1) xy"+xy'-y=x² +1,x>0 The differential equation is given.a) If one of the linear independent solutions of the homogeneouspart of the given differential equation is y1 = x, find the otherlinearly independent solution y2 from this formula.y,(x) = y;(x)[-1-SP()d* dxv (x)b) xʻy"+xy'-y=0 Form the basic solution sentence of thehomogeneous equation and write the solution.c) xy"+xy'-y =x² +1,x>0 This equation (by the methodof decreasing order) first write the general solution byreducing it to the order differential equation.

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1) x y"+xy'-y =x² +1,x>0 The differential equation is given. a) If one of the linear independent solutions of the homogeneous part of the given differential equation is y1 = x, find the other linearly independent solution y2 from this formula. 1 v,(x) = y;(x) - vi (x) b) xy"+xy'–y=0 Form the basic solution sentence of the homogeneous equation and write the solution. c) x²y"+xy'- y =x² +1,x>0 This equation (by the method of decreasing order) first write the general solution by reducing it to the order differential equation.

1) x y"+xy'-y =x² +1,x>0 The differential equation is given. a) If one of the linear independent solutions of the homogeneous part of the given differential equation is y1 = x, find the other linearly independent solution y2 from this formula. 1 v,(x) = y;(x) - vi (x) b) xy"+xy'–y=0 Form the basic solution sentence of the homogeneous equation and write the solution. c) x²y"+xy'- y =x² +1,x>0 This equation (by the method of decreasing order) first write the general solution by reducing it to the order differential equation.

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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Differential Equations

Have you ever observed the movement of the satellites and rockets or how the planets go around the sun in their orbits? How will you determine their motion? Definitely they follow some scientific laws and these kinds of problems are framed as differential equations.

Question

1) xy"+xy'-y=x² +1,x>0 The differential equation is given.
a) If one of the linear independent solutions of the homogeneous
part of the given differential equation is y1 = x, find the other
linearly independent solution y2 from this formula.
y,(x) = y;(x)[-
1
-SP()d* dx
v (x)
b) xʻy"+xy'-y=0 Form the basic solution sentence of the
homogeneous equation and write the solution.
c) xy"+xy'-y =x² +1,x>0 This equation (by the method
of decreasing order) first write the general solution by
reducing it to the order differential equation.

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ISBN:

9780470458365

Author:

Erwin Kreyszig

Publisher:

Wiley, John & Sons, Incorporated