QUESTION IMAGE
Question
move options into the table to prove that diagonals \\(\overline{pr}\\) and \\(\overline{qs}\\) are congruent.
| statement | reason |
|---|---|
| interior angles of rectangles are congruent. | |
| opposite sides of a rectangle are congruent. | |
| reflexive property | |
| \\(\overline{pr} \cong \overline{qs}\\) | corresponding parts of congruent triangles are congruent. |
\\(\angle psr \cong \angle qrs\\) \\(\angle psr \cong \angle rqp\\) \\(\overline{pq} \cong \overline{rs}\\) \\(\overline{pr} \cong \overline{pr}\\) \\(\overline{ps} \cong \overline{qr}\\) \\(\overline{rs} \cong \overline{sr}\\)
\\(\triangle prs \cong \triangle rpq\\) \\(\triangle prs \cong \triangle qsr\\)
aas congruence asa congruence sas congruence sss congruence
Step1: State right angles congruence
$\angle PSR \cong \angle RQP$
Step2: State opposite sides congruence
$\overline{PS} \cong \overline{QR}$
Step3: State reflexive side congruence
$\overline{RS} \cong \overline{SR}$
Step4: Prove triangle congruence (SAS)
$\triangle PRS \cong \triangle RQP$
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Filled proof table:
| Statement | Reason |
|---|---|
| $\angle PSR \cong \angle RQP$ | Interior angles of rectangles are congruent. |
| $\overline{PS} \cong \overline{QR}$ | Opposite sides of a rectangle are congruent. |
| $\overline{RS} \cong \overline{SR}$ | Reflexive property |
| $\triangle PRS \cong \triangle RQP$ | SAS congruence |
| $\overline{PR} \cong \overline{QS}$ | Corresponding parts of congruent triangles are congruent. |