3.4 Inverse Laplace Transform 201andA 2 =X(s)(s+ 2 )|s=− 2 =3 s+ 5
s+ 1|s=− 2 = 1Therefore,X(s)=2
s+ 1+
1
s+ 2
and as suchx(t)=[2e−t+e−^2 t]u(t)To check that the solution is correct one could use the initial or the final value theorems shown in
Table 3.2. According to the initial value theorem,x( 0 )=3 should coincide withlim
s→∞[
sX(s)=3 s^2 + 5 s
s^2 + 3 s+ 2]
=lim
s→∞3 + 5 /s
1 + 3 /s+ 2 /s^2= 3
as it does. The final value theorem indicates that limt→∞x(t)=0 should coincide withlim
s→ 0[
sX(s)=3 s^2 + 5 s
s^2 + 3 s+ 2]
= 0
as it does. Both of these validations seem to indicate that the result is correct. nRemarksThe coefficients A 1 and A 2 can be found using other methods. For instance,
n We can compute
X(s)=A 1
s+ 1+
A 2
s+ 2(3.23)
for two different values of s (as long as we do not divide by zero), such as s= 0 and s= 1 ,s= 0 X( 0 )=5
2
=A 1 +
1
2
A 2
s= 1 X( 1 )=8
6
=
1
2
A 1 +
1
3
A 2
which gives a set of two linear equations with two unknows, and applying Cramer’s rule we find that
A 1 = 2 and A 2 = 1.
n We cross-multiply the partial expansion given by Equation (3.23) to get
X(s)=3 s+ 5
s^2 + 3 s+ 2=
s(A 1 +A 2 )+( 2 A 1 +A 2 )
s^2 + 3 s+ 2
Comparing the numerators, we have that A 1 +A 2 = 3 and 2 A 1 +A 2 = 5 , two equations with two
unknowns, which can be shown to have as unique solutions A 1 = 2 and A 2 = 1 , as before.