Converting Sigma Notation: Simplifying Binomial Theorem

What would you do in this case?Thanks for your reply I like Serena. :smile:But what i would do if a question appears like this:-\sum^n_{k=0} (2k+1) {}^nC_k....and then the options were in terms of 2^n or 2^n+1 or 2^n+2 or 2^n+3What would you do in this case?I think the key to this question is to remember that the binomial theorem is:\sum_{k=0}^n {^n
  • #36


I am not familiar with the product rule but when i calculated the derivative on Wolfram, it was the same as i got? :confused:
 
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  • #38


Pranav-Arora said:
I am not familiar with the product rule

Then you need to either go back and run over it again or take our word for it :wink:

Try applying the product rule, let [tex]u=x[/tex] and [tex]v=(x^2+1)^n[/tex]
 
  • #39


I again tried to calculate the derivative and got:-
[tex]2nx^2(x^2+1)^{n-1}+(x^2+1)^n[/tex]

Right...?
Now i substitute the value 1 and i get:-
[tex]2^n(1+n)[/tex]

Am i right this time?
 
  • #40


Right... and we're done! :cool:
 
  • #41


I like Serena said:
Right... and we're done! :cool:

Thanks for reply! :smile:
I have more questions.
The question is:-

[tex]\sum_{k=1}^n \frac{{}^nC_k}{k+2}[/tex]

Can you provide me some hints to start? :smile:
(Please don't think that i am trying to solve my homework, it's not a homework question, it is from a test paper, i am only trying to get a strong hold on binomial theorem and Calculus :frown:)
 
  • #42


Looks like a combination of the previous 2 problems. :smile:

The boundary k=1 is one off. You need to correct that.

And you can define a function of x, such that the denominator disappears when you take the derivative.
 
  • #43


I like Serena said:
Looks like a combination of the previous 2 problems. :smile:

The boundary k=1 is one off. You need to correct that.

And you can define a function of x, such that the denominator disappears when you take the derivative.

I thought of that but how should i define a function of x? Like in previous question you took x2k, so what should i take here? :confused:
 
  • #44


Pranav-Arora said:
I thought of that but how should i define a function of x? Like in previous question you took x2k, so what should i take here? :confused:

Last time we chose x2k because the integral of it caused us to cancel the factor 2k+1. This time we will be taking the derivative and what n must be chosen such that when we take the derivative of xn, it cancels out the factor [tex]\frac{1}{k+2}[/tex]

And by the way, you are always allowed to check your answer, so whatever you choose, take the derivative to see what happens :wink:
 
  • #45


Mentallic said:
Last time we chose x2k because the integral of it caused us to cancel the factor 2k+1. This time we will be taking the derivative and what n must be chosen such that when we take the derivative of xn, it cancels out the factor [tex]\frac{1}{k+2}[/tex]

And by the way, you are always allowed to check your answer, so whatever you choose, take the derivative to see what happens :wink:

I tried solving it, please tell me if i am wrong somewhere:-

Define it as a function of x and differentiate it, i.e.
[tex]f(x)=\sum_{k=1}^n \frac{{}^nC_k}{k+2}x^{k+2}[/tex]

I mould it so that it is in the form where k starts from 0, i.e
[tex]f(x)=\sum_{k=0}^n \frac{{}^nc_k}{k+2}-\frac{{}^nc_0x^2}{2}[/tex]

Then i differentiated it and i get:-
[tex]\frac{d}{dx}(f(x))=(\sum_{k=0}^n{}^nC_kx^{k+1})-{}^nC_0x[/tex]

Converting it to binomial form:-
[tex]\frac{d}{dx}(f(x))=x(x+1)^n-x[/tex]

Now what should be the next step? :confused:
Should the next step be integration?
 
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  • #46


Pranav-Arora said:
I tried solving it, please tell me if i am wrong somewhere:-

Define it as a function of x and differentiate it, i.e.
[tex]f(x)=\sum_{k=1}^n \frac{{}^nC_k}{k+2}x^{k+2}[/tex]

I mould it so that it is in the form where k starts from 0, i.e
[tex]f(x)=\sum_{k=0}^n \frac{{}^nc_k}{k+2}x^{k+2}-\frac{{}^nc_0x^2}{2}[/tex]

Then i differentiated it and i get:-
[tex]\frac{d}{dx}(f(x))=(\sum_{k=0}^n{}^nC_kx^{k+1})-{}^nC_0x[/tex]

Converting it to binomial form:-
[tex]\frac{d}{dx}(f(x))=x(x+1)^n-x[/tex]

Now what should be the next step? :confused:
Should the next step be integration?

