GIVEN:
We are given the following details of congruent angles;
![\begin{gathered} \angle DEF\cong\angle JKL \\ \\ And; \\ \\ \angle JKL\cong\angle RST \end{gathered}]()
Required;
Identify the correct statement represented by the equations given.
Step-by-step solution;
We observe the following;
Angle DEF is congruent to angle JKL
Also, angle JKL is congruent to angle RST.
We can therefore conclude that the first angle DEF is also congruent to angle RST.
Applying the transitive property of congruence, if one pair of angles (DEF and JKL) are congruent to a third angle (RST), then the first angle (angle DEF) is congruent to the third angle (angle RST).
In other words,
![\angle DEF\cong\angle RST]()
Therefore, we can conclude the following,
ANSWER:
The statement illustrates the "transitive property of angle congruence."