Question 1
Refer to the information provided in Table 25.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Table 25.3. The required reserve ratio is
◦ 50%.
◦ 25%.
◦ 20%.
◦ 10%.
Question 2
Refer to the information provided in Table 25.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Table 25.3. People's Bank excess reserves are $________.
◦ 100,000
◦ 200,000
◦ 300,000
◦ 400,000