#)Giải :

#)Giải :

Vì \(\widehat{AOC}\)và \(\widehat{BOD}\)là hai góc đối đỉnh \(\Rightarrow\widehat{AOC}=\widehat{BOD}\left(=70^o\right)\)

Vì \(\widehat{AOC}\)và \(\widehat{BOC}\)là hai góc kề bù 

\(\Rightarrow\widehat{BOC}=180^o-\widehat{AOC}\)

               \(=180^o-70^o\)

               \(=110^o\)

\(\Rightarrow\widehat{BOC}=110^o\)

Vì \(\widehat{BOC}\)và \(\widehat{AOD}\)là hai góc đối đỉnh \(\Rightarrow\widehat{BOC}=\widehat{AOD}\left(=110^o\right)\)

                  #~Will~be~Pens~#

Theo đề bài biết :

\(\widehat{AOC}\)- \(\widehat{BOC}\)= 70^o

Ngoài ra còn biết :

\(\widehat{AOC}\)+ \(\widehat{BOC}\)= 180^o ( kề bù )

\(\rightarrow\)\(\widehat{AOC}\)= ( 70^o + 180^o ) : 2 = 125^o

\(\rightarrow\)\(\widehat{BOC}\)= 180^o - 125^o = 55^o

Có \(\widehat{AOD}\)+ \(\widehat{AOC}\)= 180^o ( kề bù )

\(\rightarrow\)\(\widehat{AOD}\)= 180^o - \(\widehat{AOC}\)= 180^o - 125^o = 55^o

Có \(\widehat{BOD}\)+ \(\widehat{BOC}\)= 180^o ( kề bù )

\(\rightarrow\)\(\widehat{BOD}\)= 180^o - \(\widehat{BOC}\)

180^o - 55^o = 125^o

\(\widehat{AOD}=110^0\),\(\widehat{BOC}=110^0\),\(\widehat{BOD}=70^0\)

\(\widehat{AOC}-\widehat{BOC}=50^o\)

\(\widehat{AOC}+\widehat{BOC}=\widehat{AOB}=180^o\)

suy ra \(\left\{{}\begin{matrix}\widehat{AOC}=\dfrac{180^o+50^o}{2}=115^o\\\widehat{BOC}=180^o-115^o=65^o\end{matrix}\right.\)

\(\widehat{AOD}=\widehat{BOC}=65^o\)

Vì \(\widehat {AOB}\) và \(\widehat {BOC}\) là 2 góc kề nhau nên \(\widehat {AOB} + \widehat {BOC} = \widehat {AOC}\), mà \(\widehat {AOC} = 80^\circ \) nên \(\widehat {AOB} + \widehat {BOC} = 80^\circ \)

Vì \(\widehat {AOB} = \frac{1}{5}.\widehat {AOC}\) nên \(\widehat {AOB} = \frac{1}{5}.80^\circ  = 16^\circ \)

Như vậy,

\(\begin{array}{l}16^\circ  + \widehat {BOC} = 80^\circ \\ \Rightarrow \widehat {BOC} = 80^\circ  - 16^\circ  = 64^\circ \end{array}\)

Vậy \(\widehat {AOB} = 16^\circ ;\widehat {BOC} = 64^\circ \)