Math, asked by Arvindgoyal8409, 11 months ago

Show that perimeter of triangle is greater than sum of its three medians

Answers

Answered by Anonymous
3

Answer:

Figure is in the attachment

1)

Let AD,BE & CF be the three medians of a ∆ABC.

WE KNOW THAT THE SUM OF ANY TWO SIDES OF A TRIANGLE IS GREATER THAN TWICE THE MEDIAN DRAWN TO THE THIRD SIDE.

AB+AC>2AD;. AB+BC>2BE & BC+AC>2CF.

Adding We get,

2(AB+BC+AC) >2(AD+BE+CF)

(AB+BC+AC) >(AD+BE+CF)

Hence, the perimeter of a triangle is greater than the sum of its three medians.

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2)

Use the result that the perpendicular drawn from a point( outside the line ) to a line is shorter( in length) than a line segment drawn from that point to the line and then add all three cases.

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Solution:

Consider ABC is a triangle and AL, BM and CN are the altitudes.

To Prove:

AL+BM+CN

Proof:

We know that the perpendicular AL drawn from the point A to the line BC is shorter than the line segment AB drawn from the point A to the line BC.

ALBMCN

On adding equation 1,2,3

AL+BM+CN

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3)

Given: A ∆ABC in which AD is median.

To Prove:

AC+AB>2AD

Construction:

Produce AD to E, such that AD=DE.

Join EC.

Proof:

In ∆ADB & ∆ EDC

AD=ED (by construction)

angleADB=angleEDC. (vertically opposite angle)

BD=CD. (D midpoint of BC)

∆ADB congruent ∆ EDC (by SAS)

AB=EC (by CPCT)

Now ,in ∆AEC, we have AC+EC>AE

[SINCE, SUM OF ANY TWO SIDES OF A TRIANGLE IS GREATER THAN THE THIRD SIDE]

AC+EC>AD+DE. (AE=AD+DE)

AC+AB>2AD (AD=ED & EC=AB)

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

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Hope this will help you....

Mark as brainliest

Attachments:
Answered by anjanajainrvun
1

Answer:

see in the attached picture.

Step-by-step explanation:

Before doing this note that you should know this property.

Sum of any 2 sides of triangle is greater than twice of any of it's median.

.

now you can see the solution at the attached picture

Attachments:
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