Proof of Nuprl Lemma : full-arctan

Step * 1 1 2 1 1 1 1 of Lemma full-arctan_wf

1. 8 ∈ (r(-1))/2 < r0
2. 16 ∈ (r1)/3 < (r1)/2
3. 4 ∈ r(2) < r(3)
4. x : ℝ
5. (r(-1))/2 < x
6. (r1/r(3)) < x
7. r0 < x
8. y : x < r(3)
9. r0 < (r1 + x)
10. r0 < |r1 + x|
⊢ (-((r1 + x/r(2))) ≤ (r(-1) + x)) ∧ ((r(-1) + x) ≤ (r1 + x/r(2)))
BY
{ (D 0 THEN nRMul ⌜r(2)⌝ 0⋅ THEN Auto) }

1
1. 8 ∈ (r(-1))/2 < r0
2. 16 ∈ (r1)/3 < (r1)/2
3. 4 ∈ r(2) < r(3)
4. x : ℝ
5. (r(-1))/2 < x
6. (r1/r(3)) < x
7. r0 < x
8. y : x < r(3)
9. r0 < (r1 + x)
10. r0 < |r1 + x|
⊢ (r(-1) + -(x)) ≤ (r(-2) + (r(2) * x))

2
1. 8 ∈ (r(-1))/2 < r0
2. 16 ∈ (r1)/3 < (r1)/2
3. 4 ∈ r(2) < r(3)
4. x : ℝ
5. (r(-1))/2 < x
6. (r1/r(3)) < x
7. r0 < x
8. y : x < r(3)
9. r0 < (r1 + x)
10. r0 < |r1 + x|
⊢ (r(-2) + (r(2) * x)) ≤ (r1 + x)

Latex:

Latex:
1. 8 \mmember{} (r(-1))/2 < r0 2. 16 \mmember{} (r1)/3 < (r1)/2 3. 4 \mmember{} r(2) < r(3) 4. x : \mBbbR{} 5. (r(-1))/2 < x 6. (r1/r(3)) < x 7. r0 < x 8. y : x < r(3) 9. r0 < (r1 + x) 10. r0 < |r1 + x| \mvdash{} (-((r1 + x/r(2))) \mleq{} (r(-1) + x)) \mwedge{} ((r(-1) + x) \mleq{} (r1 + x/r(2))) By Latex: (D 0 THEN nRMul \mkleeneopen{}r(2)\mkleeneclose{} 0\mcdot{} THEN Auto) Home Index