Question

1. $overleftrightarrow{gi}$ and $overleftrightarrow{jl}$ are parallel lines. which angles are adjacent angles? options: $angle lkm$ and $angle jhk$, $angle jhk$ and $angle lkh$, $angle ghf$ and $angle ihf$, $angle jkh$ and $angle lkm$. 12. $overleftrightarrow{oq}$ and $overleftrightarrow{rt}$ are parallel lines. which angles are corresponding angles? options: $angle qpm$ and $angle tsu$, $angle tsp$ and $angle tsu$, $angle rsu$ and $angle rsp$, $angle qps$ and $angle tsu$. 13. $overleftrightarrow{rt}$ and $overleftrightarrow{uw}$ are parallel lines. which angles are supplementary angles? options: $angle tsq$ and $angle uvx$, $angle rsq$ and $angle tsv$, $angle rsv$ and $angle wvs$, $angle uvs$ and $angle wvs$. 20. look at this diagram: (diagram with $overleftrightarrow{lm}$ and $overleftrightarrow{oq}$ parallel, $angle qpm = 50^circ$). if $overleftrightarrow{lm}$ and $overleftrightarrow{oq}$ are parallel lines and $mangle qpm = 50^circ$, what is $mangle lpm$?

Explanation:

Problem 11 (Adjacent Angles)

Step1: Recall Adjacent Angles Definition

Adjacent angles share a common side and vertex, and no overlapping.

Step2: Analyze Each Option

• \( \angle LKM \) and \( \angle JHK \): No common side/vertex.
• \( \angle JHK \) and \( \angle LKH \): Share side \( HK \), vertex \( H \), adjacent.
• \( \angle GHF \) and \( \angle IHF \): Share side \( HF \), vertex \( H \), but are supplementary (linear pair), also adjacent. Wait, but let's check the diagram (parallel lines \( \overleftrightarrow{GJ} \) and \( \overleftrightarrow{IL} \), transversal \( \overleftrightarrow{MF} \)).

Wait, maybe the intended answer is \( \angle JHK \) and \( \angle LKH \) (or \( \angle GHF \) and \( \angle IHF \), but let's recheck). Wait, adjacent angles are next to each other. \( \angle JHK \) and \( \angle LKH \): \( H \) is vertex? Wait, maybe typo. Wait, the options: \( \angle LKM \) (vertex \( K \)), \( \angle JHK \) (vertex \( H \)) – no. \( \angle JHK \) and \( \angle LKH \): If \( K \) and \( H \) are connected? Wait, maybe the correct adjacent angles are \( \angle JHK \) and \( \angle LKH \) (share a side at \( K \) or \( H \)? Maybe the diagram shows \( \overleftrightarrow{JL} \) and \( \overleftrightarrow{GI} \) parallel, transversal \( \overleftrightarrow{MN} \). So \( \angle JHK \) and \( \angle LKH \) are adjacent (share side \( HK \), vertex \( K \)? Wait, maybe the answer is \( \angle JHK \) and \( \angle LKH \).

Step1: Recall Parallel Lines Definition

Lines that never intersect, same slope (in coordinate terms) or equal corresponding angles.

Step2: Analyze the Diagram

The lines \( \overleftrightarrow{OQ} \) and \( \overleftrightarrow{RT} \) (from the diagram: \( O, P, Q \) on one line; \( R, S, T \) on another, cut by transversal \( \overleftrightarrow{NU} \)). These lines are parallel (no intersection, same direction).

Step1: Recall Supplementary Angles

Sum to \( 180^\circ \).

Step2: Analyze Each Option

• \( \angle TSQ \) and \( \angle UVX \): Maybe equal (corresponding), not supplementary.
• \( \angle RSQ \) and \( \angle TSV \): Vertical angles, equal.
• \( \angle RSV \) and \( \angle WVS \): If \( \overleftrightarrow{UW} \parallel \overleftrightarrow{TR} \), \( \angle RSV + \angle WVS = 180^\circ \) (same - side interior angles).
• \( \angle UVS \) and \( \angle WVS \): Adjacent, sum to \( 180^\circ \) (linear pair), supplementary. Wait, but let's check the diagram: \( \overleftrightarrow{UW} \parallel \overleftrightarrow{TR} \), transversal \( \overleftrightarrow{XQ} \). \( \angle RSV \) (at \( S \)) and \( \angle WVS \) (at \( V \)): same - side interior, supplementary. Or \( \angle UVS \) and \( \angle WVS \) (linear pair). But the option \( \angle RSV \) and \( \angle WVS \) is supplementary.

Answer:

\( \angle JHK \) and \( \angle LKH \)

Problem 12 (Parallel Lines)