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Polynomials Functions
š š = š š š š + š šāš š šāš +ā¦+ š š
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Polynomial Expressions
A polynomial is an algebraic expression that is the sum of terms involving variables that has whole number exponents In standard form, it is written in descending order of the degrees.
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Standard Form of Polynomial Functions
A polynomial function in standard form looks like š š = š š š š + š šāš š šāš +ā¦+ š š where š š are Reals coefficients and n are whole numbers. For example, š š„ =2 š„ 3 +4 š„ 2 ā5š„+7 represents a cubic function in standard form because the highest exponent is 3 followed by the quadratic term, linear term, and then the constant. In polynomials, the constant represents the y-intercept of the polynomial graph.
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Examples of Polynomials Polynomials with 4 terms
Monomial (1 term) Binomial ( 2 terms) Trinomial (3 terms) Polynomials with 4 terms 2 2š„+5 š„ 2 +5š„ ā4 š„ 5 +5 š„ 2 +3š„+1 ā 2 š„ 3 5 5 š„ 3 ā4 š„ 2 9 š„ 3 ā4 š„ 2 +5 š„ 3 ā š„ 2 +š„ ā1
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NOT Examples of Polynomials
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Factored Form of Polynomials
Polynomials may be written in factored form to explicitly show roots of the polynomials, A.K.A. the x-intercepts of the polynomial function. f(x)=a(x-x1)(x-x2)(x-x3) where x1, x2, and x3 are the x-intercepts of the function
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A Turning Point of a polynomial is a point where there is a local max or a local min.
polynomial of degree n can have at most nā1 turning points.
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What is the least degree of the following polynomial functions?
B) C)
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End Behaviors Examine the sign and the degree of the leading term to know how polynomial graph behaves as it moves further left and further right.
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Graphing Factored Form
Directions: Find the x-intercepts by putting f(x)= 0 2) Find the y-intercept by putting x=0 3) Choose multiple x-values to find interpolating points 4) Plot all points and connect them with a smooth curve followed with the expected end-behaviors.
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Graph f(x) = 2(x-3)(x+1)(x-1)
Setting f(x) = 0, we get the x-intercepts 3,-1, and 1 Setting x=0, we get the y-intercept 6. X Y -1.5 -11.25 -1 -0.5 5.25 6 0.5 3.75 1 1.5 -3.75 2 -6 2.5 -5.25 3 3.5 11.25 4 30 Try: f(x) = x(x-3) (x+2)
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Graphing Standard Form
Directions: Find the y-intercept, which is the constant Factor the polynomial (if possible), then find the x-intercepts 3) Choose multiple x-values to find interpolating points 4) Plot all points and connect them with a smooth curve followed with the expected end-behaviors.
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The y-intercept Graph š=āš š š +š Since the y-values shows symmetry about x=0 and there is only one term with the variable in the equation, the graph will behave similar to a parabola. X Y -2 -27 -1.5 -5.125 -1 3 -0.5 4.875 5 0.5 1 1.5 2
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Graph f(x) = 2(x-3)(x+1)(x-1)
Setting f(x) = 0, we get the x-intercepts 3,-1, and 1 Setting x=0, we get the y-intercept 6. X Y -1.5 -11.25 -1 -0.5 5.25 6 0.5 3.75 1 1.5 -3.75 2 -6 2.5 -5.25 3 3.5 11.25 4 30 Try: f(x) = x(x-3) (x+2)
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Determining the Type of Polynomial Function by Table Values
Make sure that X-Values are evenly spaced Are the differences constant? Add 1 to the degree of the polynomial. Continue to take another difference. NO Take the difference of the y-values YES Count the number of time each difference were made. That sum is the degree of the polynomial function.
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Quadratic Function Example
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Determine the Degree of the Polynomial
X -4 -3 -2 -1 1 2 3 4 y -77 -38 -17 -8 -5 7 28 67 a) b) X 1 2 3 4 5 6 7 y 11 16 21 26 31
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