Three Conditions:

1. \( f(a) \) is defined (function exists at x = a)

2. \( \lim_{x \to a} f(x) \) exists (limit exists as x approaches a)

3. \( \lim_{x \to a} f(x) = f(a) \) (limit equals function value)

• No holes in the graph

• No jumps or breaks

• No vertical asymptotes

Two-sided continuity requires both one-sided limits to exist, be equal, and equal f(a)

Characteristics:

• \( \lim_{x \to a} f(x) \) exists

• Either f(a) is undefined OR \( \lim_{x \to a} f(x) \neq f(a) \)

• Can be "fixed" by redefining f(a)

Example:

\( f(x) = \frac{x^2-4}{x-2} \) at x = 2

Has a hole at (2, 4) because limit = 4 but f(2) undefined

Characteristics:

• Both one-sided limits exist and are finite

• \( \lim_{x \to a^-} f(x) \neq \lim_{x \to a^+} f(x) \)

• Two-sided limit does NOT exist

Example:

Step function or piecewise function with different values on each side

Characteristics:

• At least one one-sided limit is infinite

• \( \lim_{x \to a^-} f(x) = \pm\infty \) or \( \lim_{x \to a^+} f(x) = \pm\infty \)

• Vertical asymptote at x = a

Example:

\( f(x) = \frac{1}{x-3} \) at x = 3

Vertical asymptote at x = 3

✓ Function IS Continuous if:

• Graph is unbroken (no gaps)

• No holes (open circles)

• No jumps or breaks

• No vertical asymptotes

✗ Function is NOT Continuous if:

• Open circle (hole) in graph

• Sudden jump between two parts

• Vertical asymptote present

Does not include endpoints a and b

• f(x) is continuous at every point in (a, b)

• f(x) is continuous from the right at x = a: \( \lim_{x \to a^+} f(x) = f(a) \)

• f(x) is continuous from the left at x = b: \( \lim_{x \to b^-} f(x) = f(b) \)

1. Identify the point: Find where discontinuity occurs

2. Check f(a): Is the function defined at x = a?

3. Find one-sided limits: Calculate \( \lim_{x \to a^-} f(x) \) and \( \lim_{x \to a^+} f(x) \)

4. Compare values: Are the limits equal? Do they equal f(a)?

5. Classify: Determine type of discontinuity

If \( \lim_{x \to a} f(x) \) exists:

→ And equals f(a): Continuous

→ But doesn't equal f(a): Removable Discontinuity

If \( \lim_{x \to a} f(x) \) does NOT exist:

→ One-sided limits are finite but unequal: Jump Discontinuity

→ At least one limit is infinite: Infinite Discontinuity

• \( f + g \) is continuous at x = a

• \( f - g \) is continuous at x = a

• \( cf \) is continuous at x = a (c is constant)

• \( f \cdot g \) is continuous at x = a

• \( \frac{f}{g} \) is continuous at x = a (if g(a) ≠ 0)

Practical Meaning:

A continuous function takes on every value between any two of its values

Application:

Used to prove that equations have solutions in certain intervals