How do you expand #ln(e/x)#? Precalculus Properties of Logarithmic Functions Natural Logs 1 Answer Gerardina C. Jun 25, 2016 #1-lnx# Explanation: Since #ln(a/b)=lna -lnb# you obtain #lne-lnx# but #lne=1# so you have #1-lnx# Answer link Related questions What is the natural log of e? What is the natural log of 2? How do I do natural logs on a TI-83? How do I find the natural log of a fraction? What is the natural log of 1? What is the natural log of infinity? Can I find the natural log of a negative number? How do I find a natural log without a calculator? How do I find the natural log of a given number by using a calculator? How do I do natural logs on a TI-84? See all questions in Natural Logs Impact of this question 1711 views around the world You can reuse this answer Creative Commons License