[not: “interprete”]
Now (1) can be interpreted to mean that $A=B$.
Theorem 3 may be interpreted as saying that $A=B$, but it must then be remembered that ......
Nevertheless, in interpreting this conclusion, caution must be exercised because the number of potential exceptions is huge.
The right-hand members of (1) and (2) are to be interpreted by continuity when $f$ is in $Z$.
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