Which Polynomial Is Factored Completely?A. $121x^2 + 36y^2$B. $(4x + 4)(x + 1$\]C. $2x(x^2 - 4$\]D. $3x^4 - 15n^3 + 12n^2$

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In algebra, factoring polynomials is an essential skill that helps us simplify complex expressions and solve equations. However, not all polynomials can be factored completely. In this article, we will explore four different polynomials and determine which one is factored completely.

What is Factoring a Polynomial?

Factoring a polynomial involves expressing it as a product of simpler polynomials, called factors. This can be done in various ways, including:

  • Greatest Common Factor (GCF): Factoring out the greatest common factor of all terms in the polynomial.
  • Difference of Squares: Factoring expressions of the form a2−b2a^2 - b^2.
  • Sum and Difference: Factoring expressions of the form a2+2ab+b2a^2 + 2ab + b^2 and a2−2ab+b2a^2 - 2ab + b^2.
  • Cubic and Quartic Expressions: Factoring expressions of the form ax3+bx2+cx+dax^3 + bx^2 + cx + d and ax4+bx3+cx2+dx+eax^4 + bx^3 + cx^2 + dx + e.

Option A: 121x2+36y2121x^2 + 36y^2

Let's start by examining option A: 121x2+36y2121x^2 + 36y^2. This polynomial can be factored using the greatest common factor (GCF) method.

$121x^2 + 36y^2$
= $11^2x^2 + 6^2y^2$
= $(11x)^2 + (6y)^2$

As we can see, this polynomial can be factored into the sum of two squares, but it is not factored completely. We can further factor it using the difference of squares formula, but it will not result in a complete factorization.

Option B: (4x+4)(x+1)(4x + 4)(x + 1)

Next, let's examine option B: (4x+4)(x+1)(4x + 4)(x + 1). This polynomial can be factored using the distributive property.

$(4x + 4)(x + 1)$
= $4x^2 + 4x + 4x + 4$
= $4x^2 + 8x + 4$

As we can see, this polynomial can be factored into a quadratic expression, but it is not factored completely. We can further factor it using the greatest common factor (GCF) method, but it will not result in a complete factorization.

Option C: 2x(x2−4)2x(x^2 - 4)

Now, let's examine option C: 2x(x2−4)2x(x^2 - 4). This polynomial can be factored using the distributive property.

$2x(x^2 - 4)$
= $2x^3 - 8x$

As we can see, this polynomial can be factored into a cubic expression, but it is not factored completely. We can further factor it using the greatest common factor (GCF) method, but it will not result in a complete factorization.

Option D: 3x4−15n3+12n23x^4 - 15n^3 + 12n^2

Finally, let's examine option D: 3x4−15n3+12n23x^4 - 15n^3 + 12n^2. This polynomial can be factored using the greatest common factor (GCF) method.

$3x^4 - 15n^3 + 12n^2$
= $3x^4 - 3n^2(5n + 4)$
= $3x^4 - 3n^2(5n + 4)$

As we can see, this polynomial can be factored completely using the greatest common factor (GCF) method. We can further factor it using the difference of squares formula, but it will not result in a complete factorization.

Conclusion

In conclusion, option D: 3x4−15n3+12n23x^4 - 15n^3 + 12n^2 is the only polynomial that is factored completely. The other options can be factored using various methods, but they are not factored completely.

Key Takeaways

  • Factoring a polynomial involves expressing it as a product of simpler polynomials, called factors.
  • The greatest common factor (GCF) method is used to factor out the greatest common factor of all terms in the polynomial.
  • The difference of squares formula is used to factor expressions of the form a2−b2a^2 - b^2.
  • Cubic and quartic expressions can be factored using various methods, including the greatest common factor (GCF) method and the difference of squares formula.

Final Thoughts

In our previous article, we explored the concept of factoring polynomials and determined which polynomial is factored completely. In this article, we will answer some frequently asked questions about factoring polynomials.

Q: What is the greatest common factor (GCF) method?

A: The greatest common factor (GCF) method is a technique used to factor out the greatest common factor of all terms in a polynomial. This involves identifying the largest factor that divides all terms in the polynomial.

Q: How do I factor a polynomial using the GCF method?

A: To factor a polynomial using the GCF method, follow these steps:

  1. Identify the terms in the polynomial.
  2. Determine the greatest common factor of all terms.
  3. Factor out the greatest common factor from each term.
  4. Write the factored form of the polynomial.

Q: What is the difference of squares formula?

A: The difference of squares formula is a technique used to factor expressions of the form a2−b2a^2 - b^2. This involves expressing the expression as (a+b)(a−b)(a + b)(a - b).

Q: How do I factor a polynomial using the difference of squares formula?

A: To factor a polynomial using the difference of squares formula, follow these steps:

  1. Identify the expression in the form a2−b2a^2 - b^2.
  2. Express the expression as (a+b)(a−b)(a + b)(a - b).
  3. Write the factored form of the polynomial.

Q: Can I factor a polynomial using other methods?

A: Yes, there are several other methods used to factor polynomials, including:

  • Sum and Difference: Factoring expressions of the form a2+2ab+b2a^2 + 2ab + b^2 and a2−2ab+b2a^2 - 2ab + b^2.
  • Cubic and Quartic Expressions: Factoring expressions of the form ax3+bx2+cx+dax^3 + bx^2 + cx + d and ax4+bx3+cx2+dx+eax^4 + bx^3 + cx^2 + dx + e.
  • Grouping: Factoring expressions by grouping terms.

Q: How do I determine which method to use?

A: To determine which method to use, follow these steps:

  1. Identify the type of polynomial you are working with.
  2. Determine the form of the polynomial.
  3. Choose the method that best suits the form of the polynomial.

Q: Can I factor a polynomial that has no common factors?

A: Yes, you can factor a polynomial that has no common factors using the difference of squares formula or other methods.

Q: What are some common mistakes to avoid when factoring polynomials?

A: Some common mistakes to avoid when factoring polynomials include:

  • Not identifying the greatest common factor: Failing to identify the greatest common factor of all terms in the polynomial.
  • Not using the correct method: Using the wrong method to factor the polynomial.
  • Not checking for common factors: Failing to check for common factors in the polynomial.

Conclusion

In conclusion, factoring polynomials is an essential skill in algebra that helps us simplify complex expressions and solve equations. By understanding the different methods of factoring, we can determine which polynomials are factored completely and which ones are not. In this article, we answered some frequently asked questions about factoring polynomials and provided tips and tricks for factoring polynomials.

Key Takeaways

  • The greatest common factor (GCF) method is used to factor out the greatest common factor of all terms in a polynomial.
  • The difference of squares formula is used to factor expressions of the form a2−b2a^2 - b^2.
  • There are several other methods used to factor polynomials, including sum and difference, cubic and quartic expressions, and grouping.
  • To determine which method to use, identify the type of polynomial you are working with and choose the method that best suits the form of the polynomial.

Final Thoughts

Factoring polynomials is an essential skill in algebra that helps us simplify complex expressions and solve equations. By understanding the different methods of factoring, we can determine which polynomials are factored completely and which ones are not. In this article, we answered some frequently asked questions about factoring polynomials and provided tips and tricks for factoring polynomials.