Finding the Taylor series (complex numbers)

I have
$$
{frac{1}{(z+1)(z-2)}}
$$
I did
$$
{frac{1}{(z+1)(z-2)}} = {frac{A}{z+1}}+{frac{B}{z-2}}
$$

and found
$A=-1/3, B=1/3$

So now I have
$$
-{frac{1}{3}}times {frac{1}{z+1}}+{frac{1}{3}}times{frac{1}{z-2}} = -{frac{1}{3}} sum(-1)^k z^k + {frac{1}{3}} sum(-1)^k (-{frac{z}{2}})^k
$$

But the answer in the book is different. What am I doing wrong?

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

$begingroup$
What's the answer in the book? See that the second summation can be simplified to $sum (z/2)^k$.
$endgroup$
– rafa11111
Dec 18 '18 at 16:25

$begingroup$
The answer in book is $$ {frac{1}{3}} sum((-1)^{n+1}-2^{-n-1}) z^n $$
$endgroup$
– user3132457
Dec 18 '18 at 16:28

add a comment |

I have
$$
{frac{1}{(z+1)(z-2)}}
$$
I did
$$
{frac{1}{(z+1)(z-2)}} = {frac{A}{z+1}}+{frac{B}{z-2}}
$$

and found
$A=-1/3, B=1/3$

So now I have
$$
-{frac{1}{3}}times {frac{1}{z+1}}+{frac{1}{3}}times{frac{1}{z-2}} = -{frac{1}{3}} sum(-1)^k z^k + {frac{1}{3}} sum(-1)^k (-{frac{z}{2}})^k
$$

But the answer in the book is different. What am I doing wrong?

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

$begingroup$
What's the answer in the book? See that the second summation can be simplified to $sum (z/2)^k$.
$endgroup$
– rafa11111
Dec 18 '18 at 16:25

$begingroup$
The answer in book is $$ {frac{1}{3}} sum((-1)^{n+1}-2^{-n-1}) z^n $$
$endgroup$
– user3132457
Dec 18 '18 at 16:28

add a comment |

I have
$$
{frac{1}{(z+1)(z-2)}}
$$
I did
$$
{frac{1}{(z+1)(z-2)}} = {frac{A}{z+1}}+{frac{B}{z-2}}
$$

and found
$A=-1/3, B=1/3$

So now I have
$$
-{frac{1}{3}}times {frac{1}{z+1}}+{frac{1}{3}}times{frac{1}{z-2}} = -{frac{1}{3}} sum(-1)^k z^k + {frac{1}{3}} sum(-1)^k (-{frac{z}{2}})^k
$$

But the answer in the book is different. What am I doing wrong?

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

I have
$$
{frac{1}{(z+1)(z-2)}}
$$
I did
$$
{frac{1}{(z+1)(z-2)}} = {frac{A}{z+1}}+{frac{B}{z-2}}
$$

and found
$A=-1/3, B=1/3$

So now I have
$$
-{frac{1}{3}}times {frac{1}{z+1}}+{frac{1}{3}}times{frac{1}{z-2}} = -{frac{1}{3}} sum(-1)^k z^k + {frac{1}{3}} sum(-1)^k (-{frac{z}{2}})^k
$$

But the answer in the book is different. What am I doing wrong?

complex-analysis complex-numbers taylor-expansion

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

edited Dec 18 '18 at 16:30

José Carlos Santos

168k22132236

asked Dec 18 '18 at 16:19

user3132457

1598

asked Dec 18 '18 at 16:19

user3132457

1598

asked Dec 18 '18 at 16:19

user3132457

1598

$begingroup$
What's the answer in the book? See that the second summation can be simplified to $sum (z/2)^k$.
$endgroup$
– rafa11111
Dec 18 '18 at 16:25

$begingroup$
The answer in book is $$ {frac{1}{3}} sum((-1)^{n+1}-2^{-n-1}) z^n $$
$endgroup$
– user3132457
Dec 18 '18 at 16:28

add a comment |

$begingroup$
What's the answer in the book? See that the second summation can be simplified to $sum (z/2)^k$.
$endgroup$
– rafa11111
Dec 18 '18 at 16:25

$begingroup$
The answer in book is $$ {frac{1}{3}} sum((-1)^{n+1}-2^{-n-1}) z^n $$
$endgroup$
– user3132457
Dec 18 '18 at 16:28

What's the answer in the book? See that the second summation can be simplified to $sum (z/2)^k$.

