This generates the first (n) rows of the following triangles:

Pascal‘s Triangle

Leibniz‘s Harmonic Triangle

Floyd‘s Triangle

This calculator has 1 input.

Pascal‘s Triangle

Leibniz‘s Harmonic Triangle

Floyd‘s Triangle

This calculator has 1 input.

- Floyds Triangle is built using natural numbers
- Sum Row(n) for Floyds = n(n
^{2}+ 1)/2

For more math formulas, check out our Formula Dossier

- combination
- a mathematical technique that determines the number of possible arrangements in a collection of items where the order of the selection does not matter
_{n}P_{r}= n!/r!(n - r)! - leibnizs triangle
- a triangular arrangement of unit fractions in which the outermost diagonals consist of the reciprocals of the row numbers and each inner cell is the cell diagonally above and to the left minus the cell to the left.
- pascals triangle
- a triangular array of the binomial coefficients
- triangle
- a flat geometric figure that has three sides and three angles