What have I done wrong here with this binomial expansion?

[Kulla_9289]

@topsquark there is the problem. After getting the values of j and k, I can’t substitute the values into the powers (1-j, 6-j) since I don’t have k’s as powers.

 

[Kulla_9289]

Then, after solving, you'd just put c=1/3 back into the result to obtain the final answer

@Cubist How are 1/3 and and x/3 the same?

 

[JeffM]

We want the coefficient of x^3 from [imath]\left (1 - \dfrac{x}{3} \right ) * (1 + 3x)^6[/imath]

Here is how I would proceed

I am interested in ONLY two terms of the expansion of [imath](1 + 3x)^6[/imath], namely the x squared and x cubed terms. WHY?

The x squared term is [imath]\dbinom{6}{2} * (3x)^2 * 1^4 = 15 * 9x^2 = 135x^2.[/imath]

The x cubed term is [imath]\dbinom{6}{3} * (3x)^3 * 1^3 = 20 * 27x^3 = 540x^3.[/imath]

Now what?

 

[Deleted member 4993]

@Cubist How are 1/3 and and x/3 the same?

Don't just stare at the screens - get pencil & paper and work it out!!!

 

[topsquark]

@topsquark there is the problem. After getting the values of j and k, I can’t substitute the values into the powers (1-j, 6-j) since I don’t have k’s as powers.

Huh? If you use j = 1 and k = 3, for example, then you have the term [imath]\binom{1}{1}(1)^1 \left ( -\dfrac{x}{3} \right ) ^0 \binom{6}{3}(1)^3 (3x)^3[/imath]. I don't understand where you are confused.

-Dan

 

[Steven G]

@Cubist How are 1/3 and and x/3 the same?

1/3 is known. It is 1/3, you know, a number between 0 and 1. x/3 is unknown. It depends on x. x/3 can be negative, it can be positive, it can be 0, it can be 1/3...actually it can be any number.

 

[Cubist]

@Cubist How are 1/3 and and x/3 the same?

You probably meant to ask why [imath]cx=\dfrac{1}{3}x=\dfrac{x}{3}[/imath] when [imath]c=\dfrac{1}{3}[/imath]. Am I correct? Can you see why now ??

 

[Kulla_9289]

Huh? If you use j = 1 and k = 3, for example, then you have the term [imath]\binom{1}{1}(1)^1 \left ( -\dfrac{x}{3} \right ) ^0 \binom{6}{3}(1)^3 (3x)^3[/imath]. I don't understand where you are confused.

-Dan

@tosquark What would I do with the other two numbers i.e. j=0 and k=4?

@Cubist Very much.

 

[JeffM]

@Kulla_9289

You are making an easy problem very difficult for yourself by thinking about a double summation.

Did you read my post #42?

Can you give an answer (even if you expect it’s wrong) to the first question?

 

[topsquark]

@tosquark What would I do with the other two numbers i.e. j=0 and k=4?

@Cubist Very much.

Can you follow how I did the first one?

-Dan

 

[Kulla_9289]

@topsquark Just tell me this; should I add the same values with different powers as k=0 and j=0?

@JeffM I can solve the question without double summation. This is just my curiosity.

 

[topsquark]

@topsquark Just tell me this; should I add the same values with different powers as k=0 and j=0?

@JeffM I can solve the question without double summation. This is just my curiosity.

Any terms with j + k = 4 will be an [imath]x^3[/imath] term. So yes, just add the coefficients with possible j, k.

-Dan

 

[Kulla_9289]

@topsquark So basically, (summation notation..k=0)(summation notation..j=4) + (summation notation..k=1)(summation notation..j=3), am I right?

 

[topsquark]

@topsquark So basically, (summation notation..k=0)(summation notation..j=4) + (summation notation..k=1)(summation notation..j=3), am I right?

Okay, that's where problem is!

[imath]\displaystyle \sum_{m = 0}^M a_m x^m \sum_{n = 0}^N b_n x^n = \sum_{m = 0}^M \sum_{n = 0}^N a_m b_n x^{m + n}[/imath]

[imath]= a_0 b_0 x^0 + (a_1 b_0 + a_0 b_1) x^1 + (a_2 b_0 + a_1 b_1 + a_0 b_2) x^2 + (a_3 b_0 + a_2 b_1 + a_1 b_2 + a_0 b_3) x^3 + \text{ ...}[/imath]

To get the coefficient of the power of x that you want you add the product of the coefficients of the factors you need. So to get the coefficient of the [imath]x^2[/imath] term you look at [imath]a_0 x^0[/imath] and [imath]b_1 x^2[/imath], [imath]a_1 x^1[/imath] and [imath]b_1 x^1[/imath], and [imath]a_2 x^2[/imath] and [imath]b_0 x^2[/imath]. Then you add the coefficients.

Here you have

[math]\left ( 1 - \dfrac{x}{3} \right ) (1 + 3x )^6 = \sum_{j =0}^1 \binom{1}{j} (1)^j \left ( -\dfrac{x}{3} \right )^{1- j} \sum_{k = 0}^6 \binom{6}{k} (1)^k (3x)^{6 - k}[/math]

and we need the j + k = 4 terms. That's j = 0, k = 4, and j = 1, k = 3. So add up those coefficients, ie. [imath]a_0 b_4 + a_1 b_3[/imath]. (You will not be summing from j = 0 to j = 1 or k = 0 to k = 4 or anything. Just plug in j = 0, k = 4 into the coefficients.)

-Dan

 

[Kulla_9289]

@topsquark I do not get 495x^3 as the answer. I got -585x^3 as the answer using the double summation. Would you please try it yourself?

 

[Deleted member 4993]

@topsquark I do not get 495x^3 as the answer. I got -585x^3 as the answer using the double summation. Would you please try it yourself?

Please post DETAILED steps to arrive at your answer.

 

[topsquark]

@topsquark I do not get 495x^3 as the answer. I got -585x^3 as the answer using the double summation. Would you please try it yourself?

I might have been wrong. It happens. Could you please show your work so we can see if you did anything wrong? We can only help you if we know what you have done.

-Dan

 

[Cubist]

I might have been wrong.

I get [imath]495x^3[/imath] by using your posts, so you must be correct

 

[Kulla_9289]

I know what the mistake is now. I separated the negative (-1) from the negative fraction (-x/3).