Beautifully done so far. You just accidentally forgot to write down the red part.
Well yes, of course it's time for integration since your ultimate goal is to calculate f(1) :smile:
 
  • #47


Mentallic said:
Well yes, of course it's time for integration since your ultimate goal is to calculate f(1) :smile:

Thanks Mentallic and I Like Serena! :smile:
I think i have got it right.
Integrating [itex]x(x+1)^n-x[/itex], i get:-

[tex]\frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)}[/tex]

Substituting the value 1, i get:-
[tex]\frac{n.2^{n+1}}{(n+1)(n+2)}[/tex]

Am i right...?

Mentallic said:
Beautifully done so far. You just accidentally forgot to write down the red part.
Oops! Sorry..
 
  • #48


Almost. ;)

First, it seems that you forgot to integrate the loose term "x".

And when you integrate, there is a slight problem called the integration constant.
That is, you need to add the as yet unknown constant C to the result of the integration.

Then you need to fill in a value for n and see how it works out.
From the result you can determine the value of C.
 
  • #49


I like Serena said:
Almost. ;)

First, it seems that you forgot to integrate the loose term "x".

And when you integrate, there is a slight problem called the integration constant.
That is, you need to add the as yet unknown constant C to the result of the integration.

Then you need to fill in a value for n and see how it works out.
From the result you can determine the value of C.

I didn't get how to find out the constant? :confused:
Where i forgot to integrate "x"?
 
  • #50


Pranav-Arora said:
Where i forgot to integrate "x"?

You had to subtract the k=0 term, which ended up being just "x".
I don't see it back in your integrated result.


Pranav-Arora said:
I didn't get how to find out the constant? :confused:

Let me explain with an example.

Suppose you have the function f(x)=x2 + 3
Now you know that f(0)=3 don't you?

Taking the derivative we get f'(x)=2x.
Taking the integral again we get [itex]\int f'(x)dx = x2 + C[/itex]
(This is called an indefinite integral, since the boundaries were not given.)

As you can see the result is not equal to the original function - we lost the '3' in the process.
But since we know that f(0)=3, we can deduce that the integration constant C must be 3.
 
  • #51


I like Serena said:
You had to subtract the k=0 term, which ended up being just "x".
I don't see it back in your integrated result.




Let me explain with an example.

Suppose you have the function f(x)=x2 + 3
Now you know that f(0)=3 don't you?

Taking the derivative we get f'(x)=2x.
Taking the integral again we get [itex]\int f'(x)dx = x2 + C[/itex]
(This is called an indefinite integral, since the boundaries were not given.)

As you can see the result is not equal to the original function - we lost the '3' in the process.
But since we know that f(0)=3, we can deduce that the integration constant C must be 3.

In which step should i substitute zero to get the constant? :confused:
 
  • #52


Pranav-Arora said:
In which step should i substitute zero to get the constant? :confused:

I'm assuming you mean in my example.
(It's slightly different for the current problem.)

In my example we have as input [itex]f(x) = \int f'(x) dx = x^2 + C[/itex] and f(0)=3.

We want to find f(x).

Filling in x=0 gives: [itex]f(0) = 0^2 + C = 3[/itex].

So C = 3.
 
  • #53


I like Serena said:
I'm assuming you mean in my example.
(It's slightly different for the current problem.)

In my example we have as input [itex]f(x) = \int f'(x) dx = x^2 + C[/itex] and f(0)=3.

We want to find f(x).

Filling in x=0 gives: [itex]f(0) = 0^2 + C = 3[/itex].

So C = 3.

I got what you said. :smile:
But i am asking in which step should i put x=0?
Should i put x=0 during the integration step? :confused:
 
  • #54


Pranav-Arora said:
I got what you said. :smile:
But i am asking in which step should i put x=0?
Should i put x=0 during the integration step? :confused:

I don't understand your question.
Afaik I have explicitly stated where you put x=0.

I only could have added as a last step that the conclusion is that f(x)=x2 + 3.
 
  • #55


i think the constant is zero. :confused:
 
  • #56


Pranav-Arora said:
i think the constant is zero. :confused:

Now I really don't understand you. :confused:

Which constant?
In which formula?
In which post?
Why would it be zero?
 
  • #57


I like Serena said:
Now I really don't understand you. :confused:

Which constant?
In which formula?
In which post?
Why would it be zero?

You gave an example that f(x)=x2+3.
And you said that f(0)=3, i.e you substituted the value 0 at the place of x. Right..?
Now that 3 is our integration constant, we can substitute 3 in [itex]\int f'(x)=x^2+C[/itex] at the place of C.

