Cho tam giác ABC vuông tại A có AH vuông góc với BC; HE,HF lần lượt vuông góc với AB,AC tại E,F. Gọi O là trung điểm BC
a) CMR: OA vuông góc với EF
b)CMR \(BE\sqrt{CH}+CF\sqrt{BH}=AH\sqrt{BC}\)
Những câu hỏi liên quan
Cho tam giác ABC. Vẽ ở phía ngoài tam giác ABC các tam giác vuông tại A và ABD, ACE có AB = AD, AC = AE. Kẻ AH vuông góc với BC, DM vuông góc với AH, EN vuông góc với AH. Chứng minh rằng: DM = AH
Ta có: ∠(BAH) +∠(BAD) +∠(DAM) =180o(kề bù)
Mà ∠(BAD) =90o⇒∠(BAH) +∠(DAM) =90o(1)
Trong tam giác vuông AMD, ta có:
∠(AMD) =90o⇒∠(DAM) +∠(ADM) =90o(2)
Từ (1) và (2) suy ra: ∠(BAH) =∠(ADM)
Xét hai tam giác vuông AMD và BHA, ta có:
∠(BAH) =∠(ADM)
AB = AD (gt)
Suy ra: ΔAMD= ΔBHA(cạnh huyền, góc nhọn)
Vậy: AH = DM (hai cạnh tương ứng) (3)
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Cho tam giác ABC . Vẽ về phía ngoài tam giác ABC có tam giác vuông tại A là ABD,ACE có AB=AD,AC=AE.Kẻ AH vuông góc với BC, DM vuông góc với AH , EN vuông góc với AH .CMR
a) DM=AH
b) MN đi qua trung điểm của DE
Do tam giác ABD vuông cân tại A => góc DAM + góc BAH = 90º. Trong tam giác vuông ABH có góc ABH + góc BAH = 90º => góc DAM = góc ABH (cùng phụ với một góc bằng nhau)
Xét tam giác vuông ADM và tam giác vuông BAH có:
AD = AB (gt)
góc DAM = góc ABH (cmt)
=> tam giác ADM = tam giác BAH (cạnh huyền - góc nhọn)
=> DM = AH
Cmtt ta có: tam giác ANE = tam giác CHA => EN = AH
=> DM = EN (cùng bằng AH)
Lại có: DM // EN (cùng _|_ AH) mà DM = EN (cmt) => tứ giác DMEN là hình bình hành => MN cắt DE tại trung điểm mỗi đường hay MN đi qua trung điểm của DE.
Chúc bạn học giỏi!
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1. Cho tam giác ABC vuông ở A có AB<AC. AH vuông góc với BC tại H, D là điểm trên cạnh BC sao cho AD=AB. Vẽ DE vuông góc với BC tại E. Chứng mih rằng AH=HE.
2. Cho tam giác ABC vuông cân tại A.. Qua A vẽ đường thẳng d ở ngoài tam giác ABC . Vẽ BD vuông góc với d taị D. CE vuông góc với d tại E. M là trung điểm CB. Chứng minh rằng:
a) BD + CE = DE
b) Tam giác MDE là tam giác vuông cân
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Xem thêm câu trả lời
1. cho tam giác ABC cân tại A. Trên tia đối của tia BC lấy điểm D. Vẽ AH vuông góc với BC tại H. So sánh HC và HD
3. cho tam giác ABC có góc B,C nhọn. Vẽ AH vuông góc với BC tại H. cm: AB+AC > 2AH
4. cho tam giác ABC nhọn. Vẽ BC vuông góc với AC tại D, vẽ CE vuông góc với AB tại E. cm: BC+CE < AB+AC
giải giúp mik với!!!! -_- "_" "_"
1. cho tam giác ABC cân tại A. Trên tia đối của tia BC lấy điểm D. Vẽ AH vuông góc với BC tại H. So sánh HC và HD
3. cho tam giác ABC có góc B,C nhọn. Vẽ AH vuông góc với BC tại H. cm: AB+AC > 2AH
4. cho tam giác ABC nhọn. Vẽ BC vuông góc với AC tại D, vẽ CE vuông góc với AB tại E. cm: BC+CE < AB+AC
giải giúp mik với!!!! -_- "_" "_"
1.
Ta có : AC<AD (vì : D là tia đối của tia BC )
=> HD<HC
3.
Ta có : AB+AC>AH (vì : tog 2 cah cua tam giác luôn lớn hơn cah con lại)
Mà : 1/2AH<AB+AC
=> AB+AC>2AH
4.
