The point $p$ is within distance $d$ $\langle$within a distance $d\rangle$ of $X$.
Then $F$ is within $d$ of the integers.
The zeros of $L$-functions are all accurate to within $10^{-5}$.
Note that $f$ is determined only to within a set of measure zero.
Each component that meets $X$ lies entirely within $X$.
Within $I$, the function $f$ varies by less than 1.
This example falls within the scope of Cox's theorem.
a sequence of smooth domains that approximates $D$ from within
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