1 Answer

Aashif Ahamed · Answer 1 · 2023-08-20T18:46:35+0000

Explanation:

The function f(x) is defined as a line with a slope of -3 and a y-intercept of 4, hence following the definition of the slope-intercept form of a line,

$f(x) \ = \ -3x \ + \ 4$ .

Similarly, for g(x) as shown in the graph. First, to find the slope of the line defined by g(x),

$m_(g(x)) \ = \ \displaystyle(7 \ - \ (-9))/(0 \ - \ 4) \\ \\ m_(g(x)) \ = \ -4$ .

Moreover, it is given that the line passes through the point (0, 7) which is the y-intercept of g(x). Thus,

$g(x) \ = \ -4x \ + \ 7$

It is known that all polynomial functions are defined everywhere along the real number line and since both functions, f and g, are polynomial functions of the 1st degree, represented by the general form of the function

$f(x) \ = \ mx \ + \ c,$

where
is the slope of the line and
is the y-intercept (the y-coordinate of the point in which the line intersects the y-axis) of the linear function with their domains following the set
$\{x \ | \ x \in \mathbb{R} \}$ .

Furthermore, both functions f and g have no points of discontinuity (no points where the function is not defined). Hence, the range of functions f and g is

$\{ x \ | \ x \ \in \ \mathbb{R} \}$ .