To solve the equation \( x^2 + 20x = 69 \), we need to rearrange it into standard quadratic form:
\[ x^2 + 20x - 69 = 0 \]
Now we will use the quadratic formula to find the values of \( x \): \[ x = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a} \]
Here, \( a = 1 \), \( b = 20 \), and \( c = -69 \).
Calculating the discriminant (\( b^2 - 4ac \)): \[ b^2 - 4ac = 20^2 - 4 \cdot 1 \cdot (-69) = 400 + 276 = 676 \]
Now we will find the square root of the discriminant: \[ \sqrt{676} = 26 \]
Now, substituting into the quadratic formula: \[ x = \frac{-20 \pm 26}{2 \cdot 1} \]
Calculating the two possible values for \( x \): 1. \[ x = \frac{-20 + 26}{2} = \frac{6}{2} = 3 \] 2. \[ x = \frac{-20 - 26}{2} = \frac{-46}{2} = -23 \]
Thus, the solutions are \( x = 3 \) and \( x = -23 \).
Now we’ll fill in the table provided with \( -23 \), \( 0 \), and \( 12 \) substituted into the left side of the equation \( x^2 + 20x \) and check if it equals \( 69 \):
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For \( x = -23 \): \[ x^2 + 20x = (-23)^2 + 20(-23) = 529 - 460 = 69 \quad \text{(True)} \]
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For \( x = 0 \): \[ x^2 + 20x = 0^2 + 20(0) = 0 + 0 = 0 \quad \text{(False)} \]
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For \( x = 12 \): \[ x^2 + 20x = 12^2 + 20(12) = 144 + 240 = 384 \quad \text{(False)} \]
Now, we can summarize the evaluations:
| x | Substituted | Evaluate | True | |-----|---------------------------------|--------------------------|-------| | -23 | \((-23)^2 + 20(-23) = 69\) | \(69\) | True | | 0 | \(0^2 + 20(0) = 0\) | \(0\) | False | | 12 | \(12^2 + 20(12) = 384\) | \(384\) | False |
So, the filled-in table will look like this:
| x | Substituted | Evaluate | True | |-----|---------------------------------|--------------------------|-------| | -23 | \( (-23)^2 + 20(-23) = 69 \) | \( 69 \) | True | | 0 | \( 0^2 + 20(0) = 0 \) | \( 0 \) | False | | 12 | \( 12^2 + 20(12) = 384 \) | \( 384 \) | False |
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