Dividing with Exponents (LIVE)

Going to explain WHY we do what we do to answer a division problem with exponents.

Expand:  $\frac{5\times5\times5\times5\times5}{5\times5\times5}$  

Because they are all being multiplied we can separate them into individual fractions.

Separate:  $\frac{5}{5}\times\frac{5}{5}\times\frac{5}{5}\times\frac{5}{1}\times\frac{5}{1}$  

Separated:  $\frac{5}{5}\times\frac{5}{5}\times\frac{5}{5}\times\frac{5}{1}\times\frac{5}{1}$  

We can also see it works mathematically

 $\frac{5^5}{5^3}$  =  $\frac{3125}{125}$  =  $25$  

BUT what if we are dealing with variables?

Expand:  $\frac{y\times y}{y\times y\times y\times y\times y\times y}$  


Separate:  $\frac{y}{y}\times\frac{y}{y}\times\frac{1}{y}\times\frac{1}{y}\times\frac{1}{y}\times\frac{1}{y}$  

Rewritten:  $1\times1\times\frac{1}{y}\times\frac{1}{y}\times\frac{1}{y}\times\frac{1}{y}$  

ASK: Where are there more f's?
ANSWER: on top

ASK: How many more?
ANSWER: 11

So there is  $f^{11}$  on top and  $1$  on the bottom.

So the answer is just  $f^{11}$  

ASK: Where are there more w's?
ANSWER: on the bottom

ASK: How many more?
ANSWER: 7

So there is  $w^7$  on the bottom and  $1$  on top.

So the answer is  $\frac{1}{w^7}$