Step 2: With the help of protractor and with A as center draw an angle of 45 and extend its arc to any convenient length, as shown below: Step 1: Draw a line segment AB with length 5 cm, as shown in the below diagram: Let's try to construct a triangle ABC congruent to triangle XYZ, when length of two sides and measure of one common angle of the given two sides are given. There is a given triangle XYZ, where XY = 5 cm, ∠ X = 45° & XZ = 6 cm Hence, this confirms that two triangles cannot be congruent, if one sides and one angle of a triangle are equal to the two corresponding sides and one corresponding angle of another triangle. With length of one side 5cm & measure of one angle 45°, we can construct many triangles:įrom the above diagram of different triangles, you can observe that given triangle XYZ can be any of the following and we are not sure which diagram of Triangle ABC is congruent to Triangle XYZ. There is a given triangle XYZ, XY = 5cm & ∠ X = 45Ĭan you construct a triangle ABC congruent to triangle XYZ ? Hence, this confirms that two triangles cannot be congruent, if one side of a triangle is equal to the corresponding side of another triangle. 5cm, following three types of triangles can be formed:įrom the above diagram of three triangles, you can observe that given triangle XYZ can be any of the following and we are not sure which diagram of Triangle ABC is congruent to Triangle XYZ. You are asked to construct a triangle ABC congruent to triangle XYZ. There is a given triangle XYZ and length of one of its side XY is equal to 5cm. Now, let's justify or proof of SAS Rule of Congruence with the help of following three checks: Justification / Proof - SAS Congruency Rule Therefore, SAS congruence rule fails to apply here and we get: In the above 2nd observation, you can notice that ∠ X of △ XYZ is not the common angle to sides XZ & YZ. ∠ C (common angle to sides AC & BC) of △ ABC is equal to ∠ X of △ XYZ Let's see that the change of angle can leads to any change in the solution too. Solution: You can notice that example 1 and example 2 are almost same and difference is only of 30 angle in △ XYZ. Therefore, from the above two observations, SAS congruence rules apply and we can say △ ABC and △ XYZ are congruent.Īnd the corresponding relationships are as: ∠ C (common angle to sides AC & BC) of △ ABC is equal to corresponding ∠ Z (common angle to sides XZ & YZ) of △ XYZ Two sides AC & BC of △ ABC are equal to corresponding sides XZ & YZ of △ XYZ. SAS rule of Congruence illustrates that, if two sides and one common angle to these two sides are equal to the two corresponding sides and one corresponding common angle of another triangle then both the triangle are said to be congruent. Home > Triangle > Congruent Triangles > Rules of Congruent Triangles > SAS Rule of Congruent Triangles > SAS Rule of Congruent Trianglesīefore you study this topic you are advice to studyĬorresponding Parts of Congruent Triangles
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