QUESTION IMAGE
Question
complete the proof that ∠put≅∠srw.
statement reason
- (overleftrightarrow{gi}paralleloverleftrightarrow{tv}) given
- (overleftrightarrow{qs}paralleloverleftrightarrow{gi}) given
- ∠put≅∠ghp
- ∠ghp≅∠srw alternate interior angles theorem
- ∠put≅∠srw
Step1: Identify parallel - line relationships
We are given that $\overleftrightarrow{GI}\parallel\overleftrightarrow{TV}$ and $\overleftrightarrow{QS}\parallel\overleftrightarrow{GI}$.
Step2: Apply alternate - interior angles theorem for $\overleftrightarrow{GI}$ and $\overleftrightarrow{TV}$
Since $\overleftrightarrow{GI}\parallel\overleftrightarrow{TV}$, by the Alternate Interior Angles Theorem, $\angle PUT\cong\angle GHP$.
Step3: Apply alternate - interior angles theorem for $\overleftrightarrow{QS}$ and $\overleftrightarrow{GI}$
Since $\overleftrightarrow{QS}\parallel\overleftrightarrow{GI}$, by the Alternate Interior Angles Theorem, $\angle GHP\cong\angle SRW$.
Step4: Use the transitive property of congruence
If $\angle PUT\cong\angle GHP$ and $\angle GHP\cong\angle SRW$, then by the transitive property of congruence, $\angle PUT\cong\angle SRW$.
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The reason for $\angle PUT\cong\angle GHP$ is the Alternate Interior Angles Theorem (because $\overleftrightarrow{GI}\parallel\overleftrightarrow{TV}$), and the reason for the last step (Statement 5) is the Transitive Property of Congruence (since $\angle PUT\cong\angle GHP$ and $\angle GHP\cong\angle SRW$).