How do $\ln$ and $e$ cancel out when there is an exponent that is negative?
By Daniel Rodriguez •
I have a question about $\ln$ and $e$.
Essentially I know that $e$ and $\ln$ cancel/reverse each other to give $x$. Ex: $e^{\ln x} = x$
But how does this work: $-e^{-\ln 2} = -1/2$
I thought it would just give me $-(-2)$.
$\endgroup$ 12 Answers
$\begingroup$Recall that that $a^{-b}= (a^b)^{-1}$.
Thus $e^{-\ln 2}= (e^{\ln 2})^{-1}= 2^{-1}= 1/2$.
$\endgroup$ 3 $\begingroup$We know that $e^{\ln x} = x$ and $p \ln x = ln x^p$.
Using this we get
$$ -e^{-\ln 2} = -e^{-1\ln 2}= -e^{\ln 2^{-1}} = -e^{ln(\frac{1}{2})}= -\frac{1}{2}. $$
$\endgroup$ 0More in general
"Zoraya ter Beek, age 29, just died by assisted suicide in the Netherlands. She was physically healthy, but psychologically depressed. It's an abomination that an entire society would actively facilitate, even encourage, someone ending their own life because they had no hope. Th…"
