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![](https://rs.olm.vn/images/avt/0.png?1311)
Bài 1:
a) Áp dụng hệ thức lượng trong tam giác vuông vào ΔABC vuông tại A có AH là đường cao ứng với cạnh huyền BC, ta được:
\(AB^2=BH\cdot BC\)
\(\Leftrightarrow BH=\dfrac{9^2}{15}=\dfrac{81}{15}=5.4\left(cm\right)\)
Ta có: BH+CH=BC(H nằm giữa B và C)
nên CH=BC-BH=15-5,4=9,6(cm)
b) Ta có: BH+CH=BC(H nằm giữa B và C)
nên BC=1+3=4(cm)
Áp dụng hệ thức lượng trong tam giác vuông vào ΔABC vuông tại A có AH là đường cao ứng với cạnh huyền BC, ta được:
\(\left\{{}\begin{matrix}AB^2=BH\cdot BC=1\cdot4=4\left(cm\right)\\AC^2=CH\cdot BC=3\cdot4=12\left(cm\right)\end{matrix}\right.\Leftrightarrow\left\{{}\begin{matrix}AB=2\left(cm\right)\\AC=2\sqrt{3}\left(cm\right)\end{matrix}\right.\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Áp dụng hệ thức lượng:
\(AB^2=BH.BC\Rightarrow BC=\dfrac{AB^2}{BH}=12\left(cm\right)\)
Áp dụng định lý Pitago:
\(AC=\sqrt{BC^2-AB^2}=6\sqrt{3}\left(cm\right)\)
Hệ thức lượng:
\(AH.BC=AB.AC\Rightarrow AH=\dfrac{AB.AC}{BC}=3\sqrt[]{3}\left(cm\right)\)
Áp dụng hệ thức lượng trong tam giác vuông vào ΔABC vuông tại A có AH là đường cao ứng với cạnh huyền BC, ta được:
\(AB^2=BH\cdot BC\)
\(\Leftrightarrow BC=\dfrac{6^2}{3}=12\left(cm\right)\)
Ta có:BH+CH=BC(H nằm giữa B và C)
nên CH=BC-BH=12-3=9(cm)
Áp dụng hệ thức lượng trong tam giác vuông vào ΔABC vuông tại A có AH là đường cao ứng với cạnh huyền BC, ta được:
\(AH^2=HB\cdot HC\)
\(\Leftrightarrow AH^2=3\cdot9=27\)
hay \(AH=3\sqrt{3}\left(cm\right)\)
Áp dụng định lí Pytago vào ΔABC vuông tại A, ta được:
\(BC^2=AB^2+AC^2\)
\(\Leftrightarrow AC^2=12^2-3^2=135\)
hay \(AC=3\sqrt{15}\left(cm\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Xét tam giác ABC vuông tại A ta có:
\(AB^2=BC\cdot BH\)
\(\Rightarrow BH=\dfrac{AB^2}{BC}=\dfrac{\left(\dfrac{2}{3}\right)^2}{12}=\dfrac{1}{27}\left(cm\right)\)
Mà: \(BC=CH+BH\)
\(\Rightarrow CH=12-\dfrac{1}{27}=\dfrac{323}{27}\left(cm\right)\)
\(AC^2=BC\cdot CH\)
\(\Rightarrow AC=\sqrt{BC\cdot CH}=\sqrt{12\cdot\dfrac{323}{27}}=\dfrac{2\sqrt{323}}{3}\left(cm\right)\)
Mà: \(AH\cdot BC=AB\cdot AC\)
\(\Rightarrow AH=\dfrac{AB\cdot AC}{BC}=\dfrac{\dfrac{2}{3}\cdot\dfrac{2\sqrt{323}}{3}}{12}=\dfrac{\sqrt{323}}{27}\left(cm\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
\(\left\{{}\begin{matrix}HB\cdot HC=9\\HB+HC=6.15\end{matrix}\right.\Leftrightarrow\left\{{}\begin{matrix}\left(6.15-HB\right)\cdot HB=9\\HB+HC=6.15\end{matrix}\right.\)
\(\Leftrightarrow\left\{{}\begin{matrix}HB^2-6.15HB+9=0\\HB+HC=6.15\end{matrix}\right.\Leftrightarrow\left\{{}\begin{matrix}HB=2,4\left(cm\right)\\HC=3.75\left(cm\right)\end{matrix}\right.\)
\(\Leftrightarrow\left\{{}\begin{matrix}AB=\dfrac{3\sqrt{41}}{5}\left(cm\right)\\AC=\dfrac{3\sqrt{41}}{4}\left(cm\right)\end{matrix}\right.\)
![](https://rs.olm.vn/images/avt/0.png?1311)
a, AB = 7,5cm, AC = 10cm, BC = 12,5cm, HC = 8cm
b, AH = 3 3 cm; P A B C = 18 + 6 3 c m ; P A B H = 9 + 3 3 c m ; P A C H = 9 + 9 3 c m
![](https://rs.olm.vn/images/avt/0.png?1311)
\(a,\) Áp dụng HTL tam giác
\(\left\{{}\begin{matrix}AH^2=BH\cdot HC\\AB^2=BH\cdot BC\\AC^2=CH\cdot BC\end{matrix}\right.\Rightarrow\left\{{}\begin{matrix}CH=\dfrac{AH^2}{BH}=\dfrac{36}{4,5}=8\left(cm\right)\\AB=\sqrt{4,5\left(4,5+8\right)}=\sqrt{4,5\cdot12,5}=7,5\left(cm\right)\\AC=\sqrt{8\cdot12,5}=10\left(cm\right)\end{matrix}\right.\)
và \(BC=12,5\left(cm\right)\)
\(b,\) Áp dụng HTL tam giác
\(\left\{{}\begin{matrix}AB^2=BH\cdot BC\\AC^2=CH\cdot BC\\AH^2=CH\cdot BH\end{matrix}\right.\Rightarrow\left\{{}\begin{matrix}BC=\dfrac{AB^2}{BH}=\dfrac{36}{3}=12\left(cm\right)\\CH=\dfrac{AC^2}{BC}=\dfrac{BC^2-AB^2}{12}=\dfrac{6\sqrt{3}}{12}=\dfrac{\sqrt{3}}{2}\left(cm\right)\\AH=3\cdot\dfrac{\sqrt{3}}{2}=\dfrac{3\sqrt{3}}{2}\left(cm\right)\end{matrix}\right.\)
![](https://rs.olm.vn/images/avt/0.png?1311)
tham khảo:
![](data:image/png;base64,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)
hình bạn tự vẽ nha !
https://hoidap247.com/cau-hoi/1022947