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each graph fill out thebchart by identifying the zeros and linear
factorization. Determine the degree,...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and all turning points are represented on the graph 7) 7) 2 a. Determine the minimum degree of the polynomial based on the number of turning points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even c. Approximate the real zeros of the function, and determine if their...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and all turning points are represented on the graph. 7) 7) - 4+ 3+ a. Determine the minimum degree of the polynomial based on the number of tuming points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even. c. Approximate the real zeros of the function, and determine...
Given the graph of a polynomial function, determine the minimum possible degree, the zeros and if...
Given the graph of a polynomial function, determine the minimum possible degree, the zeros and if the multiplicity of the zeros is even or odd. Assume the end behavior and all turning points are represented on the graph. གནད་ a. Determine the minimum degree of the polynomial based on the number of turning points. b. Approximate the real zeros of the function, and determine if their multiplicity is odd or even O a. Minimum degree 4 b. -4 (even multiplicity),...
8) 8) 41 3+ 2+ + 3-4-5 org 2+ 3+ 4+ a. Determine the minimum degree...
8) 8) 41 3+ 2+ + 3-4-5 org 2+ 3+ 4+ a. Determine the minimum degree of the polynomial based on the number of turning points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even. c. Approximate the real zeros of the function, and determine if their multiplicity is odd or even. A) a. Minimum degree 2 b. Lending coefficient positive degree even...
1. Given the graph below: a. Find all possible zeros. Indicate whether the zeros are odd...
1. Given the graph below: a. Find all possible zeros. Indicate whether the zeros are odd or even multiplicity with reasoning. (4 points) b. Find a possible polynomial f(x) with the least degree from the given graph. Leave your answer in linear factors form. (You do not need to multiply out.) Be sure to find the leading coefficient with the given point "A" on the graph. (6 points)
What does the graph of the polynomial function tell you about the (A) sign of the...
What does the graph of the polynomial function tell you about the (A) sign of the leading coefficient, (B) the degree of the function, and (C) the number of real zeros? Explain your answers! A. OThe sign of the leading coefficient is negative because the end behavior is from an equation of odd degree and negative leading coefficient OThe sign of the leading coefficient is positive because the end behavior is from an equation of odd degree and positive leading...
3. Identify (circle) the degree and leading coefficient for each graph. Degree (1/2 Pt): Degree (1/2...
3. Identify (circle) the degree and leading coefficient for each graph. Degree (1/2 Pt): Degree (1/2 Pt): Degree (1/2 Pt) Degree (1/2 Pt): Odd Even Odd v Odd Even Odd Even Leading Coefficient (1/2 Pt): Leading Coefficient (1/2 t): Leading Coefficient (1/2 Pt): Leading Coefficient (1/2 Pt): PositiveNegative Positiveegative PositiveNegative Positive Negative 6 pts
Given f (x) = x4 + 5x3 – 24x2, find all real zeros off and determine...
Given f (x) = x4 + 5x3 – 24x2, find all real zeros off and determine whether the multiplicity of each zero is even or odd. Then determine the maximum number of turning points of the graph off.
Consider the following. g(x) = 3x(x2 - 4x – 2) (a) Find all real zeros of...
Consider the following. g(x) = 3x(x2 - 4x – 2) (a) Find all real zeros of the polynomial function. (Enter your answers as a comma-separated list. If there is no solution, enter NO SOLUTION.) 0, x= 2 +V6 , x = 2 – V6 x X = (b) Determine whether the multiplicity of each zero is even or odd. smallest x-value even multiplicity even multiplicity largest x-value even multiplicity (c) Determine the maximum possible number of turning points of the...
w the graph of a sixth taph of a sixth degree polynomial below, as the following...
w the graph of a sixth taph of a sixth degree polynomial below, as the following a. Is the leading coefficient positive or negative? b. State the end behavior of the function: as + 0, y → ? and as 1 -0, y →? c. State each zero (-intercept) in point form with its multiplicity. Note the overall degree of the polynomial is stated above. d. State the y-intercept in point form. e. Find a possible formula for the graph...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and all turning points are represented on the graph 7) 7) 2 a. Determine the minimum degree of the polynomial based on the number of turning points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even c. Approximate the real zeros of the function, and determine if their...
Determine if the graph can represent a polynomial function. If so, assume the end behavior and all turning points are represented on the graph. 7) 7) - 4+ 3+ a. Determine the minimum degree of the polynomial based on the number of tuming points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even. c. Approximate the real zeros of the function, and determine...
Given the graph of a polynomial function, determine the minimum possible degree, the zeros and if the multiplicity of the zeros is even or odd. Assume the end behavior and all turning points are represented on the graph. གནད་ a. Determine the minimum degree of the polynomial based on the number of turning points. b. Approximate the real zeros of the function, and determine if their multiplicity is odd or even O a. Minimum degree 4 b. -4 (even multiplicity),...
8) 8) 41 3+ 2+ + 3-4-5 org 2+ 3+ 4+ a. Determine the minimum degree of the polynomial based on the number of turning points. b. Determine whether the leading coefficient is positive or negative based on the end behavior and whether the degree of the polynomial is odd or even. c. Approximate the real zeros of the function, and determine if their multiplicity is odd or even. A) a. Minimum degree 2 b. Lending coefficient positive degree even...
1. Given the graph below: a. Find all possible zeros. Indicate whether the zeros are odd or even multiplicity with reasoning. (4 points) b. Find a possible polynomial f(x) with the least degree from the given graph. Leave your answer in linear factors form. (You do not need to multiply out.) Be sure to find the leading coefficient with the given point "A" on the graph. (6 points)
What does the graph of the polynomial function tell you about the (A) sign of the leading coefficient, (B) the degree of the function, and (C) the number of real zeros? Explain your answers! A. OThe sign of the leading coefficient is negative because the end behavior is from an equation of odd degree and negative leading coefficient OThe sign of the leading coefficient is positive because the end behavior is from an equation of odd degree and positive leading...
3. Identify (circle) the degree and leading coefficient for each graph. Degree (1/2 Pt): Degree (1/2 Pt): Degree (1/2 Pt) Degree (1/2 Pt): Odd Even Odd v Odd Even Odd Even Leading Coefficient (1/2 Pt): Leading Coefficient (1/2 t): Leading Coefficient (1/2 Pt): Leading Coefficient (1/2 Pt): PositiveNegative Positiveegative PositiveNegative Positive Negative 6 pts
Given f (x) = x4 + 5x3 – 24x2, find all real zeros off and determine whether the multiplicity of each zero is even or odd. Then determine the maximum number of turning points of the graph off.
Consider the following. g(x) = 3x(x2 - 4x – 2) (a) Find all real zeros of the polynomial function. (Enter your answers as a comma-separated list. If there is no solution, enter NO SOLUTION.) 0, x= 2 +V6 , x = 2 – V6 x X = (b) Determine whether the multiplicity of each zero is even or odd. smallest x-value even multiplicity even multiplicity largest x-value even multiplicity (c) Determine the maximum possible number of turning points of the...
w the graph of a sixth taph of a sixth degree polynomial below, as the following a. Is the leading coefficient positive or negative? b. State the end behavior of the function: as + 0, y → ? and as 1 -0, y →? c. State each zero (-intercept) in point form with its multiplicity. Note the overall degree of the polynomial is stated above. d. State the y-intercept in point form. e. Find a possible formula for the graph...
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