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Five-Minute Check (over Lesson 4–5) CCSS Then/Now New Vocabulary
Key Concept: Quadratic Formula Example 1: Two Rational Roots Example 2: One Rational Root Example 3: Irrational Roots Example 4: Complex Roots Key Concept: Discriminant Example 5: Describe Roots Concept Summary: Solving Quadratic Equations Lesson Menu
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Solve x2 – 2x + 1 = 9 by using the Square Root Property.
C. 2, –2 D. 2, 1 5-Minute Check 1
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Solve x2 – 2x + 1 = 9 by using the Square Root Property.
C. 2, –2 D. 2, 1 5-Minute Check 1
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Solve 4c2 + 12c + 9 = 7 by using the Square Root Property.
D. 5-Minute Check 2
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Solve 4c2 + 12c + 9 = 7 by using the Square Root Property.
D. 5-Minute Check 2
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Find the value of c that makes the trinomial x2 + x + c a perfect square. Then write the trinomial as a perfect square. A. B. C. D. 1; (x + 1)2 5-Minute Check 3
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Find the value of c that makes the trinomial x2 + x + c a perfect square. Then write the trinomial as a perfect square. A. B. C. D. 1; (x + 1)2 5-Minute Check 3
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Solve x2 + 2x + 24 = 0 by completing the square.
D. 5-Minute Check 4
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Solve x2 + 2x + 24 = 0 by completing the square.
D. 5-Minute Check 4
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Solve 5g2 – 8 = 6g by completing the square.
D. 4, 2 5-Minute Check 5
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Solve 5g2 – 8 = 6g by completing the square.
D. 4, 2 5-Minute Check 5
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Find the value(s) of k in x2 + kx = 0 that would make the left side of the equation a perfect square trinomial. A. –10, 10 B. 5, 20 C. –20, 20 D. 4, 25 5-Minute Check 6
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Find the value(s) of k in x2 + kx = 0 that would make the left side of the equation a perfect square trinomial. A. –10, 10 B. 5, 20 C. –20, 20 D. 4, 25 5-Minute Check 6
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Mathematical Practices
Content Standards N.CN.7 Solve quadratic equations with real coefficients that have complex solutions. A.SSE.1.b Interpret complicated expressions by viewing one or more of their parts as a single entity. Mathematical Practices 8 Look for and express regularity in repeated reasoning. CCSS
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You solved equation by completing the square.
Solve quadratic equations by using the Quadratic Formula. Use the discriminant to determine the number and type of roots of a quadratic equation. Then/Now
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Quadratic Formula discriminant Vocabulary
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Concept
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Solve x2 – 8x = 33 by using the Quadratic Formula.
Two Rational Roots Solve x2 – 8x = 33 by using the Quadratic Formula. First, write the equation in the form ax2 + bx + c = 0 and identify a, b, and c. ax2 + bx + c = 0 x2 – 8x = 33 1x2 – 8x – 33 = 0 Then, substitute these values into the Quadratic Formula. Quadratic Formula Example 1
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Replace a with 1, b with –8, and c with –33.
Two Rational Roots Replace a with 1, b with –8, and c with –33. Simplify. Simplify. Example 1
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or Write as two equations.
Two Rational Roots or Write as two equations. x = x = –3 Simplify. Answer: Example 1
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or Write as two equations.
Two Rational Roots or Write as two equations. x = x = –3 Simplify. Answer: The solutions are 11 and –3. Example 1
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Solve x2 + 13x = 30 by using the Quadratic Formula.
Example 1
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Solve x2 + 13x = 30 by using the Quadratic Formula.
Example 1
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Solve x2 – 34x + 289 = 0 by using the Quadratic Formula.
One Rational Root Solve x2 – 34x = 0 by using the Quadratic Formula. Identify a, b, and c. Then, substitute these values into the Quadratic Formula. Quadratic Formula Replace a with 1, b with –34, and c with 289. Simplify. Example 2
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One Rational Root Answer: Example 2
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Answer: The solution is 17.
One Rational Root Answer: The solution is 17. Check A graph of the related function shows that there is one solution at x = 17. [–5, 25] scl: 1 by [–5, 15] scl: 1 Example 2
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Solve x2 – 22x + 121 = 0 by using the Quadratic Formula.
Example 2
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Solve x2 – 22x + 121 = 0 by using the Quadratic Formula.
Example 2
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Solve x2 – 6x + 2 = 0 by using the Quadratic Formula.
Irrational Roots Solve x2 – 6x + 2 = 0 by using the Quadratic Formula. Quadratic Formula Replace a with 1, b with –6, and c with 2. Simplify. or Example 3
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Irrational Roots Answer: Example 3
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Irrational Roots Answer: Check Check these results by graphing the related quadratic function, y = x2 – 6x + 2. Using the ZERO function of a graphing calculator, the approximate zeros of the related function are 0.4 and 5.6. [–10, 10] scl: 1 by [–10, 10] scl: 1 Example 3
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Solve x2 – 5x + 3 = 0 by using the Quadratic Formula.
