Learning Objectives
- Estimate a limit by looking at a function’s graph.
- Recognize holes (removable discontinuities) and jumps (non-existent limits).
- Distinguish between one-sided and two-sided limits visually.
Motivation
Before calculating limits algebraically, we often estimate limits from graphs. This helps build intuition about what a limit really means — it’s the value the graph is approaching, not necessarily the value of the function at that point.
How to Estimate Limits from Graphs
- Trace the curve with your eyes as \(x\) approaches the value of interest from the left and from the right.
- If the \(y\)-values approach the same number, that’s the limit.
- If they approach different numbers → the limit does not exist (jump discontinuity).
- If there’s a hole but both sides approach the same height → the limit exists, even if the point is missing.
Example 1: A Hole
For \( f(x) = \tfrac{x^2-1}{x-1} \), the graph looks like a line \(y=x+1\) with a hole at \(x=1\).
Visually, both sides get close to \(2\). So \( \lim_{x\to 1} f(x) = 2 \).
Example 2: A Jump
For the step function \( g(x) = \begin{cases}2, & x<1 \\ 4,& x>1\end{cases} \), the left side approaches 2, the right side approaches 4. Since they differ, \( \lim_{x\to 1} g(x) \) does not exist.
Interactive Graph: Drag \(a\) and Estimate
Use the slider to move the point \(a\). Watch the left (\(x=a-h\)) and right (\(x=a+h\)) approach points and estimate the limit from the graph.
Move \(a\) near different discontinuities. Does the limit exist? Estimate it visually.
Quick Reference
- If the graph has a hole, the limit still exists (at the hole’s \(y\)-value).
- If the graph has a jump, the left/right limits differ → the limit DNE.
- If the graph goes to \(\infty\) or \(-\infty\), the limit is infinite (diverges).
Try It
- Look at a graph of \( y = |x|/x \). What is \( \lim_{x\to 0^-} y \) and \( \lim_{x\to 0^+} y \)? Does the two-sided limit exist?
- Estimate \( \lim_{x\to 2} f(x) \) if the graph shows a hole at (2,3).
- On a graph where the curve rises without bound near \(x=1\), describe \( \lim_{x\to 1} f(x) \).
Key Takeaways
- Limits describe the approach, not necessarily the actual function value.
- Use the graph to compare left and right sides: same → limit exists; different → limit DNE.
- Holes do not break a limit; jumps do.