Solution: Option 3 is correct

$ We\,have:\,\,\overrightarrow{A}={{a}_{1}}\widehat{i}+{{a}_{2}}\widehat{j}+{{a}_{3}}\widehat{k},\, $

$ \,\widehat{i}\times \left( \widehat{i}\times \overrightarrow{A} \right)\,=? $

$ \left( \widehat{i}\times \overrightarrow{A} \right)={{a}_{1}}\left( \widehat{i}\times \widehat{i} \right)+{{a}_{2}}\left( \widehat{i}\times \widehat{j} \right)+{{a}_{3}}\left( \widehat{i}\times \widehat{k} \right) $

$ \left( \widehat{i}\times \overrightarrow{A} \right)={{a}_{2}}\widehat{k}-{{a}_{3}}\widehat{j} $

$ Now,\,\,\widehat{i}\times \left( \widehat{i}\times \overrightarrow{A} \right)\,=\,\widehat{i}\times \left( {{a}_{2}}\widehat{k}-{{a}_{3}}\widehat{j} \right) $

$ \,\widehat{i}\times \left( \widehat{i}\times \overrightarrow{A} \right)\,={{a}_{2}}\left( \widehat{i}\times \widehat{k} \right)-{{a}_{3}}\left( \widehat{i}\times \widehat{j} \right) $

$ \therefore \,\widehat{i}\times \left( \widehat{i}\times \overrightarrow{A} \right)\,=-{{a}_{2}}\widehat{j}-{{a}_{3}}\widehat{k} $