SOLUTION: factor by grouping x^3+ax+3a+3x^2
Algebra.Com
Question 392582: factor by grouping x^3+ax+3a+3x^2
Answer by haileytucki(390) (Show Source): You can put this solution on YOUR website!
x^(3)+ax+3a+3x^(2)
Factor the greatest common factor (GCF) from each group.
(x(x^(2)+a)+3(a+x^(2)))
Factor the polynomial by grouping the first two terms together and finding the greatest common factor (GCF). Next, group the second two terms together and find the GCF. Since both groups contain the factor (x^(2)+a), they can be combined.
(x+3)(x^(2)+a)
RELATED QUESTIONS
Factoring by grouping
x^3+ax+3a+3x^2
Lets reorganize this so we may factor by... (answered by eperette)
Use grouping to factor the polynomial.
x^3 + ax + 3a +... (answered by Cintchr)
Use grouping to factor completely:... (answered by nerdybill)
Use grouping to factor each polynomial completely
x^3+ax+3a+3x^2
Thank you for your (answered by stanbon)
USE GROUPING TO FACTOR POLYNOMIAL... (answered by jim_thompson5910)
Factor by grouping... (answered by mananth)
factor by grouping... (answered by AlisaAndersen)
factor by grouping:... (answered by nerdybill)
Factor by grouping... (answered by mananth)