THIS USER ASKED 👇

Which shows one way to determine the factors of x3 + 11×2 – 3x – 33 by grouping? x2(x + 11) + 3(x – 11) x2(x – 11) – 3(x – 11) x2(x + 11) + 3(x + 11) x2(x + 11) – 3(x + 11)Which shows one way to determine the factors of x3 + 11×2 – 3x – 33 by grouping? x2(x + 11) + 3(x – 11) x2(x – 11) – 3(x – 11) x2(x + 11) + 3(x + 11) x2(x + 11) – 3(x + 11)

THIS IS THE BEST ANSWER 👇

x ^ 2 (x + 11) -3 (x + 11) The final answer is

Step by step explanation:

x ^ 3 + 11x ^ 2 -3x - 33

We apply a grouping method to include the given sentence

(x ^ 3 + 11x ^ 2) + (- 3x - 33)

Factor out x ^ 2 from the first group and factor out -3 from the second group

x ^ 2 (x + 11) -3 (x + 11)

We commonly have x + 11, so make x + 11 a factor

(x ^ 2-3) (x + 11)

factoring x ^ 2-3 cannot be done

x ^ 2 (x + 11) -3 (x + 11) The final answer is