What Is The Factorization Of The Trinomial Below?$\[ -x^2 + 2x + 48 \\]A. \[$(x+6)(x-8)\$\]B. \[$-1(x-8)(x+6)\$\]C. \[$-1(x+8)(x+6)\$\]D. \[$(-x+6)(x+8)\$\]

Introduction

In algebra, factorization is a process of expressing a polynomial as a product of simpler polynomials. It is an essential concept in mathematics, and it has numerous applications in various fields, including physics, engineering, and computer science. In this article, we will focus on the factorization of a trinomial, which is a polynomial with three terms.

What is a Trinomial?

A trinomial is a polynomial with three terms. It can be expressed in the form of $ax^2 + bx + c$, where $a$, $b$, and $c$ are constants, and $x$ is the variable. For example, $x^2 + 2x + 1$ is a trinomial.

The Factorization of a Trinomial

The factorization of a trinomial is the process of expressing it as a product of two binomials. A binomial is a polynomial with two terms. For example, $x + 1$ is a binomial.

To factorize a trinomial, we need to find two binomials whose product is equal to the trinomial. The general form of a trinomial is $ax^2 + bx + c$. To factorize it, we need to find two binomials of the form $(x + m)$ and $(x + n)$, such that their product is equal to the trinomial.

The Factorization of the Given Trinomial

The given trinomial is $-x^2 + 2x + 48$. To factorize it, we need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$.

We know that the product of the two binomials is equal to the trinomial, so we can write:

$$(x + m)(x + n) = -x^2 + 2x + 48$$

Expanding the left-hand side of the equation, we get:

$$x^2 + (m + n)x + mn = -x^2 + 2x + 48$$

Comparing the coefficients of the two sides of the equation, we get:

$$m + n = 2$$

$$mn = 48$$

Solving the system of equations, we get:

$$m = 8$$

$$n = -6$$

Therefore, the two binomials are $(x + 8)$ and $(x - 6)$.

The Final Answer

The factorization of the given trinomial is:

$$-x^2 + 2x + 48 = -(x - 6)(x + 8)$$

This is the correct answer.

Conclusion

In this article, we have discussed the factorization of a trinomial. We have also provided the factorization of the given trinomial. The factorization of a trinomial is an essential concept in mathematics, and it has numerous applications in various fields.

References

• [1] "Algebra" by Michael Artin
• [2] "Calculus" by Michael Spivak
• [3] "Linear Algebra" by Jim Hefferon

Discussion

The factorization of a trinomial is a fundamental concept in mathematics. It has numerous applications in various fields, including physics, engineering, and computer science. In this article, we have provided the factorization of the given trinomial. We have also discussed the importance of factorization in mathematics.

A. $(x+6)(x-8)$

This is not the correct answer.

B. $-1(x-8)(x+6)$

This is the correct answer.

C. $-1(x+8)(x+6)$

This is not the correct answer.

D. $(-x+6)(x+8)$

This is not the correct answer.

The Factorization of the Trinomial Below

The factorization of the trinomial below is $-1(x-8)(x+6)$. This is the correct answer.

The Factorization of the Trinomial Below

The Factorization of a Trinomial

The factorization of a trinomial is the process of expressing it as a product of two binomials. A binomial is a polynomial with two terms. For example, $x + 1$ is a binomial.

The Factorization of the Given Trinomial

The given trinomial is $-x^2 + 2x + 48$. To factorize it, we need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$.

The Final Answer

The factorization of the given trinomial is:

$$-x^2 + 2x + 48 = -(x - 6)(x + 8)$$

This is the correct answer.

The Factorization of the Trinomial Below

Conclusion

In this article, we have discussed the factorization of a trinomial. We have also provided the factorization of the given trinomial. The factorization of a trinomial is an essential concept in mathematics, and it has numerous applications in various fields.

References

• [1] "Algebra" by Michael Artin
• [2] "Calculus" by Michael Spivak
• [3] "Linear Algebra" by Jim Hefferon

Discussion

Introduction

In our previous article, we discussed the factorization of a trinomial. We provided the factorization of the given trinomial and discussed the importance of factorization in mathematics. In this article, we will answer some frequently asked questions about the factorization of trinomials.

Q: What is the factorization of a trinomial?

A: The factorization of a trinomial is the process of expressing it as a product of two binomials. A binomial is a polynomial with two terms.

Q: How do I factorize a trinomial?

A: To factorize a trinomial, you need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$. You can then expand the left-hand side of the equation and compare the coefficients of the two sides to find the values of $m$ and $n$.

Q: What are the common mistakes to avoid when factorizing a trinomial?

A: There are several common mistakes to avoid when factorizing a trinomial. These include:

• Not checking if the trinomial can be factored
• Not using the correct method to factorize the trinomial
• Not checking if the factorization is correct
• Not simplifying the factorization

Q: How do I check if a trinomial can be factored?

A: To check if a trinomial can be factored, you need to check if the trinomial can be expressed as a product of two binomials. You can do this by trying to find two binomials whose product is equal to the trinomial.

Q: What are the common types of trinomials that can be factored?

A: There are several common types of trinomials that can be factored. These include:

• Trinomials with a leading coefficient of 1
• Trinomials with a leading coefficient of -1
• Trinomials with a constant term of 0
• Trinomials with a constant term of 1

Q: How do I factorize a trinomial with a leading coefficient of 1?

A: To factorize a trinomial with a leading coefficient of 1, you need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$. You can then expand the left-hand side of the equation and compare the coefficients of the two sides to find the values of $m$ and $n$.

Q: How do I factorize a trinomial with a leading coefficient of -1?

A: To factorize a trinomial with a leading coefficient of -1, you need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$. You can then expand the left-hand side of the equation and compare the coefficients of the two sides to find the values of $m$ and $n$.

Q: How do I factorize a trinomial with a constant term of 0?

A: To factorize a trinomial with a constant term of 0, you need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$. You can then expand the left-hand side of the equation and compare the coefficients of the two sides to find the values of $m$ and $n$.

Q: How do I factorize a trinomial with a constant term of 1?

A: To factorize a trinomial with a constant term of 1, you need to find two binomials whose product is equal to the trinomial. Let's assume that the two binomials are $(x + m)$ and $(x + n)$. You can then expand the left-hand side of the equation and compare the coefficients of the two sides to find the values of $m$ and $n$.

Conclusion

In this article, we have answered some frequently asked questions about the factorization of trinomials. We have discussed the common mistakes to avoid when factorizing a trinomial and provided examples of how to factorize different types of trinomials. We hope that this article has been helpful in understanding the factorization of trinomials.

References

• [1] "Algebra" by Michael Artin
• [2] "Calculus" by Michael Spivak
• [3] "Linear Algebra" by Jim Hefferon

Discussion

The factorization of trinomials is a fundamental concept in mathematics. It has numerous applications in various fields, including physics, engineering, and computer science. In this article, we have provided examples of how to factorize different types of trinomials and discussed the common mistakes to avoid when factorizing a trinomial. We hope that this article has been helpful in understanding the factorization of trinomials.