Which of the following is not the criteria of similarity of two triangles
A AAA
B ASA
C SSS
D SAS
Answers
Answered by
5
Answer:
Answer is : SSS criterion
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Answered by
6
(B) ASA is not the criteria of similarity of two triangles.
Explanation:
- The triangles that have same shape are called similar triangles and the size of the triangles can be different.
- The symbol for similarity triangle is ~.
- The two triangle have same ratio of corresponding sides and equal pair of corresponding angles, then they are similar.
- The two triangles are similar, if any two angles of one triangle are equal to any two angles of another and it is known as Angle-Angle similarity (AAA).
- The two triangles are said to be similar, if the two sides of one triangle have the same proportion of the two sides of another triangle and the included angle in the both triangles are equal is known as Side-Angle-Side similarity (SAS).
- The triangles are said to be similar if all the three sides of one triangle is equal to the all the three sides of another triangle and it is known as Side-Side-Side similarity (SSS).
- In ASA triangle, if two angles and the one included side are congruent to another triangle, then the two triangles are said to congruent.
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