Two young mathematicians discuss the eating habits of their cats.
Check out this dialogue between two calculus students (based on a true
story):
-
Devyn
- Yo Riley, I was watching my two cats Roxy and Yuri eat their dry cat
food last night.
-
Riley
- Cats love food! It’s so weird that they swallow the pieces whole!
-
Devyn
- I know! I noticed something else kinda funny though: Both Roxy and
Yuri start and finish eating at the same times; and while I gave Roxy a
little more food than Yuri, less food was left in Roxy’s bowl when they
stopped eating.
I wonder, is there is a point in time when Roxy and Yuri have the exact
same amount of dry cat food in their bowls?
-
Riley
- Hmmmmm. Do Roxy and Yuri both start and finish drinking their water
at the same times? And does Roxy start with a little more water than
Yuri, and finish with less water left than Yuri?
-
Devyn
- Yes!
-
Riley
- Interesting. I wonder, is there is a point in time when Roxy and Yuri
have the exact same amount of water in their bowls?
Is there a time when Roxy and Yuri have the same amount of dry cat food in their
bowls? Make the following assumptions:
- They start and finish eating at the same times.
- Roxy starts with more food than Yuri, and leaves less food uneaten than
Yuri.
You might want to try drawing a graph of this situation.
yes no There is no way to tell.
Is there a time when Roxy and Yuri have the same amount of water in their bowls?
Make the following assumptions:
- They start and finish drinking at the same times.
- Roxy starts with more water than Yuri, and leaves less water left in her
bowl than Yuri.
You might want to try drawing a graph of this situation.
yes no There is no way to tell.
Within the context of the two problems above, what is the difference between “dry
cat food” and “water?”
If we write the amount of dry cat food as a function
of time, this function is not continuous. The reason it isn’t continuous is
that the dry cat food is a collection of individual kibbles, which are eaten
whole.
On the other hand, if we write the amount of water as a function of time, this
function is continuous.