Proof of Nuprl Lemma : Taylor-theorem-for-2

Step * 2 1 2 1 of Lemma Taylor-theorem-for-2

1. I : Interval
2. iproper(I)
3. f : I ⟶ℝ
4. g : I ⟶ℝ
5. h : I ⟶ℝ
6. ∀x,y:{a:ℝ| a ∈ I} .  ((x = y) ⇒ (h[x] = h[y]))
7. d(f[x])/dx = λx.g[x] on I
8. d(g[x])/dx = λx.h[x] on I
9. a : {a:ℝ| a ∈ I}
10. b : {a:ℝ| a ∈ I}
11. e : ℝ
12. r0 < e
13. ∀e:ℝ
      ((r0 < e)
      ⇒ (∃c:ℝ
           ((rmin(a;b) ≤ c)
           ∧ (c ≤ rmax(a;b))

           ∧ (|f[b] - Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} - (b - c^1 * (h[c]/r((1)!)))

* (b - a)| ≤ e))))
14. Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} = (f[a] + (g[a] * (b - a)))
15. c : ℝ
16. rmin(a;b) ≤ c
17. c ≤ rmax(a;b)

18. |f[b] - Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} - (b - c^1 * (h[c]/r((1)!))) * (b - a)| ≤ e

19. rmin(a;b) ≤ c
20. c ≤ rmax(a;b)
⊢ |f[b] - f[a] + (g[a] * (b - a)) - ((b - c) * h[c]) * (b - a)| ≤ e
BY
{ (Assert [rmin(a;b), rmax(a;b)] ⊆ I  BY
         EAuto 1) }

1
1. I : Interval
2. iproper(I)
3. f : I ⟶ℝ
4. g : I ⟶ℝ
5. h : I ⟶ℝ
6. ∀x,y:{a:ℝ| a ∈ I} .  ((x = y) ⇒ (h[x] = h[y]))
7. d(f[x])/dx = λx.g[x] on I
8. d(g[x])/dx = λx.h[x] on I
9. a : {a:ℝ| a ∈ I}
10. b : {a:ℝ| a ∈ I}
11. e : ℝ
12. r0 < e
13. ∀e:ℝ
      ((r0 < e)
      ⇒ (∃c:ℝ
           ((rmin(a;b) ≤ c)
           ∧ (c ≤ rmax(a;b))

           ∧ (|f[b] - Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} - (b - c^1 * (h[c]/r((1)!)))

* (b - a)| ≤ e))))
14. Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} = (f[a] + (g[a] * (b - a)))
15. c : ℝ
16. rmin(a;b) ≤ c
17. c ≤ rmax(a;b)

18. |f[b] - Σ{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a^k | 0≤k≤1} - (b - c^1 * (h[c]/r((1)!))) * (b - a)| ≤ e

19. rmin(a;b) ≤ c
20. c ≤ rmax(a;b)
21. [rmin(a;b), rmax(a;b)] ⊆ I
⊢ |f[b] - f[a] + (g[a] * (b - a)) - ((b - c) * h[c]) * (b - a)| ≤ e

Latex:

Latex:
1. I : Interval 2. iproper(I) 3. f : I {}\mrightarrow{}\mBbbR{} 4. g : I {}\mrightarrow{}\mBbbR{} 5. h : I {}\mrightarrow{}\mBbbR{} 6. \mforall{}x,y:\{a:\mBbbR{}| a \mmember{} I\} . ((x = y) {}\mRightarrow{} (h[x] = h[y])) 7. d(f[x])/dx = \mlambda{}x.g[x] on I 8. d(g[x])/dx = \mlambda{}x.h[x] on I 9. a : \{a:\mBbbR{}| a \mmember{} I\} 10. b : \{a:\mBbbR{}| a \mmember{} I\} 11. e : \mBbbR{} 12. r0 < e 13. \mforall{}e:\mBbbR{} ((r0 < e) {}\mRightarrow{} (\mexists{}c:\mBbbR{} ((rmin(a;b) \mleq{} c) \mwedge{} (c \mleq{} rmax(a;b)) \mwedge{} (|f[b] - \mSigma{}\{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a\^{}k | 0\mleq{}k\mleq{}1\} - (b - c\^{}1 * (h[c]/r((1)!))) * (b - a)| \mleq{} e)))) 14. \mSigma{}\{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a\^{}k | 0\mleq{}k\mleq{}1\} = (f[a] + (g[a] * (b - a))) 15. c : \mBbbR{} 16. rmin(a;b) \mleq{} c 17. c \mleq{} rmax(a;b) 18. |f[b] - \mSigma{}\{([f[a]; g[a]; h[a]][k]/r((k)!)) * b - a\^{}k | 0\mleq{}k\mleq{}1\} - (b - c\^{}1 * (h[c]/r((1)!))) * (b - a)| \mleq{} e 19. rmin(a;b) \mleq{} c 20. c \mleq{} rmax(a;b) \mvdash{} |f[b] - f[a] + (g[a] * (b - a)) - ((b - c) * h[c]) * (b - a)| \mleq{} e By Latex: (Assert [rmin(a;b), rmax(a;b)] \msubseteq{} I BY EAuto 1) Home Index