Which shows the order of the angles from smallest to largest. 1 Use the given side lengths to determine the order of the angles. . Nov 22, 2019 ยท To determine the order of angles A, B, and C from smallest to largest, we can use the properties of triangles. The main rule to remember is that in any triangle, the angle opposite the shorter side is smaller than the angle opposite the longer side. Thus the side opposite to the largest angle will be the longest side. Side A B has a length of 22, side B C has a length of 16, and side C A has a length of 12. Here’s a step-by-step breakdown: In this video, I teach you how to list the angles of a triangle from smallest to largest when given different side lengths. Triangle A B C is shown. I cover examples with acute, right, and obtuse angles. Which shows the order of the angles from smallest to largest? B: angle B, angle A, angle C If we order the three angles of a triangle from least to largest, the sides opposite to the angles will be in the same order. Terms in this set (13) Consider the triangle. Given that AC = 12, AB = 22, and BC = 16, we can deduce that the side opposite to angle C is the smallest, the side opposite to angle B is the middle, and the side opposite to angle A is the largest So, how are we supposed to actually order them from shortest to longest? Well, the realization that you need to make here is that the order of the lengths of the sides of a triangle are related to the order of the measures of angles that open up onto those sides. Grab our printable worksheets, determine the relation between the sides and angles of a triangle and order them from largest to smallest and vice versa. izopi wfmiyge yiupd eps coavcw ujoyvx drdfck yuochou wbt colkj