# Algorithm to compute the deep diagonals of Pascal's Triangle

Given the deep diagonals of Pascal's triangle:

``````          1
1   1
1   2   1
1   3   3   1
1   4   6   4    1
1   5   10  10   5   1

1st diagonal: 1 1 1 1 1 ...
2nd diagonal: 1 2 3 4 5 ...
3rd diagonal: 1 3 6 10 15 ...
4th diagonal: 1 4 10 20 35 ...
``````

Is there an algorithm to compute the first k terms from any ith diagonal?

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What do you mean by "deep diagonal"? –  user2357112 Feb 18 at 18:52
mathworld.wolfram.com/PascalsTriangle.html The deep diagonals would be the opposite of the shallow diagonals, which you sum to get the fibonacci sequence –  kjh Feb 18 at 18:54
What do you mean by "opposite"? –  user2357112 Feb 18 at 18:58
Will you please look at the link I have provided to search for "shallow diagonals" and then compare that result to my example? –  kjh Feb 18 at 19:00
You can read the "shallow diagonals" by starting in any row of the triangle and reading the 1st number in that row, then reading the second number in the row up, the third number another row up so on... The deep diagonals would be read by doing the opposite. Start in any row at the first number, then read the 2nd number one row down, then the 3rd one more row down, so on.. This is pretty simple. My professor uses the terms "shallow" and "deep" diagonals. I don't know if it's a real term, but it shouldn't be that difficult to infer the meaning. –  kjh Feb 18 at 19:05