Example 3
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Solve x2 – 5x + 3 = 0 by using the Quadratic Formula.
Example 3
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Solve x2 + 13 = 6x by using the Quadratic Formula.
Complex Roots Solve x = 6x by using the Quadratic Formula. Quadratic Formula Replace a with 1, b with –6, and c with 13. Simplify. Simplify. Example 4
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Complex Roots Answer: Example 4
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Answer: The solutions are the complex numbers 3 + 2i and 3 – 2i.
Complex Roots Answer: The solutions are the complex numbers 3 + 2i and 3 – 2i. A graph of the related function shows that the solutions are complex, but it cannot help you find them. [–5, 15] scl: 1 by [–5, 15] scl: 1 Example 4
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x2 + 13 = 6x Original equation
Complex Roots Check To check complex solutions, you must substitute them into the original equation. The check for 3 + 2i is shown below. x = 6x Original equation (3 + 2i) = 6(3 + 2i) x = (3 + 2i) ? 9 + 12i + 4i = i Square of a sum; Distributive Property ? i – 4 = i Simplify. ? i = i Example 4
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Solve x2 + 5 = 4x by using the Quadratic Formula.
A. 2 ± i B. –2 ± i C i D. –2 ± 2i Example 4
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Solve x2 + 5 = 4x by using the Quadratic Formula.
A. 2 ± i B. –2 ± i C i D. –2 ± 2i Example 4
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Concept
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b2 – 4ac = (3)2 – 4(1)(5) Substitution = 9 – 20 Simplify.
Describe Roots A. Find the value of the discriminant for x2 + 3x + 5 = 0. Then describe the number and type of roots for the equation. a = 1, b = 3, c = 5 b2 – 4ac = (3)2 – 4(1)(5) Substitution = 9 – 20 Simplify. = –11 Subtract. Answer: Example 5
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b2 – 4ac = (3)2 – 4(1)(5) Substitution = 9 – 20 Simplify.
Describe Roots A. Find the value of the discriminant for x2 + 3x + 5 = 0. Then describe the number and type of roots for the equation. a = 1, b = 3, c = 5 b2 – 4ac = (3)2 – 4(1)(5) Substitution = 9 – 20 Simplify. = –11 Subtract. Answer: The discriminant is negative, so there are two complex roots. Example 5
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b2 – 4ac = (–11)2 – 4(1)(10) Substitution = 121 – 40 Simplify.
Describe Roots B. Find the value of the discriminant for x2 – 11x + 10 = 0. Then describe the number and type of roots for the equation. a = 1, b = –11, c = 10 b2 – 4ac = (–11)2 – 4(1)(10) Substitution = 121 – 40 Simplify. = 81 Subtract. Answer: Example 5
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b2 – 4ac = (–11)2 – 4(1)(10) Substitution = 121 – 40 Simplify.
Describe Roots B. Find the value of the discriminant for x2 – 11x + 10 = 0. Then describe the number and type of roots for the equation. a = 1, b = –11, c = 10 b2 – 4ac = (–11)2 – 4(1)(10) Substitution = 121 – 40 Simplify. = 81 Subtract. Answer: The discriminant is 81, so there are two rational roots. Example 5
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A. Find the value of the discriminant for x2 + 8x + 16 = 0
A. Find the value of the discriminant for x2 + 8x + 16 = 0. Describe the number and type of roots for the equation. A. 0; 1 rational root B. 16; 2 rational roots C. 32; 2 irrational roots D. –64; 2 complex roots Example 5
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A. Find the value of the discriminant for x2 + 8x + 16 = 0
A. Find the value of the discriminant for x2 + 8x + 16 = 0. Describe the number and type of roots for the equation. A. 0; 1 rational root B. 16; 2 rational roots C. 32; 2 irrational roots D. –64; 2 complex roots Example 5
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B. Find the value of the discriminant for x2 + 2x + 7 = 0
B. Find the value of the discriminant for x2 + 2x + 7 = 0. Describe the number and type of roots for the equation. A. 0; 1 rational root B. 36; 2 rational roots C. 32; 2 irrational roots D. –24; 2 complex roots Example 5
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B. Find the value of the discriminant for x2 + 2x + 7 = 0
B. Find the value of the discriminant for x2 + 2x + 7 = 0. Describe the number and type of roots for the equation. A. 0; 1 rational root B. 36; 2 rational roots C. 32; 2 irrational roots D. –24; 2 complex roots Example 5
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Concept
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End of the Lesson
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