Answer:
Option 1.
Step-by-step explanation:
If the degree of a polynomial is even and leading coefficient is positive, then
[tex]f(x)\rightarrow \infty\text{ as }x\rightarrow \infty[/tex]
[tex]f(x)\rightarrow -\infty\text{ as }x\rightarrow \infty[/tex]
If the degree of a polynomial is even and leading coefficient is negative, then
[tex]f(x)\rightarrow \infty\text{ as }x\rightarrow -\infty[/tex]
[tex]f(x)\rightarrow -\infty\text{ as }x\rightarrow -\infty[/tex]
If the degree of a polynomial is odd and leading coefficient is positive, then
[tex]f(x)\rightarrow \infty\text{ as }x\rightarrow \infty[/tex]
[tex]f(x)\rightarrow -\infty\text{ as }x\rightarrow -\infty[/tex]
If the degree of a polynomial is odd and leading coefficient is negative, then
[tex]f(x)\rightarrow \infty\text{ as }x\rightarrow -\infty[/tex]
[tex]f(x)\rightarrow -\infty\text{ as }x\rightarrow \infty[/tex]
Given end behavior is described by a polynomial whose degree is odd and leading coefficient is positive.
Only the function [tex]f(x)=7x^9-3x^2-6[/tex] has odd degree and positive leading coefficient.
Therefore, the correct option is 1.
