3) A 2nd-order Lagrange Interpolating Polynomial is to be fit to the following data points:(1)-1,1(2)4, 1(3)-9....
4. For the following table, answer the questions. (1) Find the cubic Newton’s interpolating polynomial using the first four data points and estimate the function value at x=2.5 with the interpolating polynomial. (2) Find the quartic Newton’s interpolating polynomial using the five data points and estimate the function value at x=2.5 with the interpolating polynomial. (3) Find the bases functions of Lagrange interpolation, Li(x) (i=1,2,…,5), and estimate the function value at x=2.5 with the Lagrange interpolating polynomial. 3 5 1...
Using Lagrange interpolation, find degree two interpolating polynomial if following points are known (0, 1, 5), (2, 0, −3), (1, 2, 8), (−2, −1, 10), (−1, 0, 5
Using Lagrange interpolation, find degree two interpolating polynomial if following points are known (0, 1, 5), (2, 0, −3), (1, 2, 8), (−2, −1, 10), (−1, 0, 5) (2,3,1)
Consider the following set of data x f(x) 3 6 4 3 5 8 1. Use and order Newton polynomial to find f (4.5). 2. Use and order Lagrange polynomial to find f (4.5). You should get the same answer using both methods they are just different representations of a quadratic (i.e., 2nd order) interpolating polynomial.
Write an equation for the polynomial graphed below 2 1,1 1 2 3 4 -5 -2 -3 Preview Points possible: 1 Unlimited attempts Post this question to forum Submit earch Write an equation for the polynomial graphed below 2 1,1 1 2 3 4 -5 -2 -3 Preview Points possible: 1 Unlimited attempts Post this question to forum Submit earch
3. (30 points) Let f(x) = 1/x and data points Zo = 2, x,-3 and x2 = 4. Note that you can use the abscissae to find the corresponding ordinates (a) (8 points) Find by hand the Lagrange form, the standard form, and the Newton form of the interpolating polynomial p2(x) of f(x) at the given points. State which is which! Then, expand out the Newton and Lagrange form to verify that they agree with the standard form of p2...
Problem 2. Given the data points (xi. yi), with xi 2 02 4 yil 5 1 1.25 find the following interpolating polynomials, and use MATLAB to graph both the interpolating polynomials and the data points: a) The piecewise linear Lagrange interpolating polynomialx) b) The piecewise quadratic Lagrange interpolating polynomial q(x) c) Newton's divided difference interpolation pa(x) of degree s 4 Problem 2. Given the data points (xi. yi), with xi 2 02 4 yil 5 1 1.25 find the following...
Let (xi , f(xi)), i = 0, . . . , 3, be data points, where xi = i + 2, for i = 0, . . . , 3. Given the divided differences f[x0] = 1, f[x0, x1] = 2, f[x0, x1, x2] = −7, f[x0, x1, x2, x3] = 9, add the data point (0, 3), find a Newton form for the Lagrange polynomial interpolating all 5 data points. 3. (25 pts) Let (r,, f()), 0,3, be data...
Exercise 5.10. Consider the set of n + 2 points: (1,1),(2, 1), (3,2), (3,2),...,(3,2) Suppose you wish to best-fit these to a line y = mx + b using least-squares. (a) Write down the corresponding matrix equation. (b) Solve for using the method of least squares. Make sure you simplify: the answer should not be complicated. (c) Find limin (d) The line corresponding to your answer in (c) passes through (3,2). Why does this make sense?
PLEASE SOLVE THE WHOLE QUESTION Numerical method I. 20 points. USE 3 DECIMAL PLACES IN ALL CALCULATIONS. Given the following data, calculate f(2) using Newton's Interpolating polynomial of order 1, order 2 and order 3. What is the true error in each case if the true value of the function atx2is 507 100 5260 Solution: 20 과 260 Write your final answers in the table shown below: Description O Order 1 Order 2 Order 3 True error, % I. 20...