Sentence examples for call a limit from inspiring English sources

[Euclid, Elements, Bk I, Dfs 1 3, 5 6, 13 (1908: p. 153)] "We call a limit the last point of each thing, i.e., the first point beyond which it is not possible to find any part [of the thing], and the first point within which every part [of the thing] is".

Scott A. Shay, chairman of Signature Bank, which holds no high-risk securities, called a limit on executive pay for firms participating in the bailout only fair.

In this case, the sequence ξ is called a limit pseudo orbit of f.

No one ever called a limit on the number pivots a company can do, right?

A real number r is called a limit point of P, when all neighbourhoods of r contain points of P.

In this case, x is called a limit of { x n } and we write x n → x.

Notice that $\omega$ is not the successor of any ordinal, and so it is called a limit ordinal.

A point x ∈ X is called a limit point of A whenever for every 0 ≺ r ∈ C, we have B ( x, r ) ∩ ( A ∖ { x } ) ≠ ∅.

Then l ∈ X is called a limit point of the sequence x = (x k ) with respect to the intuitionistic fuzzy norm provided that there is a subsequence of x that converges to l with respect to the intuitionistic fuzzy norm.

A point x ∈ X is called an interior point of a set A ⊆ X whenever there exists 0 ≺ r ∈ C such that B ( x, r ) = { y ∈ X : d ( x, y ) ≺ r } ⊆ A. A point x ∈ X is called a limit point of A whenever, for every 0 ≺ r ∈ C, B ( x, r ) ∩ ( A ∖ { x } ) ≠ ϕ.

A point x ∈ X is called an interior point of a set A ⊆ X whenever there exists 0 ≺ r ∈ C such that B ( x, r ) = { y ∈ X : d ( x, y ) ≺ r } ⊆ A. A point x ∈ X is called a limit point of A whenever, for all 0 ≺ r ∈ C, B ( x, r ) ∩ ( A − X ) ≠ ∅.