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I am trying to understand how to solve recurrence relations. I understand it to the point where we have to simplify.

T(N) = T(N-1) + N-1              Initial condition: T(1)=O(1)=1
T(N) = T(N-1) + N-1
T(N-1) = T(N-2) + N-2
T(N-2) = T(N-3) + N-3
……
T(2) = T(1) + 1


**Summing up right and left sides**

T(N) + T(N-1) + T(N-2) + T(N-3) + …. T(3) + T(2) =

= T(N-1) + T(N-2) + T(N-3) + …. T(3) + T(2) + T(1) +

(N-1) + (N-2) + (N-3) + …. +3 + 2 + 1


** Canceling like terms and simplifying **

T(N) = T(1) + N*(N-1)/2 1 + N*(N - 1)/2

T(N) = 1 + N*(N - 1)/2

I really don't understand the last part. I understand canceling like terms but don't understand how the simplification below works:

T(N) = T(1) + (N-1) + (N-2) + (N-3) + …. +3 + 2 + 1
T(N) = T(1) + N*(N-1)/2 1 + N*(N - 1)/2

How is the second line derived from the first? Doesn't make any sense to me.

Would be a great help if someone can help me understand this. Thanks =)

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2 Answers 2

up vote 1 down vote accepted

In your second-to-last-line:

 S = (N-1) + (N-2) + (N-3) + ... + 3 + 2 + 1

You can say:

2S = S + S
   = (N-1) + (N-2) + (N-3) + ... +   3   +   2   +   1
       1   +   2   +   3   + ... + (N-3) + (N-2) + (N-1)
   =   N   +   N   +   N   + ... +   N   +   N   +   N
       |__________________ N-1 times ________________|

You're counting from N - 1 to 1, so there are N - 1 terms in the sequence. But the whole sequence is just N so you can say:

2S = N * (N - 1)
 S = (N * (N - 1)) / 2

So in your last chunk:

T(N) = T(1) + (N-1) + (N-2) + (N-3) + ... + 3 + 2 + 1
     = T(1) + (N * (N - 1)) / 2
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Hi there, thanks for your answer. Where does the '2S = S + S' come from? –  Harry Tiron Jun 2 '12 at 4:11
    
2S = S + S? 2 = 1 + 1. It's just a true statement. Proving things isn't as intuitive as reading through the proof, so this is one of those examples that you just have to look at and accept. It's a trick that simplifies things. –  Blender Jun 3 '12 at 2:29
T(N) = T(1) + (N-1) + (N-2) + (N-3) + …. +3 + 2 + 1
     = T(1) + (N-1) +  (N-2) + (N-3) + ..... + ( N-(N-3)) + (N-(N-2)) + (N-(N-1))
     = T(1) + [N+N+N+..... n-1 times] - [1+2+3+......+(N-3)+(N-2)+(N-1)]
     = T(1) + N*(N-1) - (N*(N-1))/2
     = T(1) + N*(N-1)/2
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Hi there, thanks for your answer. I kind of get it. Don't understand why we divide by 2 ? :S –  Harry Tiron Jun 2 '12 at 4:25
    
@HarryTiron divide by 2 is actually the part of n*(n+1)/2 which is sum of n natural numbers, here we have to find sum of (n-1)natural numbers i.e. 1+2+3+....+(n-1). so sum is (n-1)*(n-1+1)/2. see this wikipedia page en.wikipedia.org/wiki/Sum_of_natural_numbers –  abhinav8 Jun 2 '12 at 4:28

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