A hyperbolic PDE in (x, y) can be written in canonical form, Pen = f(n. 0.03, Pn) by using the characteristic curves as the transformed coordinates (x, y) and n(x, y). That is, we let =y-λ₁x n=y=λ₂x apxx + boxy + covy + dox + eoy + fo = g(x, y) (2.32) (2.33) (2.18a)
A hyperbolic PDE in (x, y) can be written in canonical form, Pen = f(n. 0.03, Pn) by using the characteristic curves as the transformed coordinates (x, y) and n(x, y). That is, we let =y-λ₁x n=y=λ₂x apxx + boxy + covy + dox + eoy + fo = g(x, y) (2.32) (2.33) (2.18a)
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter11: Topics From Analytic Geometry
Section: Chapter Questions
Problem 33RE
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