x2 Solve the initial value problem yy' + x = √√x² + y² with y(4): To solve this, we should use the substitution u = help (formulas) = - -√20. u' = help (formulas) Enter derivatives using prime notation (e.g., you would enter y' for dy -). dx After the substitution above, we obtain the following linear differential equation in x, u, ☐ help (equations) ป. The solution to the original initial value problem is described by the following equation in x, y. ☐ help (equations) Book: Section 1.5 of Notes on Diffy Qs
x2 Solve the initial value problem yy' + x = √√x² + y² with y(4): To solve this, we should use the substitution u = help (formulas) = - -√20. u' = help (formulas) Enter derivatives using prime notation (e.g., you would enter y' for dy -). dx After the substitution above, we obtain the following linear differential equation in x, u, ☐ help (equations) ป. The solution to the original initial value problem is described by the following equation in x, y. ☐ help (equations) Book: Section 1.5 of Notes on Diffy Qs
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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Transcribed Image Text:x2
Solve the initial value problem yy' + x = √√x² + y² with y(4):
To solve this, we should use the substitution
u = help (formulas)
=
-
-√20.
u' =
help (formulas)
Enter derivatives using prime notation (e.g., you would enter y' for
dy
-).
dx
After the substitution above, we obtain the following linear differential equation in x, u,
☐ help (equations)
ป.
The solution to the original initial value problem is described by the following equation in x, y.
☐ help (equations)
Book: Section 1.5 of Notes on Diffy Qs
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