Writing A Polynomial Function Given An Irrational RootSuppose One Of The Roots Of The Polynomial Function Is Irrational. The Roots Of The Function Are \[$2\$\], \[$\sqrt{3}\$\], And \[$5\$\]. Write The Equation For This

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Introduction

In algebra, a polynomial function is a mathematical expression consisting of variables and coefficients combined using only addition, subtraction, and multiplication. When given the roots of a polynomial function, we can write the equation of the function using the factored form. In this article, we will discuss how to write a polynomial function given an irrational root.

Understanding Irrational Roots

An irrational root is a root that cannot be expressed as a finite decimal or fraction. In other words, it is a root that is not a rational number. The roots of a polynomial function can be rational or irrational. In this case, we are given that one of the roots is irrational, specifically 3{\sqrt{3}}.

The Factor Theorem

The factor theorem states that if f(a)=0{f(a) = 0}, then (xβˆ’a){(x - a)} is a factor of the polynomial function f(x){f(x)}. In other words, if we know that a certain value of x{x} makes the polynomial function equal to zero, then we can write the polynomial function as a product of the factor (xβˆ’a){(x - a)} and another polynomial function.

Writing the Polynomial Function

Given the roots of the polynomial function, we can write the equation of the function using the factored form. The factored form of a polynomial function is a product of linear factors, where each factor corresponds to a root of the function. In this case, we are given that the roots of the polynomial function are 3{\sqrt{3}}, βˆ’2{-2}, and 5{5}.

Step 1: Write the Linear Factors

To write the polynomial function, we need to write the linear factors corresponding to each root. The linear factor corresponding to a root a{a} is (xβˆ’a){(x - a)}. Therefore, the linear factors corresponding to the roots 3{\sqrt{3}}, βˆ’2{-2}, and 5{5} are:

  • (xβˆ’3){(x - \sqrt{3})}
  • (x+2){(x + 2)}
  • (xβˆ’5){(x - 5)}

Step 2: Multiply the Linear Factors

To write the polynomial function, we need to multiply the linear factors together. The product of the linear factors is:

(xβˆ’3)(x+2)(xβˆ’5){(x - \sqrt{3})(x + 2)(x - 5)}

Step 3: Simplify the Expression

To simplify the expression, we can multiply the factors together using the distributive property. The distributive property states that for any numbers a{a}, b{b}, and c{c}, a(b+c)=ab+ac{a(b + c) = ab + ac}.

(xβˆ’3)(x+2)(xβˆ’5)=(x2+2xβˆ’23)(xβˆ’5){(x - \sqrt{3})(x + 2)(x - 5) = (x^2 + 2x - 2\sqrt{3})(x - 5)}

=x3βˆ’5x2+2x2βˆ’10xβˆ’23x+103{= x^3 - 5x^2 + 2x^2 - 10x - 2\sqrt{3}x + 10\sqrt{3}}

=x3βˆ’3x2βˆ’12x+103{= x^3 - 3x^2 - 12x + 10\sqrt{3}}

Conclusion

In this article, we discussed how to write a polynomial function given an irrational root. We used the factored form of a polynomial function and the factor theorem to write the equation of the function. We also simplified the expression by multiplying the factors together using the distributive property. The final answer is a polynomial function of degree 3, with the equation:

f(x)=x3βˆ’3x2βˆ’12x+103{f(x) = x^3 - 3x^2 - 12x + 10\sqrt{3}}

Example Use Case

Suppose we want to find the value of the polynomial function at x=2{x = 2}. We can plug in x=2{x = 2} into the equation of the function:

f(2)=(2)3βˆ’3(2)2βˆ’12(2)+103{f(2) = (2)^3 - 3(2)^2 - 12(2) + 10\sqrt{3}}

=8βˆ’12βˆ’24+103{= 8 - 12 - 24 + 10\sqrt{3}}

=βˆ’28+103{= -28 + 10\sqrt{3}}

Therefore, the value of the polynomial function at x=2{x = 2} is βˆ’28+103{-28 + 10\sqrt{3}}.

Tips and Tricks

  • When writing a polynomial function given an irrational root, make sure to use the factored form of the function.
  • Use the factor theorem to write the linear factors corresponding to each root.
  • Multiply the linear factors together using the distributive property to simplify the expression.
  • Be careful when simplifying the expression, as it may involve irrational numbers.

Frequently Asked Questions

  • Q: What is the factored form of a polynomial function? A: The factored form of a polynomial function is a product of linear factors, where each factor corresponds to a root of the function.
  • Q: How do I write the linear factors corresponding to each root? A: Use the factor theorem to write the linear factors corresponding to each root.
  • Q: How do I simplify the expression? A: Multiply the linear factors together using the distributive property to simplify the expression.

