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The Bessel function Jn (x) has the integral representation J₁(x) = = * cos(x sin 0 - ne)do. л Jо Estimate J₁ (4) using the Simpson's 1/3 rule with step length h = π/10, and compare your result with J1(4) = -0.066043, which is accurate to six decimal places. What is the absolute approximate error?

The Bessel function Jn (x) has the integral representation J₁(x) = = * cos(x sin 0 - ne)do. л Jо Estimate J₁ (4) using the Simpson's 1/3 rule with step length h = π/10, and compare your result with J1(4) = -0.066043, which is accurate to six decimal places. What is the absolute approximate error?

Functions and Change: A Modeling Approach to College Algebra (MindTap Course List)
Functions and Change: A Modeling Approach to College Algebra (MindTap Course List)
6th Edition
ISBN:9781337111348
Author:Bruce Crauder, Benny Evans, Alan Noell
Publisher:Bruce Crauder, Benny Evans, Alan Noell
Chapter2: Graphical And Tabular Analysis
Section2.1: Tables And Trends
Problem 1TU: If a coffee filter is dropped, its velocity after t seconds is given by v(t)=4(10.0003t) feet per...
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The Bessel function Jn (x) has the integral representation 1 J₂(x) = = * cos(x sin 0 - nº)do. л Jo Estimate J₁ (4) using the Simpson's 1/3 rule with step length h = π/10, and compare your result with J1(4) = -0.066043, which is accurate to six decimal places. What is the absolute approximate error? Answer: absolute approximate error =
Transcribed Image Text:The Bessel function Jn (x) has the integral representation 1 J₂(x) = = * cos(x sin 0 - nº)do. л Jo Estimate J₁ (4) using the Simpson's 1/3 rule with step length h = π/10, and compare your result with J1(4) = -0.066043, which is accurate to six decimal places. What is the absolute approximate error? Answer: absolute approximate error =
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