Lesson 13
Completing the Square (Part 2)
Problem 1
Add the number that would make the expression a perfect square. Next, write an equivalent expression in factored form.
- \(x^2 + 3x\)
- \(x^2 + 0.6x\)
- \(x^2 - 11x\)
- \(x^2 - \frac52 x\)
- \(x^2 + x\)
Solution
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Problem 2
Noah is solving the equation \(x^2 + 8x + 15 = 3\). He begins by rewriting the expression on the left in factored form and writes \((x+3)(x+5)=3\). He does not know what to do next.
Noah knows that the solutions are \(x= \text- 2\) and \(x = \text- 6\), but is not sure how to get to these values from his equation.
Solve the original equation by completing the square.
Solution
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Problem 3
An equation and its solutions are given. Explain or show how to solve the equation by completing the square.
- \(x^2 + 20x + 50 = 14\) . The solutions are \(x = \text- 18\) and \(x = \text- 2\).
- \(x^2 + 1.6x = 0.36\) . The solutions are \(x = \text- 1.8\) and \(x = 0.2\).
- \(x^2 - 5x = \frac{11}{4}\). The solutions are \(x = \frac{11}{2}\) and \(x = \frac{\text- 1}{2}\).
Solution
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Problem 4
Solve each equation.
- \(x^2-0.5x=0.5\)
- \(x^2+0.8x=0.09\)
- \(x^2 + \frac{13}{3}x = \frac{56}{36}\)
Solution
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Problem 5
Match each quadratic expression given in factored form with an equivalent expression in standard form. One expression in standard form has no match.
Solution
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(From Unit 7, Lesson 8.)Problem 6
Four students solved the equation \(x^2+225=0\). Their work is shown here. Only one student solved it correctly.
Student A:
\(\displaystyle \begin{align} x^2 +225&=0\\ x^2&=\text -225\\ x=15 \quad &\text{ or } \quad x= \text- 15\\ \end{align}\\\)
Student B:
\(\displaystyle \begin{align} x^2 +225&=0\\ x^2&=\text -225\\ \text{No} &\text{ solutions} \end{align}\\\)
Student C:
\(\displaystyle \begin{align} x^2 +225&=0\\ (x-15)(x+15)&=0\\ x=15 \quad \text{ or } \quad x&= \text- 15\\ \end{align}\\\)
Student D:
\(\displaystyle \begin{align} x^2 +225&=0\\ x^2&=225\\ x=15 \quad &\text{ or } \quad x= \text- 15\\ \end{align}\\\)
Determine which student solved the equation correctly. For each of the incorrect solutions, explain the mistake.
Solution
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(From Unit 7, Lesson 9.)