Answer to Question #282947 in Differential Equations for Bumba

Question #282947

Find the integral surface of the linear partial differential equation x(x^2+z)p - y(y^2+z)q = (x^2-y^2)z; p, q has their usual meaning , which contains the straight line. [CO1] *

Expert's answer

Given question is incomplete and incorrect. We assume it as:

Find the integral surface of the linear PDE

x(y²+z)p - y(x²+z)q = (x²-y²)z , which contains the straight line x+y =0 , z=1 .

Solution:

Auxiliary equations are

"{dx\\over x(y^2+z)}={dy \\over -y(x^2+z)}={dz \\over z(x^2-y^2)}"

By Choosing multipliers "x, y, -1," we get

"{xdx+ydy-dz\\over x^2y^2+x^2z-x^2y^2-y^2z-x^2z+y^2z}={xdx+ydy-dz\\over 0}"

Then

"x^2+y^2-2z=C_1"

By Choosing multipliers "1\/x, 1\/y, 1\/z," we get

"{{dx \\over x}+{dx \\over x}+{dz \\over z}\\over y^2+z-x^2-z+x^2-y^2}={{dx \\over x}+{dx \\over x}+{dz \\over z}\\over 0}"

Then

"\\ln(xyz)=\\ln (C_2)"

"xyz=C_2"

Parametric equation of straight line is

"x=t, y=-t, z=1"

Substitute

"t^2+(-t)^2-2(1)=C_1""t(-t)(1)=C_2"

Eliminate "t"

"2t^2-2=C_1""t^2=-C_2"

Then

"-2C_2-2=C_1"

"C_1+2C_2+2=0"

Hence, the integral surface, which contains the straight line

"x^2+y^2-2z+2xyz+2=0"

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Answer to Question #282947 in Differential Equations for Bumba

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