Metamath Proof Explorer


Theorem eflog

Description: Relationship between the natural logarithm function and the exponential function. (Contributed by Paul Chapman, 21-Apr-2008)

Ref Expression
Assertion eflog A A 0 e log A = A

Proof

Step Hyp Ref Expression
1 dflog2 log = exp ran log -1
2 1 fveq1i log A = exp ran log -1 A
3 2 fveq2i exp ran log log A = exp ran log exp ran log -1 A
4 logrncl A A 0 log A ran log
5 4 fvresd A A 0 exp ran log log A = e log A
6 eldifsn A 0 A A 0
7 eff1o2 exp ran log : ran log 1-1 onto 0
8 f1ocnvfv2 exp ran log : ran log 1-1 onto 0 A 0 exp ran log exp ran log -1 A = A
9 7 8 mpan A 0 exp ran log exp ran log -1 A = A
10 6 9 sylbir A A 0 exp ran log exp ran log -1 A = A
11 3 5 10 3eqtr3a A A 0 e log A = A