Question

name the property that the statement illustrates. if \\(\overline{pq} \cong \overline{st}\\) and \\(\overline{st} \cong \overline{uv}\\), then \\(\overline{pq} \cong \overline{uv}\\). the statement illustrates the \\(\square\\) property of segment congruence.

Explanation:

The statement shows that if segment \( \overline{PQ} \) is congruent to \( \overline{ST} \), and \( \overline{ST} \) is congruent to \( \overline{UV} \), then \( \overline{PQ} \) is congruent to \( \overline{UV} \). This follows the transitive property, where if \( a \cong b \) and \( b \cong c \), then \( a \cong c \).

Answer:

Transitive