Game of Triangle


In \(\triangle FGH\), \(FG = 7\), \(GH = 8\), and \(HF = 9\) with \(FP\) as the perpendicular. \(HJ\) and \(GI\) are the angle bisectors of \(\angle FHG\) and \(\angle FGH\) respectively. The lines \(HJ\) and \(GI\) intersect the line \(FP\) at points \(R\) and \(S\) respectively. If the length of \(RS\) can be expressed in the form \(\frac{y}{z}\), what is the minimum value of \(y + z\)?


Geometry  


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Statistics



Attempt 11


Solve 2


First Solve matician369