Symmetric functions/odd even or neither

In summary, symmetric functions are mathematical functions that remain unchanged when variables are swapped, known as "commutativity". To determine if a function is symmetric, it must be written as a polynomial in terms of the elementary symmetric polynomials. Odd and even functions are types of symmetric functions with different types of symmetry. A function cannot be both odd and even. Symmetric functions have various applications in science and mathematics, including in describing the symmetry of physical systems and in coding theory and cryptography.
  • #1
schlynn
88
0

Homework Statement


I am supposed to find out if this function is symmetric with reference to the y-axis or reference to the origin.
The function is
F(x)=4x^2/(x^3+x)

Homework Equations



These are how to know if even or odd
A(-x)^even power = ax^even power
A(-x)^odd power = -ax^odd power

The Attempt at a Solution


I think that to solve these u change x to -x in the function right? So I got...
F(-x)=4-x^2/(-x^3-x)
To
F(-x)=4+x/(-x-x)
To
F(-x)=4+x/-2x
To
F(-x)=2+x/-x
To
-2

But now what, how do I tell if it's odd even or neither?? Did I even do the math right?
 
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  • #2
schlynn said:

Homework Statement


I am supposed to find out if this function is symmetric with reference to the y-axis or reference to the origin.
The function is
F(x)=4x^2/(x^3+x)

Homework Equations



These are how to know if even or odd
A(-x)^even power = ax^even power
A(-x)^odd power = -ax^odd power
These equations aren't what you use to determine the evenness or oddness of a function.
If f(-x) = f(x) for all x in the domain of f, f is an even function.
If f(-x) = -f(x) for all x in the domain of f, f is an odd function.
schlynn said:

The Attempt at a Solution


I think that to solve these u change x to -x in the function right? So I got...
F(-x)=4-x^2/(-x^3-x)
No, you need some parentheses here.
F(-x) = 4(-x)^2/((-x)^3 + (-x))
= 4x^2/(-x^3 - x)
= -(4x^2)/(x^3 + x)
= ?
schlynn said:
To
F(-x)=4+x/(-x-x)
To
F(-x)=4+x/-2x
To
F(-x)=2+x/-x
To
-2
What are you doing here? You can't get the first of the four lines from what you started with, and the third line doesn't follow from the second, and the fourth doesn't follow from the third.
schlynn said:
But now what, how do I tell if it's odd even or neither?? Did I even do the math right?
 
  • #3
In general, a function is Even if
[tex] F(x) = F(-x) [/tex]
and a function is Odd if
[tex] F(x) = -F(-x) [/tex]

So consider in your case
[tex] F(x) = -\frac{x^2}{x^3+x} [/tex]

Look now at [tex] F(-x) [/tex]:

[tex] F(-x) = -\frac{(-x)^2}{(-x)^3+(-x)} [/tex]
[tex] = -\frac{x^2}{-x^3-x} [/tex]
[tex] = \frac{x^2}{x^3+x} [/tex]
[tex] = -F(x) [/tex]

So your function is Odd.

Another approach is to treat it as a product or quotient of even or odd functions

Odd function * Odd function = Even function
Even * Even = Even
Even * Odd = Odd
Odd * Even = Odd

Likewise
Odd / Odd = Even
Even / Even = Even
Even / Odd = Odd (this is your case)
Odd / Even = Odd
 

1. What are symmetric functions?

Symmetric functions are mathematical functions that remain unchanged when variables are swapped. In other words, the value of the function does not change when the order of the variables is rearranged. This property is also known as "commutativity".

2. How can you tell if a function is symmetric?

A function is symmetric if it can be written as a polynomial in terms of the elementary symmetric polynomials. These polynomials are symmetric in nature and represent the sum, product, and power of the variables in a function.

3. What is the relationship between symmetric functions and odd/even functions?

Odd and even functions are types of symmetric functions. An odd function is symmetric about the origin, meaning it has rotational symmetry of 180 degrees. An even function is symmetric about the y-axis, meaning it has reflectional symmetry.

4. Can a function be both odd and even?

No, a function cannot be both odd and even. An odd function must have a zero at the origin, while an even function must have a zero at every point where the function is defined. These conditions are contradictory, so a function cannot satisfy both at the same time.

5. Why are symmetric functions important in science and mathematics?

Symmetric functions have many applications in various fields of science and mathematics. They are used in algebraic geometry, number theory, combinatorics, and physics. In science, symmetric functions are used to describe the symmetry of physical systems, such as crystals and molecules. They also have important applications in coding theory and cryptography.

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