Conclusion

In conclusion, writing a polynomial function given an irrational root involves using the factored form of the function and the factor theorem to write the linear factors corresponding to each root. We then multiply the linear factors together using the distributive property to simplify the expression. The final answer is a polynomial function of degree 3, with the equation:

f(x)=x3βˆ’3x2βˆ’12x+103{f(x) = x^3 - 3x^2 - 12x + 10\sqrt{3}}

We hope this article has been helpful in understanding how to write a polynomial function given an irrational root.

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Introduction

In our previous article, we discussed how to write a polynomial function given an irrational root. We used the factored form of a polynomial function and the factor theorem to write the equation of the function. In this article, we will answer some frequently asked questions about writing a polynomial function given an irrational root.

Q&A

Q: What is the factored form of a polynomial function?

A: The factored form of a polynomial function is a product of linear factors, where each factor corresponds to a root of the function.

Q: How do I write the linear factors corresponding to each root?

A: Use the factor theorem to write the linear factors corresponding to each root. The factor theorem states that if f(a)=0{f(a) = 0}, then (xβˆ’a){(x - a)} is a factor of the polynomial function f(x){f(x)}.

Q: How do I simplify the expression?

A: Multiply the linear factors together using the distributive property to simplify the expression. The distributive property states that for any numbers a{a}, b{b}, and c{c}, a(b+c)=ab+ac{a(b + c) = ab + ac}.

Q: What is the difference between a rational and irrational root?

A: A rational root is a root that can be expressed as a finite decimal or fraction, while an irrational root is a root that cannot be expressed as a finite decimal or fraction.

Q: How do I determine if a root is rational or irrational?

A: To determine if a root is rational or irrational, try to express it as a finite decimal or fraction. If it cannot be expressed as a finite decimal or fraction, then it is an irrational root.

Q: Can I have multiple irrational roots in a polynomial function?

A: Yes, you can have multiple irrational roots in a polynomial function. In fact, it is possible to have a polynomial function with only irrational roots.

Q: How do I find the value of a polynomial function at a given point?

A: To find the value of a polynomial function at a given point, plug the value of the point into the equation of the function.

Q: What is the degree of a polynomial function?

A: The degree of a polynomial function is the highest power of the variable in the function. For example, the degree of the polynomial function f(x)=x3βˆ’3x2βˆ’12x+103{f(x) = x^3 - 3x^2 - 12x + 10\sqrt{3}} is 3.

Q: Can I have a polynomial function with a degree of 0?

A: Yes, you can have a polynomial function with a degree of 0. A polynomial function with a degree of 0 is a constant function, such as f(x)=5{f(x) = 5}.

Tips and Tricks

  • When writing a polynomial function given an irrational root, make sure to use the factored form of the function.
  • Use the factor theorem to write the linear factors corresponding to each root.
  • Multiply the linear factors together using the distributive property to simplify the expression.
  • Be careful when simplifying the expression, as it may involve irrational numbers.
  • Make sure to check your work by plugging in the roots of the function to ensure that the function is equal to zero.

Example Use Case

Suppose we want to find the value of the polynomial function at x=2{x = 2}. We can plug in x=2{x = 2} into the equation of the function:

f(2)=(2)3βˆ’3(2)2βˆ’12(2)+103{f(2) = (2)^3 - 3(2)^2 - 12(2) + 10\sqrt{3}}

=8βˆ’12βˆ’24+103{= 8 - 12 - 24 + 10\sqrt{3}}

=βˆ’28+103{= -28 + 10\sqrt{3}}

Therefore, the value of the polynomial function at x=2{x = 2} is βˆ’28+103{-28 + 10\sqrt{3}}.

Conclusion

In conclusion, writing a polynomial function given an irrational root involves using the factored form of the function and the factor theorem to write the linear factors corresponding to each root. We then multiply the linear factors together using the distributive property to simplify the expression. The final answer is a polynomial function of degree 3, with the equation:

f(x)=x3βˆ’3x2βˆ’12x+103{f(x) = x^3 - 3x^2 - 12x + 10\sqrt{3}}

We hope this article has been helpful in understanding how to write a polynomial function given an irrational root.

Frequently Asked Questions

  • Q: What is the factored form of a polynomial function? A: The factored form of a polynomial function is a product of linear factors, where each factor corresponds to a root of the function.
  • Q: How do I write the linear factors corresponding to each root? A: Use the factor theorem to write the linear factors corresponding to each root.
  • Q: How do I simplify the expression? A: Multiply the linear factors together using the distributive property to simplify the expression.

Further Reading

  • For more information on polynomial functions, see our article on "Polynomial Functions: A Comprehensive Guide".
  • For more information on the factor theorem, see our article on "The Factor Theorem: A Guide to Factoring Polynomial Functions".
  • For more information on simplifying expressions, see our article on "Simplifying Expressions: A Guide to Algebraic Manipulation".