Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
a. vì tan giác ABC vuông tại A nên:
Áp dụng định lý Pytago ta có:
BC2 = AB2 + AC2
BC = 6+8
BC2 = 362 + 642
BC = \(\sqrt{100}\)
BC = 10 (cm)
Vậy BC= 10cm
b. Xét 2 tam giác vuông AFD và tam giác vuông ECD, ta có:
A=E= 900
D1 = D2 ( hai góc đối đỉnh)
=> tam giác AFD= tam giác ECD
=> DF=DC( hai cạnh tương ứng)
ko bt đúng hay sai, làm bừa. nếu sai thì tự sửa lại nha
a.vì tam giác ABC vuông tại A
áp dụng định lí py-ta-go,ta có
BC^2=AB^2+AC^2
BC^2=6^2+8^2
BC^2=100
BC=10
b.xét tam giác EDB và tam giác ADB,có
DEB=DAB(=90*)
EBD=ABD
DB chung
suy ra:tam giác EDB=tam giácADB
suy ra ,ED=AD
xét tam giác CED và tam giác FAD,có
CED=FAD
CDE=FDA
DE=DA
suy ra tam giác CED=tam giácFAD
suy ra DF=DC
c.tam giác CFB có
CA là đường cao
FE là đường cao
mà CA cắt FE tại D
SUY RA :D là trực tâm
Lời giải:
Gọi $M, N,P$ lần lượt là chân đường cao kẻ từ $A,B,C$ của tam giác ABC. $AM, BN, CP$ cắt nhau tại trực tâm $H$ của tam giác $ABC$.
Xét tam giác ABH: $AN\perp BH, BM\perp AH$. Mà $AM, BM$ cắt nhau tại $C$ nên $C$ là trực tâm của tam giác $ABH$
Tương tự: $B$ là trực tâm tam giác $ACH$, $A$ là trực tâm tam giác $BHC$
Hình vẽ:
![](data:image/png;base64,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)