Proof of Nuprl Lemma : rsin-arcsine

Step * 1 1 1 1 1 1 1 of Lemma rsin-arcsine

1. x : {x:ℝ| x ∈ (r(-1), r1)}
2. [rmin(rsin(arcsine(x));r0), rmax(rsin(arcsine(x));r0)] ⊆ (r(-1), r1)
3. [rmin(x;rmin(rsin(arcsine(x));r0)), rmax(x;rmax(rsin(arcsine(x));r0))] ⊆ (r(-1), r1)
4. [rmin(x;r0), rmax(x;r0)] ⊆ (r(-1), r1)
5. a : ℝ
6. x_∫^-r0 arcsine_deriv(x) dx = a ∈ ℝ
⊢ (x_∫^-rsin(arcsine(x)) arcsine_deriv(x) dx = (a + arcsine(rsin(arcsine(x)))))
⇒ (a = -(arcsine(x)))
⇒ (rsin(arcsine(x)) = x)
BY
{ (Assert ⌜rsin(arcsine(x)) ∈ (r(-1), r1)⌝⋅ THENA (BLemma `rsin-strict-bound` THEN Auto)) }

1
1. x : {x:ℝ| x ∈ (r(-1), r1)}
2. [rmin(rsin(arcsine(x));r0), rmax(rsin(arcsine(x));r0)] ⊆ (r(-1), r1)
3. [rmin(x;rmin(rsin(arcsine(x));r0)), rmax(x;rmax(rsin(arcsine(x));r0))] ⊆ (r(-1), r1)
4. [rmin(x;r0), rmax(x;r0)] ⊆ (r(-1), r1)
5. a : ℝ
6. x_∫^-r0 arcsine_deriv(x) dx = a ∈ ℝ
7. rsin(arcsine(x)) ∈ (r(-1), r1)
⊢ (x_∫^-rsin(arcsine(x)) arcsine_deriv(x) dx = (a + arcsine(rsin(arcsine(x)))))
⇒ (a = -(arcsine(x)))
⇒ (rsin(arcsine(x)) = x)

Latex:

Latex:
1. x : \{x:\mBbbR{}| x \mmember{} (r(-1), r1)\} 2. [rmin(rsin(arcsine(x));r0), rmax(rsin(arcsine(x));r0)] \msubseteq{} (r(-1), r1) 3. [rmin(x;rmin(rsin(arcsine(x));r0)), rmax(x;rmax(rsin(arcsine(x));r0))] \msubseteq{} (r(-1), r1) 4. [rmin(x;r0), rmax(x;r0)] \msubseteq{} (r(-1), r1) 5. a : \mBbbR{} 6. x\_\mint{}\msupminus{}r0 arcsine\_deriv(x) dx = a \mvdash{} (x\_\mint{}\msupminus{}rsin(arcsine(x)) arcsine\_deriv(x) dx = (a + arcsine(rsin(arcsine(x))))) {}\mRightarrow{} (a = -(arcsine(x))) {}\mRightarrow{} (rsin(arcsine(x)) = x) By Latex: (Assert \mkleeneopen{}rsin(arcsine(x)) \mmember{} (r(-1), r1)\mkleeneclose{}\mcdot{} THENA (BLemma `rsin-strict-bound` THEN Auto)) Home Index