\begin{tabular}{l} Question 18 \\ \hline You decide to save up for a vacation to Europe by throwing all of your loose change into a large coffee \\ can. After a few months, you discover that the jar is 2 inches full and contains \( \$ 202 \). \\ a) Determine the average rate of change in \( \$ / \) inch (Dollars per inch), for the coffee can from when it \\ was empty ( 0 inches) to when it was 2 inches deep. \\ The average rate of change from 0 to 2 inches is \\ b) A month later, you check the can and find the change is now 3 inches deep arns adds up to \( \$ 303 \). Find \\ the average rate of change, in \( \$ / i n c h, ~ f o r ~ t h e ~ c o f f e e ~ c a n ~ f r o m ~ \) \\ 0 inches to 3 inches. \\ The average rate of change from 0 to 3 inches is \\ c) What is the meaning of the average rate of change in this situation? \\ Select an answer \\ Submit Question \end{tabular}
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The average rate of change is a nifty way to quantify how much value is packed into each inch of your change jar! From 0 to 2 inches, you have \( \$ 202 \). So, to find the average rate, just divide \( 202 \) by \( 2 \) inches, resulting in \( \$ 101 \) per inch. For your later check, with the change increasing to \( \$ 303 \) at 3 inches, divide \( 303 \) by \( 3 \) inches, giving you \( \$ 101 \) per inch again. Look at you, keeping it consistent! Understanding the average rate of change here is like finding the hidden treasure map leading to your vacation! It tells you how much money you accumulate for every inch of coins you pile up. Thus, maintaining that rate indicates the growth of your savings, and helps you plan that exciting trip across Europe with a clearer financial roadmap!
