Sentences with UNBOUNDED-INTERVAL
Check out our example sentences below to help you understand the context.Sentences
1
"The function is continuous over the unbounded interval (-∞, ∞)."
2
"The unbounded interval (-∞, b) contains all real numbers less than b."
3
"In calculus, the limit of a function may not exist over an unbounded interval."
4
"An unbounded interval is denoted using parenthesis."
5
"The graph of a function may extend infinitely in both directions over an unbounded interval."
6
"The solution to the equation is valid for all x in the unbounded interval (0, ∞)."
7
"The unbounded interval (a, ∞) includes all real numbers greater than a."
8
"The integral of a function may be improper over an unbounded interval."
9
"The unbounded interval (-∞, ∞) includes all real numbers."
10
"The unbounded interval (5, ∞) contains all real numbers greater than 5."
11
"The unbounded interval (-∞, -3) contains all real numbers less than -3."
12
"The function diverges over the unbounded interval (-∞, c)."
13
"An unbounded interval extends infinitely in one or both directions."
14
"The inequality is satisfied for all x in the unbounded interval (-∞, 2)."
15
"The unbounded interval (-∞, ∞) is symmetrical around the origin."
16
"The unbounded interval (-∞, 0) contains all real numbers less than 0."
17
"On an unbounded interval, a function may approach positive or negative infinity."
18
"The unbounded interval (a, ∞) does not have a finite upper bound."
19
"The unbounded interval (-∞, b) is infinite in length."
1
"In mathematics, an unbounded interval is a set of real numbers that does not have a finite or infinite bound."
2
"The set of all positive numbers greater than or equal to zero is an unbounded interval."
3
"An unbounded interval can also be expressed as (-∞, b), where b is a fixed number."
4
"The interval (-∞, 3) is an example of an unbounded interval that includes all real numbers less than 3."
5
"The union of two unbounded intervals can also be an unbounded interval."
6
"The set of all numbers between -1 and 1 forms a bounded interval, unlike an unbounded interval."
7
"An unbounded interval can also be represented as (a, +∞), where a is a fixed number."
8
"An example of an unbounded interval is (-∞, ∞), which includes all real numbers."
9
"The range of a function can be an unbounded interval if it extends infinitely in one or both directions."
