what is the area of a triangle with a perimeter of 1000m?

Answer 1

It depends on the shape of the triangle. An equilateral triangle will have the greatest area; a triangle that's nearly 500m long on two sides, and almost zero length on the third, will have nearly zero area.

Answer 2

I can replace 1000 with p (perimeter) each time. The new formula is: A= n ({1 X p/n} X 1X p/n/ Tan (180/n)) I can simplify this equation now: A= n ({1 X p/n} X 1X p/n/ Tan (180/n)) A= n (p/2n) X p/2n / Tan (180/n)) A= n (p/2n) X p/2n / Tan (180/n)) A= n(P2/ 4n2 x Tan(180/n)) A=P2/ 4n x Tan(180/n) This is the formula for all regular shapes. The only area that this and my original formula will get unstuck is for circles. I have found out that a circle has infinite sides so when substituted into the equation: A=250000/ n x Tan (180/n) A=250000/ â x Tan (180/â) This is not a workable equation. However, after more investigation, I found out that the denominator of theoriginal equation is equal to Pi when n is a very large number. Therefore, the area of a Triangle with a 1000m perimeter is: A=250000/â

Answer 3

The area of a triangle is not directly connected with its perimeter. You can draw triangles having different area but the same perimeter. :p

Answer 4

the area of a triangle has no direct connection with its perimeter
until and unless it is an equilateral triangle

Answer 5

you cant find the area of a triangle just by knowing only its perimeter..

Answer 6

Depends on the angles of the triangle, surely.

Answer 7

Please provide the lengths of the sides of the Triangle.

Area Formula

A = 1/2 b h

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Answer 8

There is not enough information