|
 For
problems 1 through 5, use the "Mixing
Orange Juice" applet to check your answers to the problems in
the "Orange Juice Mixture" problem. (You need to decide whether
one mixture will taste more "orangey" than the other or whether
they will taste the same.)
| 1. |
Mixture 1 |
Mixture 2 |
|
|
|
| |
| 2. |
Mixture 1 |
Mixture 2 |
| |
|
|
| |
| 3. |
Mixture 1 |
Mixture 2 |
| |
|
|
| |
| 4. |
Mixture 1 |
Mixture 2 |
| |
|
|
| |
| 5. |
Mixture 1 |
Mixture 2 |
| |
|
|
In problems 6 through
8, use the applet to compare the two mixtures. Come up with a way to reliably
determine which mixture is more "orangey" than the other or
whether they are the same amount of "orangeyness."
| 6. |
Mixture 1 |
Mixture 2 |
|
|
|
| |
| 7. |
Mixture 1 |
Mixture 2 |
| |
|
|
| |
| 8. |
Mixture 1 |
Mixture 2 |
| |
|
|
| |
9. Come up with a
new pair of mixtures in which the second mixture is more "orangey"
than the first mixture.
10. Come up with a
new pair of mixtures in which the two mixtures have the same amount of
"orangeyness."
|
| Why
these problems? |
| These
problems: |
 |
Address
the misconception that proportionality is based on additive
relationships; |
|
Highlight
the difference between part-to-part ratios and part-to-whole
ratios; |
|
Provide
a visual model for thinking about ratios; |
|
Require
the learner to synthesize his or her learning about comparing
proportions to create new examples. |
|
|
