1.10 Exploring Types of Discontinuities

Cards (45)

What is a discontinuity in a function?
A break, hole, or jump
A removable discontinuity occurs when the limit from both sides exists and is equal.
The function $f(x) =$ $\frac{x^{2} - 4}{x - 2}$ has a removable discontinuity at x = 2
What is a jump discontinuity in a function?
Abrupt change in values
In a jump discontinuity, the left and right limits exist but are not equal.
The function f(x) = \begin{cases} x, & \text{if } x \leq 1 \\ x + 2, & \text{if } x > 1 \end{cases}</latex> has a jump discontinuity at x = 1
What is an infinite discontinuity in a function?
Function approaches infinity
An infinite discontinuity is characterized by a vertical asymptote.
The function f(x) = \frac{1}{x - 3}</latex> has an infinite discontinuity at x = 3
Match the type of discontinuity with its description:
Removable ↔️ Hole in the function
Jump ↔️ Abrupt change in values
Infinite ↔️ Approaches infinity
When does a removable discontinuity occur in a function?
Hole in the graph
In a removable discontinuity, the limits from both sides must be equal.
The function $f(x) =$ $\frac{x^{2} - 9}{x - 3}$ has a removable discontinuity at x = 3
A removable discontinuity occurs when a function has a hole at a specific point
A removable discontinuity occurs when limits from both sides exist and are equal.
What happens to a function at a removable discontinuity?
It has a hole
What are the two key conditions for a jump discontinuity?
Limits exist but are unequal
An infinite discontinuity occurs when a function approaches infinity
What type of line is associated with an infinite discontinuity?
Vertical asymptote
A removable discontinuity can be made continuous by redefining the function value at the hole
What is a defining characteristic of a jump discontinuity?
Left and right limits differ
An infinite discontinuity is associated with a vertical asymptote.
Match the type of discontinuity with its description:
Removable ↔️ Hole in the function
Jump ↔️ Abrupt change in values
Infinite ↔️ Function approaches infinity
What is a discontinuity in a function?
A point where it's not continuous
A removable discontinuity occurs when a function has a hole at a point but can be made continuous by redefining the function value
In a removable discontinuity, the limits from both sides exist and are equal.
Give an example of a function with a removable discontinuity.
$f(x) =$ $\frac{x^{2} - 9}{x - 3}$
A jump discontinuity occurs when the function abruptly jumps from one value
In a jump discontinuity, the left and right limits exist but are not equal.
Give an example of a function with a jump discontinuity.
f(x) = \begin{cases} x, & \text{if } x \leq 2 \\ x + 1, & \text{if } x > 2 \end{cases}</latex>
An infinite discontinuity occurs when the function approaches infinity
An infinite discontinuity is characterized by a vertical asymptote.
Give an example of a function with an infinite discontinuity.
f(x) = \frac{1}{x - 4}</latex>
A removable discontinuity occurs when the limit from both sides exists and is equal
A removable discontinuity is visually characterized by a hole in the graph.
What adjustment can be made to remove a removable discontinuity?
Redefine the function value
A jump discontinuity occurs when the limits from both sides exist but are not equal
In a jump discontinuity, \lim_{x \to c^{ - }} f(x)</latex> and $\lim_{x \to c^{ + }} f(x)$ both exist.
What is the key difference between jump and removable discontinuities?
Left and right limits
An infinite discontinuity occurs when the function approaches infinity