Inverse Laplace Transforms without Prefix

wozzers
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Homework Statement


find the partial fractions and thus the inverse of the following
6s^2-2s-11/(s-1)(s^2-1)

and

7s^2+8s+16/(s+2)(s^2+3)


Homework Equations



answer tutor gave for the fist one was 3e^2t + 3cosht + sinht
and second was 4e^-2t+3cos sqrt3t+ 2/sqrt3 sin sqrt3

The Attempt at a Solution




skipping a few steps for the first inverse transform i factored (s^2-1) to (s+1)(s-1) and got the following partial fractions

6s^2-2s-11=a/(s-2) + b/(s+1)(s-1) +c(s^2-1) and eventually was able to derive the 3e^-2t but struggled to get the other values

i didn't really no where to star with the 2nd one

please help
 
on Phys.org
wozzers said:

Homework Statement


find the partial fractions and thus the inverse of the following
6s^2-2s-11/(s-1)(s^2-1)

and

7s^2+8s+16/(s+2)(s^2+3)


Homework Equations



answer tutor gave for the fist one was 3e^2t + 3cosht + sinht
and second was 4e^-2t+3cos sqrt3t+ 2/sqrt3 sin sqrt3

The Attempt at a Solution




skipping a few steps for the first inverse transform i factored (s^2-1) to (s+1)(s-1) and got the following partial fractions

6s^2-2s-11=a/(s-2) + b/(s+1)(s-1) +c(s^2-1) and eventually was able to derive the 3e^-2t but struggled to get the other values

i didn't really no where to star with the 2nd one

please help

The first one you should break into$$
\frac A {s+1} + \frac B {s-2} + \frac C {(s-1)^2}$$
The second would be like this:$$
\frac A {s+2} +\frac{Bs+C}{s^2+3}$$
 
LCKurtz said:
The first one you should break into$$
\frac A {s+1} + \frac B {s-2} + \frac C {(s-1)^2}$$
The second would be like this:$$
\frac A {s+2} +\frac{Bs+C}{s^2+3}$$

i put in the wrong transform for the first one it is 6s^2-2s-11/(s-2)(s^2-1)
 
wozzers said:
i put in the wrong transform for the first one it is 6s^2-2s-11/(s-2)(s^2-1)

So factor the rest of the way to 3 linear factors in the denominator.
 
wozzers said:

Homework Statement


find the partial fractions and thus the inverse of the following
6s^2-2s-11/(s-1)(s^2-1)

and

7s^2+8s+16/(s+2)(s^2+3)


Homework Equations



answer tutor gave for the fist one was 3e^2t + 3cosht + sinht
and second was 4e^-2t+3cos sqrt3t+ 2/sqrt3 sin sqrt3

The Attempt at a Solution




skipping a few steps for the first inverse transform i factored (s^2-1) to (s+1)(s-1) and got the following partial fractions

6s^2-2s-11=a/(s-2) + b/(s+1)(s-1) +c(s^2-1) and eventually was able to derive the 3e^-2t but struggled to get the other values

i didn't really no where to star with the 2nd one

please help

For the first one: what you have written--when read using standard priority rules--is
[tex]6s^2 - 2s - \frac{11}{(s-1)(s^2-1)}, \text{ or possibly }<br /> 6s^2 - 2s - \frac{11}{s-1} (s^2-1),[/tex] depending on whether you interpret a/bc as a/(bc) or as (a/b)c. (Some computer algebra systems may use one interpretation, and some may use the other.) However, possibly you really meant
[tex]\frac{6s^2 - 2s - 11}{(s-1)(s^2-1)}.[/tex] To make thing clear, please use brackets, like this: (6s^2 - 2s - 11)/[(s-1)(s^2-1)].

RGV
 
{6s^2 - 2s - 11}/(s-2)(s^2-1)}. the problem i have is breaking it down to its partial fractions
 
wozzers said:
{6s^2 - 2s - 11}/(s-2)(s^2-1)}. the problem i have is breaking it down to its partial fractions

$$\frac {6s^2-2s-11}{(s-2)(s+1)(s-1)}=\frac A {s-2}+\frac B {s+1}+\frac C {s-1}$$
 
yes i thought that was the way but i just don't seem to get the answer my tutor has given i can get one of the numbers the 3e^2t but i can't find 3cosht and 4sinht
 
wozzers said:
yes i thought that was the way but i just don't seem to get the answer my tutor has given i can get one of the numbers the 3e^2t but i can't find 3cosht and 4sinht

Remember that if you are getting answers with ##e^t## and ##e^{-t}##, you answers may be equivalent to answers in terms of ##\cosh t## and ##\sinh t##.
 

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