Wize High School Algebra II Textbook (Common Core) > Polynomial Functions

Polynomials

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Basic of Polynomials
A polynomial is an expression consisting of one or more algebraic terms with coefficients, constants, & variables raised to whole-number exponents.

The degree of a polynomial is determined by the value of the greatest exponent. 

The following are examples of polynomials and their degree:
2x2+5xDegree 22a−15a3Degree 3−6y6−4y2Degree 6\begin{array}{rcccl}
2x^2+5x&&&\text{Degree 2}\\\\
\sqrt{2}a-\frac{1}{5}a^3&&&\text{Degree 3}\\\\
-6y^6-4y^2&&&\text{Degree 6}

\end{array}2x2+5x2​a−51​a3−6y6−4y2​​​Degree 2Degree 3Degree 6​

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Types of Polynomials
A monomial is a polynomial consisting of one term 
Example:  x2, 4a, 3xyzx^2,~4a,~3xyzx2, 4a, 3xyz
A binomial is a polynomial consisting of two terms 
Example: 2x−y, 3ab+12x-y,~3a^b+12x−y, 3ab+1
A trinomial is a polynomial consisting of three terms
Example: ax2+bx+cax^2+bx+cax2+bx+c

First Degree Polynomials
y=xy=xy=x
Linear Monomial
     SymmetryPointEven/OddOddX-Intercepts(0,0)Y-Intercepts(0,0)End Behavoiurx → ∞, y →∞x → −∞, y →−∞Min/MaxNoneDomain(−∞,∞)Range(−∞,∞)\begin{array}{|c|c|}\hline\\
\textbf{Symmetry}&\text{Point}\\\\\hline\\
\textbf{Even/Odd}&\text{Odd}\\\\\hline\\
\textbf{X-Intercepts}&(0,0)\\\\\hline\\
\textbf{Y-Intercepts}&(0,0)\\\\\hline\\
\textbf{End Behavoiur}&x~\rightarrow~\infin,~y~\rightarrow\infin\\
&x~\rightarrow~-\infin,~y~\rightarrow-\infin\\\\\hline\\
\textbf{Min/Max}&\text{None}\\\\\hline\\
\textbf{Domain}&(-\infin,\infin)\\\\\hline\\
\textbf{Range}&(-\infin,\infin)\\\\\hline
\end{array}SymmetryEven/OddX-InterceptsY-InterceptsEnd BehavoiurMin/MaxDomainRange​PointOdd(0,0)(0,0)x → ∞, y →∞x → −∞, y →−∞None(−∞,∞)(−∞,∞)​​
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Second Degree Polynomials
y=x2y=x^2y=x2
Quadratic Monomial
        SymmetryLineEven/OddEvenX-Intercepts(0,0)Y-Intercepts(0,0)End Behavoiurx → ∞, y →∞x → −∞, y →∞Min/MaxMin at (0,0)Domain(−∞,∞)Range[0,∞)\begin{array}{|c|c|}\hline\\
\textbf{Symmetry}&\text{Line}\\\\\hline\\
\textbf{Even/Odd}&\text{Even}\\\\\hline\\
\textbf{X-Intercepts}&(0,0)\\\\\hline\\
\textbf{Y-Intercepts}&(0,0)\\\\\hline\\
\textbf{End Behavoiur}&x~\rightarrow~\infin,~y~\rightarrow\infin\\
&x~\rightarrow~-\infin,~y~\rightarrow\infin\\\\\hline\\
\textbf{Min/Max}&\text{Min at}~(0,0)\\\\\hline\\
\textbf{Domain}&(-\infin,\infin)\\\\\hline\\
\textbf{Range}&[0,\infin)\\\\\hline
\end{array}SymmetryEven/OddX-InterceptsY-InterceptsEnd BehavoiurMin/MaxDomainRange​LineEven(0,0)(0,0)x → ∞, y →∞x → −∞, y →∞Min at (0,0)(−∞,∞)[0,∞)​​
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Third Degree Polynomials
y=x3y=x^3y=x3
Cubic Monomial
         SymmetryPointEven/OddOddX-Intercepts(0,0)Y-Intercepts(0,0)End Behavoiurx → ∞, y →∞x → −∞, y →−∞Min/MaxNoneDomain(−∞,∞)Range(−∞,∞)\begin{array}{|c|c|}\hline\\
\textbf{Symmetry}&\text{Point}\\\\\hline\\
\textbf{Even/Odd}&\text{Odd}\\\\\hline\\
\textbf{X-Intercepts}&(0,0)\\\\\hline\\
\textbf{Y-Intercepts}&(0,0)\\\\\hline\\
\textbf{End Behavoiur}&x~\rightarrow~\infin,~y~\rightarrow\infin\\
&x~\rightarrow~-\infin,~y~\rightarrow-\infin\\\\\hline\\
\textbf{Min/Max}&\text{None}\\\\\hline\\
\textbf{Domain}&(-\infin,\infin)\\\\\hline\\
\textbf{Range}&(-\infin,\infin)\\\\\hline
\end{array}SymmetryEven/OddX-InterceptsY-InterceptsEnd BehavoiurMin/MaxDomainRange​PointOdd(0,0)(0,0)x → ∞, y →∞x → −∞, y →−∞None(−∞,∞)(−∞,∞)​​
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Fourth Degree Polynomials
y=x4y=x^4y=x4
Quartic Monomial
        SymmetryLineEven/OddEvenX-Intercepts(0,0)Y-Intercepts(0,0)End Behavoiurx → ∞, y →∞x → −∞, y →∞Min/MaxMin at (0,0)Domain(−∞,∞)Range[0,∞)\begin{array}{|c|c|}\hline\\
\textbf{Symmetry}&\text{Line}\\\\\hline\\
\textbf{Even/Odd}&\text{Even}\\\\\hline\\
\textbf{X-Intercepts}&(0,0)\\\\\hline\\
\textbf{Y-Intercepts}&(0,0)\\\\\hline\\
\textbf{End Behavoiur}&x~\rightarrow~\infin,~y~\rightarrow\infin\\
&x~\rightarrow~-\infin,~y~\rightarrow\infin\\\\\hline\\
\textbf{Min/Max}&\text{Min at}~(0,0)\\\\\hline\\
\textbf{Domain}&(-\infin,\infin)\\\\\hline\\
\textbf{Range}&[0,\infin)\\\\\hline
\end{array}SymmetryEven/OddX-InterceptsY-InterceptsEnd BehavoiurMin/MaxDomainRange​LineEven(0,0)(0,0)x → ∞, y →∞x → −∞, y →∞Min at (0,0)(−∞,∞)[0,∞)​​
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Fifth Degree Polynomial
y=x5y=x^5y=x5
Quintic Monomial
        SymmetryPointEven/OddOddX-Intercepts(0,0)Y-Intercepts(0,0)End Behavoiurx → ∞, y →∞x → −∞, y →−∞Min/MaxNoneDomain(−∞,∞)Range(−∞,∞)\begin{array}{|c|c|}\hline\\
\textbf{Symmetry}&\text{Point}\\\\\hline\\
\textbf{Even/Odd}&\text{Odd}\\\\\hline\\
\textbf{X-Intercepts}&(0,0)\\\\\hline\\
\textbf{Y-Intercepts}&(0,0)\\\\\hline\\
\textbf{End Behavoiur}&x~\rightarrow~\infin,~y~\rightarrow\infin\\
&x~\rightarrow~-\infin,~y~\rightarrow-\infin\\\\\hline\\
\textbf{Min/Max}&\text{None}\\\\\hline\\
\textbf{Domain}&(-\infin,\infin)\\\\\hline\\
\textbf{Range}&(-\infin,\infin)\\\\\hline
\end{array}SymmetryEven/OddX-InterceptsY-InterceptsEnd BehavoiurMin/MaxDomainRange​PointOdd(0,0)(0,0)x → ∞, y →∞x → −∞, y →−∞None(−∞,∞)(−∞,∞)​​

