Mathematics
In the given figure, M is the mid-point of AB and DE, whereas N is mid-point of BC and DF. Show that : EF = AC.
Mid-point Theorem
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Answer
By mid-point theorem,
The line segment joining the mid-points of any two sides of a triangle is parallel to the third side and is equal to half of it.
In △ EDF,
M is the mid-point of ED and N is the mid-point of DF.
∴ MN = (By mid-point theorem)
⇒ EF = 2MN ………….(1)
In △ ABC,
M is the mid-point of AB and N is the mid-point of BC.
∴ MN = (By mid-point theorem)
⇒ AC = 2MN ………….(2)
From (1) and (2), we get :
⇒ EF = AC.
Hence, proved that EF = AC.
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