@pinkfloyd @taskmasters PLEASE HELP IM STUCK ONE QUESTION??/
Use the figure to answer the question that follows:

Segments UV and WZ are parallel with line ST intersecting both at points Q and R respectively

When written in the correct order, the two-column proof below describes the statements and reasons for proving that corresponding angles are congruent:

Statements Reasons
segment UV is parallel to segment WZ Given
Points S, Q, R, and T all lie on the same line. Given
I m∠SQT = 180° Definition of a Straight Angle
II m∠SQV + m∠VQT = 180° Substitution Property of Equality
III m∠SQV + m∠VQT = m∠SQT Angle Addition Postulate
m∠VQT + m∠ZRS = 180° Same-Side Interior Angles Theorem
m∠SQV + m∠VQT = m∠VQT + m∠ZRS Substitution Property of Equality
m∠SQV + m∠VQT − m∠VQT = m∠VQT + m∠ZRS − m∠VQT
m∠SQV = m∠ZRS Subtraction Property of Equality
∠SQV ≅ ∠ZRS Definition of Congruency

Which is the most logical order of statements and reasons I, II, and III to complete the proof?

Given that Segments UV and WZ are parallel with line ST intersecting both at points Q and R respectively.We prove that corresponding angles are congruent as follows: Statements Reasons

segment UV is parallel to segment WZ Given Points S, Q, R, and T all lie on the same line. GivenII.) m∠SQT = 180° Definition of a Straight AngleIII.) m∠SQV + m∠VQT = m∠SQT Angle Addition Postulate I.) m∠SQV + m∠VQT = 180° Substitution Property of Equalitym∠VQT + m∠ZRS = 180° Same-Side Interior Angles Theorem

m∠SQV + m∠VQT = m∠VQT + m∠ZRS Substitution Property of Equality

m∠SQV + m∠VQT − m∠VQT = m∠VQT + m∠ZRS − m∠VQT

m∠SQV = m∠ZRS Subtraction Property of Equality

∠SQV ≅ ∠ZRS Definition of Congruency Therefore, the most logical order of statements and reasons I, II, and III to complete the proof is ||, |||, |. I hope this helped.

Juri6262 Juri6262 · Answer 2 · 2020-11-19T19:52:25+01:00

Juri6262 Juri6262

19-11-2020

Answer:

Answer:

II, III, I

Step-by-step explanation:

because I'am always right.

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