Consider the following points. (a) Determine the polynomial function of least degree whose graph passes through...
Consider the following points. (-1, 5), (0, 0), (1, 1), (4, 58) (a) Determine the polynomial function of least degree whose graph passes through the given points. p(x) = (b) Sketch the graph of the polynomial function, showing the given points. y 2 3 4 2 3 -10 -20 -20 -30 -40 -40 -60 -50 -601 -80 у BOF у 60 50 60 40 40 30 20 20 10 х 2 3 4 2 3
Find the polynomial function with the given zeros whose graph passes through the given point. Zeros: -3,1,4 Point:(6,180)
(a) Determine the polynomial function of least degree whose graph passes through the given points.
1. Determine the polynomial function whose graph passes through the points (0, 10), (1, 7), (3, -11), and (4, -14). Be sure to include a sketch of the polynomial functions, showing the points. Solve using the Gauss-Jordan method or Gaussian elimination with back substitution. Show the matrix and rovw operation used for each step. 2. The figure below shows the flow of traffic (in vehicles per hour) through a network of streets. 300 200 100 500 YA Y 600 400...
find a polynomial function whose graph passes through(-1,-16)(0,-7)(1,-2)(2,11)
7. (-18.33 Points) DETAILS OSCOLALG1 5.2. 115. Consider the following Determine whether the graph of the function provided is a graph of a polynomial function. polynomial function not a polynomial function If the graph is a polynomial function, determine the number of turning points. (If the graph is not a polynomial function, enter DNE.) If the graph is a polynomial function, determine the number of least possible degree for the function. (Ir the graph is not a polynomial function, Additional...
(3 points) Find a formula for the polynomial of least degree through the points shown in the graph. f(x) = help (formulas) - - -2
Find the polynomial of degree 4 whose graph goes through the points (-3,-194), (-2,-36), (0, 10), (2, 16), and (3, -56) f(x) +10
5. Find a formula for an exponential function whose graph passes through the points (1,3) and (5,40). 6. Consider the function h(x) = 5/12 - 3x (a) For what values of x is the quadratic function f(x) = 12 - 3x2 zero or positive? (b) What can part (a) tell you about h(x)?
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),...