TADM2E 2.33
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Revision as of 07:40, 2 August 2020 by FuckyouMatt (talk | contribs) (FuckyouMatt moved page TADM2E 2.33 to User:TADM2E 2.33)
On careful observation , one can see that the sum of any row is just $ 3^{n-1} $ this is the sum for the series . This can even be computed using a series as shown below
1=a0 1 1 1 a1 a0 a2
now a(mid) of the next line becomes the a(0) +a(1) +a(2) that it this mid element is always the sum of the middle three elements
Alternate explanation :
Every element in the current row will be used 3 times in next row; once directly below it, and also in left and right element below it.
So sum of elements in $ (n+1) $th row will be 3*(sum of elements in $ n $th row).
Hence, S(n) = $ 3^{n-1} $ (Base case : For 1st row, sum is 1)