Proof of Nuprl Lemma : arctan-poly-approx-1

Step * 2 1 of Lemma arctan-poly-approx-1

1. ∀x:ℝ. (r0 < (r1 + x^2))
2. ∀x:ℝ. -(x^2) ≠ r1
3. x : {x:ℝ| r0 ≤ x}
4. k : ℕ

5. r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)

6. (arctangent(x) - arctan-poly(x;k)) = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)
⊢ |r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx| ≤ (x^(2 * k) + 3/r((2 * k) + 3))
BY

{ Assert ⌜r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = r0_∫^-x (-(x^2)^k + 1/r1 + x^2) dx⌝⋅ }

1
.....assertion.....
1. ∀x:ℝ. (r0 < (r1 + x^2))
2. ∀x:ℝ. -(x^2) ≠ r1
3. x : {x:ℝ| r0 ≤ x}
4. k : ℕ

5. r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)

6. (arctangent(x) - arctan-poly(x;k)) = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)
⊢ r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = r0_∫^-x (-(x^2)^k + 1/r1 + x^2) dx

2
1. ∀x:ℝ. (r0 < (r1 + x^2))
2. ∀x:ℝ. -(x^2) ≠ r1
3. x : {x:ℝ| r0 ≤ x}
4. k : ℕ

5. r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)

6. (arctangent(x) - arctan-poly(x;k)) = (arctangent(x) - r0_∫^-x Σ{-(x^2)^i | 0≤i≤k} dx)
7. r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx = r0_∫^-x (-(x^2)^k + 1/r1 + x^2) dx
⊢ |r0_∫^-x (r1/r1 + x^2) - Σ{-(x^2)^i | 0≤i≤k} dx| ≤ (x^(2 * k) + 3/r((2 * k) + 3))

Latex:

Latex:
1. \mforall{}x:\mBbbR{}. (r0 < (r1 + x\^{}2)) 2. \mforall{}x:\mBbbR{}. -(x\^{}2) \mneq{} r1 3. x : \{x:\mBbbR{}| r0 \mleq{} x\} 4. k : \mBbbN{} 5. r0\_\mint{}\msupminus{}x (r1/r1 + x\^{}2) - \mSigma{}\{-(x\^{}2)\^{}i | 0\mleq{}i\mleq{}k\} dx = (arctangent(x) - r0\_\mint{}\msupminus{}x \mSigma{}\{-(x\^{}2)\^{}i | 0\mleq{}i\mleq{}k\} dx) 6. (arctangent(x) - arctan-poly(x;k)) = (arctangent(x) - r0\_\mint{}\msupminus{}x \mSigma{}\{-(x\^{}2)\^{}i | 0\mleq{}i\mleq{}k\} dx) \mvdash{} |r0\_\mint{}\msupminus{}x (r1/r1 + x\^{}2) - \mSigma{}\{-(x\^{}2)\^{}i | 0\mleq{}i\mleq{}k\} dx| \mleq{} (x\^{}(2 * k) + 3/r((2 * k) + 3)) By Latex: Assert \mkleeneopen{}r0\_\mint{}\msupminus{}x (r1/r1 + x\^{}2) - \mSigma{}\{-(x\^{}2)\^{}i | 0\mleq{}i\mleq{}k\} dx = r0\_\mint{}\msupminus{}x (-(x\^{}2)\^{}k + 1/r1 + x\^{}2) dx\mkleeneclose{}\mcdot{} Home Index