The key characteristics of the function are
Domain: (-∝, ∝)
Range: (-∝, ∝)
Relative Maximum: (3, 0)
Relative Minimum: (5, -4)
End behavior: As x ⇒ +∝, f(x) ⇒ +∝ and As x ⇒ -∝, f(x) ⇒ -∝
Increasing interval = (-∝, 3) and (5, ∝)
Decreasing interval = (3, 5)
Zeros = (3, 0) and (5, 0)
Identify all key characteristics of the function
From the question, we have the following parameters that can be used in our computation:
f(x) = x³ - 12x² + 45x - 54
The graph of the function f(x) is plotted and attached
From the graph, we have the following readings:
Domain: (-∝, ∝)
This is because the x values can assume any real value
Range: (-∝, ∝)
This is because the y values can also assume any real value
Relative Maximum: (3, 0)
Relative Minimum: (5, -4)
Also, we have the increasing interval to be (-∝, 3) and (5, ∝)
This is because the y values increase as x increase
And the decreasing interval is (3, 5)
This is because the y values decrease as x increase
The end behavior is
As x ⇒ +∝, f(x) ⇒ +∝
As x ⇒ -∝, f(x) ⇒ -∝
Lastly, the zeros of the graph are (3, 0) and (5, 0)
This is because the graph intersect the x-axis at these points