\(BC=HB+HC=35\)

\(AM=\frac{1}{2}BC=\frac{35}{2}\) \(\Rightarrow HM=HB-BM=HB-\frac{1}{2}BC=\frac{3}{2}\)

\(AH=\sqrt{HB.HC}=4\sqrt{19}\)

\(sin\widehat{HAM}=\frac{HM}{AM}=\frac{3}{35}\)

\(cos\widehat{HAM}=\frac{AH}{AM}=\frac{8\sqrt{19}}{35}\)

\(tan\widehat{HAM}=\frac{HM}{AH}=\frac{3}{8\sqrt{19}}\)

Xét ΔABC vuông tại A, có đường cao AH:

\(AH^2=BH.HC\\ \Leftrightarrow AH^2=9.16\\ \Leftrightarrow AH^2=144\\ \Leftrightarrow AH=12cm\)

Có AM là đường trung tuyến

\(\Rightarrow BM=MC=\dfrac{1}{2}BC=\dfrac{9+16}{2}=12,5cm\\ \Rightarrow HM=BM-BH=12,5-9=3,5cm\\ \Rightarrow\tan HAM=\dfrac{HM}{AH}=\dfrac{3,5}{12}\)

a ,   Δ A B C ,   A ⏜ = 90 0 , A H ⊥ B C g t ⇒ A H = B H . C H = 4.9 = 6 c m Δ A B H ,   H ⏜ = 90 0   g t ⇒ tan B = A H B H = 6 4 ⇒ B ⏜ ≈ 56 , 3 0 b ,   Δ A B C ,   A ⏜ = 90 0 , M B = M C g t ⇒ A M = 1 2 B C = 1 2 .13 = 6 , 5 c m S Δ A H M = 1 2 M H . A H = 1 2 .2 , 5.6 = 7 , 5 c m 2

Đặt \(\frac{AH}{40}=\frac{AM}{41}=a\Rightarrow AH=40a;AM=41a\)

=> HM=9a và BC=2AM=82a

=> HC=9a+41a=50a

Mà \(\Delta ABC\infty HAC\Rightarrow\frac{AB}{AC}=\frac{HA}{HC}=\frac{40A}{50A}=\frac{4}{5}\)

vẬY ....

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