c. -Xét △ADC có: OM//DC (gt).

\(\Rightarrow\dfrac{MO}{DC}=\dfrac{AO}{AC}\) (định lí Ta-let).

\(\Rightarrow\dfrac{DC}{MO}=\dfrac{AC}{AO}\)

\(\Rightarrow\dfrac{DC}{OM}-1=\dfrac{OC}{AO}\) (1).

-Xét △BDC có: ON//DC (gt).

\(\Rightarrow\dfrac{ON}{DC}=\dfrac{BO}{BD}\) (định lí Ta-let).

\(\Rightarrow\dfrac{DC}{ON}=\dfrac{BD}{BO}\)

\(\Rightarrow\dfrac{DC}{ON}-1=\dfrac{OD}{BO}\)

-Xét △ABO có: AB//DC (gt).

\(\Rightarrow\dfrac{OD}{BO}=\dfrac{OC}{OA}=\dfrac{DC}{AB}\) (3)

-Từ (1), (2),(3) suy ra:

\(\dfrac{DC}{OM}-1=\dfrac{DC}{ON}-1=\dfrac{DC}{AB}\)

\(\Rightarrow\dfrac{DC}{OM}=\dfrac{DC}{ON}=\dfrac{DC}{AB}+1=\dfrac{AB+DC}{AB}\)

\(\Rightarrow\dfrac{1}{OM}=\dfrac{1}{ON}=\dfrac{AB+DC}{AB.DC}=\dfrac{1}{AB}+\dfrac{1}{CD}\)

a: Xét ΔAOB và ΔCOD có 

\(\widehat{OAB}=\widehat{OCD}\)

\(\widehat{AOB}=\widehat{COD}\)

Do đó: ΔAOB∼ΔCOD

Suy ra: \(\dfrac{OA}{OC}=\dfrac{OB}{OD}=\dfrac{AB}{CD}\)

hay \(OA\cdot OD=OB\cdot OC\)

b: \(\dfrac{OA}{OC}=\dfrac{AB}{CD}\)

\(\Leftrightarrow OA=\dfrac{1}{2}\cdot6=3\left(cm\right)\)

Xét ΔADC có OM//DC

nên \(\dfrac{OM}{DC}=\dfrac{AM}{AD}\left(1\right)\)

Xét ΔBDC có ON//DC

nên \(\dfrac{ON}{DC}=\dfrac{BN}{BC}\left(2\right)\)

Xét hình thang ABCD có MN//AB//CD

nên \(\dfrac{AM}{MD}=\dfrac{BN}{NC}\)

=>\(\dfrac{MD}{MA}=\dfrac{CN}{BN}\)

=>\(\dfrac{MD+MA}{MA}=\dfrac{CN+BN}{BN}\)

=>\(\dfrac{AD}{AM}=\dfrac{BC}{BN}\)

=>\(\dfrac{AM}{AD}=\dfrac{BN}{BC}\left(3\right)\)

Từ (1),(2),(3) suy ra OM=ON

Tam giác ABD có OE//AB =>DO/DB = OE/AB (Theo hệ quả Đlý Ta-lét) (1) Tam giác ABC có OF//AB =>CO/CA = OF/AB (Theo hệ quả Đlý Ta-lét) (2) Tam giác ABO có CD//AB =>OD/OB = OC/OA (Theo hệ quả Đlý Ta-lét) => OD/(OB+OD) = OC/(OA+OC) hay OD/DB=CO/CA (3) Từ (1) (2) và (3) => OE/AB = OF/AB => OE = OF (điều phải chứng minh.)

Mik chua bt lm

a: Xét ΔIAB và ΔICD có

góc IAB=góc ICD

góc AIB=góc CID

=>ΔIAB đồng dạng với ΔICD

=>IA/IC=IB/ID

=>AI/AC=BI/BD

b: Xét ΔADC có MI//DC

nên MI/DC=AI/AC

Xét ΔBDC có NI//DC

nên NI/DC=BI/BD

=>MI/DC=NI/DC

=>MI=NI