Metamath Proof Explorer

Theorem nnge2recico01

Description: The reciprocal of an integer greater than 1 is in the right open interval between 0 and 1. (Contributed by AV, 10-Apr-2026)

Ref Expression
Assertion nnge2recico01 N 2 1 N 0 1

Proof

Step Hyp Ref Expression
1 eluzelre N 2 N
2 eluz2n0 N 2 N 0
3 1 2 rereccld N 2 1 N
4 1red N 2 1
5 0le1 0 1
6 5 a1i N 2 0 1
7 eluz2nn N 2 N
8 7 nngt0d N 2 0 < N
9 divge0 1 0 1 N 0 < N 0 1 N
10 4 6 1 8 9 syl22anc N 2 0 1 N
11 eluz2gt1 N 2 1 < N
12 recgt1 N 0 < N 1 < N 1 N < 1
13 1 8 12 syl2anc N 2 1 < N 1 N < 1
14 11 13 mpbid N 2 1 N < 1
15 0re 0
16 1xr 1 *
17 15 16 pm3.2i 0 1 *
18 elico2 0 1 * 1 N 0 1 1 N 0 1 N 1 N < 1
19 17 18 mp1i N 2 1 N 0 1 1 N 0 1 N 1 N < 1
20 3 10 14 19 mpbir3and N 2 1 N 0 1