I did the same in my question. I substituted 0 in f(x), i.e i substituted 0 in:-
[tex]f(x)=\sum_{k=1}^n \frac{{}^nC_k}{k+2}x^{k+2}[/tex]

So i got f(0)=0. Therefore integration constant is 0.

Did you get me now? :confused:
 
  • #58


Yes, I more or less get what you did, but it is not right.Let's take it a couple of steps back.

You had:
[itex]f'(x) = x(x+1)^n \color{red}{\textbf{- x}}[/itex]

You integrated this wonderfully, but you forgot the "[itex]\color{red}{\textbf{- x}}[/itex]" I just marked.

So you should have:
[tex]f(x) = \int f'(x)dx =\frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)} - \frac {x^2} 2 + C[/tex]

Now you need to determine the integration constant C using f(0) = 0, but C is not zero!
 
  • #59


I like Serena said:
Yes, I more or less get what you did, but it is not right.


Let's take it a couple of steps back.

You had:
[itex]f'(x) = x(x+1)^n \color{red}{\textbf{- x}}[/itex]

You integrated this wonderfully, but you forgot the "[itex]\color{red}{\textbf{- x}}[/itex]" I just marked.

So you should have:
[tex]f(x) = \int f'(x)dx =\frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)} - \frac {x^2} 2 + C[/tex]

Now you need to determine the integration constant C using f(0) = 0, but C is not zero!

So then what's the C, i don't seem to find any other way to find C. :confused:
 
  • #60


Pranav-Arora said:
So then what's the C, i don't seem to find any other way to find C. :confused:

What do you get if you fill in x=0 in this formula?
[tex]f(x) = \frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)} - \frac {x^2} 2 + C[/tex]
 
  • #61


I like Serena said:
What do you get if you fill in x=0 in this formula?
[tex]f(x) = \frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)} - \frac {x^2} 2 + C[/tex]

If i would fill x=0 in this formula i get
[tex]f(x) = \frac{0^{n+2}}{n+1}-\frac{0^{n+2}}{(n+1)(n+2)}+ C[/tex]

Is it correct..?
 
  • #62


Noooo. ;)
You need to fix the second term.
 
  • #63


I like Serena said:
Noooo. ;)
You need to fix the second term.

Ok fixed. :smile:
[tex]f(x) =-\frac{1^{n+2}}{(n+1)(n+2)}+ C[/tex]

Is it ok..?
 
  • #64


Yes... :smile:
 
  • #65


I like Serena said:
Yes... :smile:

But now what's the C?
 
  • #66


Pranav-Arora said:
But now what's the C?

Set the expression equal to zero (since we had f(0)=0) and solve C.
 
  • #67


I like Serena said:
Set the expression equal to zero (since we had f(0)=0) and solve C.

I set it to 0 and i get
[tex]C=\frac{1^{n+2}}{(n+1)(n+2)}[/tex]

So therefore our final answer is:-
[tex]f(x)=\frac{x(x+1)^{n+1}}{n+1}-\frac{(x+1)^{n+2}}{(n+1)(n+2)} - \frac {x^2} 2 + \frac{1^{n+2}}{(n+1)(n+2)}[/tex]

Substituting x=1, i get
[tex]f(1)=\frac{n.2^{n+2}-n^2-3n-4}{2(n+1)(n+2)}[/tex]

Is it right..?
Can i simplify it further?
 
  • #68


Pranav-Arora said:
Is it right..?
Can i simplify it further?

You're expression for f(x) is right! :smile:

However your simplification after substitution of x=1 is wrong. :(

You can check by for instance filling in n=1.
(What should the result be for n=1 and for n=2? And does your expression match it?)

And actually I would recommend simplifying as little as possible.
Simplify the obvious things.
But do not try to simplify too much, since it opens up the door to mistakes.
And especially if the resulting expression is not really simpler, it's not worthwhile anyway.
 
  • #69


I like Serena said:
You're expression for f(x) is right! :smile:

However your simplification after substitution of x=1 is wrong. :(

You can check by for instance filling in n=1.
(What should the result be for n=1 and for n=2? And does your expression match it?)

And actually I would recommend simplifying as little as possible.
Simplify the obvious things.
But do not try to simplify too much, since it opens up the door to mistakes.
And especially if the resulting expression is not really simpler, it's not worthwhile anyway.

Thanks, i would correct it. :smile:
So now we are done with this question, Right..?
 
  • #70


Pranav-Arora said:
Thanks, i would correct it. :smile:
So now we are done with this question, Right..?

Hmm, you still didn't give the right answer... :rolleyes:

But if you substitute x=1 without simplifying it, that would be a proper answer, so I guess we're done, with only a technicality left. :smile:
 

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