Triangular number: Difference between revisions

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A triangular number represents the number of circles you can arrange to a equilateral triangle.

Definition

${\displaystyle \Delta _{n}=\sum _{i=1}^{n}i={\frac {n\cdot (n+1)}{2}}={\frac {n+n^{2}}{2}}={n+1 \choose 2}}$

Properties

The triangular number is related to many other figurated numbers:

• The sum of two consecutive triangles is a square number:

${\displaystyle \Delta _{n-1}+\Delta _{n}={\frac {(n-1)\cdot n}{2}}+{\frac {n\cdot (n+1)}{2}}={\frac {n\cdot (n-1+n+1)}{2}}={\frac {n\cdot (2n)}{2}}={\frac {2n^{2}}{2}}=n^{2}}$

• ${\displaystyle 4\cdot \Delta _{n}+1}$ is a centered square number
• ${\displaystyle 6\cdot \Delta _{n}+1}$ is a centered hexagonal number
• ${\displaystyle 8\cdot \Delta _{n}+1}$ is an odd square number
• ${\displaystyle \sum _{i=1}^{n}i^{3}=\Delta _{n}^{2}}$

Every even perfect number is a triangular number

References