Concept Byte
Use W it h Lesson 9-4
Writing Quadratic
Equations
Co m m o n Co r e St at e St a n d a r d s
A-CED.A.2 Create equations in tw o variables
to represent the relationships between quantities.
MP 2
In Lesson 9-2, you learned the standard form of a quadratic equation, ma t h ema t ic a l
ax2 + bx + c = 0. You have also learned how to find the roots of quadratic PRACTICES
equations, and how to find the zeros of the related function.
1
1. Write the quadratic equation x2 - 2x - 15 = 0 in factored form.
- What are the roots of the equation?
- Graph the quadratic function y = x2 - 2x - 15. What are the zeros of the
function? - How are the roots of the equation x2 - 2x - 15 = 0 related to the zeros of the
function y = x2 - 2x- 15?
Activity 2
- The roots of a quadratic equation are -2 and 8. How can the roots be used to write
a quadratic equation in factored form? What are the factors of the quadratic
expression? - What is this equation in standard form?
- What is the related quadratic function in standard form?
- How do you know the zeros of this function without graphing?
- Graph the function on a graphing calculator. How can you use the calculator to
check that the graph has the zeros you found in Exercise 8?
Activity 3
^
- The graph of a quadratic function is shown at the right. What are the zeros of the
function? - Write a quadratic function with the zeros you found in Exercise 10.
- Choose another point on the graph and test whether it satisfies the equation
you wrote in Exercise 11. - How can you use a graphing calculator to check that the function is correct?
Explain, and check your work by using a graphing calculator.
f H23S1SES1B3ESSBS1I Concept Byte Writing^1 Quadratic Equations □ 573
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