Lesson 12
Reasoning about Exponential Graphs (Part 1)
Problem 1
Here are equations defining three exponential functions \(f\), \(g\), and \(h\).
\(f(x) = 100 \boldcdot 3^x\)
\(g(x) = 100 \boldcdot (3.5)^x\)
\(h(x) = 100 \boldcdot 4^x\)
- Which of these functions grows the least quickly? Which one grows the most quickly? Explain how you know.
-
The three given graphs represent \(f\), \(g\), and \(h\). Which graph corresponds to each function?
- Why do all three graphs share the same intersection point with the vertical axis?
Solution
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Problem 2
Here are graphs of three exponential equations.
Match each equation with its graph.
Solution
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Problem 3
The function \(f\) is given by \(f(x) = 160 \boldcdot \left(\frac{4}{5}\right)^x\) and the function \(g\) is given by \(g(x) = 160 \boldcdot \left(\frac{1}{5}\right)^x\). The graph of \(f\) is labeled \(A\) and the graph of \(g\) is labeled \(C\).
If \(B\) is the graph of \(h\) and \(h\) is defined by \(h(x) = a\boldcdot b^x\), what can you say about \(a\) and \(b\)? Explain your reasoning.
Solution
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Problem 4
Here is a graph of \(y = 100 \boldcdot 2^x\).
On the same coordinate plane:
- Sketch a graph of \(y = 50\boldcdot 2^x\) and label it \(A\).
- Sketch a graph of \(y = 200 \boldcdot 2^x\) and label it \(B\).
Solution
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Problem 5
Choose the inequality whose solution region is represented by this graph.
\(3x - 4y > 12\)
\(3x - 4y \geq 12\)
\(3x - 4y < 12\)
\(3x - 4y \leq 12\)
Solution
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(From Unit 2, Lesson 21.)Problem 6
Technology required. Start with a square with area 1 square unit (not shown). Subdivide it into 9 squares of equal area and remove the middle one to get the first figure shown.
- What is the area of the first figure shown?
- Take the remaining 8 squares, subdivide each into 9 equal squares, and remove the middle one from each. What is the area of the figure now?
- Continue the process and find the area for stages 3 and 4.
- Write an equation representing the area \(A\) at stage \(n\).
- Use technology to graph your equation.
- Use your graph to find the first stage when the area is first less than \(\frac12\) square unit.
Solution
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(From Unit 5, Lesson 5.)Problem 7
The equation \(b = 500 \boldcdot (1.05)^t\) gives the balance of a bank account \(t\) years since the account was opened. The graph shows the annual account balance for 10 years.
- What is the average annual rate of change for the bank account?
- Is the average rate of change a good measure of how the bank account varies? Explain your reasoning.
Solution
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(From Unit 5, Lesson 10.)