Answer:
Explanation:
We need to factor out ,
Look out for factors of 3 , which could be , ±1 or ±3 . That is : 1 , -1 , 3 , -3
Substitute these factors one by one in the given cubic polynomial and look out for that value for which the expression becomes 0 .
Substitute
,
Again substitute
, we have ;
This implies
is a factor of the given cubic polynomial. Now on dividing the polynomial by
, we have; ( see attachment)
Now we can further factorise
as ,
can be written as ,
on using identity
, we have;
So the final factorised form of the given cubic polynomial is ,
and we are done!