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18 votes
18 votes
What is the greatest common factor of the terms in the polynomial 12x4 + 27x3 + 6x2?

3x
3x2
6x2
6x4

User Hicham Zouarhi
by
2.6k points

2 Answers

14 votes
14 votes

Explanation:

We're going to be factoring:


12 {x}^(4) + 27 {x}^(3) + 6 {x}^(2)

We know that the GCF between 12, 27, and 6 is 3.

We also know that the GCF of x^4, x^3, and x^2 is x^2.

When factoring:

  • Use both of our GCFs, 3 and x^2 (3x^2).
  • Divide our coefficients by the GCF.


3{x}^(2) (4 {x}^(2) + 9x + 2)

We know 3x^2 is the correct option since the polynomial is factored completely.

User Adrien BARRAL
by
3.6k points
30 votes
30 votes

Answer:


3x^2

Explanation:


12x^4 + 27x^3 + 6x^2

The coefficients of the variables are 12, 27 and 6. The greatest common factor (GCF) of these numbers is 3.


\implies 3(4x^4 +9x^3 + 2x^2)

From inspection, the GCF of the variables is
x^2


\implies 3x^2(4x^2+9x + 2)

Therefore, the GCF of the terms in the polynomial is
3x^2

User PhoneixS
by
2.6k points