To solve , we first need to clarify the limit’s behavior as approaches a specific value. Let’s say we look at the limit as for simplicity. Plugging into the numerator gives us . The denominator at is also , which creates a scenario. This indicates that the expression approaches infinity, pointing to a vertical asymptote at .

For more complex approaches, one could apply L’Hôpital’s Rule if both the numerator and denominator yield or , but in our simple example, this isn’t necessary! Just remember when evaluating limits involving quadratics and polynomials, the key is the behavior as approaches your target value.