Finding coefficient of polynomial?
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The coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + …)^3$ is_______?
My Try:
Somewhere it explain as:
The expression can be re-written as: $(x^3 (1+ x + x^2 + x^3 + …))^3=x^9(1+(x+x^2+x^3))^3$
Expanding $(1+(x+x^2+x^3))^3$ using binomial expansion:
$(1+(x+x^2+x^3))^3 $
$= 1+3(x+x^2+x^3)+3*2/2((x+x^2+x^3)^2+3*2*1/6(x+x^2+x^3)^3…..$
The coefficient of $x^3$ will be $10$, it is multiplied by $x^9$ outside, so coefficient of $x^12$ is $10$.
Can you please explain?
combinatorics functions polynomials binomial-coefficients
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
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up vote
11
down vote
favorite
The coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + …)^3$ is_______?
My Try:
Somewhere it explain as:
The expression can be re-written as: $(x^3 (1+ x + x^2 + x^3 + …))^3=x^9(1+(x+x^2+x^3))^3$
Expanding $(1+(x+x^2+x^3))^3$ using binomial expansion:
$(1+(x+x^2+x^3))^3 $
$= 1+3(x+x^2+x^3)+3*2/2((x+x^2+x^3)^2+3*2*1/6(x+x^2+x^3)^3…..$
The coefficient of $x^3$ will be $10$, it is multiplied by $x^9$ outside, so coefficient of $x^12$ is $10$.
Can you please explain?
combinatorics functions polynomials binomial-coefficients
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
add a comment |Â
up vote
11
down vote
favorite
up vote
11
down vote
favorite
The coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + …)^3$ is_______?
My Try:
Somewhere it explain as:
The expression can be re-written as: $(x^3 (1+ x + x^2 + x^3 + …))^3=x^9(1+(x+x^2+x^3))^3$
Expanding $(1+(x+x^2+x^3))^3$ using binomial expansion:
$(1+(x+x^2+x^3))^3 $
$= 1+3(x+x^2+x^3)+3*2/2((x+x^2+x^3)^2+3*2*1/6(x+x^2+x^3)^3…..$
The coefficient of $x^3$ will be $10$, it is multiplied by $x^9$ outside, so coefficient of $x^12$ is $10$.
Can you please explain?
combinatorics functions polynomials binomial-coefficients
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
The coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + …)^3$ is_______?
My Try:
Somewhere it explain as:
The expression can be re-written as: $(x^3 (1+ x + x^2 + x^3 + …))^3=x^9(1+(x+x^2+x^3))^3$
Expanding $(1+(x+x^2+x^3))^3$ using binomial expansion:
$(1+(x+x^2+x^3))^3 $
$= 1+3(x+x^2+x^3)+3*2/2((x+x^2+x^3)^2+3*2*1/6(x+x^2+x^3)^3…..$
The coefficient of $x^3$ will be $10$, it is multiplied by $x^9$ outside, so coefficient of $x^12$ is $10$.
Can you please explain?
combinatorics functions polynomials binomial-coefficients
combinatorics functions polynomials binomial-coefficients
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
edited Aug 31 at 6:29
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
asked Feb 14 '16 at 7:22
Mithlesh Upadhyay
2,83982555
2,83982555
add a comment |Â
add a comment |Â
4 Answers
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It's basically the number of ways you can write $12$ as a sum of three integers all greater than or equal to $3$, where order matters. So $12=3+3+6$, $12=3+4+5$, $12=4+4+4$. The first can be rearranged three ways, the second can be rearranged six ways and the last can only be arranged one way. So yes, I believe the answer is $10$.
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
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$$(x^3+x^4+x^5+x^6+cdots)^3=x^9(1+x+x^2+cdots)^3=x^9left(dfrac11-xright)^3=x^9(1-x)^-3$$
Now, we need the coefficient of $x^3$ in $(1-x)^-3$
Now the $r+1,(rge0)$th term of $(1-x)^-3$ is $$dfrac-3(-4)(-5)cdots(-r)(-r-1)(-r-2)1cdot2cdot3cdot r(-x)^r=binomr+22x^r$$
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
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up vote
6
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From the OP, the coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + cdots)^3$ is equal to that of $x^3$ in $(1+x+x^2+x^3)^3$. This is equivalent to asking the number of ways to pick one $x^i$ below in each row so that the product of the $x^i$ picked in each row is of the form $kx^3$ for some number $k$.
