6.2 Partial Fractions and Convolutions 371
The rules of elementary algebra suggest thatUcan be written as a sum,
cs+d
(s−r 1 )(s−r 2 )=A 1
s−r 1 +A 2
s−r 2 , (1)for some choice ofA 1 andA 2. Indeed, by finding the common denominator
form for the right-hand side and matching powers ofsin the numerator, we
obtain
cs+d
(s−r 1 )(s−r 2 )=A 1 (s−r 2 )+A 2 (s−r 1 )
(s−r 1 )(s−r 2 ) ,
c=A 1 +A 2 , d=−A 1 r 2 −A 2 r 1.WhenA 1 andA 2 are determined, the inverse transform of the right-hand side
of Eq. (1) is easily found:
L−^1(
A 1
s−r 1 +A 2
s−r 2)
=A 1 exp(r 1 t)+A 2 exp(r 2 t).For a specific example, suppose that
U(s)=s+ 4
s^2 + 3 s+ 2.The roots of the denominator arer 1 =−1andr 2 =−2. Thus
s+ 4
s^2 + 3 s+ 2= A^1
s+ 1+ A^2
s+ 2=(A^1 +A^2 )s+(^2 A^1 +A^2 )
(s+ 1 )(s+ 2 ).
We fi n dA 1 =3,A 2 =−2. Hence
L−^1( s+ 4
s^2 + 3 s+ 2)
=L−^1( 3
s+ 1 −2
s+ 2)
= 3 e−t− 2 e−^2 t.A little calculus takes us much further. Suppose thatUhas the formU(s)=qp((ss)),wherepandqare polynomials and the degree ofqis less than the degree ofp.
Assume thatphas distinct rootsr 1 ,...,rk:
p(s)=(s−r 1 )(s−r 2 )···(s−rk).We t r y t o w r i t eUin the fraction form
U(s)=A 1
s−r 1 +A 2
s−r 2 +···+Ak
s−rk=q(s)
p(s).