cho tam giac ABC vuông tai A, ke AH vuong goc BC tai H, goi K la d9iem thuoc doan thang HC so cho HB=HK, tren tia AH lay diem D sao cho H la trung diem doan AD, cm
a/ tam giac ABH = tam giac DHK
b/ AK//BD
AK vuong goc CD
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 giac abc vuong tai a. Ke ah vuong goc voi bc tai h. Tren tia doi cua tia ha lay diem d sao cho ha=hd.
a) chung minh tam giac ahd=tam giac dhc
b)tren tia dc lay diem k sao cho c la trung diem cua dk. Chung minh ak||bc
c) tu c ke duong thang song song voi ab cat ak tai m. Doan thang bm cat ac tai q. Chung minh am+cm>2mq
Cho tam giac ABC vuong tai A va M la trung diem AB ke MN vuong goc BC tai N Tren tia doi tia AB lay D sao cho AD=BN Ke ME vuong goc CD tai E Cac doan thang DN va ME cat nhau tai K Goi I la trung diem cua doan thang DK Tinh so do goc CIM
Cho tam giac ABC vuong tai A co goc B = 60° .Ve AH vuong goc voi BC tai H A/Tinh goc HAB B/Tren canh AC lay D sao cho AD=AH .Goi I la trung diem cua canh HD. C/M tam giac AHI= tam giac ADI . Tu do suy ra AI vuong goc voi HD C/Tia AI cat canh HC tai diem K .C/M tam giac AHK=tam giac ADK.Tu do suy ra AB//KD D/Tren tia doi cua tia HA lay E sao cho HE=AH.C/M H la trung diem cua BK va 3 diem D,E,K thang hang
a: \(\widehat{HAB}=90^0-60^0=30^0\)
b: Xét ΔAHI và ΔADI có
AH=AD
HI=DI
AI chung
Do đó: ΔAHI=ΔADI
Ta có: ΔAHD cân tại A
mà AI là đường trung tuyến
nên AI là đường cao
c: Xét ΔAHK và ΔADK có
AH=AD
\(\widehat{HAK}=\widehat{DAK}\)
AK chung
Do đó: ΔAHK=ΔADK
Suy ra: \(\widehat{AHK}=\widehat{ADK}=90^0\)
=>DK//AB
Cho tam giac abc vuong tai a ke ah vuong goc voi bc tai h. Hoi a,chung minh tam giac abh bang tam giac ach , ve trung tuyen bm goi g la giao diem cua ah va bm cm g la trong tam abc c, cho ab= 30 bh=18 tinh ah ag d, tu h ke hc song song ac cm 3 diem cgd thang hang
Cho tam giac abc can tai a, diem m la trung diem cua bc. Ke mh vuong goc voi ab. Goi e la mot diem thuoc doan thang ah. Tren nua mat phang ac lay f sao cho goc aef bang 2 lan goc emh. CMR fm la tia phan giac cua goc efc
Mong cac ban giup minh, minh dang can gap :D
cho tam giac abc vuong tai a,co ab=3cm,ac=4cm.
a)tinh bc va so sanhcac goc cua tam giac abc
b)ke ah vuong goc voi bc,lay d tren bc sao cho h la trung diem cua bd.cm:tam giac abd can tai a
c)tren ah lay m sao cho h la trung diem cua am.cm:tam giac abm la tam giac can
a: BC=5cm
Xét ΔABC có AB<AC<BC
nên \(\widehat{C}< \widehat{B}< \widehat{A}\)
b: Xét ΔABD có
AH là đường cao
AH là đường trung tuyến
Do đó: ΔABD cân tại A
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!