a/ Ta có: AB² + AC² = BC² = 25

=> tam giác ABC vuông tại A

b/ \(AB.AC=AH.BC\Rightarrow AH=\frac{AB.AC}{BC}=\frac{3.4}{5}=\frac{12}{5}=2,4cm\)

\(AB^2=BH.BC\Rightarrow BH=\frac{AB^2}{BC}=\frac{3^2}{5}=\frac{9}{5}=1,8cm\)

\(BC=BH+CH\Rightarrow CH=BC-BH=5-1,8=3,2cm\)

Trong tam giác vuông AHB có: 

\(AH.HB=HD.AB\Rightarrow HD=\frac{AH.HB}{AB}=\frac{2,4.1,8}{3}=\frac{36}{25}=1,44cm\)

Trong tam giác vuông AHC có:

\(AH.HC=HE.AC\Rightarrow HE=\frac{AH.HC}{AC}=\frac{2,4.3,2}{4}=\frac{48}{25}=1,92cm\)

a: \(BC=\sqrt{15^2+20^2}=25\left(cm\right)\)

AH=15*20/25=12cm

BH=15^2/25=9cm

CH=25-9=16cm

b: Xet ΔABC vuông tại A và ΔDHC vuông tại D có

góc C chung

=>ΔABC đồng dạng với ΔDHC

c: \(\dfrac{S_{ABC}}{S_{DHC}}=\left(\dfrac{BC}{HC}\right)^2=\left(\dfrac{25}{16}\right)^2\)

=>\(S_{DHC}=150:\dfrac{625}{256}=61.44\left(cm^2\right)\)

\(CH=\dfrac{AH^2}{BH}=16\left(cm\right)\)

\(AB=\sqrt{BH\cdot BC}=\sqrt{9\cdot25}=15\left(cm\right)\)

AC=20(cm)

\(\widehat{B}\simeq37^0\)

\(\widehat{C}\simeq53^0\)

Áp dụng HTL:

\(CH=\dfrac{AH^2}{BH}=16\left(cm\right)\Rightarrow BC=BH+BC=25\left(cm\right)\)

\(\Rightarrow\left\{{}\begin{matrix}AB=\sqrt{BH\cdot BC}=15\left(cm\right)\\AC=\sqrt{CH\cdot BC}=20\left(cm\right)\end{matrix}\right.\)

\(\sin B=\dfrac{AC}{BC}=\dfrac{20}{25}=\dfrac{4}{5}\approx53^0\Rightarrow\widehat{B}\approx53^0\\ \widehat{C}=90^0-\widehat{B}\approx90^0-53^0=37^0\)

a. \(BC^2=AB^2+AC^2\) nên ABC vuông tại A

b. Hệ thức lượng: \(AH=\dfrac{AB\cdot AC}{BC}=2,4\left(cm\right)\)

\(\sin B=\dfrac{AC}{BC}=\dfrac{4}{5}\approx\sin53^0\\ \Rightarrow\widehat{B}\approx53^0\\ \Rightarrow\widehat{C}=90^0-\widehat{B}\approx37^0\)

a: AB=15(cm)

AC=20(cm)

BH=9(cm)
CH=16(cm)