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Example: Basics of Polynomials
Let f(x)=x(x−1)(x−2) f(x)=x(x-1)(x-2)~f(x)=x(x−1)(x−2)  be shown below:


Identify the following:
Degree
End Behaviour 
X-Intercepts
Domain & Range

Degree: 3

End Behaviour: 
x→∞, y→∞x\rightarrow\infty,~y\rightarrow\inftyx→∞, y→∞
x→−∞, y→−∞x\rightarrow-\infin,~y\rightarrow-\infinx→−∞, y→−∞

xxx-Intercepts: x = 0, 1, 2

Domain: (−∞,∞)(-\infin,\infin)(−∞,∞)

Range: (−∞,∞)(-\infin,\infin)(−∞,∞)

Which of the following are polynomials?

A) −3x6+5x−3-3x^6+5x-3−3x6+5x−3  

B) 3xx3+5x−7x3x\sqrt{x^3}+5x-\frac{7}{x}3xx3​+5x−x7​ 

C) 15x8+x4−9\frac{1}{5}x^8+\frac{x}{4}-951​x8+4x​−9 

D) -105

(7x+10)(x4−3x2+x−19)(7x+10)(x^4-3x^2+x-19)(7x+10)(x4−3x2+x−19) 

103x−1+x210^{3x-1}+x^2103x−1+x2

I don't know

Extra Practice

Basics of Polynomials

Practice: Basics of Polynomials
Which of the following are polynomials?

Basics of Polynomials

Practice: Basics of Polynomials
Which of the following are polynomials?

Basics of Polynomials

Practice: Basics of Polynomials
Which of the following are polynomials?