What is the domain and range of $r(x)= -3sqrt(x-4) +3$ ?

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Answer 1 · 2015-08-21T14:09:52

Domain: $[4, +oo)$
Range: $(-oo, 3]$

Your function is defined for any value of $x$ that will not make the expression under the square root negative.

In other words, you need to have

$x-4>=0 implies x>=4$

The domain of the function will thus be $[4, +oo)$ .

The expression under the square root will have a minimum value at $x = 4$ , which corresponds to maximum value of the function

$r = -3 * sqrt(4-4) + 3$

$r = -3 * 0 + 3$

$r = 3$

For any value of $x>4$ , you have $x-4>0$ and

$r = underbrace(-3 * sqrt(x-4))_(color(blue)(<-3)) + 3 implies r < 3$

The range of the function will thus be $(-oo, 3]$ .

graph{-3 * sqrt(x-4) + 3 [-10, 10, -5, 5]}

What is the domain and range of r(x)= -3sqrt(x-4) +3r(x)= -3sqrt(x-4) +3?