7.(This one is a gift) Consider a homogeneous differential equation,p(x, y) dx + q(x, y) dy = 0,where the coefficients p(x, y) and q(x, y) satisfy the special homogeneitycondition:p(Ax, Xy) = X®p(x, y);q(Ax, Ay) = X°q(x, y).Explain why it is always possible to express any such homogeneousdifferential equation in the formdyh.Fdx

Answered: Image /qna-images/answer/ec3c16b8-274c-4bbe-b035-59c50d86eb43.jpg

7.(This one is a gift) Consider a homogeneous differential equation, p(x, y) dx + q(x, y) dy = 0, where the coefficients p(x, y) and q(x, y) satisfy the special homogeneity condition: p(Ax, Ay) = X®p(x, y); q(Ax, Ay) = X®q(x, y). Explain why it is always possible to express any such homogeneous differential equation in the form dy F (!) . dx

7.(This one is a gift) Consider a homogeneous differential equation, p(x, y) dx + q(x, y) dy = 0, where the coefficients p(x, y) and q(x, y) satisfy the special homogeneity condition: p(Ax, Ay) = X®p(x, y); q(Ax, Ay) = X®q(x, y). Explain why it is always possible to express any such homogeneous differential equation in the form dy F (!) . dx

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

7.(This one is a gift) Consider a homogeneous differential equation,
p(x, y) dx + q(x, y) dy = 0,
where the coefficients p(x, y) and q(x, y) satisfy the special homogeneity
condition:
p(Ax, Xy) = X®p(x, y);
q(Ax, Ay) = X°q(x, y).
Explain why it is always possible to express any such homogeneous
differential equation in the form
dy
h.
F
dx

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