Let P(x) be the Lagrange interpolating polynomial of1f(x) =%3Dat the points xo 0; x1 = 1 and x2 =approximation of f (2) is most nearly:2x2 + 33. If P(x) is used to approximate f(x), then anO 1/10O11/105O 1/1513/290The root of the equation f ()= 0 is found by using the Newton's method. The initial

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Answered: Let P(x) be the Lagrange interpolating…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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How large should n be to guarantee that the Trapezoidal Rule approximation to 14x – 60z? – læ + 3)dx is accurate to within 0.1. 5 n = How large should n be to guarantee that the Simpsons Rule approximation to | (-24 – 14x – 60z? – læ + 3)dx is accurate to within 0.1. n = Hint: Remember your answers should be a whole numbers, and Simpson's Rule requires even values for n
2 1. Consider a polynomial function f(x) = co + C₁ x + c₂x² +...+ cd-1xd-1 + caxd. A. Applying the addition rule, the constant multiple rule, and the power rule for derivatives, we can compute that ƒ'(x) = c₁ + 2c2x + … + (d − 1)cd-1xd-2 + (d)caxd-¹. Explain. B. Following the general outline from Part A, compute the derivatives of each of the following functions: g(x) = 5x³ 10x² + 7x - 11. p(x) = −7x² – 3x² + πx √17. O O 2. Consider the function f(x) = (2x³ – 5x + 1) (3x² − 4). A. Distribute out the product of the two polynomials multiplied in the expression of f and simplify your result to find an equivalent expression for f(x).

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Let P(x) be the Lagrange interpolating polynomial of 1 f(x) = at the points xo = 0; x, = 1 and x = approximation of f (2) is most nearly: 2x2 + 3 3. If P(x) is used to approximate f(x), then an O 1/10 O 11/105 O 1/15 O 13/290