Circumradius of a Triangle

In $\bigtriangleup ABC$, bisect the two sides $BC$ and $CA$ in $D$ and $E$ respectively and draw $DO$ and $EO$ perpendicular to $BC$ and $CA$. 

Thus, $O$ is the center of the circumcircle. Join $OB$ and $OC$. 

The two triangles $BOD$ and $COD$ are equal in all respect, so 
$ \angle BOD = \angle COD$
Therefore, $ \angle BOD = \cfrac{1}{2} \angle BOC =  \angle BAC = \angle A$
Also, $BD = BO \sin \angle BOD$
Therefore, $\cfrac{a}{2} = R \sin \angle A$
or
$R =  \cfrac{a}{2 \sin \angle A}$

Now, we know that
sin $A = \cfrac{2}{bc}$ $\sqrt{s(s-a)(s-b)(s-c)} = \cfrac {2S}{bc}$ where $S$ is the area of the triangle.  
Therefore, substituting the above values of sin $\angle A$ in eq $(1)$, we get
$R = \cfrac {abc}{4S}$
giving the radius of the circumcircle in terms of the sides.