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Match each polynomial in standard form to its equivalent factored form.

8x^3+1
2x^4+16x
x^3+8

(2x+1)(4x^2−2x+1)
The polynomial cannot be factored over the integers using the sum of cubes method.
(x+1)(4x^2−2x+1)
(x+8)(x^2−16x+64)
(2x+16)(4x^2−32x+64)
(x+2)(x^2−2x+4)
2x(x+2)(x^2−2x+4)

Answer :

sqdancefan

Answer:

  • 8x^3+1   ⇒   (2x+1)(4x^2−2x+1)
  • 2x^4+16x   ⇒   2x(x+2)(x^2−2x+4)
  • x^3+8   ⇒   (x+2)(x^2−2x+4)

Step-by-step explanation:

The factoring of the sum of cubes is ...

  a³ +b³ = (a +b)(a² -ab +b²)

1. a=2x, b=1

  = (2x)³ + 1³

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2. There is an overall factor of 2x. Once that is factored out, a=x, b=2.

  = (2x)(x³ +2³)

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3. a=x, b=2

  = x³ +2³

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