[Second Order Equations] How do you solve this question? Theorem 1. By a linear transformation of the independent variables, theequation can be reduced to one of three forms, as follows.(1)Elliptic case: If a12 < a11922, it is reducible toUxx + Uyy +... 0(where... denotes terms of order 1 or 0).(ii) Hyperbolic case: If a²2 > a11922, it is reducible toUxxUyy += 0.1.6 TYPES OF SECOND-ORDER EQUATIONS(iii) Parabolic case: If a 12:= a11922, it is reducible toUxx + = 0(unless a11 = a12 = a22 = 0).29 6. Consider the equation 3uy + xy = 0.(a) What is its type?(b) Find the general solution. (Hint: Substitute v = Uy.)-3x(c) With the auxiliary conditions u(x, 0) = e−³x and uy(x, 0) = 0, doesa solution exist? Is it unique?

Given: In this problem, the given equation is, 3uy+uxy=0 a) To find the type of the given equation.…

6. Consider the equation 3uy + Uxy = 0. (a) What is its type? (b) Find the general solution. (Hint: Substitute v = uy.) (c) With the auxiliary conditions u(x, 0) = e-³x and uy(x, 0) = 0, does a solution exist? Is it unique?

6. Consider the equation 3uy + Uxy = 0. (a) What is its type? (b) Find the general solution. (Hint: Substitute v = uy.) (c) With the auxiliary conditions u(x, 0) = e-³x and uy(x, 0) = 0, does a solution exist? Is it unique?

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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Question

[Second Order Equations] How do you solve this question?

Theorem 1. By a linear transformation of the independent variables, the
equation can be reduced to one of three forms, as follows.
(1)
Elliptic case: If a12 < a11922, it is reducible to
Uxx + Uyy +... 0
(where... denotes terms of order 1 or 0).
(ii) Hyperbolic case: If a²2 > a11922, it is reducible to
UxxUyy +
= 0.
1.6 TYPES OF SECOND-ORDER EQUATIONS
(iii) Parabolic case: If a 12:
= a11922, it is reducible to
Uxx + = 0
(unless a11 = a12 = a22 = 0).
29

6. Consider the equation 3uy + xy = 0.
(a) What is its type?
(b) Find the general solution. (Hint: Substitute v = Uy.)
-3x
(c) With the auxiliary conditions u(x, 0) = e−³x and uy(x, 0) = 0, does
a solution exist? Is it unique?

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