[size=150][size=100]All books at a bookstore are 25% off. Priya bought a book originally priced at $32. The cashier applied the storewide discount and then took another 25% off for a coupon that Priya brought. If there was no sales tax, how much did Priya pay for the book? Show your reasoning.[/size][/size]

How much will she owe at the end of one year? Show your reasoning.

Assuming she continues to make no payments to the lender, how much will she owe at the end of two years? [br]

Three years?

[size=150]To find the amount owed at the end of the third year, a student started by writing: [math]$\text{[Year 3 Amount]}=\text{[Year 2 Amount]}+\text{[Year 2 Amount]}\cdot (0.18)$[/math] and ended with [math]450\cdot\left(1.18\right)\cdot\left(1.18\right)\cdot\left(1.18\right)[/math]. [br][/size][br]Does her final expression correctly reflect the amount owed at the end of the third year? Explain or show your reasoning.[br]

Write an expression for the amount she owes at the end of [math]x[/math] years without payment.[br]

[size=150]Make a new shape by taking the middle third of the line segment and replacing it by two line segments of the same length to reconnect the two pieces. Repeat this process over and over, replacing the middle third of each of the remaining line segments with two segments each of the same length as the segment they replaced, as shown in the figure.[/size][br][img]data:image/png;base64,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[/img][br][br]What is the perimeter of the figure after one iteration of this process (the second shape in the diagram)?

After two iterations?

After [math]n[/math] iterations? Experiment with the value of your expression for large values of [math]n[/math].

Based on your graph, about how many years would it take for the original unpaid balance of each loan to double?[br]

[size=150]The functions [math]a[/math], [math]b[/math], and [math]c[/math] represent the amount owed (in dollars) for Loans A, B, and C respectively: the input for the functions is [math]t[/math], the number of years without payments.[br][br]For each loan, find the average rate of change per year between:[/size][br][list][*]the start of the loan and the end of the second year[/*][/list]

[list][*]the end of the tenth year and the end of the twelfth year[br][/*][/list]

How do the average rates of change for the three loans compare in each of the two-year intervals?[br]