Answered: Use separation of variables to derive…

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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Use the elimination method to find a general solution for the given linear system, where differentiation is with respect to t. dx/dt = 2x - 3y and dy/dt = 3x + 2y. THEN, eliminate x and solve the remaining differential equation for y.
Use the "mixed partials" check to see if the following differential equation is exact. If it is exact find a function F(x, y) whose differential, dF(x, y) is the left hand side of the differential equation. That is, level curves F(x, y) = C are solutions to the differential equation (3e* sin(y) - ly)dx + (-1x - 3e* cos(y))dy = 0 First, if this equation has the form M(x, y)dx + N(x, y)dy = 0: My(x, y) = 1 and N₂(x, y) = If the equation is not exact, enter not exact, otherwise enter in F(x, y) here
Determine which of the following expressions are exact differentials: (a) df = (y + z)dx + (z + y)dy + (x + y)dz (b) df = 2xy dx + 2yz² dy – (1 – x² – 2y²z)dz (c) df =z dx + x dy + y dz (d) df = (x' + 3x³y>z)dx + (y+ 2x'yz)dy + (x'y³)dz

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Use separation of variables to derive ordinary differential equations for the factors X(x) and Y(y) in a product solution u(x,y)= X(x) Y(y) to the partial differential equation: (d/dx)[x(du/dx)]+xy(d2u/dy2) = 0