FIll in the blank with the most appropriate answer.
The sum of the three sides of a triangle is greater than the sum of its three
medians
Let ABC be the triangle and D, E and F the midpoints of BC, CA and AB respectively.
Recall that the sum of two sides of a triangle is greater than twice the median bisecting the third side,
Hence in ΔABD, AD is a median
⇒AB+AC>2AD
Similarly, we get,
BC+AC>2CF
BC+AB>2BE
On adding the above inequations, we get
(AB+AC)+(BC+AC)+(BC+AB)>(2AD+2CD+2BE)
2(AB+BC+AC)>2(AD+BE+CF)
∴AB+BC+AC>AD+BE+CF
Hence, we can say that the perimeter of a triangle is greater than the sum of the medians.