Difference between revisions of "Euler's inequality"

Revision as of 10:23, 4 June 2013

Euler's Inequality states that $R \ge 2r$

Proof

Let the circumradius be $R$ and inradius $r$ . Let $d$ be the distance between the circumcenter and the incenter. Then $d=\sqrt{R(R-2r)}$ From this formula, Euler's Inequality follows as $d^2=R(R-2r)$ By the Trivial Inequality, $R(R-2r)$ is positive. Since $R$ has to be positive as it is the circumradius, $R-2r \ge 0\\R \ge 2r$ as desired

Revision as of 10:19, 4 June 2013 (view source) Flamefoxx99 (talk \| contribs) (→‎Proof) ← Older edit		Revision as of 10:23, 4 June 2013 (view source) Flamefoxx99 (talk \| contribs) m Newer edit →
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−	~~==Euler's Inequality==~~

	Euler's Inequality states that <cmath>R \ge 2r</cmath>		Euler's Inequality states that <cmath>R \ge 2r</cmath>

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Difference between revisions of "Euler's inequality"

Revision as of 10:23, 4 June 2013

Proof