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Give an example of an odd degree polynomial but is NOT an odd function

Give an example of an odd degree polynomial but is NOT an odd function-example-1
User Siyavash
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1 Answer

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Ok, so

We want to find an odd degree polynomial but is NOT an odd function.

This polynomial could be:


x^3+2x^2-5x

This is an odd degree polynomial because the highest degree is 3 which is an odd number.

Now, we're going to check that this isn't an odd function.

An odd function is supposed to satisfy that:


f(-x)=-f(x)

So, we're going to check this with our example:


\begin{gathered} f(-x)=(-x)^3+2(-x)^2-5(-x) \\ f(-x)=-x^3+2x^2+5x \end{gathered}

Now, let's make - f(x):


-f(x)=-x^3-2x^2+5x

As you can see, these expressions aren't the same.


f(-x)\\e-f(x)

Therefore, the function is not odd.

User ElementalVoid
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