Ta có : ko hiu
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bạn giải bài 3 mik hk hiu, bn viết rõ rak dc hk
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Cho tam giác ABC. Vẽ ở phía ngoài tam giác ABC các tam giác vuông tại A và ABD, ACE có AB = AD, AC = AE. Kẻ AH vuông góc với BC, DM vuông góc với AH, EN vuông góc với AH. Chứng minh rằng: MN đi qua trung điểm của DE
Ta có: ∠(HAC) +∠(CAE) +∠(EAN) =180o(kề bù)
Mà ∠(CAE) =90o⇒∠(HAC) +∠(EAN) =90o (4)
Trong tam giác vuông AHC, ta có:
∠(AHC) =90o⇒∠(HAC) +∠(HCA) =90o (5)
Từ (4) và (5) suy ra: ∠(HCA) =∠(EAN) ̂
Xét hai tam giác vuông AHC và ENA, ta có:
∠(AHC) =∠(ENA) =90o
AC = AE (gt)
∠(HCA) =∠(EAN) ( chứng minh trên)
Suy ra : ΔAHC= ΔENA(cạnh huyền, góc nhọn)
Vậy AH = EN (hai cạnh tương ứng)
Từ (3) và (6) suy ra: DM = EN
Vì DM ⊥ AH và EN ⊥ AH (giả thiết) nên DM // EN (hai đường thẳng cùng vuông góc với đường thẳng thứ ba)
Gọi O là giao điểm của MN và DE
Xét hai tam giác vuông DMO và ENO, ta có:
∠(DMO) =∠(ENO) =90o
DM= EN (chứng minh trên)
∠(MDO) =∠(NEO)(so le trong)
Suy ra : ΔDMO= ΔENO(g.c.g)
Do đó: DO = OE ( hai cạnh tương ứng).
Vậy MN đi qua trung điểm của DE
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Cho tam giác ABC vuông tại A ,kẻ Ah vuông góc với BC (H thuộc BC).Trên nửa mp bờ là đthẳng BC ko chứa điểm A vẽ tia Bx song song với AH .Trên tia Bx lấy D sao cho BD AH .a. Chứng minh Cho tam giác ABC vuông tại A ,kẻ Ah vuông góc với BC (H thuộc BC).Trên nửa mp bờ là đthẳng BC ko chứa điểm A vẽ tia Bx song song với AH .Trên tia Bx lấy D sao cho BD AH .a. Chứng minh tam giác AHB và tam giác DHB bằng nhaub. Gọi I là giao điểm của BH và DA .Chứng minh IB IH
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Cho tam giác ABC vuông tại A ,kẻ Ah vuông góc với BC (H thuộc BC).Trên nửa mp bờ là đthẳng BC ko chứa điểm A vẽ tia Bx song song với AH .Trên tia Bx lấy D sao cho BD = AH .a. Chứng minh Cho tam giác ABC vuông tại A ,kẻ Ah vuông góc với BC (H thuộc BC).Trên nửa mp bờ là đthẳng BC ko chứa điểm A vẽ tia Bx song song với AH .Trên tia Bx lấy D sao cho BD = AH .
a. Chứng minh tam giác AHB và tam giác DHB bằng nhau
b. Gọi I là giao điểm của BH và DA .Chứng minh IB =IH
cho tam giác ABC. Vẽ về phía ngoài tam giác ABC các tam giác vuông tại A là ABD, ACE, có AB=AD, AC=AE. Kẻ AH vuông góc với BC, DM vuông góc với AH, EN vuông góc với AH. CMR
a) DM=AH
b) MN là trung điểm của DE
18 tháng 2 2022 lúc 17:21
Cho tam giác ABC vuông tại A (AB<AC)
AH vuông góc với BC tại H
Lấy điểm D thuộc AC sao cho AD = AB
Kẻ DE vuông góc với BC tại điểm E
Kẻ DK vuông góc với AH tại điểm K
C/m: a) AH = DK
b) Tam giasc AHE vuông cân
cho tam giác ABC nhọn. về phía ngoài tam giác ABC vẽ hình vuông ABDE và hình vuông ACFG. vẽ AH vuông góc với BC, EI vuông góc với AH tại I, GJ vuông góc với AH tại J.
a) CM tam giác ABH tam giác EAI
b)CM AK là trung tuyến tam giác AEG(AH cắt EG tại K)
c)L là điểm thuộc AK sao cho K là trung điểm của AL. CM AL BC
d) CM tam giác ABLtam giác BDC
e)CM CD là đường cao của tam giác BCL
mọi người giúp mình câu e với!!!
Đọc tiếp
cho tam giác ABC nhọn. về phía ngoài tam giác ABC vẽ hình vuông ABDE và hình vuông ACFG. vẽ AH vuông góc với BC, EI vuông góc với AH tại I, GJ vuông góc với AH tại J.
a) CM tam giác ABH = tam giác EAI
b)CM AK là trung tuyến tam giác AEG(AH cắt EG tại K)
c)L là điểm thuộc AK sao cho K là trung điểm của AL. CM AL = BC
d) CM tam giác ABL=tam giác BDC
e)CM CD là đường cao của tam giác BCL
mọi người giúp mình câu e với!!!