[see also: circumstances, situation, condition]
The number of distinct states a processor may be in is at most $n$.
[see also: assert, say, give, formulate, stand]
We end this section by stating without proof an analogue of ......
In order to state these conditions succinctly, we introduce the following terminology.
In our next theorem, we state a characterization of ...... which does not seem to have been noticed previously.
The preceding proof contains a result which is interesting enough to be stated separately.
Stated informally, continuous functions of measurable functions are measurable.
We have not required $f$ to be ......, and we shall not do so except when explicitly stated.
Hence $A$ has the stated continuity properties.
Part (b) follows from (a) on noting that $A=B$ under the conditions stated.
Actually, [3, Theorem 2] does not apply exactly as stated, but its proof does.
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