To determine which values from the table are solutions to the quadratic equation \( x^2 + 20x = 69 \), we first need to rearrange the equation to set it to zero:
\[ x^2 + 20x - 69 = 0 \]
Next, we will substitute each given value of \( x \) into this equation and evaluate it to see if the equation holds true (i.e., equals 0).
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For \( x = -23 \): \[ (-23)^2 + 20(-23) - 69 = 529 - 460 - 69 = 0 \] True statement: Yes
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For \( x = 0 \): \[ (0)^2 + 20(0) - 69 = 0 - 69 = -69 \] True statement: No
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For \( x = 12 \): \[ (12)^2 + 20(12) - 69 = 144 + 240 - 69 = 315 \] True statement: No
After evaluating each value:
- The only value for which the equation \( x^2 + 20x - 69 = 0 \) holds true is \( x = -23 \).
Therefore, the answer is: Only \( x = -23 \) is in the solution set.
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