Prove that sum of any two sides of a triangle is greater than twice the median with respect to the third side.

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Solution

Step:Proof
Given: $Δ A B C$ with median $A D$ .
To Prove: $A B + A C > 2 A D, A B + B C > 2 A D, B C + A C > 2 A D$
Construction:
Extend $A D$ to $E$ such that $D E = A D$ ,Join $E C$ .
Proof: From $Δ A D B$ and $Δ E D C,$
$A D = E D$ [By construction]
$∠ 1 = ∠ 2$ [Vertically opposite angles are equal]
$D B = D C$ [Given]
By $S A S$ criterion of congruence,( $S A S$ congruence rule: If any two sides and the angle included between the sides of one triangle are equivalent to the corresponding two sides and the angle between the sides of the second triangle, then the two triangles are said to be congruent by $S A S$ rule.)
$Δ A D B ≅ Δ E D C$
$A B = E C [C P C T]$
And $∠ 3 = ∠ 4 [C P C T]$
Now, in $Δ A E C,$
Since sum of the lengths of any two sides of a triangle must be greater than the third side,We have
$A C + C E > A E$
$\Rightarrow A C + C E > A D + D E$
$\Rightarrow A C + C E > A D + A D [A D = D E]$
$\Rightarrow A C + C E > 2 A D$
$\Rightarrow A C + A B > 2 A D [∵ A B = C E]$
Similarly,We get,
$A B + B C > 2 A D a n d B C + A C > 2 A D .$
Hence, proved.

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Similar questions

Justify the following statements with reasons:

(a) The sum of three sides of a triangle is more than the sum of its altitudes.

(b) The sum of any two sides of a triangle is greater than twice the median drawn to the third side.

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