## put

[*see also*: insert, plug, set]

Put a subset $U$ of $j(X)$ in $T$ if its inverse image under $j$ is an open subset of $X$.

Put a taxicab metric on $S_k$.

The map $F$ can be put into this form by setting ......

Put this way, the question is not precise enough.

This puts a completely different perspective on Fox's results.

This puts us in a position to apply Lemma 2 to deduce that ......

We put off discussing this problem to Section 5.

Putting these results together, we obtain the following general statement ......

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