Question 1
The formula for the return on common stockholders' equity is
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![](data:image/png;base64, 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)
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)
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)
Question 2
Which of the following is the reason that preferred dividends declared during the period are deducted from net income in calculating return on common stockholders' equity?
◦ Preferred dividends are not a part of stockholders' equity.
◦ Preferred dividends are not paid from net income.
◦ Preferred dividends are not paid until all common stockholders have received their dividends, so preferred dividends are not relevant in the formula and so must be taken out of the equation.
◦ Preferred dividends reduce the amount of income available for distribution to common stockholders.