In this paper,we firstly modified the mistake in reference of Bennett,then using Strmer s theorem of the solutions of Pell equation,and a deep result of privitive divisor of Bilu,Hanrot and Voutier,we proved that there is no exist four distinct triangular numbers in geometric progression,therefore we sovled the question of Sierpinski on triangular numbers.

when n=2~(r+1)-1,it can be expressed by geometric progression ∑ni=0x~i=∏rj=0(1+x~(2~j)).

Considering the product of geometric series,where negatively associated sequences are identically distributed with mean zero and variance 1,a law of iterated logarithm obtained when β converges to one.

By using summation algorithms of hypergeometric series,the author got a series of summations of hypergeometric series which widen the research results of ZHANG Xiang-de,TAO Ching-qi.