cho tam giac ABC can tai B lay E trung diem AC chung minh tam giac BAE=BCE ve EK vuong goc AB,EH vuong goc BC chung minh tam giac AKE=CHE ,BE cat KH tai I chung minh KH song song AC
Cho tam giac ABC vuong tai A, ve AH vuong goc BC tai H. Tia phan giac cua goc HAC cat AC tai D, E la diem tren canh AB sao cho BE bang BH. Chung minh EH song song AD
cho tam giac ABC vuong tai A co AB = 8cm, BC = 10cm a) Tinh AC, b) tren tia AC lay diem D sao cho AD = AC. Ve AE vuong goc BD tai E, ve AF vuong goc BC tai F. Chung minh tam giac ABE = tam giac ABF, c) Ve duong thang vuong goc BD tai D duong thang vuong goc BC tai C. Hai duong thang nay cat nhau ta M. Chung minh: tam giac MDC can, D) Chung minh: B,A, M thang hang
a, dễ tự làm
b, xét tam giác CAB và tam giác DAB có : AB chung
AC = AD (gt)
góc CAB = góc DAB = 90
=> tam giác CAB = tam giác DAB (2cgv)
=> góc CBA = góc DBA (đn)
xét tam giác AFB và tam giác AEB có : AB chung
góc AFB = góc AEB = 90
=> tam giác AFB = tam giác AEB (ch - gn)
cho tam giac nhon ABC, ve BD vuong goc AC tai D va CE vuong goc AB tai E. Cac duong thang BD va CE cat nhau tai H. Goi diem M la trung diem cua canh CB. Tren tia doi cua tia MH lay diem K sao cho MH=MK. a) chung minh: tam giac BMH=tam giac CMK, b) chung minh: CK vuong goc AC, c) ve HI vuong goc BC tai I, tren tia HI laydiem G sao cho HI=IG. Chung minh: GC=BK
Cho tam giac ABC vuong tai A. Duong thang qua B vuong goc voi BC cat AC tai F. Lay D, I lan luot la trung diem cua doan BC, AB. FI cat ED tai M. DF vuong goc voi BC.
a) Chung minh : Tam giac FID dong dang voi tam giac FDC.
b) Chung minh : MC song song voi AB.
cho tam giac ABC vuong tai A . tren canh BC lay diem D sao cho BD=AB. qua D ve duong thang vuong goc voi BC , cat AC tai diem E va cat tia BA tai diem K
a)tinh so do goc ACB neu co ABC = 35 do
b) chung minh tam giac ABE= tam giac DBE
c) chung minh EK=EC
d) chung minh EB+EK<CB+CK
Cho tam giac ABC can tai A co AD la duong trung tuyen
a)Chung minh tam giac ABD= tam gaic ACD va AD vuong goc voi BC
b)Cho AB=10cm,BC=16cm. Tinh do dai AD va so sanh cac goc cua tam giac ABC.
c) Ve duong trung tuyen CF cua tam giac ABC cat AD tai M. Tinh do dai AM.
d) Ve DH vuong goc AC tai H, tren canh AC va canh DC lan luot lay hai diem E,K sao cho AE=AD va DK=DH. Chung minh: EK vuong goc voi BC
A,
xét \(\Delta ABD\)và \(\Delta ACD\)
CÓ \(\hept{\begin{cases}AB=AC\\chungAD\\BD=DC\end{cases}}\)
SUY RA \(\Delta ABD\)=\(\Delta ACD\) (C.C.C) (1)
=> \(\widehat{BDA}\)=\(\widehat{CDA}\)
MÀ \(\widehat{BDA}\)+\(\widehat{CDA}\)=180
=> \(\widehat{BDA}\)=\(\widehat{CDA}\)=90
B, (1) => BC=DC=1/2 BC=8
ÁP DỤNG ĐỊNH LÍ PITAGO TA CÓ
\(AB^2=AD^2+BD^2\)
=> AD^2=36
=>AD=6
Cho tam giac ABC vuong tai A . tu 1 diem K bat ky thuoc canh BC ve KH vuong goc vs AC . tren tia doi cua tia HK lay I sao cho HI =HK
a, chung minh AB song song voi HK
b, chung minh tam giac AKI can
c, chung minh goc BAK= gocAIK
d, chung minh tam giac AIC =tam giac AKC
cho tam giac ABC B=60 tren tia doi BC lay diem E sao cho BE=BA . qua B ve 1 duong thang song song AE cat AC o F a] chung minh BE la phan giac cua goc ABC b] Qua A ve mot duong thang vuong goc BF cat BC tai D .Chung minh tam giac ABC deu c] goi Ax la tia doi cua AB . Chung minh goc CAx =goc CDF d] chung minh AF=FC
1+2+3+4+5+6+7+8
=1+2+3+4+5+6+7+8
=8+7+6+5+4+3+2+1
=36
1+2+3+4+5+6+7+8
=1+2+3+4+5+6+7+8
=8+7+6+5+4+3+2+1
=36
cho tam giac ABC vuong tai A ve phan giac cua goc ABC tia nay cat canh AC tai K tren canh BC lay diem D sao cho BD= BA a)chung minh KA=KD b)duong thang AB cat duong thang DK tai E chung minh tam giac KDC c) chung minh tam giac BEC can tai c