Mathematics
Grade-8
Easy
Question
Tell these triangles appear to be similar or not.
![](data:image/png;base64,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)
- AA
- SAS
- SSS
- Not Similar
The correct answer is: AA
These triangles appear to be similar by AA.
since the triangles have two angles same so they are similar by AA
Question
since the triangles have two angles same so they are similar by AA