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What is the sum of the following sequence

$\begin{align*} (2^1 - 1) &+ \Big((2^1 - 1) + (2^2 - 1)\Big)\\ &+ \Big((2^1 - 1) + (2^2 - 1) + (2^3 - 1) \Big)+\ldots\\ &+\Big( (2^1 - 1)+(2^2 - 1)+(2^3 - 1)+\ldots+(2^n - 1)\Big) \end{align*}$

I tried to solve this. I reduced the equation into the following equation

$n(2^1) + (n-1)\cdot2^2 + (n-2)\cdot2^3 +\ldots$

but im not able to solve it further. Can any one help me solve this equation out. and btw its not a Home work problem. This equation is derived from some puzzle.

Thanks in advance

  • 1
    Note that your formula $n(2^1) + (n-1)\cdot2^2 + (n-2)\cdot2^3 +\ldots$ is not correct, for example, when n=2 it does not yield 5.2012-09-07

3 Answers 3

7

We have $\begin{align} \sum_{i=1}^n\sum_{j=1}^i(2^j-1) &=\sum_{i=1}^n\sum_{j=1}^i2^j-\sum_{i=1}^n\sum_{j=1}^i1\\ &=\sum_{i=1}^n(2^{i+1}-2)-\sum_{i=1}^ni\\ &=2\sum_{i=1}^n2^{i}-\sum_{i=1}^n2-\sum_{i=1}^ni\\ &=2(2^{n+1}-2)-2n-\frac12n(n+1)\\ &=2^{n+2}-4-\frac52n-\frac12n^2\\ \end{align} $

  • 0
    I go$t$ a downvote for this? If anyone was actually reading the answer the mistake was clear.2012-09-07
3

Let's note that $(2^1 - 1) + (2^2 - 1) + \cdots + (2^k - 1) = 2^{k+1} - 2-k$ where we have used the geometric series. Thus, the desired sum is actually $\sum_{k=1}^n{2^{k+1}-2-k}$. As this is a finite sum, we can evaluate each of the terms separately. We get the sum is $2\left(\frac{2^{n+1}-1}{2-1}-1\right) - 2n- \frac{n(n+1)}{2} = 2^{n+2}-4 - 2n-\frac{n(n+1)}{2} $

  • 0
    Well good then. I downvoted a wrong answer.2012-09-08
2

Others have given the correct answer; here’s how you could have simplified your incorrect expression.

$\begin{align*} n(2^1) + (n-1)\cdot2^2 + (n-2)\cdot2^3 +\ldots&=\sum_{k=1}^n(n-k+1)2^k\\ &=(n+1)\sum_{k=1}^n2^k-\sum_{k=1}^nk2^k\\ &=(n+1)\left(2^{n+1}-2\right)-\sum_{k=1}^n\sum_{i=1}^k2^k\\ &=(n+1)\left(2^{n+1}-2\right)-\sum_{i=1}^n\sum_{k=i}^n2^k\\ &=(n+1)\left(2^{n+1}-2\right)-\sum_{i=1}^n\left(2^{n+1}-2^i\right)\\ &=(n+1)\left(2^{n+1}-2\right)-n2^{n+1}+\sum_{i=1}^n2^i\\ &=(n+1)\left(2^{n+1}-2\right)-n2^{n+1}+2^{n+1}-2\\ &=2\cdot2^{n+1}-2n-4\\ &=2^{n+2}-2n-4 \end{align*}$