Metamath Proof Explorer


Theorem 2irrexpqALT

Description: Alternate proof of 2irrexpq : There exist irrational numbers a and b such that ( a ^ b ) is rational. Statement in the Metamath book, section 1.1.5, footnote 27 on page 17, and the "constructive proof" for theorem 1.2 of Bauer, p. 483. In contrast to 2irrexpq , this is a constructive proof because it is based on two explicitly named irrational numbers ( sqrt2 ) and ( 2 logb 9 ) , see sqrt2irr0 , 2logb9irr and sqrt2cxp2logb9e3 . Therefore, this proof is also acceptable/usable in intuitionistic logic. (Contributed by AV, 23-Dec-2022) (New usage is discouraged.) (Proof modification is discouraged.)

Ref Expression
Assertion 2irrexpqALT a b a b

Proof

Step Hyp Ref Expression
1 sqrt2irr0 2
2 2logb9irr log 2 9
3 sqrt2cxp2logb9e3 2 log 2 9 = 3
4 3z 3
5 zq 3 3
6 4 5 ax-mp 3
7 3 6 eqeltri 2 log 2 9
8 oveq1 a = 2 a b = 2 b
9 8 eleq1d a = 2 a b 2 b
10 oveq2 b = log 2 9 2 b = 2 log 2 9
11 10 eleq1d b = log 2 9 2 b 2 log 2 9
12 9 11 rspc2ev 2 log 2 9 2 log 2 9 a b a b
13 1 2 7 12 mp3an a b a b