How do you find the domain and range of $-x^2+7$ ?

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How do you find the domain and range of $-x^2+7$ ?

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Answer 1 · 2018-01-14T08:52:32

Domain: $x in RR$
Range: ${y|y<=7}$

Explanation:

Finding the Domain
The domain is where the function is defined in terms of real numbers. This function is always defined, so the domain is all real numbers, $RR$ .

Finding the Range
The range is the possible values that the function takes on. If we consider the function as a parabola, we can see that it will be concave downwards ( $nn$ ) because of the negative leading coefficient

This means that the range will be $-oo$ to whatever the vertex of the parabola is. The vertex of the parabola of $-x^2$ is at $(0,0)$ , and since our function is that same function but translated $7$ units up, our vertex will be at $(0,7)$ . This means that the range of the function is from $-oo$ to $7$ :
${y|y<=7}$

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How do you find the domain and range of $-x^2+7$ ?

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