$$ requireenclose bbox[border:2px solid red]
beginarrayc
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3
endarray
$$
If we focus on indices, we will find out that this is equivalent to asking the number of ways of choosing one number from each row so that the sum of three chosen numbers adds up to three.
$$ bbox[border:2px solid red]
beginarrayc
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3
endarray
$$
Therefore, the problem is asking for $$#x,y,zinBbb Z_0^+ mid x colorbluefbox+ y colorredfbox+ z = 3.$$
Hence, the answer is very simple: $5 choose 2 = 10$. First, imagine that we have a $5times 1$ grid.
beginarray
hline \
&&&& \ hline
endarray
Then you choose two grids to put $colorbluefbox+$ and $colorredfbox+$. These two plus signs symbolises $xcolorbluefbox+ycolorredfbox+z=3$. Therefore, $colorbluefbox+$ should be at the left of $colorredfbox+$. The picture below serves as an example.
beginarray
hline \
&colorbluefbox+&colorredfbox+&& \ hline tag* label*
endarray
Fill the remaining grids with three $enclosecircle1$ to see what happens.
beginarray
hline \
enclosecircle1&colorbluefbox+&colorredfbox+&enclosecircle1&enclosecircle1 \ hline
endarray
Therefore, this example shows one possibility $x=1,y=0,z=2$. You may make up others by choosing other combinations in eqref*.
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
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Another way: For $|x|<1$, we have:
$$(x^3+x^4+x^5+...)^3=x^9(1+x+x^2+...)^3=x^9(1-x)^-1.$$
Now $(1-x)^-3$ is half of the second derivative of $(1-x)^-1.$ The second derivative of $(1-x)^-1=(1+x+x^2+...)$ is $(1.2+2.3 x+3.4 x^2+4.5 x^3+...). $ Half the co-efficient of $x^3$ in this, which is $(1/2).4.5=10,$ is therefore the co-efficient of $x^12$ in $x^9(1+x+x^2+...). $
edited Feb 14 '16 at 13:52
MickG
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
 |Â
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4 Answers
4
active
oldest
votes
4 Answers
4
active
oldest
votes
active
oldest
votes
active
oldest
votes
up vote
12
down vote
accepted
It's basically the number of ways you can write $12$ as a sum of three integers all greater than or equal to $3$, where order matters. So $12=3+3+6$, $12=3+4+5$, $12=4+4+4$. The first can be rearranged three ways, the second can be rearranged six ways and the last can only be arranged one way. So yes, I believe the answer is $10$.
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
add a comment |Â
up vote
12
down vote
accepted
It's basically the number of ways you can write $12$ as a sum of three integers all greater than or equal to $3$, where order matters. So $12=3+3+6$, $12=3+4+5$, $12=4+4+4$. The first can be rearranged three ways, the second can be rearranged six ways and the last can only be arranged one way. So yes, I believe the answer is $10$.
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
add a comment |Â
up vote
12
down vote
accepted
up vote
12
down vote
accepted
It's basically the number of ways you can write $12$ as a sum of three integers all greater than or equal to $3$, where order matters. So $12=3+3+6$, $12=3+4+5$, $12=4+4+4$. The first can be rearranged three ways, the second can be rearranged six ways and the last can only be arranged one way. So yes, I believe the answer is $10$.
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
It's basically the number of ways you can write $12$ as a sum of three integers all greater than or equal to $3$, where order matters. So $12=3+3+6$, $12=3+4+5$, $12=4+4+4$. The first can be rearranged three ways, the second can be rearranged six ways and the last can only be arranged one way. So yes, I believe the answer is $10$.
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
answered Feb 14 '16 at 7:28
Gregory Grant
12.2k42447
12.2k42447
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
add a comment |Â
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
Is this concept applicable for any question like my?
– Mithlesh Upadhyay
Feb 14 '16 at 7:36
2
2
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
Yes, it follows from how the terms combine. Another classic example is how if you expand $Pi_n=1^infty(1+x^n+x^2n+x^3n+cdots)=sum a_nx^n$ you find $a_n$ is exactly the number of ways of writing $n$ as a sum, where order does not matter. For example $a_3=3$ since $3=1+1+1$, $3=1+2$, and $3=3$. So three ways.
