What Are The Excluded Values Of X X X For X + 4 − 3 X 2 + 12 X + 36 \frac{x+4}{-3x^2+12x+36} − 3 X 2 + 12 X + 36 X + 4 ?A. X = − 6 , X = 2 X=-6, X=2 X = − 6 , X = 2 B. X = − 6 , X = − 3 , X = 2 X=-6, X=-3, X=2 X = − 6 , X = − 3 , X = 2 C. X = − 2 , X = 6 X=-2, X=6 X = − 2 , X = 6 D. X = − 2 , X = 3 , X = 6 X=-2, X=3, X=6 X = − 2 , X = 3 , X = 6

Mar 12, 2025 by ADMIN 349 views

What are the Excluded Values of $x$ for $\frac{x+4}{-3x^2+12x+36}$ ?

Understanding Excluded Values in Algebra

In algebra, excluded values are the values of the variable that make the denominator of a fraction equal to zero. These values are excluded from the domain of the function because division by zero is undefined. In this article, we will explore the excluded values of $x$ for the given rational function $\frac{x+4}{-3x^2+12x+36}$ .

The Rational Function

The given rational function is $\frac{x+4}{-3x^2+12x+36}$ . To find the excluded values of $x$ , we need to find the values of $x$ that make the denominator $-3x^2+12x+36$ equal to zero.

Finding the Excluded Values

To find the excluded values, we need to solve the equation $-3x^2+12x+36=0$ . This is a quadratic equation, and we can solve it using the quadratic formula or factoring.

Factoring the Quadratic Equation

Let's try to factor the quadratic equation $-3x^2+12x+36=0$ . We can start by finding two numbers whose product is $-3(36)=-108$ and whose sum is $12$ . These numbers are $-18$ and $6$ , so we can write the equation as:

-3x^2+12x+36=-3(x^2-4x-12)=-3(x-6)(x+2)=0

Solving for $x$

Now that we have factored the quadratic equation, we can solve for $x$ by setting each factor equal to zero:

x-6=0 \Rightarrow x=6

x+2=0 \Rightarrow x=-2

The Excluded Values

Therefore, the excluded values of $x$ for the given rational function are $x=-2$ and $x=6$ .

Conclusion

In this article, we have explored the excluded values of $x$ for the given rational function $\frac{x+4}{-3x^2+12x+36}$ . We have found that the excluded values are $x=-2$ and $x=6$ . These values are excluded from the domain of the function because division by zero is undefined.

Answer

The correct answer is C. $x=-2, x=6$ .

Additional Information

The excluded values of $x$ are the values that make the denominator of the fraction equal to zero.
The rational function is undefined at the excluded values of $x$ .
The excluded values can be found by solving the equation $-3x^2+12x+36=0$ .

References

[1] Algebra, 2nd edition, Michael Artin, Pearson Education, 2010.
[2] Calculus, 3rd edition, Michael Spivak, Cambridge University Press, 2008.

Related Topics

Excluded values in algebra
Rational functions
Quadratic equations
Factoring quadratic equations
Solving quadratic equations using the quadratic formula
Q&A: Excluded Values in Algebra

Understanding Excluded Values in Algebra

Q: What are excluded values in algebra?

A: Excluded values in algebra are the values of the variable that make the denominator of a fraction equal to zero. These values are excluded from the domain of the function because division by zero is undefined.

Q: How do I find the excluded values of $x$ for a rational function?

A: To find the excluded values of $x$ for a rational function, you need to solve the equation that makes the denominator equal to zero. This is a quadratic equation, and you can solve it using the quadratic formula or factoring.

Q: What is the difference between a rational function and a quadratic equation?

A: A rational function is a function that is the ratio of two polynomials, while a quadratic equation is a polynomial of degree two. The excluded values of $x$ for a rational function are the values that make the denominator equal to zero, while the solutions to a quadratic equation are the values that make the equation equal to zero.

Q: Can you give an example of a rational function and its excluded values?

A: Yes, the rational function $\frac{x+4}{-3x^2+12x+36}$ has excluded values of $x=-2$ and $x=6$ . These values are excluded from the domain of the function because division by zero is undefined.

Q: How do I know if a value is an excluded value or not?

A: To determine if a value is an excluded value or not, you need to plug the value into the denominator of the rational function and check if it equals zero. If it does, then the value is an excluded value.

Q: Can you give a step-by-step guide to finding the excluded values of $x$ for a rational function?

A: Yes, here is a step-by-step guide to finding the excluded values of $x$ for a rational function:

Write down the rational function.
Identify the denominator of the rational function.
Set the denominator equal to zero and solve for $x$ .
The values of $x$ that make the denominator equal to zero are the excluded values.

Q: What are some common mistakes to avoid when finding excluded values?

A: Some common mistakes to avoid when finding excluded values include:

Not factoring the denominator correctly
Not solving the equation correctly
Not checking if the value is an excluded value or not

Q: Can you give some practice problems to help me understand excluded values better?

A: Yes, here are some practice problems to help you understand excluded values better:

Find the excluded values of $x$ for the rational function $\frac{x-2}{x^2-4x+4}$ .
Find the excluded values of $x$ for the rational function $\frac{x+1}{x^2-6x+9}$ .
Find the excluded values of $x$ for the rational function $\frac{x-3}{x^2-2x-15}$ .

Conclusion

In this article, we have explored the excluded values of $x$ for the given rational function $\frac{x+4}{-3x^2+12x+36}$ . We have also provided a step-by-step guide to finding the excluded values of $x$ for a rational function and some practice problems to help you understand excluded values better.

References

[1] Algebra, 2nd edition, Michael Artin, Pearson Education, 2010.
[2] Calculus, 3rd edition, Michael Spivak, Cambridge University Press, 2008.

Related Topics

Excluded values in algebra
Rational functions
Quadratic equations
Factoring quadratic equations
Solving quadratic equations using the quadratic formula