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LINEAR FIRST-ORDER DIFFERENTIAL EQUATIONS
JAMESKEESLING
In this post we give solution of the most general first-order ordinary differential equation.
This equation has the form:
(1) dx +p(t)x = g(t).
dt
Wesolve the equation by finding an integrating factor in much the same way that we did
to produce exact differential equations from equations that were not exact.
Consider the following expression.
(2) d exp Z p(t)dt ·x =exp Z p(t)dt · dx +p(t)·x
dt dt
Wecan put (1) and (2) together in the following way.
d exp Z p(t)dt ·x =exp Z p(t)dt · dx +p(t)x =exp Z p(t)dt ·g(t)
dt dt
Wecan now solve.
Z Z Z
exp p(t)dt · x = exp p(t)dt · g(t) dt +C
Z Z Z
x=exp − p(t)dt · exp p(t)dt · g(t) dt +C
�R
The basic trick is to note that the function exp p(t)dt is an integrating factor for the
left-hand side of (1).
1. Example
Consider the differential equation.
(3) dx + 1 x = sin(t)
�R dt t
Our integrating factor is exp 1 dt = exp(ln(t)) = t. So, our differential equation
t
becomes
1
2 JAMESKEESLING
d (t · x) = t · sin(t)
dt
and the solutiion is
x(t) = 1 Z t sin(t)dt + C = sin(t) −cos(t)+ C.
t t t t
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