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1. Solve for y3 using the method of successive approximation. dy = x + y; y(1) = 1 dx ANS: y3 = 1+ 2(x – 1) + (x – 1)² +(x – 1)³ +(x – 1)* 2

1. Solve for y3 using the method of successive approximation. dy = x + y; y(1) = 1 dx ANS: y3 = 1+ 2(x – 1) + (x – 1)² +(x – 1)³ +(x – 1)* 2

Algebra & Trigonometry with Analytic Geometry
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter5: Inverse, Exponential, And Logarithmic Functions
Section: Chapter Questions
Problem 18T
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1. Solve for y3 using the method of successive approximation. dy = x + y; y(1) = 1 dx ANS: y3 = 1+ 2(x – 1) + (x – 1)² +(x – 1)³ +(x – 1)* 2
Transcribed Image Text:1. Solve for y3 using the method of successive approximation. dy = x + y; y(1) = 1 dx ANS: y3 = 1+ 2(x – 1) + (x – 1)² +(x – 1)³ +(x – 1)* 2
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