In order to factor x ^ 2 – 2x – 8 we must break up the “bx” term into two terms whose coefficients

In order to factor x ^ 2 – 2x – 8 we must break up the “bx” term into two terms whose coefficients…
add to-2 and multiply to 8.
add to 8 and multiply to 2.
add to 1 and multiply to -8.
add to 1 and multiply to 2.

The correct answer and explanation is:

The correct answer is add to -2 and multiply to -8.

Explanation:

When factoring a quadratic expression of the form ax^2 + bx + c, the goal is to find two numbers that multiply to ac and add to b. In this case, the quadratic expression is x^2 – 2x – 8. Here, a = 1, b = -2, and c = -8.

To factor this quadratic, we need to find two numbers that:

1. Multiply to a * c = 1 * (-8) = -8.
2. Add up to b = -2.

Now, let’s find two numbers that meet these conditions:

• The factors of -8 are:
  • (1, -8)
  • (-1, 8)
  • (2, -4)
  • (-2, 4)

Out of these pairs, -4 and 2 add up to -2. Therefore, these are the numbers that we need to break up the bx term.

Step-by-step process:

1. Start with the original quadratic: x^2 – 2x – 8.
2. Break up the bx term -2x into -4x + 2x: x2−4x+2x−8x^2 – 4x + 2x – 8
3. Factor by grouping:
   • Group the first two terms: x^2 – 4x.
   • Group the last two terms: 2x – 8.
   (x2−4x)+(2x−8)(x^2 – 4x) + (2x – 8)
4. Factor out the greatest common factor (GCF) from each group:
   • From x^2 – 4x, factor out x: x(x – 4).
   • From 2x – 8, factor out 2: 2(x – 4).
   x(x−4)+2(x−4)x(x – 4) + 2(x – 4)
5. Now, factor out the common binomial factor (x – 4): (x−4)(x+2)(x – 4)(x + 2)

Thus, the factored form of x^2 – 2x – 8 is (x – 4)(x + 2).

This demonstrates the factoring process and shows that the correct numbers to split the bx term were -4 and 2, which add up to -2 and multiply to -8.