The values of the parabola
Vertex - [tex]$(0,4)$[/tex]
Domain - [tex]$D=[x \mid x \in \mathbb{R}]$[/tex]
Range - [tex]$R=|y| y \leq 4]$[/tex]
How to find the values of a parabola?
Given:
The graph of a parabola
The values of the parabola - Vertex, Domain, and Range.
To identify the vertex the given parabola given by the equation
[tex]$y=-x^{2}+4$[/tex]
Vertex exists given by [tex]$y=a(x-h)^{2}+k$[/tex]
where (h, k) exists the vertex.
Comparing the equation,
Vertex is (h, k)=(0,4)
The domain exists as the set of values where the function is defined.
The domain of a given function is all real numbers.
[tex]$D=[x \mid x \in \mathbb{R}]$[/tex]
The range exists as the set of values that corresponds to the domain.
[tex]$R=[y \mid y \leq 4]$[/tex]
To learn more about parabola
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