Guides on solving this recurrence relation equation?

oslon

T(n)=c if n=1 =2T(n-1)+d if n>1 Find the value of T(n) and thus the time complexity. My attempt at it got stuck. T(n)=4T(n-2)+3d T(n)=8T(n-3)+7d .. .. .. T(n)=8T(n-k)+7d It can't be solved further.

Andre Oosthuizen

Quote:

It can't be solved further

This does not help us in any way or format, why can it not be solved further, did it freeze, were there an error etc. etc.

jeron1

Start writing things out more fully then look for the pattern in terms of n .

T(1) = c

T(2) = 2T(1) + d
T(2) = 2c + d -------- take this
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T(3) = 2T(2) + d |
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____________| and put it here
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/------\
T(3) = 2(2c + d) + d
T(3) = 4c + 2d + d
T(3) = 4c + 3d

T(4) = 2T(3) + d
T(4) = 2(4c + 3d) + d
T(4) = 8c + 6d + d
T(4) = 8c + 7d

T(5) = 2T(4) + d
T(5) = 2(8c + 7d) + d
T(5) = 16c + 14d + d
T(5) = 16c + 15d

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jschell

Googling suggests that time complexity requires 'code'. So as a starting point doesn't one need to write the recursive function first?

Marc Antoine Froger

Maybe I didn't understand completely your question, but to me, your function T can be written like this : For any Positive non null integer n => T(n) = ( c + d ) * ( 2^( n - 1 ) ) - d It works also with n = 1 since T(1) becomes ( c + d ) * (2^0) - d => c + d - d => c