Let a_{0}=2, a_{1}=5, and a_{2}=8, and for n>2 define a_{n} recursively to be the remainder when 4\left(a_{n-1}+a_{n-2}+a_{n-3}\right) is divided by 11 . Find a_{2018} \cdot a_{2020} \cdot a_{2022}.
Let a_{0}=2, a_{1}=5, and a_{2}=8, and for n>2 define a_{n} recursively to be the remainder when 4\left(a_{n-1}+a_{n-2}+a_{n-3}\right) is divided by 11 . Find a_{2018} \cdot a_{2020} \cdot a_{2022}.