mBbbR{}| a \mmember{} I\} . ((x = y) {}\mRightarrow{} (F[k;x] = F[k;y]))) {}\mRightarrow{} finite-deriv-seq(I;(n - 1) + 1;i,x.F[i;x]) {}\mRightarrow{} (Taylor-remainder(I;n - 1;b;a;k,x.F[k;x]) = a\_\mint{}\msupminus{}b (F[(n - 1) + 1;t]/r((n - 1)!)) * b - t\^{}n - 1 dt)) 9. F : \mBbbN{}n + 2 {}\mrightarrow{} I {}\mrightarrow{}\mBbbR{} 10. \mforall{}k:\mBbbN{}n + 2. \mforall{}x,y:\{a:\mBbbR{}| a \mmember{} I\} . ((x = y) {}\mRightarrow{} (F[k;x] = F[k;y])) 11. finite-deriv-seq(I;n + 1;i,x.F[i;x]) 12. \mlambda{}t.((F[n + 1;t]/r((n)!)) * b - t\^{}n) \mmember{} \{f:[rmin(a;b), rmax(a;b)] {}\mrightarrow{}\mBbbR{}| ifun(f;[rmin(a;b), rmax(a;b)])\} 13. a\_\mint{}\msupminus{}b (F[n + 1;t]/r((n)!)) * b - t\^{}n dt = a\_\mint{}\msupminus{}b (b - t\^{}n/r((n)!)) * F[n + 1;t] dt \mvdash{} Taylor-remainder(I;n;b;a;k,x.F[k;x]) = a\_\mint{}\msupminus{}b (F[n + 1;t]/r((n)!)) * b - t\^{}n dt By Latex: (RWO "-1" 0 THENA Auto) Home Index