Leibniz harmonic triangle

The first eight rows are:

${\displaystyle {\begin{array}{cccccccccccccccccc}&&&&&&&&&1&&&&&&&&\\&&&&&&&&{\frac {1}{2}}&&{\frac {1}{2}}&&&&&&&\\&&&&&&&{\frac {1}{3}}&&{\frac {1}{6}}&&{\frac {1}{3}}&&&&&&\\&&&&&&{\frac {1}{4}}&&{\frac {1}{12}}&&{\frac {1}{12}}&&{\frac {1}{4}}&&&&&\\&&&&&{\frac {1}{5}}&&{\frac {1}{20}}&&{\frac {1}{30}}&&{\frac {1}{20}}&&{\frac {1}{5}}&&&&\\&&&&{\frac {1}{6}}&&{\frac {1}{30}}&&{\frac {1}{60}}&&{\frac {1}{60}}&&{\frac {1}{30}}&&{\frac {1}{6}}&&&\\&&&{\frac {1}{7}}&&{\frac {1}{42}}&&{\frac {1}{105}}&&{\frac {1}{140}}&&{\frac {1}{105}}&&{\frac {1}{42}}&&{\frac {1}{7}}&&\\&&{\frac {1}{8}}&&{\frac {1}{56}}&&{\frac {1}{168}}&&{\frac {1}{280}}&&{\frac {1}{280}}&&{\frac {1}{168}}&&{\frac {1}{56}}&&{\frac {1}{8}}&\\&&&&&\vdots &&&&\vdots &&&&\vdots &&&&\\\end{array}}}$

The denominators are listed in (sequence A003506 in the OEIS), while the numerators are all 1s.

The terms are given by the recurrences

${\displaystyle a_{n},_{1}={1 \choose n}}$

${\displaystyle a_{n},_{k}=\left({\frac {1}{n{\binom {n-1}{k-1}}}}\right)}$

and explicitly by

${\displaystyle a_{n},_{k}={\frac {1}{{\binom {n}{k}}k}}}$

Where${\displaystyle {\binom {n}{k}}}$is a binomial coefficient[1]

Whereas each entry in Pascal's triangle is the sum of the two entries in the above row, each entry in the Leibniz triangle is the sum of the two entries in the row below it. For example, in the 5th row, the entry (1/30) is the sum of the two (1/60)s in the 6th row.

Just as Pascal's triangle can be computed by using binomial coefficients, so can Leibniz's: ${\displaystyle L(r,c)={\frac {1}{r{r-1 \choose c-1}}}}$. Furthermore, the entries of this triangle can be computed from Pascal's: "The terms in each row are the initial term divided by the corresponding Pascal triangle entries."[2] In fact, each diagonal relates to corresponding Pascal Triangle diagonals: The first Leibniz diagonal consists of 1/(1x natural numbers), the second of 1/(2x triangular numbers), the third of 1/(3x tetrahedral numbers) and so on.

If one takes the denominators of the nth row and adds them, then the result will equal ${\displaystyle n2^{n-1}}$. For example, for the 3rd row, we have 3 + 6 + 3 = 12 = 3 × 2².

We have ${\displaystyle L(r,c)=\int _{0}^{1}\!x^{c-1}(1-x)^{r-c}\,dx\,.}$