Roots of Polynomials

Names for roots

Polynomial functions have roots, which are also known as the x-intercepts, zeros, or solutions to the function. These are the "answers" when you factor and solve.

When a polynomial is in factored form, like on the right, we can just set each factor equal to 0 and solve the equation. In simple cases, we just switch the sign of the number in the parentheses.

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Solving a polynomial in factored form

Solve: (x+3)(x-2)(x+7)=0

Just switch the signs of the number in parentheses with x.

so... if x+3 is the factor, x=-3

... if x-2 is the factor, x=2

...if x+7 is the factor, x=-7

...if x is the factor, x=0

​Solve the factored functions on the following slides.

Zeros to Polynomials

We can take the given zeros of a function and write a polynomial in factored form.

Just do the opposite of what you did on the previous slides. We still switch the signs of our numbers, but now we put them with x inside a set of parentheses. For example:

If x=7, our factor is (x-7).

Number of Solutions

​The number of solutions to a function is given by its degree - the highest exponent.

Consider: f(x) = x²-4x+4... the highest exponent is 2, so there are 2 roots or 2 solutions.

If f(x)=x⁵+6x²-2x+1... the highest exponent is 5, so there are 5 roots.

Sometimes, a polynomial has multiple roots at the same zero. When looking at a graph, there is an even multiplicity of the root if the curves bounces off the x-axis and there is an odd multiplicity the root if it crosses the x-axis.

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​Multiplicity

(x-2)⁴(x+3)²

The root 2 has a multiplicity of 4.

The root -3 has a multiplicity of 2.

​Examples

Multiplicity is shown in polynomial form as a degree (exponent). The exponent shows you what multiplicity a root has.

Multiplicity in Polynomials

Simplifying Polynomials

Simplify the polynomial by combining like terms, and write the polynomial in standard form. Classify the polynomial by number of terms and degree.