Factor Out The GCF Of The Three Terms, Then Complete The Factorization Of $x^4+8x^3+15x^2$.A. $x^2(x+3)(x+5)$ B. \$x^2(x+6)(x+2)$[/tex\] C. $x^3(x+8)+15x^2$ D. $x^2(x+8x+15)$

Introduction

Factorizing polynomials is a fundamental concept in algebra that helps us simplify complex expressions and solve equations. In this article, we will focus on factorizing the polynomial $x^4+8x3+15x^2$ by first factoring out the greatest common factor (GCF) and then completing the factorization.

Understanding the Greatest Common Factor (GCF)

The GCF of a set of numbers is the largest number that divides each of the numbers without leaving a remainder. In the context of polynomials, the GCF is the highest power of the variable (in this case, x) that divides each term.

Factoring Out the GCF

To factor out the GCF, we need to identify the highest power of x that divides each term in the polynomial. In this case, the highest power of x that divides each term is $x^2$. Therefore, we can factor out $x^2$ from each term:

$$x^4+8x^3+15x^2 = x^2(x^2+8x+15)$$

Completing the Factorization

Now that we have factored out the GCF, we need to complete the factorization of the remaining quadratic expression $x^2+8x+15$. To do this, we need to find two numbers whose product is 15 and whose sum is 8.

Using the Factorization Method

One way to factorize a quadratic expression is to use the factorization method. This involves finding two numbers whose product is the constant term (in this case, 15) and whose sum is the coefficient of the linear term (in this case, 8).

After some trial and error, we find that the two numbers are 3 and 5, since their product is 15 and their sum is 8. Therefore, we can write the quadratic expression as:

$$x^2+8x+15 = (x+3)(x+5)$$

Substituting Back

Now that we have factored the quadratic expression, we can substitute it back into the original expression:

$$x^4+8x^3+15x^2 = x^2(x+3)(x+5)$$

Conclusion

In this article, we have factorized the polynomial $x^4+8x3+15x^2$ by first factoring out the GCF and then completing the factorization of the remaining quadratic expression. We have shown that the correct factorization is $x^2(x+3)(x+5)$.

Comparison with Other Options

Let's compare our answer with the other options:

• Option A: $x^2(x+3)(x+5)$
• Option B: $x^2(x+6)(x+2)$
• Option C: $x^3(x+8)+15x2$
• Option D: $x^2(x+8x+15)$

Our answer matches option A, which is the correct factorization.

Tips and Tricks

Here are some tips and tricks to help you factorize polynomials:

• Always look for the GCF first.
• Use the factorization method to factorize quadratic expressions.
• Check your answer by multiplying the factors together.

By following these tips and tricks, you can become proficient in factorizing polynomials and solve complex equations with ease.

Conclusion

Introduction

In our previous article, we discussed how to factorize the polynomial $x^4+8x3+15x^2$ by first factoring out the greatest common factor (GCF) and then completing the factorization of the remaining quadratic expression. In this article, we will answer some frequently asked questions about factorizing polynomials.

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

A: The GCF of a set of numbers is the largest number that divides each of the numbers without leaving a remainder. In the context of polynomials, the GCF is the highest power of the variable (in this case, x) that divides each term.

Q: How do I find the GCF of a polynomial?

A: To find the GCF of a polynomial, you need to identify the highest power of x that divides each term. You can do this by looking at the coefficients of each term and finding the greatest common factor.

Q: What is the factorization method?

A: The factorization method is a technique used to factorize quadratic expressions. It involves finding two numbers whose product is the constant term and whose sum is the coefficient of the linear term.

Q: How do I use the factorization method?

A: To use the factorization method, you need to find two numbers whose product is the constant term and whose sum is the coefficient of the linear term. You can do this by trial and error or by using a calculator.

Q: What is the difference between factoring and simplifying?

A: Factoring involves breaking down a polynomial into its simplest form, while simplifying involves combining like terms to make the polynomial easier to work with.

Q: Can I factorize a polynomial with a negative coefficient?

A: Yes, you can factorize a polynomial with a negative coefficient. To do this, you need to multiply each term by -1 to make the coefficient positive.

Q: How do I factorize a polynomial with a variable in the denominator?

A: To factorize a polynomial with a variable in the denominator, you need to multiply each term by the reciprocal of the denominator.

Q: Can I factorize a polynomial with a complex number?

A: Yes, you can factorize a polynomial with a complex number. To do this, you need to use the complex conjugate to simplify the expression.

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

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

• Not factoring out the GCF
• Not using the factorization method
• Not checking the answer by multiplying the factors together
• Not simplifying the expression

Conclusion

Factorizing polynomials is a fundamental concept in algebra that helps us simplify complex expressions and solve equations. By following the steps outlined in this article, you can factorize polynomials with ease and become proficient in algebra. Remember to always look for the GCF first, use the factorization method to factorize quadratic expressions, and check your answer by multiplying the factors together.

Tips and Tricks

Here are some tips and tricks to help you factorize polynomials:

• Always look for the GCF first.
• Use the factorization method to factorize quadratic expressions.
• Check your answer by multiplying the factors together.
• Simplify the expression to make it easier to work with.
• Use a calculator to check your answer.

By following these tips and tricks, you can become proficient in factorizing polynomials and solve complex equations with ease.