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e*dy+(3ye* – 2x}dx= 0 1. е

e*dy+(3ye* – 2x}dx= 0 1. е

Advanced Engineering Mathematics
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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L Linear equation of order one. e*dy+* – 2x}tx = 0 (3 ye 2x dx =0 2. dy+(y tan x-cosxdx=D0 II. Integrating factors found by inspection. 1. y-ycos yldy= 0 y sin ydx+ x(sin y(x* – y² \dx+ x(x* +y² \dy = 0 3D0 2. III. Determination of integrating factors. (2y² +3xy – 2y+6x dx+x(x+2y–1)dy = 0 %3D 1. 2y(x² – y + x kdx + (x² – 2 y kly = 0 -2ykdy 0 %3D 2. IV. Substitution Suggested by the Equation 1. (2x+ y dx-3(2.x+ y +4)ly = 0 2. sin y(sin y + x\dx+2x¯ cos vdy= 0
Transcribed Image Text:L Linear equation of order one. e*dy+* – 2x}tx = 0 (3 ye 2x dx =0 2. dy+(y tan x-cosxdx=D0 II. Integrating factors found by inspection. 1. y-ycos yldy= 0 y sin ydx+ x(sin y(x* – y² \dx+ x(x* +y² \dy = 0 3D0 2. III. Determination of integrating factors. (2y² +3xy – 2y+6x dx+x(x+2y–1)dy = 0 %3D 1. 2y(x² – y + x kdx + (x² – 2 y kly = 0 -2ykdy 0 %3D 2. IV. Substitution Suggested by the Equation 1. (2x+ y dx-3(2.x+ y +4)ly = 0 2. sin y(sin y + x\dx+2x¯ cos vdy= 0
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