– Gregory Grant
Feb 14 '16 at 7:41
add a comment |Â
up vote
9
down vote
$$(x^3+x^4+x^5+x^6+cdots)^3=x^9(1+x+x^2+cdots)^3=x^9left(dfrac11-xright)^3=x^9(1-x)^-3$$
Now, we need the coefficient of $x^3$ in $(1-x)^-3$
Now the $r+1,(rge0)$th term of $(1-x)^-3$ is $$dfrac-3(-4)(-5)cdots(-r)(-r-1)(-r-2)1cdot2cdot3cdot r(-x)^r=binomr+22x^r$$
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
add a comment |Â
up vote
9
down vote
$$(x^3+x^4+x^5+x^6+cdots)^3=x^9(1+x+x^2+cdots)^3=x^9left(dfrac11-xright)^3=x^9(1-x)^-3$$
Now, we need the coefficient of $x^3$ in $(1-x)^-3$
Now the $r+1,(rge0)$th term of $(1-x)^-3$ is $$dfrac-3(-4)(-5)cdots(-r)(-r-1)(-r-2)1cdot2cdot3cdot r(-x)^r=binomr+22x^r$$
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
add a comment |Â
up vote
9
down vote
up vote
9
down vote
$$(x^3+x^4+x^5+x^6+cdots)^3=x^9(1+x+x^2+cdots)^3=x^9left(dfrac11-xright)^3=x^9(1-x)^-3$$
Now, we need the coefficient of $x^3$ in $(1-x)^-3$
Now the $r+1,(rge0)$th term of $(1-x)^-3$ is $$dfrac-3(-4)(-5)cdots(-r)(-r-1)(-r-2)1cdot2cdot3cdot r(-x)^r=binomr+22x^r$$
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
$$(x^3+x^4+x^5+x^6+cdots)^3=x^9(1+x+x^2+cdots)^3=x^9left(dfrac11-xright)^3=x^9(1-x)^-3$$
Now, we need the coefficient of $x^3$ in $(1-x)^-3$
Now the $r+1,(rge0)$th term of $(1-x)^-3$ is $$dfrac-3(-4)(-5)cdots(-r)(-r-1)(-r-2)1cdot2cdot3cdot r(-x)^r=binomr+22x^r$$
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
edited Feb 14 '16 at 12:30
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
answered Feb 14 '16 at 8:45
lab bhattacharjee
216k14153265
216k14153265
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
add a comment |Â
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
Thanks for nice explanation
– Mithlesh Upadhyay
Feb 14 '16 at 9:16
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
@MithleshUpadhayay, My pleasure.
– lab bhattacharjee
Feb 14 '16 at 12:30
add a comment |Â
up vote
6
down vote
From the OP, the coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + cdots)^3$ is equal to that of $x^3$ in $(1+x+x^2+x^3)^3$. This is equivalent to asking the number of ways to pick one $x^i$ below in each row so that the product of the $x^i$ picked in each row is of the form $kx^3$ for some number $k$.
$$ requireenclose bbox[border:2px solid red]
beginarrayc
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3
endarray
$$
If we focus on indices, we will find out that this is equivalent to asking the number of ways of choosing one number from each row so that the sum of three chosen numbers adds up to three.
$$ bbox[border:2px solid red]
beginarrayc
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3
endarray
$$
Therefore, the problem is asking for $$#x,y,zinBbb Z_0^+ mid x colorbluefbox+ y colorredfbox+ z = 3.$$
Hence, the answer is very simple: $5 choose 2 = 10$. First, imagine that we have a $5times 1$ grid.
beginarray
hline \
&&&& \ hline
endarray
Then you choose two grids to put $colorbluefbox+$ and $colorredfbox+$. These two plus signs symbolises $xcolorbluefbox+ycolorredfbox+z=3$. Therefore, $colorbluefbox+$ should be at the left of $colorredfbox+$. The picture below serves as an example.
beginarray
hline \
&colorbluefbox+&colorredfbox+&& \ hline tag* label*
endarray
Fill the remaining grids with three $enclosecircle1$ to see what happens.
beginarray
hline \
enclosecircle1&colorbluefbox+&colorredfbox+&enclosecircle1&enclosecircle1 \ hline
endarray
Therefore, this example shows one possibility $x=1,y=0,z=2$. You may make up others by choosing other combinations in eqref*.
