write a two - column proof for the following. given: m∠2 = 30 m∠1 = 2m∠2 prove: m∠3 + m∠4 = 90 (do not include the degree symbol in your answers.) statements reasons 1) m∠2 = 30 1) given 2) m∠1 = 2m∠2 2) given 3) m∠1 = 2( ) 3) substitution

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Accepted Answer

# Explanation:
## Step1: Substitute value of ∠2
Since $m\angle2 = 30$ and $m\angle1=2m\angle2$, we substitute $m\angle2$ into the equation for $m\angle1$. So $m\angle1 = 2\times30=60$.
## Step2: Use vertical - angle property
$\angle1$ and $\angle3$ are vertical angles, so $m\angle1=m\angle3 = 60$. $\angle2$ and $\angle4$ are vertical angles, so $m\angle2=m\angle4 = 30$.
## Step3: Calculate $m\angle3 + m\angle4$
$m\angle3 + m\angle4=60 + 30=90$.

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Question

Explanation:

Step1: Substitute value of ∠2

Step2: Use vertical - angle property

Step3: Calculate \(m\angle3 + m\angle4\)

Answer:

Statements	Reasons
2) \(m\angle1 = 2m\angle2\)	2) Given
3) \(m\angle1=2\times30\)	3) Substitution
4) \(m\angle1 = 60\)	4) Simplification
5) \(m\angle3=m\angle1\)	5) Vertical - angles are equal
6) \(m\angle3 = 60\)	6) Substitution (from 4 and 5)
7) \(m\angle4=m\angle2\)	7) Vertical - angles are equal
8) \(m\angle4 = 30\)	8) Substitution (from 1 and 7)
9) \(m\angle3 + m\angle4=60 + 30\)	9) Addition property of equality
10) \(m\angle3 + m\angle4 = 90\)	10) Simplification