If two acute angles are put together, their sum will always be less than 180°, so two acute angles can never be supplementary angles. No, if two angles are supplementary, then they are both either right angles or one of them is acute and one of them is obtuse. Can Two Acute Angles be Supplementary Angles? Supplementary angles always form a straight angle (180°) when they are put together. For example, if ∠A + ∠B = 180°, then ∠A and ∠B are called supplementary angles. In geometry, two angles are said to be supplementary angles if they add up to 180°. Hence, you can remember that two 'Complementary' angles when put together form a 'Corner (right)' angle.įAQs on Supplementary Angles What is the Meaning of Supplementary Angles in Geometry? 'C' is for 'Complementary' and 'C' is for 'Corner'.Hence, you can remember that two 'Supplementary' angles when put together form a 'Straight' angle. 'S' is for 'Supplementary' and 'S' is for 'Straight'.Here is a little trick for you to remember the difference between supplementary angles and complementary angles. Tips on Supplementary angles vs Complementary angles Two angles are said to be supplementary if they add up to 180 ° Two angles are said to be complementary if they add up to 90 °. The supplementary vs complementary angles table. The following table shows the difference between supplementary and complementary angles. These angles have numerous real-time applications, the most common being the crossroads. While supplementary angles add up to 180 °, complementary angles add up to 90°. Non-adjacent supplementary angles, when put together, form a straight angle.Ĭomplementary angles and supplementary angles are those angles that exist in pairs. Hence, these two angles are non-adjacent supplementary angles. Observe the figure given below which shows ∠ABC and ∠PQR are non-adjacent angles as they neither have a common vertex nor a common arm. They may add up to 180° but they do not share any common vertex or common arm. Two supplementary angles that are NOT adjacent are said to be non-adjacent supplementary angles. Hence, these two angles are adjacent supplementary angles. Observe the figure given below which shows that ∠COB and ∠AOB are adjacent angles as they have a common vertex, O, and a common arm OB. Two supplementary angles with a common vertex and a common arm are said to be adjacent supplementary angles. Each of these types of supplementary angles is explained below. So, there are two types of supplementary angles. Supplementary angles can either be adjacent or non-adjacent. Adjacent and Non-Adjacent Supplementary Angles
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