Mathematical Methods for Physics and Engineering : A Comprehensive Guide

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14.2 FIRST-DEGREE FIRST-ORDER EQUATIONS


Solve
dy
dx

=(x+y+1)^2.

Making the substitutionv=x+y+ 1, we obtain, as in (14.23),


dv
dx

=v^2 +1,

which is separable and integrates directly to give

dv
1+v^2


=



dx ⇒ tan−^1 v=x+c 1.

So the solution to the original ODE is tan−^1 (x+y+1)=x+c 1 ,wherec 1 is a constant of
integration.


Solution method.In an equation such as (14.22), substitutev=ax+by+cto obtain


a separable equation that can be integrated directly. Then replacevbyax+by+c


to obtain the solution.


Secondly, we discuss

dy
dx

=

ax+by+c
ex+fy+g

, (14.24)

wherea,b,c,e,fandgare all constants. This equation may be solved by letting


x=X+αandy=Y+β,whereαandβare constants found from


aα+bβ+c= 0 (14.25)

eα+fβ+g=0. (14.26)

Then (14.24) can be written as


dY
dX

=

aX+bY
eX+fY

,

which is homogeneous and can be solved by the method of subsection 14.2.5.


Note, however, that ifa/e=b/fthen (14.25) and (14.26) are not independent


and so cannot be solved uniquely forαandβ. However, in this case, (14.24)


reduces to an equation of the form (14.22), which was discussed above.


Solve
dy
dx

=


2 x− 5 y+3
2 x+4y− 6

.


Letx=X+αandy=Y+β,whereαandβobey the relations


2 α− 5 β+3=0
2 α+4β−6=0,

which solve to giveα=β= 1. Making these substitutions we find


dY
dX

=


2 X− 5 Y


2 X+4Y


,

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