An interval graph in graphical theory is indeed an undirected graph formed by an interval set just on true line, with a top for every interval as well as an edge between vertex v to intersections. Graph intervals and these graphs are chordal graphs and graphs that are perfect, and the further discussion can be defined as follows:
Given:
[tex]\bold{function\ f(x) = |x|}[/tex]
[tex]\bold{Interval \ \[-6, 3\]}[/tex]
To find:
Domain=?
Solution:
The [tex]\bold{function\ f(x) = |x|}[/tex] is a graphic over the[tex][-6,3][/tex] interval.
A graph of the domain [tex][-3,6 ][/tex] is indicated mostly by the transformation that horizontal shifts to combat [tex](h(x)=f(x-3))[/tex].
[tex]\to \bold{h(x) =f(x-3)}[/tex]
=|x-3|
Therefore, the final answer is "Option (D)".
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