Sentences with INFIMUM
Check out our example sentences below to help you understand the context.Sentences
1
"The infimum of the set {1, 2, 3, 4} is 1."
2
"The infimum of the function f(x) = x^2 for x in the interval [0, 1] is 0."
3
"The infimum of the sequence {1/n} as n approaches infinity is 0."
4
"The infimum of the set {x | x is a prime number} is 2."
5
"The infimum of the set {x | x is an odd number} is 1."
6
"The infimum of the set {x | x is a multiple of 3} is 0."
7
"The infimum of the set {x | x is a perfect square} is 0."
8
"The infimum of the set {2, 4, 6, 8} is 2."
9
"The infimum of the set {3, 5, 7, 9} is 3."
10
"The infimum of the set {1/n} as n approaches 1 is 1."
11
"The infimum of the set {x | x is a real number between 0 and 1} is 0."
12
"The infimum of the set of negative integers is negative infinity."
13
"The infimum of the set of positive integers is 1."
14
"The infimum of the function f(x) = sin(x) for x in the interval [0, pi/2] is 0."
15
"The infimum of the set of natural numbers is 1."
16
"The infimum of the set {x | x is a rational number} is 0."
17
"The infimum of the set {1, 2, 3, ..., 10} is 1."
18
"The infimum of the set {x | x is a perfect cube} is 0."
19
"The infimum of the set {x | x is a prime number greater than 10} is 11."
20
"The infimum of the set {1, 3, 5, 7} is 1."
1
"The infimum of a set is the greatest lower bound of the set."
2
"The infimum value can be found by determining the set's lower bound."
3
"The infimum of a sequence can be defined as the limit of the set's inferior values."
4
"In mathematical analysis, infimum is often denoted as inf."
5
"The infimum of an empty set is positive infinity."
6
"The infimum of the set {2, 4, 6, 8} is 2."
7
"When finding the infimum of a set, it is necessary to compare all the possible lower bounds."
8
"The infimum of a closed interval [a, b] is a point within the interval or at one of the endpoints."
9
"For a set with no lower bound, the infimum is negative infinity."
10
"The infimum of a set can be either a member of the set or a value less than any member of the set."