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
add a comment |Â
up vote
6
down vote
From the OP, the coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + cdots)^3$ is equal to that of $x^3$ in $(1+x+x^2+x^3)^3$. This is equivalent to asking the number of ways to pick one $x^i$ below in each row so that the product of the $x^i$ picked in each row is of the form $kx^3$ for some number $k$.
$$ requireenclose bbox[border:2px solid red]
beginarrayc
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3
endarray
$$
If we focus on indices, we will find out that this is equivalent to asking the number of ways of choosing one number from each row so that the sum of three chosen numbers adds up to three.
$$ bbox[border:2px solid red]
beginarrayc
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3
endarray
$$
Therefore, the problem is asking for $$#x,y,zinBbb Z_0^+ mid x colorbluefbox+ y colorredfbox+ z = 3.$$
Hence, the answer is very simple: $5 choose 2 = 10$. First, imagine that we have a $5times 1$ grid.
beginarray
hline \
&&&& \ hline
endarray
Then you choose two grids to put $colorbluefbox+$ and $colorredfbox+$. These two plus signs symbolises $xcolorbluefbox+ycolorredfbox+z=3$. Therefore, $colorbluefbox+$ should be at the left of $colorredfbox+$. The picture below serves as an example.
beginarray
hline \
&colorbluefbox+&colorredfbox+&& \ hline tag* label*
endarray
Fill the remaining grids with three $enclosecircle1$ to see what happens.
beginarray
hline \
enclosecircle1&colorbluefbox+&colorredfbox+&enclosecircle1&enclosecircle1 \ hline
endarray
Therefore, this example shows one possibility $x=1,y=0,z=2$. You may make up others by choosing other combinations in eqref*.
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
add a comment |Â
up vote
6
down vote
up vote
6
down vote
From the OP, the coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + cdots)^3$ is equal to that of $x^3$ in $(1+x+x^2+x^3)^3$. This is equivalent to asking the number of ways to pick one $x^i$ below in each row so that the product of the $x^i$ picked in each row is of the form $kx^3$ for some number $k$.
$$ requireenclose bbox[border:2px solid red]
beginarrayc
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3
endarray
$$
If we focus on indices, we will find out that this is equivalent to asking the number of ways of choosing one number from each row so that the sum of three chosen numbers adds up to three.
$$ bbox[border:2px solid red]
beginarrayc
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3
endarray
$$
Therefore, the problem is asking for $$#x,y,zinBbb Z_0^+ mid x colorbluefbox+ y colorredfbox+ z = 3.$$
Hence, the answer is very simple: $5 choose 2 = 10$. First, imagine that we have a $5times 1$ grid.
beginarray
hline \
&&&& \ hline
endarray
Then you choose two grids to put $colorbluefbox+$ and $colorredfbox+$. These two plus signs symbolises $xcolorbluefbox+ycolorredfbox+z=3$. Therefore, $colorbluefbox+$ should be at the left of $colorredfbox+$. The picture below serves as an example.
beginarray
hline \
&colorbluefbox+&colorredfbox+&& \ hline tag* label*
endarray
Fill the remaining grids with three $enclosecircle1$ to see what happens.
beginarray
hline \
enclosecircle1&colorbluefbox+&colorredfbox+&enclosecircle1&enclosecircle1 \ hline
endarray
Therefore, this example shows one possibility $x=1,y=0,z=2$. You may make up others by choosing other combinations in eqref*.
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
From the OP, the coefficient of $x^12$ in $(x^3 + x^4 + x^5 + x^6 + cdots)^3$ is equal to that of $x^3$ in $(1+x+x^2+x^3)^3$. This is equivalent to asking the number of ways to pick one $x^i$ below in each row so that the product of the $x^i$ picked in each row is of the form $kx^3$ for some number $k$.
$$ requireenclose bbox[border:2px solid red]
beginarrayc
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3 \ hline
x^0 & x^1 & x^2 & x^3
endarray
$$
If we focus on indices, we will find out that this is equivalent to asking the number of ways of choosing one number from each row so that the sum of three chosen numbers adds up to three.
$$ bbox[border:2px solid red]
beginarrayc
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3 \ hline
0 & 1 & 2 & 3
endarray
$$
Therefore, the problem is asking for $$#x,y,zinBbb Z_0^+ mid x colorbluefbox+ y colorredfbox+ z = 3.$$
Hence, the answer is very simple: $5 choose 2 = 10$. First, imagine that we have a $5times 1$ grid.
beginarray
hline \
&&&& \ hline
endarray
Then you choose two grids to put $colorbluefbox+$ and $colorredfbox+$. These two plus signs symbolises $xcolorbluefbox+ycolorredfbox+z=3$. Therefore, $colorbluefbox+$ should be at the left of $colorredfbox+$. The picture below serves as an example.
beginarray
hline \
&colorbluefbox+&colorredfbox+&& \ hline tag* label*
endarray
Fill the remaining grids with three $enclosecircle1$ to see what happens.
beginarray
hline \
enclosecircle1&colorbluefbox+&colorredfbox+&enclosecircle1&enclosecircle1 \ hline
endarray
Therefore, this example shows one possibility $x=1,y=0,z=2$. You may make up others by choosing other combinations in eqref*.
