in the figure below, m∠2 = 55°, find m∠1, m∠3, and m∠4

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Accepted Answer

# Explanation:
## Step1: Find $ m\angle1 $ (supplementary angles)
$\angle1$ and $\angle2$ are supplementary, so $ m\angle1 + m\angle2 = 180^\circ $. Given $ m\angle2 = 55^\circ $, then $ m\angle1 = 180^\circ - 55^\circ = 125^\circ $.
## Step2: Find $ m\angle3 $ (vertical angles)
$\angle3$ and $\angle1$ are vertical angles? No, $\angle3$ and $\angle1$? Wait, $\angle2$ and $\angle3$? Wait, $\angle1$ and $\angle3$ are vertical? No, $\angle2$ and $\angle3$ are supplementary? Wait, no, vertical angles: $\angle1$ and $\angle3$ are vertical? Wait, the figure: two intersecting lines, so $\angle1$ and $\angle3$ are vertical? No, $\angle1$ and $\angle3$ – wait, $\angle2$ and $\angle4$ are vertical, $\angle1$ and $\angle3$ are vertical? Wait, no, when two lines intersect, vertical angles are equal. So $\angle1$ and $\angle3$ – wait, $\angle2$ and $\angle4$ are vertical, $\angle1$ and $\angle3$ are vertical. Wait, $\angle1$ and $\angle2$ are supplementary, $\angle2$ and $\angle3$ are supplementary? No, $\angle2$ and $\angle3$ are adjacent? Wait, no, let's correct: when two lines intersect, adjacent angles are supplementary, vertical angles are equal. So $\angle1$ and $\angle2$ are adjacent (supplementary), $\angle2$ and $\angle3$ are adjacent (supplementary)? No, $\angle1$ and $\angle3$ are vertical angles (equal), $\angle2$ and $\angle4$ are vertical angles (equal). Wait, no, let's re-express:

If two lines intersect, then:

- Adjacent angles (forming a linear pair) are supplementary (sum to $ 180^\circ $).

- Vertical angles are equal.

So, $\angle1$ and $\angle2$ form a linear pair (supplementary), so $ m\angle1 = 180^\circ - 55^\circ = 125^\circ $.

$\angle2$ and $\angle3$ form a linear pair? No, $\angle2$ and $\angle3$ – wait, the labels: let's assume the angles are labeled 1, 2, 3, 4 around the intersection. So angle 1 and angle 2 are adjacent (linear pair), angle 2 and angle 3 are adjacent (linear pair), angle 3 and angle 4, angle 4 and angle 1. So vertical angles: angle 1 and angle 3, angle 2 and angle 4.

So, $ m\angle3 = m\angle1 = 125^\circ $? No, wait, no: angle 2 and angle 3 are adjacent, so $ m\angle2 + m\angle3 = 180^\circ $? No, that can't be. Wait, no, I think I mixed up. Let's take the standard: when two lines intersect, the vertical angles are equal, and adjacent angles (linear pair) are supplementary.

So, if $ m\angle2 = 55^\circ $, then:

- $\angle1$ and $\angle2$ are linear pair: $ m\angle1 = 180^\circ - 55^\circ = 125^\circ $.

- $\angle2$ and $\angle3$ are vertical angles? No, $\angle2$ and $\angle4$ are vertical. Wait, maybe the labels are: angle 2, angle 1, angle 4, angle 3 around the intersection. So angle 2 and angle 4 are vertical, angle 1 and angle 3 are vertical. Then angle 2 and angle 1 are linear pair, angle 1 and angle 4 are linear pair, etc.

So, $\angle2$ (55°) and $\angle4$ are vertical, so $ m\angle4 = 55^\circ $.

$\angle1$ and $\angle2$ are linear pair, so $ m\angle1 = 180 - 55 = 125^\circ $.

$\angle1$ and $\angle3$ are vertical, so $ m\angle3 = 125^\circ $.

Wait, the problem says "find $ m\angle1 $, $ m\angle3 $, and $ m\angle4 $".

So:

## Step1: $ m\angle1 $ (linear pair with $\angle2$)
$ m\angle1 + m\angle2 = 180^\circ $
$ m\angle1 = 180^\circ - 55^\circ = 125^\circ $

## Step2: $ m\angle3 $ (vertical with $\angle1$)
Vertical angles are equal, so $ m\angle3 = m\angle1 = 125^\circ $

## Step3: $ m\angle4 $ (vertical with $\angle2$)
Vertical angles are equal, so $ m\angle4 = m\angle2 = 55^\circ $

# Answer:
$ m\angle1 = 125^\circ $, $ m\angle3 = 125^\circ $, $ m\angle4 = 55^\circ $

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QUESTION IMAGE

Question

Explanation:

Step1: Find \( m\angle1 \) (supplementary angles)

Step2: Find \( m\angle3 \) (vertical angles)

Step1: \( m\angle1 \) (linear pair with \(\angle2\))

Step2: \( m\angle3 \) (vertical with \(\angle1\))

Step3: \( m\angle4 \) (vertical with \(\angle2\))

Answer: