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Prove that all terms of number triangle are integers

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October 12, 2010

number theory unsolvednumber theory

Problem Statement

A “number triangle”

(t_{n, k}) (0 \le k \le n)

is defined by

t_{n,0} = t_{n,n} = 1 (n \ge 0),

t_{n+1,m} =(2 -\sqrt{3})^mt_{n,m} +(2 +\sqrt{3})^{n-m+1}t_{n,m-1} (1 \le m \le n) Prove that all

t_{n,m}

are integers.