a)

 \(\begin{array}{l}\overrightarrow {AB}  + \overrightarrow {BC}  + \overrightarrow {CD}  + \overrightarrow {DA}  = \left( {\overrightarrow {AB}  + \overrightarrow {BC} } \right) + \left( {\overrightarrow {CD}  + \overrightarrow {DA} } \right)\\ = \overrightarrow {AC}  + \overrightarrow {CA}  = \overrightarrow {AA}  = \overrightarrow 0 .\end{array}\)

b)

\(\overrightarrow {AC}  - \overrightarrow {AD}  = \overrightarrow {DC} \) và \(\overrightarrow {BC}  - \overrightarrow {BD}  = \overrightarrow {DC} \)

\( \Rightarrow \overrightarrow {AC}  - \overrightarrow {AD}  = \overrightarrow {BC}  - \overrightarrow {BD} \)

a)

\(\begin{array}{l}\overrightarrow {AB}  + \overrightarrow {CD}  = \overrightarrow {AD}  + \overrightarrow {CB} \\ \Leftrightarrow \overrightarrow {AB}  - \overrightarrow {CB}  = \overrightarrow {AD}  - \overrightarrow {CD} \\ \Leftrightarrow \overrightarrow {AB}  + \overrightarrow {BC}  = \overrightarrow {AD}  + \overrightarrow {DC} \\ \Leftrightarrow \overrightarrow {AC}  = \overrightarrow {AC} \end{array}\)

(luôn đúng)

b) \(\overrightarrow {AB}  + \overrightarrow {CD}  + \overrightarrow {BC}  + \overrightarrow {DA}  = \overrightarrow 0 \)

Ta có:

\(\begin{array}{l}\overrightarrow {AB}  + \overrightarrow {CD}  + \overrightarrow {BC}  + \overrightarrow {DA}  = (\overrightarrow {AB}  + \overrightarrow {BC} ) + (\overrightarrow {CD}  + \overrightarrow {DA} )\\ = \overrightarrow {AC}  + \overrightarrow {CA}  = \overrightarrow 0 \end{array}\)

Chú ý khi giải

+) Hiệu hai vecto chung gốc: \(\overrightarrow {AB}  - \overrightarrow {AC}  = \overrightarrow {CB} \) (suy ra từ tổng \(\overrightarrow {AB}  = \overrightarrow {AC}  + \overrightarrow {CB} \))

+) Với 4 điểm A, B, C, D bất kì ta có: \(\overrightarrow {AB}  + \overrightarrow {BC}  + \overrightarrow {CD}  + \overrightarrow {DA}  = \overrightarrow {AA}  = \overrightarrow 0 \)

\(\overrightarrow{AB}+\overrightarrow{CD}+\overrightarrow{BC}=\left(\overrightarrow{AB}+\overrightarrow{BC}\right)+\overrightarrow{CD}\)

\(=\overrightarrow{AC}+\overrightarrow{CD}=\overrightarrow{AD}\) (đpcm)

a)

Do \(\overrightarrow{AB}=\overrightarrow{DC}\) nên AB // DC và AB = DC .
Vì vậy tứ giác ABCD là là hình bình hành.
Từ đó suy ra: AD = BC và AD//BC nên \(\overrightarrow{AD}=\overrightarrow{BC}\).

Cách 2:
Áp dụng quy tắc ba điểm ta có:
\(\overrightarrow{AB}=\overrightarrow{DC}\Leftrightarrow\overrightarrow{AD}+\overrightarrow{DB}=\overrightarrow{DB}+\overrightarrow{BC}\)\(\Leftrightarrow\overrightarrow{AD}=\overrightarrow{BC}\).

a) ta có : \(\overrightarrow{AB}+\overrightarrow{DC}=\overrightarrow{AM}+\overrightarrow{MN}+\overrightarrow{NB}+\overrightarrow{DM}+\overrightarrow{MN}+\overrightarrow{NC}\)

\(=2\overrightarrow{MN}+\left(\overrightarrow{AM}+\overrightarrow{DM}\right)+\left(\overrightarrow{NB}+\overrightarrow{NC}\right)=2\overrightarrow{MN}\left(đpcm\right)\)

b) ta có : \(\overrightarrow{AB}+\overrightarrow{CD}=\overrightarrow{AI}+\overrightarrow{IJ}+\overrightarrow{JB}+\overrightarrow{CI}+\overrightarrow{IJ}+\overrightarrow{JD}\)

