The SSS criterion for triangle similarity states that if three sides of one triangle are proportional to three sides of another triangle, then the triangles are similar.
What is the similarity of the triangle?
When it comes to Euclidean geometry, two things are said to be comparable if they have the same shape or the same shape as each other's mirror image. One can be created from the other more precisely by evenly scaling, possibly with the inclusion of further translation, rotation, and reflection.
SSS is when we know the lengths of the three sides a, b, and c.
Use the law of sines when you are given ASA, SSA, or AAS.
An example of ASA is when you are given the measure of angles A, and C, and the length of side b.
An example of SSA is when you are given the sides c, and a, and angle C.
The Side Side Side (SSS) Theorem states that if all three sides of a triangle are congruent (identical) to the corresponding sides of another triangle, then the triangles themselves are also congruent.
Hence, the SSS criterion for triangle similarity states that if three sides of one triangle are proportional to three sides of another triangle, then the triangles are similar.
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