Proof of Nuprl Lemma : arctangent-bounds

Step * 1 1 1 1 1 1 1 1 of Lemma arctangent-bounds

.....assertion.....
1. x : ℝ
2. n : ℕ
3. r(-n) ≤ x
4. x ≤ r(n)
5. d : ℝ
6. r0 < d
7. ∀y:ℝ
     (((r(-5) ≤ -(π/2)) ∧ (-(π/2) ≤ r(5)))
     ⇒ ((r(-5) ≤ y) ∧ (y ≤ r(5)))
     ⇒ (|-(π/2) - y| ≤ d)
     ⇒ (|rcos(-(π/2)) - rcos(y)| ≤ (r1/r((2 * n) + 1))))
8. d1 : ℝ
9. r0 < d1
10. ∀y:ℝ
      (((r(-5) ≤ -(π/2)) ∧ (-(π/2) ≤ r(5)))
      ⇒ ((r(-5) ≤ y) ∧ (y ≤ r(5)))
      ⇒ (|-(π/2) - y| ≤ d1)
      ⇒ (|-(r1) - rsin(y)| ≤ (r1/r(2))))
⊢ ∃t:ℝ. ((r0 < t) ∧ (t < π/2) ∧ (t ≤ d1) ∧ (t ≤ d))
BY

{ (D 0 With ⌜rmin(r1;rmin(d1;d))⌝  THEN Auto THEN Try (RepeatFor 2 ((BLemma `rmin_strict_ub` THEN Auto)))) }

1
1. x : ℝ
2. n : ℕ
3. r(-n) ≤ x
4. x ≤ r(n)
5. d : ℝ
6. r0 < d
7. ∀y:ℝ
     (((r(-5) ≤ -(π/2)) ∧ (-(π/2) ≤ r(5)))
     ⇒ ((r(-5) ≤ y) ∧ (y ≤ r(5)))
     ⇒ (|-(π/2) - y| ≤ d)
     ⇒ (|rcos(-(π/2)) - rcos(y)| ≤ (r1/r((2 * n) + 1))))
8. d1 : ℝ
9. r0 < d1
10. ∀y:ℝ
      (((r(-5) ≤ -(π/2)) ∧ (-(π/2) ≤ r(5)))
      ⇒ ((r(-5) ≤ y) ∧ (y ≤ r(5)))
      ⇒ (|-(π/2) - y| ≤ d1)
      ⇒ (|-(r1) - rsin(y)| ≤ (r1/r(2))))
11. r0 < rmin(r1;rmin(d1;d))
⊢ rmin(r1;rmin(d1;d)) < π/2

Latex:

Latex:
.....assertion..... 1. x : \mBbbR{} 2. n : \mBbbN{} 3. r(-n) \mleq{} x 4. x \mleq{} r(n) 5. d : \mBbbR{} 6. r0 < d 7. \mforall{}y:\mBbbR{} (((r(-5) \mleq{} -(\mpi{}/2)) \mwedge{} (-(\mpi{}/2) \mleq{} r(5))) {}\mRightarrow{} ((r(-5) \mleq{} y) \mwedge{} (y \mleq{} r(5))) {}\mRightarrow{} (|-(\mpi{}/2) - y| \mleq{} d) {}\mRightarrow{} (|rcos(-(\mpi{}/2)) - rcos(y)| \mleq{} (r1/r((2 * n) + 1)))) 8. d1 : \mBbbR{} 9. r0 < d1 10. \mforall{}y:\mBbbR{} (((r(-5) \mleq{} -(\mpi{}/2)) \mwedge{} (-(\mpi{}/2) \mleq{} r(5))) {}\mRightarrow{} ((r(-5) \mleq{} y) \mwedge{} (y \mleq{} r(5))) {}\mRightarrow{} (|-(\mpi{}/2) - y| \mleq{} d1) {}\mRightarrow{} (|-(r1) - rsin(y)| \mleq{} (r1/r(2)))) \mvdash{} \mexists{}t:\mBbbR{}. ((r0 < t) \mwedge{} (t < \mpi{}/2) \mwedge{} (t \mleq{} d1) \mwedge{} (t \mleq{} d)) By Latex: (D 0 With \mkleeneopen{}rmin(r1;rmin(d1;d))\mkleeneclose{} THEN Auto THEN Try (RepeatFor 2 ((BLemma `rmin\_strict\_ub` THEN Auto)))) Home Index