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I have tried to solve the following recurrence relation using Iteration method,

T(1) = 8  
T(n) = 3T(n-1) - 15

Iterations:

i=1

T(n) = 3(3T(n-2) - 15) -15

i=2

3(3(3T(n-3) - 15) -15) - 15

i=3

 3(3(3(3T(n-4) - 15) -15) - 15) - 15

i=4

3(3(3(3(3T(n-5) - 15) -15) - 15) - 15) - 15

From the iteration pattern I found that
T(n) = 3(i+1) * T(n-(i+1)) - 15

Now I need to find the summation for this recurrence relation and obtain the closed form. I'm just not sure how to proceed.

Can someone guide me to solving this problem?

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The Mathematics Stack Exchange may be a better place for this. –  Kevin Apr 17 '13 at 18:54
    
Alright thanks Kevin, ill try asking there. –  user1057004 Apr 17 '13 at 18:59
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1 Answer 1

up vote 2 down vote accepted

The Recurrence relation is,

T(n) = 3T(n-1) - 15                        ------ 1

T(n-1) = 3T(n-2) - 15                      ------ 2

1-2 ->  T(n) - T(n-1) = 3T(n-1) - 3T(n-2)  ------ 3

T(n) - 4T(n-1)  + 3T(n-2) = 0              ------ 4

The corresponding characteristic equation is,

x2 -4x + 3 = 0

x = 3 and x = 1 are the solutions,

There for the general solution is,

T(n) = a 1n + b 3n

Which implies T(n) = a + b 3n

We have T(1) = 8,

There for a + 3b = 8 ---- 5

T(2) = 9,

There for a + 9b = 9 ---- 6

solving 5 & 6, we get a = 15/2 and b = 1/6.

Thus the general solution is, T(n) = (1/6) 3n + 15/2.

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