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[[Image:Apollonius' theorem.svg||thumb|right|350px|Area of Green + Area of Blue = Area of Red]] | |||
In [[geometry]], '''Apollonius' theorem''' is a [[theorem]] relating the length of a [[Median (geometry)|median]] of a [[triangle]] to the lengths of its side. | |||
It states that "the sum of the squares of any two sides of any triangle equals twice the square on half the third side, together with twice the square on the median bisecting the third side"<br /> | |||
Specifically, in any triangle ''ABC'', if ''AD'' is a median, then | |||
:<math>AB^2 + AC^2 = 2(AD^2+BD^2).\,</math> | |||
It is a special case of [[Stewart's theorem]]. For a [[right-angled triangle]] the theorem reduces to the [[Pythagorean theorem]]. From the fact that diagonals of a [[parallelogram]] bisect each other, the theorem is equivalent to the [[parallelogram law]]. | |||
The theorem is named for [[Apollonius of Perga]]. | |||
==Proof== | |||
[[image:ApolloniusTheoremProof.svg|left|thumb|Proof of Apollonius' theorem]] | |||
The theorem can be proved as a special case of Stewart's theorem, or can be proved using vectors (see [[parallelogram law]]). The following is an independent proof using the law of cosines.<ref>Following Godfrey & Siddons</ref> | |||
Let the triangle have sides ''a'', ''b'', ''c'' with a median ''d'' drawn to side ''a''. Let ''m'' be the length of the segments of ''a'' formed by the median, so ''m'' is half of ''a''. Let the angles formed between ''a'' and ''d'' be θ and θ′ where θ includes ''b'' and θ′ includes ''c''. Then θ′ is the supplement of θ and cos θ′ = −cos θ. The [[law of cosines]] for θ and θ′ states | |||
:<math> | |||
\begin{align} | |||
b^2 &= m^2 + d^2 - 2dm\cos\theta \\ | |||
c^2 &= m^2 + d^2 - 2dm\cos\theta' \\ | |||
&= m^2 + d^2 + 2dm\cos\theta.\, \end{align} | |||
</math> | |||
Add these equations to obtain | |||
:<math>b^2 + c^2 = 2m^2 + 2d^2\,</math> | |||
as required. | |||
==References== | |||
{{reflist}} | |||
*{{cite book |title=Modern Geometry|first1=Charles|last1=Godfrey|first2=Arthur Warry|last2=Siddons | |||
|publisher=University Press|year=1908 | |||
|url=http://books.google.com/books?id=LGsLAAAAYAAJ&pg=PA20#v=onepage|page=20}} | |||
*{{PlanetMath|title=Apollonius Theorem|urlname=ApolloniusTheorem}} | |||
{{DEFAULTSORT:Apollonius' Theorem}} | |||
[[Category:Euclidean geometry]] | |||
[[Category:Triangle geometry]] | |||
[[Category:Articles containing proofs]] | |||
[[Category:Theorems in plane geometry]] | |||
Revision as of 21:40, 28 February 2013
In geometry, Apollonius' theorem is a theorem relating the length of a median of a triangle to the lengths of its side.
It states that "the sum of the squares of any two sides of any triangle equals twice the square on half the third side, together with twice the square on the median bisecting the third side"
Specifically, in any triangle ABC, if AD is a median, then
It is a special case of Stewart's theorem. For a right-angled triangle the theorem reduces to the Pythagorean theorem. From the fact that diagonals of a parallelogram bisect each other, the theorem is equivalent to the parallelogram law.
The theorem is named for Apollonius of Perga.
Proof
The theorem can be proved as a special case of Stewart's theorem, or can be proved using vectors (see parallelogram law). The following is an independent proof using the law of cosines.[1]
Let the triangle have sides a, b, c with a median d drawn to side a. Let m be the length of the segments of a formed by the median, so m is half of a. Let the angles formed between a and d be θ and θ′ where θ includes b and θ′ includes c. Then θ′ is the supplement of θ and cos θ′ = −cos θ. The law of cosines for θ and θ′ states
Add these equations to obtain
as required.
References
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- ↑ Following Godfrey & Siddons