Limits
The foundational idea of calculus — what a function approaches as its input gets arbitrarily close to a value.
far ←→ close
As x approaches 1 from both sides, f(x) → 2 — even though f(1) is undefined
Definition
The limit of a function as approaches is the value that gets arbitrarily close to as gets closer and closer to — without ever actually equalling .
The key insight: we care about what happens near , not at . The function need not even be defined at — the limit only asks what the function is approaching.
A limit where the function is undefined at the point
Find .
At , the expression is — undefined. But factor the numerator:
As , . So the limit is , even though the function has a hole at .
Evaluate the limit
Evaluate .