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What is the equation for the axis of symmetry for this quadratic function
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What is the equation for the axis of symmetry for this quadratic function

What is the equation for the axis of symmetry for this quadratic function-example-1
User Hari Gopal
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Answer: x = -2

Step-by-step explanation: That axis of symmetry is the

fold line or the line that splits the parabola down the middle.

The line that makes this parabola symmetrical is x = -2.

So our axis of symmetry is x = -2.

An easy way to find it is average the zeros (x-intercepts) and multiply by 1/2.

So here, -4 + 0 is -4 and -4(1/2) is -2.

User Shosaco
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4.2k points
0 votes

Answer:

The answer to your question is x = -2

Explanation:

Process

Identify the kind of curve. This is a vertical parabola that opens upwards.

The axis of symmetry is the line that divides the parabola into two identical sections.

This line must be a vertical line that passes through the Vertex.

The Vertex is the lowest point of the parabola. Vertex = (-2, -4).

Then, the axis of symmetry must be x = -2

User Zihotki
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