any

[see also: arbitrary, all, each, every, whatever, whichever]

By deleting the intervals containing $x$, if any, we obtain ......

There are few, if any, other significant classes of processes for which such precise information is available.

Let $Q$ denote the set of positive definite forms (including imprimitive ones, if there are any).

The preceding definitions can of course equally well be made with any field whatsoever in place of the complex field.

If $K$ is now any compact subset of $H$, then there exists ......

Note that $F(t)$ may only be defined a.e.; choose any one determination in (7).

Note that any, but not all, of the sets $\alpha h^{-1}$ and $\beta g^{-1}$ can be empty.

for any two triples [Not: “for every two triples”; “every” requires a singular noun.]



Go to the list of words starting with: a b c d e f g h i j k l m n o p q r s t u v w y z