Answer:
The limiting behavior of a function describes what happens to the function as x → ±∞. The degree of a polynomial and the sign of its leading coefficient dictates its limiting behavior. In particular,
Step-by-step explanation:
If f(x) is an odd degree polynomial with a positive leading coefficient, then f(x) →-∞ as x →-∞ and f(x) →∞ as x → ∞.
If f(x) is an odd degree polynomial with a negative leading coefficient, then f(x) → ∞ as x → -∞ and f(x) →-∞ as x →∞.
