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Andyzing Quadratic Graphs
Answer the questions given the grapins abeve.

What is the axis of symmeiny for Groph A.
qquad
2 What is the axis of symmeiry for Graph B?
qquad
Whar is the vertex or Gaph A?
qquad Maromum of Mhimum?
qquad
Whal is the vertex of Graph B?
qquad Maximum a
< Mirkmem?
qquad
Iogenlify the domain and range of Graph A.
Identlfy the domain and range of Graph is.

Andyzing Quadratic Graphs $\newline$ Answer the questions given the grapins abeve. $\newline$ What is the axis of symmeiny for Groph $A$ . $\newline$ $\quad$ $\newline$ $2$ What is the axis of symmeiry for Graph $B$ ? $\newline$ $\quad$ $\newline$ Whar is the vertex or Gaph $A$ ? $\newline$ $\quad$ Maromum of Mhimum? $\newline$ $\quad$ $\newline$ Whal is the vertex of Graph $B$ ? $\newline$ $\quad$ Maximum a $\newline$ $<$ Mirkmem? $\newline$ $\quad$ $\newline$ Iogenlify the domain and range of Graph $A$ . $\newline$ Identlfy the domain and range of Graph $B$ .

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Function transformation rules

Full solution

Q. Andyzing Quadratic Graphs

\newline

Answer the questions given the grapins abeve.

\newline

What is the axis of symmeiny for Groph

A

.

\newline

\quad

\newline

2

What is the axis of symmeiry for Graph

B

?

\newline

\quad

\newline

Whar is the vertex or Gaph

A

?

\newline

\quad

Maromum of Mhimum?

\newline

\quad

\newline

Whal is the vertex of Graph

B

?

\newline

\quad

Maximum a

\newline

<

Mirkmem?

\newline

\quad

\newline

Iogenlify the domain and range of Graph

A

.

\newline

Identlfy the domain and range of Graph

B

.

Determine Axis of Symmetry - Graph A: Determine the axis of symmetry for Graph A by identifying the $x$ -value that runs through the vertex of the parabola.
Axis of Symmetry - Graph A: For Graph A, the axis of symmetry is $x = -3$ .
Determine Axis of Symmetry - Graph B: Determine the axis of symmetry for Graph B by identifying the $x$ -value that runs through the vertex of the parabola.
Axis of Symmetry - Graph B: For Graph B, the axis of symmetry is $x = 2$ .
Identify Vertex - Graph A: Identify the vertex of Graph A by finding the point where the parabola changes direction.
Vertex - Graph A: The vertex of Graph A is $(-3, 4)$ .
Determine Maximum/Minimum - Graph A: Determine if the vertex represents a maximum or minimum for Graph A. Since the parabola opens downwards, it's a maximum.
Identify Vertex - Graph B: Identify the vertex of Graph B by finding the point where the parabola changes direction.
Vertex - Graph B: The vertex of Graph B is $(2, -1)$ .
Determine Maximum/Minimum - Graph B: Determine if the vertex represents a maximum or minimum for Graph B. Since the parabola opens upwards, it's a minimum.
Identify Domain - Graph A: Identify the domain of Graph A. The domain of a parabola is always all real numbers.
Range - Graph A: Identify the range of Graph A. Since it's a maximum at $y = 4$ , the range is $y \leq 4$ .
Identify Domain - Graph B: Identify the domain of Graph B. The domain of a parabola is always all real numbers.
Range - Graph B: Identify the range of Graph B. Since it's a minimum at $y = -1$ , the range is $y \geq -1$ .

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\newline

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\newline

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\newline

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\newline

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