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Chapter 8: Problem 87
Explain how to solve a system of equations using the substitution method. Use \(y=3-3 x\) and \(3 x+4 y=6\) to illustrate your explanation.
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You invest in a new play. The cost includes an overhead of \(\$ 30,000,\) plus production costs of \(\$ 2500\) per performance. A sold-out performance brings in \(\$ 3125 .\) (In solving this exercise, let \(x\) represent the number of sold-out performances.
Solve the system for \(x\) and \(y\) in terms of \(a_{1}, b_{1}, c_{1}, a_{2}, b_{2},\) and \(c_{2}\) $$\left\\{\begin{array}{l} {a_{1} x+b_{1} y=c_{1}} \\ {a_{2} x+b_{2} y=c_{2}} \end{array}\right.$$
Perform the operations and write the result in standard form: $$\frac{-20+\sqrt{-32}}{10}$$
Exercises \(41-43\) will help you prepare for the material covered in the first section of the next chapter. Consider the following array of numbers: $$\left[\begin{array}{rrr} {1} & {2} & {-1} \\ {4} & {-3} & {-15} \end{array}\right]$$ Rewrite the array as follows: Multiply each number in the top row by -4 and add this product to the corresponding number in the bottom row. Do not change the numbers in the top row.
Write the linear system whose solution set is {(6, 2)}. Express each equation in the system in slope-intercept form.
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