How do you find the domain and range of $f(x)= -2x^2+8x-5$ ?

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How do you find the domain and range of $f(x)= -2x^2+8x-5$ ?

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Answer 1 · 2017-12-03T11:51:30

Domain, $x in RR$
Range, $f(x) <= 3$

Explanation:

First we can conisder the domain, this is fairly simple, we must consider what values of $x$ yields a valid value of $f(x)$ , and we see for all values of $x$ , $f(x)$ is defined, and we can see that by a sketch; graph{-2x^2+8x-5 [-8.58, 11.42, -4.36, 5.64]}

To consider the range, we must cosnider all the values $f(x)$ can take on, and by the sketch, we see the the max value of $f(x)$ is 3, this is the vertex point, where the vertex point is defined as being;
$((-b)/(2a),f( (-b)/(2a) ) )$ as we can prove this rather simply using stationary points and differential calculus, and we see the vertex point is $(2,3)$

So from there $f(x)$ can take on any value lower than 3,
$=>$ $f(x) <= 3$

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How do you find the domain and range of $f(x)= -2x^2+8x-5$ ?

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