Đặt S OBC=S1, S OAC=S2, S OAB=S3, S=S ABC

Kẻ AH vuông góc BC< OK vuông góc BC

=>OK//AH

OP/AP=OK/AH=1/2*OK*BC/1/2*AH*CB=S1/S

=>\(\dfrac{AP-OP}{AP}=\dfrac{S-S_1}{S}\)

=>\(\dfrac{OA}{AP}=\dfrac{S_2+S_3}{S}\)

Cmtương tự, ta được: \(\dfrac{OB}{BQ}=\dfrac{S_1+S_3}{S};\dfrac{OC}{CR}=\dfrac{S_1+S_2}{S}\)

=>\(\dfrac{OA}{AP}+\dfrac{OB}{BQ}+\dfrac{OC}{CR}=2\)

AI GIÚP VỚI ,MAI NỘP BÀI RỒI.

kẻ đường cao AH có: \(\frac{OA'}{AA'}=\frac{S_{BOC}}{S_{ABC}}\), ta có:

                                 \(\frac{OB'}{BB'}=\frac{S_{AOC}}{S_{ABC}}\)

                              \(\frac{OC'}{CC'}=\frac{S_{AOB}}{S_{ABC}}\)

\(\Rightarrow\frac{OA'}{AA'}+\frac{OB'}{BB'}+\frac{OC'}{CC'}=\frac{S_{BOC}+S_{AOC}+S_{AOB}}{S_{ABC}}=\frac{S_{ABC}}{S_{ABC}}=1\) (đpcm)

Nguồn: HiệU NguyễN

b) C/m: \(\Delta ABC\sim\Delta DAC\left(g.g\right)\Rightarrow AC^2=DC.BC\left(1\right)\)

\(\Delta ABC\sim\Delta DBA\left(g.g\right)\Rightarrow AB^2=BD.BC\left(2\right)\)

\(\left(1\right)\left(2\right)\Rightarrow\frac{AC^2}{AB^2}=\frac{DC.BC}{BD.BC}=\frac{DC}{BD}\Rightarrow\frac{AC^4}{AB^4}=\frac{DC^2}{BD^2}\left(5\right)\)

C/m: \(\Delta DAC\sim\Delta EDC\left(g.g\right)\Rightarrow DC^2=CE.AC\left(3\right)\)

\(\Delta DBA\sim\Delta FBD\left(g.g\right)\Rightarrow BD^2=BF.AB\left(4\right)\)

\(\left(3\right)\left(4\right)\Rightarrow\frac{DC^2}{BD^2}=\frac{CE.AC}{BF.AB}\left(6\right)\)

\(\left(5\right)\left(6\right)\Rightarrow\frac{AC^4}{AB^4}=\frac{CE.AC}{BF.AB}\Rightarrow\frac{AC^3}{AB^3}=\frac{CE}{BF}\Rightarrowđpcm\)

2:

a: HM là đường trung bình của ΔEBC

=>EH=HB

KM là đường trug bình của ΔFBC

=>FK=KC

ΔAHM có EO//HM

=>AE/AH=AO/AM

ΔAKM có KM//FO

nên AF/AK=AO/AM

=>AE/AH=AF/AK

=>EF//HK

b: ΔAHM có EO//HM

=>MA/MO=HA/HE

=>MA/MO=HA/HB

ΔAKM có FO//KM

=>MA/MO=KA/KF=KA/KC

=>HA/HB=KA/KC

=>HK//BC

=>EF//BC