Cho ∆ ABC, goc A=90°. Ke AH vuong goc vs BC tai H. Goi AD la tia p/giac cua goc HAC
a, CMrang goc BAD = goc BDA
b, biet goc C=40°. Tinh goc B, goc BDA , goc DAC
cho tam giac ABC co goc A =90 do , AH vuong goc voi BC , H thuoc BC
goi AD la tia phan giac cua goc HAC
a) CM : goc BAD = goc BDA
b) C = 40 do tinh gocB , gocBDA , goc DAC
cho tam giac ABC vuong tai A . Ke AH vuong goc voi BC tai H. ke tia phan giac cua goc BAH tai D
a, CMR goc BAH =goc C, goc CAH =goc B
b CMR goc DAC= goc ADC
c ke tia phan giac cua goc C cat AD tai K . CMR CK vuong goc voi AD
Cho tam giac abc vuong tai A . Ke AH vuong goc voi BC tai H ke tia phan giac AD cua goc BAH (D thuoc BH)
a,Chung minh goc DAC=ADC
b,Ke phan giac cua goc C cat AD tai K
Chung minh CK vuong goc voi AD
cho tam giac abc can tai a(goc a nhon, ab>bc). goi h la trung diem bc
A)chung minh tam giac ahb=tam giac ahc va ah vuong goc voi bc tai h
B)goi m la trung diem cua AB. Qua A ke duong thang song song voi BC, cat tia HM tai D. Gia su AB=20cm,AD=12cm. Chung minh AD=BH. tinh do dai doan AH.
C)tia phan giac cua goc BAD cat tia CB tai N. Ke NK vuong goc voi AD tai K, NQ vuong goc voi AB tai Q. Chung minh AQ=AK va goc ANQ=45do + 1/4gocBAC
D)CD cat AB tai S. Chung minh BC < 3.AS
bai 4:cho tam giac ABC co goc A=90 do.Goi M la trung diem cua AC,tren tia Bm lay diem N sao cho M la trung diem cua doan BN.CMR:
a)CN vuong goc voi AC va CN=AB
b)AN=BC va AN song song voi BC
bai 4:cho tam giac ABC ke AH vuong goc voi BC(H thuoc BC)goi M la trung diem cua canh BC.Biet goc BAH=goc HAM=goc MAC.Tinh cac goc cua tam giac ABC
bai 6:cho tam giac ABC vuong tai A,phan giac BD.Tren canh BC lay diem H sao cho BH=BA
a)CMR:DH vuong goc voi BC
b)BIET goc ADH=120 do.Tinh goc ABD
Bài 6:
b) Theo câu a) ta có \(\Delta ABD=\Delta HBD.\)
=> \(\widehat{ADB}=\widehat{HDB}\) (2 góc tương ứng).
Ta có: \(\widehat{ADB}+\widehat{HDB}=\widehat{ADH}\left(gt\right)\)
=> \(\widehat{ADB}+\widehat{HDB}=120^0\)
Mà \(\widehat{ADB}=\widehat{HDB}\left(cmt\right)\)
=> \(2.\widehat{ADB}=120^0\)
=> \(\widehat{ADB}=120^0:2\)
=> \(\widehat{ADB}=60^0.\)
=> \(\widehat{ADB}=\widehat{HBD}=60^0\)
Xét \(\Delta ABD\) có:
(định lí tổng ba góc trong một tam giác).
=> \(90^0+\widehat{ABD}+60^0=180^0\)
=> \(150^0+\widehat{ABD}=180^0\)
=> \(\widehat{ABD}=180^0-150^0\)
=> \(\widehat{ABD}=30^0\)
Vậy \(\widehat{ABD}=30^0.\)
Chúc bạn học tốt!
Cho tam giac ABC vuong tai A. Ke AH vuong goc voi BC ( H thuoc BC ). Goi AD la tia phan giac cua goc BAH.
a) Chung minh goc CAD= goc CDA
b)Tren tia CA lay I sao cho CI=CH. Goi M la trung diem cua HI. Chung minh CM la duong trung truc cua doan thang AD
cho tam gia ABC ke AH vuong goc voi BC . GOI M la trung diem cua BC .biet AH,AM chia goc o dinh A cua tam giac thanh 3 goc bang nhau. tinh cac goc cua tam giac ABC
cho tam giac ABC vuong tai A. Tia phan giac cua goc B cat AC tai D. Ke DE vuong goc BC tai E.
a) chung minh tam giac BAD = tam giac BED
b) goi H la giao diem cua BD va AE. Chung minh tam giac ABH = tam giac EBH. Tinh so do goc H
Mk chỉ biết lm câu a thuj nka, mk ko học giỏi toán nên có j sai thì xin lỗi bn nka! :)))
a) Xét t.g BAD và t.g BED
Ta có: Góc A = Góc B = 90*( gt )
BD là cạnh chung
B1 = B2 ( BD là tia phân giác của góc B)
=> T.g BAD = T.g BED ( g.c.g )
cho tam giac abc co goc c+90 do=goca ve ah vuong goc bc duong thang vuong goc voi ab tai a cat bc tai d goi m la giao diem cua cac tia phan giac goc bah va adh chung minh goc bah=2c chung minh mavuong goc ac