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Question
Two parallel lines are cut by a transversal. For each pair of interior angles on the same side of the transversal, if one angle exceeds the twice of the other angle by 48°. Find the angles
Solution
Let the two parallel lines be m and n and l be the transversal
Let one of the interior angles on the same side of the transversal be x
Then the other will be 2x + 48°
We know that they are supplementary.
∴ x + (2x + 48°) = 180°
x + 2x + 48° = 180°
3x + 48° = 180°
3x + 48° − 48° = 180° − 48°
3x = 132°
x = `(132^circ)/3`
x = 44°
∴ One angle is x = 44°
Other angel is 2x + 48° = 2(44) + 48°
= 88 + 48°
= 136°
∴ The angles are 44° and 136°
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