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Let \( y \) represent the total cost of publishing a book (in dollars). Let \( x \) represent the number of copies of the book printed. Suppose that \( x \) and \( y \) are related by the equation \( y=1250+10 x \). Answer the questions below. Note that a change can be an increase or a decrease. For an increase, use a positive number. For a decrease, use a negative number. What is the change in the total cost for each book printed? What is the cost to get started (before any books are printed)? \( \$ \square \)

Ask by Dawson Burgess. in the United States
Mar 15,2025

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Answer

For each book printed, the cost increases by \$10. The initial cost before printing any books is \$1,250.

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Bonus Knowledge

The change in the total cost for each book printed is determined by the coefficient of \( x \) in the equation \( y=1250+10 x \). This coefficient, which is \( 10 \), represents the additional cost incurred for each additional book printed. The cost to get started, or the fixed cost before any books are printed, is represented by the constant term in the equation. In this case, it is \( 1250 \) dollars. So, the answers are: 1. Change in total cost for each book printed: \( \$10 \) 2. Cost to get started: \( \$1250 \)

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