– rafa11111
Dec 18 '18 at 16:25

The answer in book is $$ {frac{1}{3}} sum((-1)^{n+1}-2^{-n-1}) z^n $$

– user3132457
Dec 18 '18 at 16:28

add a comment |

2 Answers
2

active

oldest

votes

We have if $|r|<1$, then $$frac{1}{1-r}=sum_{i=0}^infty r^i$$

begin{align}
-{frac{1}{3}}times {frac{1}{z+1}}+{frac{1}{3}}times{frac{1}{z-2}} &=-{frac{1}{3}} sum(-1)^k z^k - frac16 times frac{1}{1-left( frac{z}2right)}
\&= -{frac{1}{3}} sum(-1)^k z^k - {frac{1}{6}} sum ({frac{z}{2}})^k \
&= frac13 left[sum(-1)^{k+1} z^k - {frac{1}{2}} sum ({frac{z}{2}})^k right]\
&= frac13 sumleft[(-1)^{k+1} - {2}^{-k-1} right]z^k\
end{align}

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

add a comment |

It is indeed true that$$frac1{(z+1)(z-2)}=-frac13timesfrac1{z+1}+frac13timesfrac1{z-2}$$and that$$frac1{z+1}=sum_{k=0}^infty(-1)^kz^k.$$However,$$frac1{z-2}=-frac1{2-z}=-sum_{k=0}^inftyfrac{z^k}{2^{k+1}}.$$

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

$begingroup$
What formula did you use for series of $-{frac{1}{2-z}}$?
$endgroup$
– user3132457
Dec 18 '18 at 16:31

$begingroup$
$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$
$endgroup$
– José Carlos Santos
Dec 18 '18 at 17:16

add a comment |

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2 Answers
2

active

oldest

votes

2 Answers
2

active

oldest

votes

We have if $|r|<1$, then $$frac{1}{1-r}=sum_{i=0}^infty r^i$$

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

add a comment |

We have if $|r|<1$, then $$frac{1}{1-r}=sum_{i=0}^infty r^i$$

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

add a comment |

We have if $|r|<1$, then $$frac{1}{1-r}=sum_{i=0}^infty r^i$$

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

We have if $|r|<1$, then $$frac{1}{1-r}=sum_{i=0}^infty r^i$$

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

edited Dec 18 '18 at 16:32

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

answered Dec 18 '18 at 16:26

Siong Thye Goh

103k1468119

add a comment |

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

$begingroup$
What formula did you use for series of $-{frac{1}{2-z}}$?
$endgroup$
– user3132457
Dec 18 '18 at 16:31

$begingroup$
$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$
$endgroup$
– José Carlos Santos
Dec 18 '18 at 17:16

add a comment |

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

$begingroup$
What formula did you use for series of $-{frac{1}{2-z}}$?
$endgroup$
– user3132457
Dec 18 '18 at 16:31

$begingroup$
$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$
$endgroup$
– José Carlos Santos
Dec 18 '18 at 17:16

add a comment |

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

answered Dec 18 '18 at 16:28

José Carlos Santos

168k22132236

$begingroup$
What formula did you use for series of $-{frac{1}{2-z}}$?
$endgroup$
– user3132457
Dec 18 '18 at 16:31

$begingroup$
$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$
$endgroup$
– José Carlos Santos
Dec 18 '18 at 17:16

add a comment |

$begingroup$
What formula did you use for series of $-{frac{1}{2-z}}$?
$endgroup$
– user3132457
Dec 18 '18 at 16:31

$begingroup$
$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$
$endgroup$
– José Carlos Santos
Dec 18 '18 at 17:16

What formula did you use for series of $-{frac{1}{2-z}}$?

– user3132457
Dec 18 '18 at 16:31

$$frac1{a-z}=frac1atimesfrac1{1-frac za}=frac1asum_{k=0}^inftyleft(frac zaright)^k=sum_{k=0}^inftyfrac{z^k}{a^{k+1}}.$$

– José Carlos Santos
Dec 18 '18 at 17:16

add a comment |

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