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• The concepts for this exercise are summarized below.
  For a complete discussion, read the text.

A teacher reports an average grade on a test.
You read about the average number of calories burned per hour for your favorite exercise.
What do these figures mean?
The purpose of this section is to discuss the concept, the computation, and some important properties of averaging.

To average two numbers means to add the numbers together, and then divide by [beautiful math coming... please be patient] $\,2\,$. Thus:
[beautiful math coming... please be patient] $$ \text{the average of } \,a\, \text{ and } \,b\, \text{ is } \,\frac{a+b}{2} $$ Averaging two different numbers always gives the number exactly halfway between, as illustrated below:

In this web exercise, you will compute averages of two numbers, where the numbers can be [beautiful math coming... please be patient] $\,-10, -9, \ldots, 9, 10\,$.
You should be able to do this exercise without a calculator!
It is good practice with mental arithmetic, and will reinforce your skills with addition of signed numbers.

There are two key ideas to keep in mind:

• If the two numbers being averaged are close to each other,
  just visualize the number line and picture the number that is exactly halfway between.
• If the numbers being averaged are far enough apart that you can't easily decide which number is halfway between,
  then do the arithmetic:   add the two numbers and divide by $\,2\,$.

Clearly, the formula [beautiful math coming... please be patient] $\,\frac{a+b}2\,$ gives some number;
but how do we know that the number given by this formula is really, always, halfway between [beautiful math coming... please be patient] $\,a\,$ and [beautiful math coming... please be patient] $\,b\,$?
Although repeated trials (with lots of different numbers) is pretty convincing, it is of course impossible to check every pair of real numbers.
To see a proof, read the text!