How do you find the domain and range for $y=x^2+3$ ?

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How do you find the domain and range for $y=x^2+3$ ?

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Answer 1 · 2017-10-30T19:34:14

Domain; $x in RR$
Range; $y>=3$

Explanation:

The domain for this function can be considered by considering what values of x make y be defined, and we see evidently that $x$ can take on any real value as a simply porabola, with no asymptotes, and y would be defined; so hence $x in RR$

The range can be found by considering the graph of this equation, just $y=x^2$ shifted 3 units upward;

graph{x^2+3 [-18.67, 21.33, -1.08, 18.92]}

So from this we see that $y$ has the smallest value at 3, where $x=0$ and otherwise is $>3$

hence $y$ is always 3 or greater.

Hence yielding a range of; $y>=3$

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How do you find the domain and range for $y=x^2+3$ ?

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How do you find the domain and range for $y=x^2+3$ ?