Answer:
- The volume of water in Matt's flask will eventually be greater than the volume of water in Carmen's flask.
- The volume of water in Carmen's flask is increasing at a slower rate than the volume of water in Matt's flask over the interval [4, 6].
Step-by-step explanation:
The attached graph shows the results from the experiments. Rays are drawn showing the average rate of change for the intervals [0,2], [4,6], and [6,8].
The average rate of change of volume in Matt's flask over the interval [4, 6] is very nearly the same as Carmen's. However, Carmen's is slightly slower.
Here's the average rate of change in Matt's flask on that interval:
(g(6) -g(4))/(6 -4) ≈ (43.980 -26.844)/2 = 17.136/2 = 8.568 . . . mL/s
This is very slightly more than Carmen's rate of 8.5 mL/s.
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An exponential function will eventually exceed any polynomial function, so Matt's result will eventually exceed Carmen's. (It does so before 10 seconds pass.)
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On the interval [0, 2], Carmen's rate of increase clearly exceeds Matt's. On the interval [6, 8], the reverse is true. The volume in Carmen's flask is only greater than Matt's for a short period (less than about 9.8 seconds).