\(=2\overrightarrow{IJ}+\left(\overrightarrow{AI}+\overrightarrow{CI}\right)+\left(\overrightarrow{JB}+\overrightarrow{JD}\right)=2\overrightarrow{IJ}\left(đpcm\right)\)

bn dùng định lí ta lét chứng minh được \(\overrightarrow{MJ}=\overrightarrow{IN}=\dfrac{1}{2}\overrightarrow{AB}\)

C) ta có : \(\overrightarrow{MN}+\overrightarrow{IJ}=\overrightarrow{MA}+\overrightarrow{AB}+\overrightarrow{BN}+\overrightarrow{IA}+\overrightarrow{AB}+\overrightarrow{BJ}\)

\(=2\overrightarrow{AB}+\left(\overrightarrow{MA}+\overrightarrow{BJ}\right)+\left(\overrightarrow{BN}+\overrightarrow{IA}\right)\)

d) ta có : \(\overrightarrow{IM}+\overrightarrow{IN}=\overrightarrow{IJ}+\overrightarrow{JM}+\overrightarrow{IN}=\overrightarrow{IJ}\left(đpcm\right)\)

không sao đâu ; mk cam đoan là đúng hoàn toàn

a, =CD+FA+AB+DE+BC+EF=(CD+DE)+(AB+BC)+FA+EF

=CE+AC+FA+EF= (CE+EF)+AC+FA=CF+AC+FA=(CF+FA)+AC=CA+AC=0

b,VP=CD+AE+BF

VT=AD+FC+BE=AC+CD+CB+BF+BA+AE=(AC+CB)+CD+BF+BA+AE

=AB+CD+BF+BA+AE=(AB+BA)+CD+BF+AE=CD+BF+AE=VP(dccm)

Có: \(\overrightarrow{AB}=\overrightarrow{DC}\)\(\Leftrightarrow\overrightarrow{AD}+\overrightarrow{DB}=\overrightarrow{DB}+\overrightarrow{BC}\)\(\Leftrightarrow\overrightarrow{AD}=\overrightarrow{BC}\) (dpcm)

\(a\text{) }\overrightarrow{AB}-\overrightarrow{CD}=\left(\overrightarrow{AC}+\overrightarrow{CB}\right)-\overrightarrow{CD}\\ =\overrightarrow{AC}-\left(\overrightarrow{CD}-\overrightarrow{CB}\right)=\overrightarrow{AC}-\overrightarrow{BD}\)

\(b\text{) }\overrightarrow{AB}+\overrightarrow{DC}+\overrightarrow{BD}+\overrightarrow{CA}=\left(\overrightarrow{AB}+\overrightarrow{BD}\right)+\left(\overrightarrow{DC}+\overrightarrow{CA}\right)\\ =\left(\overrightarrow{AB}+\overrightarrow{BD}\right)+\left(\overrightarrow{DC}+\overrightarrow{CA}\right)=\overrightarrow{AD}+\overrightarrow{DA}=0\)

\(c\text{) }\overrightarrow{AC}+\overrightarrow{DE}-\overrightarrow{DC}-\overrightarrow{CE}+\overrightarrow{CB}\\ =\left(\overrightarrow{AC}+\overrightarrow{CB}\right)+\left(\overrightarrow{DE}-\overrightarrow{DC}\right)-\overrightarrow{CE}\\ =\overrightarrow{AB}+\overrightarrow{CE}-\overrightarrow{CE}=\overrightarrow{AB}\)

\(d\text{) }\overrightarrow{AB}+\overrightarrow{DE}+\overrightarrow{CF}\\ =\left(\overrightarrow{AC}+\overrightarrow{CB}\right)+\left(\overrightarrow{DF}+\overrightarrow{FE}\right)+\left(\overrightarrow{CE}+\overrightarrow{EF}\right)\\ =\overrightarrow{AC}+\overrightarrow{CE}+\overrightarrow{CB}+\overrightarrow{DF}+\left(\overrightarrow{FE}+\overrightarrow{EF}\right)\\ =\overrightarrow{AC}+\overrightarrow{CE}+\overrightarrow{CB}+\overrightarrow{DF}\)