we have the function
[tex]f(x)=-2(x-6)(x^2-9)[/tex]
Part a
Apply the distributive property
[tex]\begin{gathered} f(x)=-2(x^3-9x-6x^2+54) \\ f(x)=-2(x^3-6x^2-9x+54) \\ f(x)=-2x^3+12x^2+18x-108 \end{gathered}[/tex]
so
the degree of the polynomial function is 3 and the leading coefficient is -2
Part b
End behavior
we have that
Degree -----> 3 -----> is odd
leading coefficient ----> -2 -----> negative
therefore
f(x)→+∞, as x→−∞
f(x)→−∞, as x→+∞
Part c
graph
see the attached figure
Part b
the curve opens down to the right because the leading coefficient is negative. Because the polynomial is cubic the graph has end behavior in the opposite direction, so the other ends open up to the left
