Solving Exponential Equations with Logs

e is a number. e is roughly 2.718. Click the "e" button on your calculator.

For example, $\log_e\left(e\right)=1$  

Instead of writing " $\log_e$  ", we write " $\ln$  " and it is called the "natural logarithm."

Find the "LN" button on your calculator and try LN(e), LN(1), LN(5)

Notice the "LOG" button on your calculator? Try LOG(10), LOG(100) and LOG(0.01).

It is common notation to simply write " $\log$  " without a base when we are referring to  $\log_{10}$  .

So...  $\log_e\left(x\right)=\ln\left(x\right)$  and $\log_{10}\left(x\right)=\log\left(x\right)$  

But other bases stays the same! This notation isn't only your calculator. If you type "log(1000)" into google, you will get 3 as an answer. If you type "ln(e)," you will get 1. 

 $2^x=12$  

 $\log\left(2^x\right)=\log\left(12\right)$  

Using the power property, this becomes    $x\cdot\log\left(2\right)=\log\left(12\right)$  

Then divide both sides by  $\log\left(2\right)$  and you get 

 $x=\frac{\log\left(12\right)}{\log\left(2\right)}$