![]() Therefore according to the SSS Formula, the two triangles are congruent.Įxample 2: Triangle ABC is an isosceles triangle and the line segment AD is the angle bisector of the angle A. Can you prove that \(\Delta ADB\) is congruent to the \(\Delta ADC\)? Now the side PQ is common in both the triangles \(\Delta PAQ\) and \(\Delta PBQ\). Two points P and Q, equidistant from the endpoints of the line segment AB. Solution: To prove: \(\Delta PAQ\) is congruent to the \(\Delta PBQ\) Math will no longer be a tough subject, especially when you understand the concepts through visualizations with Cuemath.īook a Free Trial Class Examples Using SSS FormulaĮxample 1: The two points P and Q are on the opposite sides of the line segment AB. The points P and Q are equidistant from points A and B. Can you prove that \(\Delta PAQ\) is congruent to the \(\Delta PBQ\)? There are different SSS Triangle formulas used to prove the congruence or similarity between two triangles. ![]() ![]() Using the SSS Formula, the congruency or similarity of any two triangles can be checked when two sides and the angle between these sides for both the triangles follow the required criterion. Let us understand the desired criterion using the SSS triangle formula using solved examples in the following sections. If two triangles are similar it means that all corresponding angle pairs are equal and all corresponding sides are proportional. However, in order to be sure that the two triangles are similar or congruent, we do not necessarily need to have information about all sides and all angles. If two triangles are congruent it means that three sides of one triangle will be (respectively) equal to the three sides of the other and three angles of one triangle will be (respectively) equal to the three angles of the other. Before learning the SSS formula let us recall what are congruence and similarity. ![]()
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