Evaluating Logarithms

Relay race competition.

Quiz corrections.

Quick notes on evaluating logarithms.

Launch Lost Project. (in-person only).

You will be able to evaluate easy logarithms like

You will be able to evaluate hard logarithms like  $\ln57$  with a calculator.

You will be able to apply logarithm knowledge to our project.

Logarithms answer the question, "How many of one number do we multiply to get another number."

For example: How many 3's do we multiply to get 27? (or  $3^x=27$  )

Logarithms are the inverses of exponents.

With a partner: create arrows showing the connections between  $3^5=243\ and\ \log_3\ 243\ =5$  

Be thinking: "How many times do I multiply 3 by itself to get 27?"

It might help to rewrite it in exponential form like  $3^x=27$  .

 $\log_28\ vs.\ \log_82\ \ vs.\ \log_2\ \frac{1}{8}\ vs.\ \ \log_8\ \frac{1}{2}$  

You try:  $\log_416\ vs.\ \log_{16}4\ vs.\ \log_4\ \frac{1}{16}\ vs.\ \log_{16}\ \frac{1}{4}$  

Some logarithms may be difficult to solve by hand. For now, we can use a calculator to help us solve larger application problems! (we are going to be learning a trick soon so we can ditch the calculators ;-) )

For example,   $\log_346$  cannot be done easily by hand. Throw it in the calculator! (Symbolab is a great online calculator..)