So many rectangles.

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A dialogue where students discuss area approximations.

Check out this dialogue between two calculus students (based on a true story):

Devyn: Hey Riley, I’ve found a problem with approximating areas!
Riley: Fascinating! Tell me more.
Devyn: Remember how it works. We split the region into some number $n$ of rectangles, find the area of each of the rectangles, then add them all together.
Riley: Yes, and by taking more rectangles we can make that approximation better and better!
Devyn: Pretty much. But think about the calculations we’ve been doing. For each rectangle, we’re tracking the height and area, then adding them all together. That works for, like, 6 or 8 rectangles, but we want LOTS of rectangles to get a really good approximation.
Riley: How can we track this for 100 rectangles?!?!?
Devyn: Exactly!
Riley: Hmmm...

Which of the following quantities does the accuracy of our approximation depend upon?

The function. The interval. The number of rectangles.