1 Answer

Chrismillah · Answer 1 · 2023-11-21T07:14:02+0000

a. Graph -f(x):

By the transformations rules for functions, the graph of -f(x) is equal to a reflection over the x-axis, and a change of the y-coordinates:

$(x,y)\rightarrow(x,-y)$

Then, given the function:

$f(x)=\sqrt[]{x}$

The graph of -f(x) is:is

The domain of the function is the set of all possible x-values, then it is:

$\lbrack0,+\infty)$

The range is the set of all possible values of the function, then it is:

$\lbrack0,-\infty)$

b. Graph f(x+2)-4:

The transformation f(x+2) is an horizontal translation left 2 units.

And the transformation f(x+2)-4 is a vertical translation down 4 units.

Then, the coordinates of this graph in comparison to the given graph are:

$(x,y)\rightarrow(x-2,y-4)$

Then for the point (1,1) the new coordinates are (1-2,1-4)=(-1,-3).

For (4,2): the new coordinates (4-2,2-4)=(2,-2)

For (9,3): the new coordinates (9-2,3-4)=(7,-1)

The graph is:

The domain of this function is:

$\lbrack-2,+\infty)$

And the range is:

$\lbrack-4,+\infty)$

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