Question
\begin{tabular}{|lc}\hline SOLVING EQUATIONS \\ \hline 1. & Distribute \\ \hline 2. \( \begin{array}{c}\text { Simplify Each Side } \\ \text { by combining like terms }\end{array} \) \\ \hline 3. \( \begin{array}{c}\text { Move Variables } \\ \text { to one side }\end{array} \) \\ \hline 4. \( \begin{array}{c}\text { Solve }\end{array} \) \\ \hline \( \begin{array}{l}\text { Examples inverse operations }\end{array} \) \\ \hline \hline Directions: Solve each equation below. \( \frac{10 x+17-(x-9)}{2}=3 x+1 \) \\ \hline\end{tabular}
Ask by Reeves Stanley. in the United States
Dec 26,2024
Real Tutor Solution
Tutor-Verified Answer
Answer
\( x = -8 \)
Solution
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Bonus Knowledge
To solve this equation, let's start by simplifying the left side. Distribute the 10 and then combine like terms. You'll have \( \frac{10x + 17 - x + 9}{2} = 3x + 1 \) which simplifies down to \( \frac{9x + 26}{2} = 3x + 1 \). Next, multiply both sides by 2 to eliminate the fraction: \( 9x + 26 = 6x + 2 \). From here, subtract \( 6x \) from both sides to find \( 3x + 26 = 2 \). Finally, isolate \( x \) by subtracting 26 from both sides, yielding \( 3x = -24 \). Divide by 3 and voilà, you’ve found \( x = -8 \)!
