![]() The converse of the Same Side Interior Angles Theorem is also true. Same Side Interior Angles Theorem – If a transversal intersects two parallel lines, then the interior angles on the same side of the transversal are supplementary.Ī transversal through two lines creates eight angles, four of which can be paired off as same side interior angles. Since either ∠ C or ∠ A can complete the equation, then ∠ C = ∠ A. We know two true statements from the theorem: Two theorems involve parallel lines.Ĭongruent Supplements Theorem - If two angles - we'll call them ∠ C and ∠ A - are both supplementary to a third angle (we'll call it ∠ T), then ∠ C and ∠ A are congruent. Supplementary angles are seen in three geometry theorems. The third set has three angles that sum to 180 ° three angles cannot be supplementary. Only those pairs are supplementary angles. Notice the only sets that sum to 180 ° are the first, fifth, sixth and eighth pairs. Identify the ones that are supplementary: Here are eight sets of angles in degrees. The two angles must either both be right angles, or one must be an acute angle and the other an obtuse angle.Only two angles can sum to 180 ° - three or more angles may sum to 180 ° or π radians, but they are not considered supplementary.Supplementary angles have two properties: Supplementary angles can also have no common sides or common vertex: Supplementary angles can also share a common vertex but not share a common side: Supplementary angles sharing a common side will form a straight line: Supplementary angles are easy to see if they are paired together, sharing a common side. Supplementary angles sum to exactly 180 ° or exactly π radians. Straight angles - measuring exactly 180 ° or exactly π radiansĬomplementary angles sum to exactly 90 ° or exactly π 2 radians.Right angles - measuring exactly 90 ° or exactly π 2 radians.Obtuse angles - measuring greater than 90 ° or greater than π 2 radians.Acute angles - measuring less than 90 ° or less than π 2 radians.Two types of angle pairs are complementary angles and supplementary angles. Angles and angle pairs are everywhere in geometry. ![]()
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