2. Cho tam giác ABC vuông tại A có AB=AC. Qua A vẽ đường thẳng d không cắt cạnh BC.Kẻ BD và CE cùng vuông góc với d.
Cm: DB=AE
Cm: DE=DB+CE
Cho tam giác ABC vuông tại A. M là trung điểm của BC. Qua A kẻ đường thẳng d vuông góc với AM. Qua m kẻ các đường thẳng vuông góc với AB và AC, Chúng cắt đường thẳng d theo thứ tự ở D và E. CMR:
a, BD song song với CE
b,DE=DB+CE
Cho tam giác ABC vuông cân tại A vẽ đường thẳng xy đi qua A không cắt đoạn BC.Vẽ BD và CE cùng vuông góc với đường thẳng xy tại D,E
C/m BD+CE=DE
B1:cho tam giác ABC, A= 90 đọ. AB= AC, qua A kẻ đường thẳng xy. Vẽ BD vuông góc xy. Tại D, CE vuông góc với xy tại E.CMR:
a) tam giác ABD= tam giác ACE
b) DE= BD+ CE
B2:Cho tam giác ABC có góc A= 90 độ. Trên nửa mặt phẳng bờ AB có chứa điểm C. Vẽ AD vuông góc với AB và AD= AB. Trên nửa mặt phẳng bờ AC có chứa điểm B. Vẽ AE vuông góc với AC. Kẻ AH vuông góc với ED tại H. CMR: đường thẳng AH đi qua chung điểm cạnh BC.
B1:cho tam giác ABC, A= 90 đọ. AB= AC, qua A kẻ đường thẳng xy. Vẽ BD vuông góc xy. Tại D, CE vuông góc với xy tại E.CMR:
a) tam giác ABD= tam giác ACE
b) DE= BD+ CE
B2:Cho tam giác ABC có góc A= 90 độ. Trên nửa mặt phẳng bờ AB có chứa điểm C. Vẽ AD vuông góc với AB và AD= AB. Trên nửa mặt phẳng bờ AC có chứa điểm B. Vẽ AE vuông góc với AC. Kẻ AH vuông góc với ED tại H. CMR: đường thẳng AH đi qua chung điểm cạnh BC.
1)
a) Ta có: góc BAD+góc CAE+góc BAC=180 độ
Mà góc BAC=90 độ nên góc BAD+ góc CAE=90 độ (1)
Vì tam giác ACE vuông tại E nên góc ACE+góc CAE=90 độ(2)
Từ (1) và (2) => góc BAD= góc ACE
Xét tam giác ABD và tam giác ACE có:
góc ADB=góc AED=90 độ
AB=AC ( vì tam giác ABC vuông cân tại A)
góc BAD=góc ACE (cmt)
=> tam giác ABD=tam giác ACE (cạnh huyền-góc nhọn)
b) Theo câu a) Tam giác ABD=tam giác ACE
=> DA=EC và BD=AE
Mà DE=DA+AE nên DE=EC+BD
a bài này học rùi!! dễ lắm!! đại trà cũng làm được
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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cho tam giác ABC có góc A=90. trung tuyến AM . Qua A kẻ đường thẳng vuông góc với AM giao đường thẳng vuông góc với BC ở D , cắt đường thẳng vuông góc với BC tại E. TIA em giao DB tại I. gọi Q,P LẦN LƯỢT LÀgiao điểm của AB và AC VỚI dm và ME
A) Tam giác MCE = MBI
B) TAM GIÁC DIE CÂN
C) DE=BD+CE
D) PQ//BC và PQ=1/2BC
cho tam giác ABC vuông tại A và AB=AC. qua A kẻ xy sao cho xy không đi qua 2 góc B và C. kẻ BD vuông với xy, CE vuông với xy
cmr
a) góc DAB = ACE
b) tam giác ABD = ACE
c) DE = DB + CE
a) Có :
Góc ACE = 180' - ( 90' + CAE ) (1)
Góc DAB = 180' - ( 90' + CAE ) (2)
=> Góc ACE = Góc DAB ( Từ 1 và 2 ) (3)
b) Xét tam giác ABD vuông tại D và tam giác CEA vuông tại E
Có : + AB = AC ( gt )
+ Góc DAB = Góc ACE ( cmt )
=> Tam giác ABD = Tam giác CEA ( cạnh huyền - góc nhọn ) (3)
c) Từ (3) ta có :
AD = EC ( hai cạnh tương ứng )
DB = AE ( hai cạnh tương tứng )
Mà DE = AD + AE
=> DE = DB + CE
Cho tam giác ABC vuông ở A và AB=AC . Qua A vẽ đường thẳng xy ( B và C ở cùng phía đối với xy) sao cho xy không song song với BC . Vẽ BD vuông góc với xy tại D , CE vuông góc với xy tại E. Chứng minh:
a) góc ABD = góc CAE và góc ACE = góc BAD
b) BD + CE = DE
Các bn giúp mik bài này nhanh nhanh với:
1)cho tam giác abc cân tại a. Vẽ BD vuông góc AC, CE vuông góc AB, AF vuông góc BC. CMR: các đường thẳng AF,BD,CE cùng đi qua 1 điểm
2) Cho tam giác ABC cân tại đỉnh A. Qua A vẽ đường thẳng d sao cho: B,C cùng thuộc nửa mặt phẳng bờ d. Vẽ BD,CE cùng vuông góc với d. CMR: Tam giác DBA=Tam giác EAC