Problem Study (Polynomial Division)

1.   If is a factor of , Find the values of and
Let  .
Since is a factor of , the remainder when is divided by is 0.
By polynomial long division we can find the remainder.  

Hence we have
and .
Similarly, we can say , 
When , and
When , .
 2.   If is divisible by , prove that .
 Since is divisible by , The remainder when is divided by = is zero.
By polynomial long division,

and .
စာဖတ်သူ၏ အမြင်ကို လေးစားစွာစောင့်မျှော်လျက်!
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