Proof of Nuprl Lemma : log-property

Step * 1 2 1 1 1 2 2 of Lemma log-property

1. b : {i:ℤ| 1 < i}
2. x : ℕ
3. ∀x:ℕx. (b^log(b;x) ≤ x) ∧ x < b^log(b;x) + 1 supposing 0 < x
4. 0 < x
5. b ≤ x
6. 0 < x ÷ b
7. x ÷ b < x
8. b^log(b;x ÷ b) ≤ (x ÷ b)
9. x ÷ b < b^log(b;x ÷ b) + 1
10. 1 < b
11. b^log(b;x ÷ b) + 1 = (b^log(b;x ÷ b) * b^1) ∈ ℤ
12. b^(log(b;x ÷ b) + 1) + 1 = (b^log(b;x ÷ b) + 1 * b^1) ∈ ℤ
13. (b^log(b;x ÷ b) * b) ≤ x
⊢ x < b^log(b;x ÷ b) + 1 * b
BY
{ InstLemma `mul_preserves_le` [⌜(x ÷ b) + 1⌝;⌜b^log(b;x ÷ b) + 1⌝;⌜b⌝]⋅
THEN Auto⋅ }

1
1. b : {i:ℤ| 1 < i}
2. x : ℕ
3. ∀x:ℕx. (b^log(b;x) ≤ x) ∧ x < b^log(b;x) + 1 supposing 0 < x
4. 0 < x
5. b ≤ x
6. 0 < x ÷ b
7. x ÷ b < x
8. b^log(b;x ÷ b) ≤ (x ÷ b)
9. x ÷ b < b^log(b;x ÷ b) + 1
10. 1 < b
11. b^log(b;x ÷ b) + 1 = (b^log(b;x ÷ b) * b^1) ∈ ℤ
12. b^(log(b;x ÷ b) + 1) + 1 = (b^log(b;x ÷ b) + 1 * b^1) ∈ ℤ
13. (b^log(b;x ÷ b) * b) ≤ x
14. (b * ((x ÷ b) + 1)) ≤ (b * b^log(b;x ÷ b) + 1)
⊢ x < b^log(b;x ÷ b) + 1 * b

Latex:

Latex:
1. b : \{i:\mBbbZ{}| 1 < i\} 2. x : \mBbbN{} 3. \mforall{}x:\mBbbN{}x. (b\^{}log(b;x) \mleq{} x) \mwedge{} x < b\^{}log(b;x) + 1 supposing 0 < x 4. 0 < x 5. b \mleq{} x 6. 0 < x \mdiv{} b 7. x \mdiv{} b < x 8. b\^{}log(b;x \mdiv{} b) \mleq{} (x \mdiv{} b) 9. x \mdiv{} b < b\^{}log(b;x \mdiv{} b) + 1 10. 1 < b 11. b\^{}log(b;x \mdiv{} b) + 1 = (b\^{}log(b;x \mdiv{} b) * b\^{}1) 12. b\^{}(log(b;x \mdiv{} b) + 1) + 1 = (b\^{}log(b;x \mdiv{} b) + 1 * b\^{}1) 13. (b\^{}log(b;x \mdiv{} b) * b) \mleq{} x \mvdash{} x < b\^{}log(b;x \mdiv{} b) + 1 * b By Latex: InstLemma `mul\_preserves\_le` [\mkleeneopen{}(x \mdiv{} b) + 1\mkleeneclose{};\mkleeneopen{}b\^{}log(b;x \mdiv{} b) + 1\mkleeneclose{};\mkleeneopen{}b\mkleeneclose{}]\mcdot{} THEN Auto\mcdot{} Home Index