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
edited Feb 14 '16 at 8:29
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
answered Feb 14 '16 at 8:23
GNU Supporter
11.8k72143
11.8k72143
add a comment |Â
add a comment |Â
up vote
3
down vote
Another way: For $|x|<1$, we have:
$$(x^3+x^4+x^5+...)^3=x^9(1+x+x^2+...)^3=x^9(1-x)^-1.$$
Now $(1-x)^-3$ is half of the second derivative of $(1-x)^-1.$ The second derivative of $(1-x)^-1=(1+x+x^2+...)$ is $(1.2+2.3 x+3.4 x^2+4.5 x^3+...). $ Half the co-efficient of $x^3$ in this, which is $(1/2).4.5=10,$ is therefore the co-efficient of $x^12$ in $x^9(1+x+x^2+...). $
edited Feb 14 '16 at 13:52
MickG
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
 |Â
show 1 more comment
up vote
3
down vote
Another way: For $|x|<1$, we have:
$$(x^3+x^4+x^5+...)^3=x^9(1+x+x^2+...)^3=x^9(1-x)^-1.$$
Now $(1-x)^-3$ is half of the second derivative of $(1-x)^-1.$ The second derivative of $(1-x)^-1=(1+x+x^2+...)$ is $(1.2+2.3 x+3.4 x^2+4.5 x^3+...). $ Half the co-efficient of $x^3$ in this, which is $(1/2).4.5=10,$ is therefore the co-efficient of $x^12$ in $x^9(1+x+x^2+...). $
edited Feb 14 '16 at 13:52
MickG
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
 |Â
show 1 more comment
up vote
3
down vote
up vote
3
down vote
Another way: For $|x|<1$, we have:
$$(x^3+x^4+x^5+...)^3=x^9(1+x+x^2+...)^3=x^9(1-x)^-1.$$
Now $(1-x)^-3$ is half of the second derivative of $(1-x)^-1.$ The second derivative of $(1-x)^-1=(1+x+x^2+...)$ is $(1.2+2.3 x+3.4 x^2+4.5 x^3+...). $ Half the co-efficient of $x^3$ in this, which is $(1/2).4.5=10,$ is therefore the co-efficient of $x^12$ in $x^9(1+x+x^2+...). $
edited Feb 14 '16 at 13:52
MickG
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
Another way: For $|x|<1$, we have:
$$(x^3+x^4+x^5+...)^3=x^9(1+x+x^2+...)^3=x^9(1-x)^-1.$$
Now $(1-x)^-3$ is half of the second derivative of $(1-x)^-1.$ The second derivative of $(1-x)^-1=(1+x+x^2+...)$ is $(1.2+2.3 x+3.4 x^2+4.5 x^3+...). $ Half the co-efficient of $x^3$ in this, which is $(1/2).4.5=10,$ is therefore the co-efficient of $x^12$ in $x^9(1+x+x^2+...). $
edited Feb 14 '16 at 13:52
MickG
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
edited Feb 14 '16 at 13:52
MickG
4,23731551
edited Feb 14 '16 at 13:52
MickG
4,23731551
edited Feb 14 '16 at 13:52
MickG
4,23731551
4,23731551
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
answered Feb 14 '16 at 9:30
DanielWainfleet
32.1k31644
32.1k31644
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
 |Â
show 1 more comment
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
@Mithlesh Upadhayay. Why do you ask about a typo? I do make a lot but usually get them out.
– DanielWainfleet
Feb 14 '16 at 11:16
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
I believe you mean "cdot" in many of the places you have ".". Also, "dots" or "cdots" tend to produce better spacing in expressions than does "...".
– Eric Towers
Feb 14 '16 at 20:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
@EricTowers. I prefer . to cdot when it's not causing problems.
– DanielWainfleet
Feb 15 '16 at 0:25
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
Alrighty. Then from where do "1.2", "2.3", "3.4", "4.5" and other non-integers in your sentence starting "The second derivative..." come from? Also, what is the bizarrely malformed syntax "(1/2).4.5" supposed to convey?
– Eric Towers
Feb 15 '16 at 0:32
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
@EricTowers. The co-efficients come from twice differentiating the power series for $1/(1-x)$ giving the power series for $2/(1-x)^3$. Non-integers? 1.2=2,2.3=6, etc. "Half the co-efficient..." is half of 4x5.
– DanielWainfleet
Feb 15 '16 at 1:23
 |Â
show 1 more comment
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