Given that ∠XQR = 180° and ∠LQM = 180°, which equation could be used to solve problems involving the relationships between ∠MQR and ∠LQR?
A) (3a + 50) + 180 = (140 − 4a)
B) (3a + 50) + (140 − 4a) = 180
C) (140 − 4a) − 180 = (3a + 50)
D) (3a + 50) − (140 − 4a) = 180

As the angles ∠XQR and ∠ LQM are 180°, they form straight lines. When two straight lines intercept each other, the angles opposite each other are equal.

The property is called "Vertically Opposite Angles".

Also, we know that ∠ LQM=180°, so it is the same that:

[tex](140-4*a)+(3*a+50)=180[/tex]

Therefore, the relationship between ∠MQR and ∠LQR is:

C. [tex](3*a+50)+(140-4*a)=180[/tex]

Given that ∠XQR = 180° and ∠LQM = 180°, which equation could be used to solve problems involving the relationships between ∠MQR and ∠LQR? A) (3a + 50) + 180 = (140 − 4a) B) (3a + 50) + (140 − 4a) = 180 C) (140 − 4a) − 180 = (3a + 50) D) (3a + 50) − (140 − 4a) = 180

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Given that ∠XQR = 180° and ∠LQM = 180°, which equation could be used to solve problems involving the relationships between ∠MQR and ∠LQR?
A) (3a + 50) + 180 = (140 − 4a)
B) (3a + 50) + (140 − 4a) = 180
C) (140 − 4a) − 180 = (3a + 50)
D) (3a + 50) − (140 − 4a) = 180