How to split a series into two other series.
$begingroup$
How do you take this $$sum_{n=0}^{100} frac{1}{a^n+b^n}:;text{(or)}:;sum_{n=0}^{100} frac{x}{a^n+b^n}$$ and split it into two sums, one having only $1$ (or $x$) and $a$ and the other having only $1$ (or $x$) and $b$.
sequences-and-series
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
$endgroup$
add a comment |
$begingroup$
How do you take this $$sum_{n=0}^{100} frac{1}{a^n+b^n}:;text{(or)}:;sum_{n=0}^{100} frac{x}{a^n+b^n}$$ and split it into two sums, one having only $1$ (or $x$) and $a$ and the other having only $1$ (or $x$) and $b$.
sequences-and-series
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
$endgroup$
add a comment |
$begingroup$
How do you take this $$sum_{n=0}^{100} frac{1}{a^n+b^n}:;text{(or)}:;sum_{n=0}^{100} frac{x}{a^n+b^n}$$ and split it into two sums, one having only $1$ (or $x$) and $a$ and the other having only $1$ (or $x$) and $b$.
sequences-and-series
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
$endgroup$
How do you take this $$sum_{n=0}^{100} frac{1}{a^n+b^n}:;text{(or)}:;sum_{n=0}^{100} frac{x}{a^n+b^n}$$ and split it into two sums, one having only $1$ (or $x$) and $a$ and the other having only $1$ (or $x$) and $b$.
sequences-and-series
sequences-and-series
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
edited Dec 20 '18 at 1:53
Yadati Kiran
2,1121622
2,1121622
asked Dec 20 '18 at 1:46
JamesJames
218
asked Dec 20 '18 at 1:46
JamesJames
218
asked Dec 20 '18 at 1:46
JamesJames
218
218
add a comment |
add a comment |
2 Answers
2
active
oldest
votes
$begingroup$
This is not possible. Let
$$f(a,b)=sum_{n=0}^{100}frac{1}{a^n+b^n}.$$
We have that
$$frac{partial f}{partial b}=-sum_{n=0}^{100}frac{n b^{n-1}}{(a^n+b^n)^2}$$
which clearly depends on $a$. If we were to have
$$f(a,b)=g(a)+k(b)$$
then we'd have that
$$frac{partial f}{partial b}=k'(b)$$
doesn't depend on $a$.
answered Dec 20 '18 at 1:54
user628024user628024
762
$endgroup$
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
add a comment |
$begingroup$
You can't. If that sum were of the form $f(a) + g(b)$ then the partial derivative with respect to $a$ would be independent of $b$. That's clearly not the case.
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
$endgroup$
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
add a comment |
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2 Answers
2
active
oldest
votes
2 Answers
2
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
This is not possible. Let
$$f(a,b)=sum_{n=0}^{100}frac{1}{a^n+b^n}.$$
We have that
$$frac{partial f}{partial b}=-sum_{n=0}^{100}frac{n b^{n-1}}{(a^n+b^n)^2}$$
which clearly depends on $a$. If we were to have
$$f(a,b)=g(a)+k(b)$$
then we'd have that
$$frac{partial f}{partial b}=k'(b)$$
doesn't depend on $a$.
answered Dec 20 '18 at 1:54
user628024user628024
762
$endgroup$
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
add a comment |
$begingroup$
This is not possible. Let
$$f(a,b)=sum_{n=0}^{100}frac{1}{a^n+b^n}.$$
We have that
$$frac{partial f}{partial b}=-sum_{n=0}^{100}frac{n b^{n-1}}{(a^n+b^n)^2}$$
which clearly depends on $a$. If we were to have
$$f(a,b)=g(a)+k(b)$$
then we'd have that
$$frac{partial f}{partial b}=k'(b)$$
doesn't depend on $a$.
answered Dec 20 '18 at 1:54
user628024user628024
762
$endgroup$
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
add a comment |
$begingroup$
This is not possible. Let
$$f(a,b)=sum_{n=0}^{100}frac{1}{a^n+b^n}.$$
We have that
$$frac{partial f}{partial b}=-sum_{n=0}^{100}frac{n b^{n-1}}{(a^n+b^n)^2}$$
which clearly depends on $a$. If we were to have
$$f(a,b)=g(a)+k(b)$$
then we'd have that
$$frac{partial f}{partial b}=k'(b)$$
doesn't depend on $a$.
answered Dec 20 '18 at 1:54
user628024user628024
762
$endgroup$
This is not possible. Let
$$f(a,b)=sum_{n=0}^{100}frac{1}{a^n+b^n}.$$
We have that
$$frac{partial f}{partial b}=-sum_{n=0}^{100}frac{n b^{n-1}}{(a^n+b^n)^2}$$
which clearly depends on $a$. If we were to have
$$f(a,b)=g(a)+k(b)$$
then we'd have that
$$frac{partial f}{partial b}=k'(b)$$
doesn't depend on $a$.
answered Dec 20 '18 at 1:54
user628024user628024
762
answered Dec 20 '18 at 1:54
user628024user628024
762
answered Dec 20 '18 at 1:54
user628024user628024
762
answered Dec 20 '18 at 1:54
user628024user628024
762
762
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
add a comment |
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
$begingroup$
+1 you got there first. Welcome to stackexchange.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 1:55
add a comment |
$begingroup$
You can't. If that sum were of the form $f(a) + g(b)$ then the partial derivative with respect to $a$ would be independent of $b$. That's clearly not the case.
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
$endgroup$
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
add a comment |
$begingroup$
You can't. If that sum were of the form $f(a) + g(b)$ then the partial derivative with respect to $a$ would be independent of $b$. That's clearly not the case.
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
$endgroup$
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
add a comment |
$begingroup$
You can't. If that sum were of the form $f(a) + g(b)$ then the partial derivative with respect to $a$ would be independent of $b$. That's clearly not the case.
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
$endgroup$
You can't. If that sum were of the form $f(a) + g(b)$ then the partial derivative with respect to $a$ would be independent of $b$. That's clearly not the case.
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
answered Dec 20 '18 at 1:54
Ethan BolkerEthan Bolker
45.1k553120
45.1k553120
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
add a comment |
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
Ok but what about $$sum_{n=0}^{100} {-1}^{n-1}*{3an+2bn}$$ How would you split this
$endgroup$
– James
Dec 20 '18 at 2:05
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
$begingroup$
@James That one is easy. It's just the distributive law. Write out the sum with ellipses or for an upper limit of $2$ instead of $100$ without the $Sigma$.
$endgroup$
– Ethan Bolker
Dec 20 '18 at 13:03
add a comment |
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