Mathematics
Grade-8
Easy
Question
Determine whether the triangles are similar by AA~, SSS~, SAS~, or not similar.
![](data:image/png;base64,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)
- AA
- SAS
- SSS
- Not Similar
The correct answer is: Not Similar
These triangles not similar by AA, SAS, SSS.
As the two triangles have only one angle common , Also they are not having any fixed ratio between there sides.
so triangles are not similar