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Given the deep diagonals of Pascal's triangle:

        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 '14 at 18:52 The deep diagonals would be the opposite of the shallow diagonals, which you sum to get the fibonacci sequence – kjh Feb 18 '14 at 18:54
What do you mean by "opposite"? – user2357112 Feb 18 '14 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 '14 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 '14 at 19:05

1 Answer 1

up vote -1 down vote accepted

Yes, this is covered in Wikipedia. Here you go:

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Link-only answers are a poor practice. An answer should answer the question, not just point you to a different answer. Especially if the linked page changes or disappears, the answer should still remain valid. – user2357112 Feb 18 '14 at 18:56
This "answer" should have been a comment. – Zzyrk Feb 18 '14 at 19:02
I could copy-paste it from Wikipedia, but the formulas would not come out right. This conveys the information perfectly, there's no need for me to paraphrase it and bungle up the details. – StilesCrisis Feb 18 '14 at 19:31
Also, the "link-only answers are poor" article assumes that you link to something which does not cover the answer precisely. In this case, my link is an exact answer. – StilesCrisis Feb 18 '14 at 19:32
@StilesCrisis And I quote - "I think that links are fantastic, but they should never be the only piece of information in your answer." ("never", there's no "except when..." there - did you read that answer?). It doesn't matter what the link says. Knowing the basics of mark-down (Stack Overflow formatting) should allow you to rewrite the equations. – Dukeling Feb 18 '14 at 20:06

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