Using The Function F ( X ) = 7 X 4 + 2 X 3 + 4 X 2 − 6 X + 5 F(x) = 7x^4 + 2x^3 + 4x^2 - 6x + 5 F ( X ) = 7 X 4 + 2 X 3 + 4 X 2 − 6 X + 5 And Descartes' Rule Of Signs, What Are The Possible Combinations Of Positive, Negative, And Complex Zeros?Select All That Apply:- 2 Positive, 2 Negative, 0 Complex- 4 Positive, 0

Introduction

Descartes' Rule of Signs is a mathematical technique used to determine the possible combinations of positive, negative, and complex zeros of a polynomial function. This rule is based on the number of sign changes in the coefficients of the polynomial function. In this article, we will use Descartes' Rule of Signs to determine the possible combinations of positive, negative, and complex zeros of the function $f(x) = 7x^4 + 2x^3 + 4x^2 - 6x + 5$.

Descartes' Rule of Signs

Descartes' Rule of Signs states that the number of positive zeros of a polynomial function is either equal to the number of sign changes in the coefficients of the polynomial function or less than that by a positive even integer. Similarly, the number of negative zeros of a polynomial function is determined by applying the rule to the coefficients of the polynomial function with the variable replaced by $-x$. The number of complex zeros is then determined by the difference between the total number of zeros and the number of real zeros.

Determining the Number of Positive Zeros

To determine the number of positive zeros of the function $f(x) = 7x^4 + 2x^3 + 4x^2 - 6x + 5$, we need to count the number of sign changes in the coefficients of the polynomial function. The coefficients of the polynomial function are 7, 2, 4, -6, and 5. There are 2 sign changes in the coefficients, from positive to negative and then from negative to positive.

According to Descartes' Rule of Signs, the number of positive zeros of the polynomial function is either equal to the number of sign changes or less than that by a positive even integer. Therefore, the possible number of positive zeros of the polynomial function is either 2 or 0.

Determining the Number of Negative Zeros

To determine the number of negative zeros of the polynomial function, we need to replace the variable $x$ with $-x$ in the polynomial function and then count the number of sign changes in the coefficients of the resulting polynomial function. The polynomial function with $-x$ replaced by $x$ is $f(-x) = 7(-x)^4 + 2(-x)^3 + 4(-x)^2 - 6(-x) + 5$. Simplifying this expression, we get $f(-x) = 7x^4 - 2x^3 + 4x^2 + 6x + 5$.

The coefficients of the polynomial function $f(-x)$ are 7, -2, 4, 6, and 5. There are 2 sign changes in the coefficients, from positive to negative and then from negative to positive.

According to Descartes' Rule of Signs, the number of negative zeros of the polynomial function is either equal to the number of sign changes or less than that by a positive even integer. Therefore, the possible number of negative zeros of the polynomial function is either 2 or 0.

Determining the Number of Complex Zeros

The total number of zeros of the polynomial function is equal to the degree of the polynomial function, which is 4. The number of real zeros is the sum of the number of positive zeros and the number of negative zeros. Therefore, the number of complex zeros is equal to the total number of zeros minus the number of real zeros.

If the number of positive zeros is 2 and the number of negative zeros is 2, then the number of real zeros is 4. In this case, the number of complex zeros is 0.

If the number of positive zeros is 0 and the number of negative zeros is 0, then the number of real zeros is 0. In this case, the number of complex zeros is 4.

Conclusion

In conclusion, using Descartes' Rule of Signs, we have determined the possible combinations of positive, negative, and complex zeros of the function $f(x) = 7x^4 + 2x^3 + 4x^2 - 6x + 5$. The possible combinations are:

• 2 positive, 2 negative, 0 complex
• 0 positive, 0 negative, 4 complex

Therefore, the correct answer is:

• 2 positive, 2 negative, 0 complex
  Q&A: Using Descartes' Rule of Signs to Determine Zeros of a Polynomial Function ================================================================================

Q: What is Descartes' Rule of Signs?

A: Descartes' Rule of Signs is a mathematical technique used to determine the possible combinations of positive, negative, and complex zeros of a polynomial function. This rule is based on the number of sign changes in the coefficients of the polynomial function.

Q: How do I apply Descartes' Rule of Signs to a polynomial function?

A: To apply Descartes' Rule of Signs, you need to count the number of sign changes in the coefficients of the polynomial function. If the number of sign changes is equal to the number of positive zeros, then the number of positive zeros is equal to the number of sign changes. If the number of sign changes is less than the number of positive zeros by a positive even integer, then the number of positive zeros is less than the number of sign changes by a positive even integer.

Q: How do I determine the number of negative zeros of a polynomial function using Descartes' Rule of Signs?

A: To determine the number of negative zeros of a polynomial function, you need to replace the variable $x$ with $-x$ in the polynomial function and then count the number of sign changes in the coefficients of the resulting polynomial function.

Q: What is the relationship between the number of real zeros and the number of complex zeros of a polynomial function?

A: The number of real zeros is the sum of the number of positive zeros and the number of negative zeros. The number of complex zeros is equal to the total number of zeros minus the number of real zeros.

Q: Can I use Descartes' Rule of Signs to determine the exact number of zeros of a polynomial function?

A: No, Descartes' Rule of Signs can only be used to determine the possible combinations of positive, negative, and complex zeros of a polynomial function. It cannot be used to determine the exact number of zeros.

Q: What are some common mistakes to avoid when using Descartes' Rule of Signs?

A: Some common mistakes to avoid when using Descartes' Rule of Signs include:

• Counting the number of sign changes incorrectly
• Failing to replace the variable $x$ with $-x$ when determining the number of negative zeros
• Not considering the possibility of complex zeros

Q: Can I use Descartes' Rule of Signs with polynomial functions of any degree?

A: Yes, Descartes' Rule of Signs can be used with polynomial functions of any degree. However, the rule may not be as useful for polynomial functions of high degree.

Q: Are there any other methods for determining the zeros of a polynomial function?

A: Yes, there are other methods for determining the zeros of a polynomial function, including the Rational Root Theorem and the use of numerical methods such as the Newton-Raphson method.

Q: Can I use Descartes' Rule of Signs to determine the zeros of a polynomial function with complex coefficients?

A: No, Descartes' Rule of Signs is only applicable to polynomial functions with real coefficients. If the polynomial function has complex coefficients, then Descartes' Rule of Signs cannot be used.

Conclusion

In conclusion, Descartes' Rule of Signs is a useful tool for determining the possible combinations of positive, negative, and complex zeros of a polynomial function. However, it is essential to understand the limitations of the rule and to use it in conjunction with other methods for determining the zeros of a polynomial function.