Mathematics
Grade9
Easy
Question
Can we use the midsegment theorem if only DE =
AB from the given figure?
![](data:image/png;base64,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)
- Yes, we can use DE not parallel to AB
- No , as DE not parallel to AB
- No , as DE not perpendicular to AB
- Yes, as DE not perpendicular to AB
Hint: