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Possible Duplicate:
the sum of powers of $2$ between $2^0$ and $2^n$

What is the result of $$2^0 + 2^1 + 2^2 + \cdots + 2^{n-1} + 2^n\ ?$$

Is there a formula on this? and how to prove the formula?

(It is actually to compute the time complexity of a Fibonacci recursive method.)

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    Yes, there is a formula. Consider what the result looks like in binary notation. What happens if you add 1 to the result (still in binary)?2012-06-15
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    You know how a geometric series works?2012-06-15
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    $2^{n+1}-1$ is correct. If you need to produce a rigorous proof, I suggest induction.2012-06-15
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    @null Isn't the time complexity of a Fibonacci recursive method given in terms of the Fibonacci numbers?2012-06-15
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    @PatrickDaSilva: Nice catch, I was trying to find it but didn't know what exactly I want to find!2012-06-15
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    @Gigili ?? You were trying to find what? A duplicate?2012-06-15
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    @PatrickDaSilva: Yes? What's wrong with it? I had a strong sense of deja vu that we had the question before.2012-06-15
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    @talmid I just have a class for time complexity, then I looked at past-year exam paper, there is a question about complexity of Fibonacci recursion, so I was trying to figure out the time complexity of that.thanks so much !2012-06-15
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    @Gigili : I was just confused with your "Nice catch", I didn't understand if it meant you liked the fact that I found a duplicate, or the content of my answer there, something like that.2012-06-15
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    @null See http://stackoverflow.com/questions/360748/computational-complexity-of-fibonacci-sequence. You don't need to compute sums of powers of $2$.2012-06-15
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    I am extremely amused as to why you didn't vote to close yourself @PatrickDaSilva!2012-06-16

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Let $S = 2^0 + 2^1 + 2^2 + \cdots + 2^{n}$.

Then $2S = 2^1 + 2^2 + 2^3 + \cdots + 2^{n} + 2^{n+1}$.

Then $$\begin{align*} S = 2S - S &= & & 2^1 &+& 2^2 & + & 2^3 & + & 2^4 &+&\cdots &+& 2^{n} &+& 2^{n+1}\\ && -2^0 -& 2^1 & - & 2^2 & - & 2^3 & - & 2^4 & - & \cdots & - & 2^n \end{align*}$$ How much is that?

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    It's at least +1!2012-06-15
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Might be overkill, but there is a well known identity for sums of the form $\sum_{i=0}^n x^i$ where $x$ is not 1.

$$\sum_{i = 0}^n x^i = \frac{1- x^{n+1}}{1-x}$$

Now plug in 2 and you have what you seek.

This identity can easily be proven by induction.

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    I wouldn't call this "overkill", but rather "standard approach". The proof of this identity is essentially the standard approach when one tries to prove this identity for $x = 2$.2012-06-15
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    This is usually an standard exercise in your first `proof' course at the university.2012-06-15
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I thought I might post a little more elaborate version of Henning's hint (see his comment). $$\begin{align} 1&=2^0\\ 10&=2^1\\ 100&=2^2\\ 1000&=2^3\\ \vdots&=\vdots\\ 10\dots0&=2^n\\ \hline 11\dots1&=2^0+2^1+\dots+2^n\\ 1&=1\\ \hline 100\dots0&=2^0+2^1+\dots+2^n+1=2^{n+1} \end{align}$$ Hence $2^0+2^1+\dots+2^n=2^{n+1}-1$

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Hint: Consider the sequence of partial sums $(a_n) = 2^0 + \cdots + 2^n$. Add one to each term. Do you notice a pattern?

For example:

$a_0 + 1 = 2^0 + 1 = \dots$

$a_1 + 1 = 2^0 + 2^1 + 1 = \dots$

$a_2 + 1 = 2^0 + 2^1 + 2^2 + 1 = \dots$

Can you guess what a general formula for $a_n + 1$ might be? Then what is $a_n$? An easy way to prove this would be by induction.

Since you already know $a_n = 2^{n+1} - 1$, the proof by induction goes like this:

  • Base case: with $n=0$: $a_0 = 2^0 = 1$, which is $2^{0+1}-1$, so the formula holds for the base case.
  • Inductive step: if $a_n = 2^{n+1}-1$, then $a_{n+1} = a_n + 2^{n+1}$ (because to get to the next term in the sequence you just add the next power of $2$); by the inductive hypothesis, this is equal to $(2^{n+1}-1) + 2^{n+1} = 2 \times 2^{n+1} - 1 = 2^{(n+1)+1} - 1$, which is the formula we conjectured for $a_{n+1}$.

With this, we've shown $a_n = 2^{n+1}-1$ for all $n \in \mathbb{N}_0$.

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How much is a direct summation worth? $$\begin{align*} 1 + \sum_{i=0}^n 2^i &= 1 + (2^0 + 2^1 + 2^2 + \cdots + 2^n)\\ &= (2^0 + 2^0) + (2^1 + 2^2 + \cdots + 2^n)\\ &= 2^1 + (2^1 + 2^2 + \cdots + 2^n)\\ &= (2^1 + 2^1) + (2^2 + \cdots + 2^n)\\ &= 2^2 + (2^2 + \cdots + 2^n)\\ \vdots &= \ddots\\ &= 2^n + (2^n)\\ &= 2^{n+1}. \end{align*}$$ Hence, $\displaystyle \sum_{i=0}^n 2^i = 2^{n+1} - 1.$

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    It's at least worth +1!2012-06-15
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Let us take a particular example that is large enough to illustrate the general situation. Concrete experience should precede the abstract.

Let $n=8$. We want to show that $2^0+2^1+2^2+\cdots +2^8=2^9-1$. We could add up on a calculator, and verify that the result holds for $n=8$. However, we would not learn much during the process.

We will instead look at the sum written backwards, so at $$2^8+2^7+2^6+2^5+2^4+2^3+2^2+2^1+2^0.$$ A kangaroo is $2^9$ feet from her beloved $B$. She takes a giant leap of $2^8$ feet. Now she is $2^8$ feet from $B$. She takes a leap of $2^7$ feet. Now she is $2^7$ feet from $B$. She takes a leap of $2^6$ feet. And so on. After a while she is $2^1$ feet from $B$, and takes a leap of $2^0$ feet, leaving her $2^0$ feet from $B$.

The total distance she has covered is $2^8+2^7+2^6+\cdots+2^0$. It leaves her $2^0$ feet from $B$, and therefore $$2^8+2^7+2^6+\cdots+2^0+2^0=2^9.$$ Since $2^0=1$, we obtain by subtraction that $2^8+2^7+\cdots +2^0=2^9-1$.

We can write out the same reasoning without the kangaroo. Note that $2^0+2^0=2^1$, $2^1+2^1=2^2$, $2^2+2^2=2^3$, and so on until $2^8+2^8=2^9$. Therefore $$(2^0+2^0)+2^1+2^2+2^3+2^4+\cdots +2^8=2^9.$$ Subtract the front $2^0$ from the left side, and $2^0$, which is $1$, from the right side, and we get our result.

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    I mean, seriously? A kangaroo? Gosh. $2^8$ feet leaps? Man... +1 for the laugh2012-06-15
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    @PatrickDaSilva: Yes, seriously. Someone reading it with attention may be able to reconstruct the idea a year from now.2012-06-15
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    @AndréNicolas "A Hulk is $2^9$ feet from her beloved..." would be more interesting. +12012-06-15
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    @AndreNicolas : You seem to like this pedagogic approach a lot. I respect you for that =) sometimes people forget that you need to do mathematics to have fun! When there's no fun, there's no theorem.2012-06-15
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This is called as a Geometric progression. YES there is a formula. Refer this: http://en.wikipedia.org/wiki/Geometric_progression

The answer for your problem is 2^(n-1).

You want the proof refer the above link. Simple and excellent

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    Its 2^(n+1)....my bad.2012-06-15
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    Note that the sum has exactly one odd number and therefore the sum cannot be an odd number. So your answers $2^{n-1},2^{n+1}$ are wrong.2012-06-15