<math>\frac {1}{4} < \frac {AI\cdot BI\cdot CI}{AA^{\prime }\cdot BB^{\prime }\cdot CC^{\prime }} \leq \frac {8}{27}</math>

<math>\frac {1}{4} < \frac {AI\cdot BI\cdot CI}{AA^{\prime }\cdot BB^{\prime }\cdot CC^{\prime }} \leq \frac {8}{27}</math>

We have <math>\prod\frac{AI}{AA^\prime}=\prod\frac{1}{1+\frac{IA^\prime}{IA}}</math>.  From Van Aubel's Theorem, we have <math>\frac{IA}{IA^\prime}=\frac{AB^\prime}{B^\prime C}+\frac{AC^\prime}{C^\prime B}</math> which from the Angle Bisector Theorem reduces to <math>\frac{b+c}{a}</math>.  We find similar expressions for the other terms in the product so that the product simplifies to <math>\prod\frac{1}{1+\frac{a}{b+c}}=\prod\frac{b+c}{a+b+c}</math>. Letting <math>a=x+y,b=y+z,c=z+x</math> for positive reals <math>x,y,z</math>, the product becomes <math>\frac{1}{8}\prod\frac{x+2y+z}{x+y+z}=\frac{1}{8}\prod\left(1+\frac{y}{x+y+z}\right)</math>.  To prove the right side of the inequality, we simply apply AM-GM to the product to get

We have <math>\prod\frac{AI}{AA^\prime}=\prod\frac{1}{1+\frac{IA^\prime}{IA}}</math>.  From Van Aubel's Theorem, we have <math>\frac{IA}{IA^\prime}=\frac{AB^\prime}{B^\prime C}+\frac{AC^\prime}{C^\prime B}</math> which from the Angle Bisector Theorem reduces to <math>\frac{b+c}{a}</math>.  We find similar expressions for the other terms in the product so that the product simplifies to <math>\prod\frac{1}{1+\frac{a}{b+c}}=\prod\frac{b+c}{a+b+c}</math>. Letting <math>a=x+y,b=y+z,c=z+x</math> for positive reals <math>x,y,z</math>, the product becomes <math>\frac{1}{8}\prod\frac{x+2y+z}{x+y+z}=\frac{1}{8}\prod\left(1+\frac{y}{x+y+z}\right)</math>.  To prove the right side of the inequality, we simply apply AM-GM to the product to get