Xét tam giác ABC vuông tại A, ta có: BC2 = AB2 + AC2 (định lí Pi - ta - go)
\(\frac{AB}{AC}=\frac{5}{6}\) => \(AB=\frac{5}{6}AC\) => BC2 = \(\left(\frac{5}{6}AC\right)^2+AC^2=\frac{25}{36}AC^2+AC^2=\frac{61}{36}AC^2\)
=> BC = \(\frac{\sqrt{61}}{6}AC\)
Ta có: SABC = \(\frac{AB.AC}{2}=\frac{AH.BC}{2}\)(Vì ABC là t/giác vuông)
<=> \(\frac{5}{6}AC.AC=AH.\frac{\sqrt{61}}{6}AC\)
=> \(\frac{5}{6}AC^2=30\cdot\frac{\sqrt{61}}{6}.AC\)
=> \(\frac{5}{6}AC^2-5\sqrt{61}AC=0\)
<=> \(AC\left(\frac{5}{6}AC-5\sqrt{61}\right)=0\)
<=> \(\frac{5}{6}AC=5\sqrt{61}\)
<=> AC = \(6\sqrt{61}\) (cm) => AB = 5/6AC = \(5\sqrt{61}\) (cm)
=> BC = \(\frac{\sqrt{61}}{6}.6\sqrt{61}=61\)(cm)
Xét t/giác AHB vuông tại H, ta có: \(AB^2=AH^2+BH^2\)(định lí Pi - ta - go)
=> BH2 = AB2 - AH2 = \(\left(5\sqrt{61}\right)^2-30^2=625\)
=> BH = 25 (cm) => AC = 61 - 25 = 36 (cm)
