从1乘2分之1加到49乘50分之一的答案

1乘2乘3乘4分之1加2乘3乘4乘5分之1加3乘4乘5乘6分之1加4乘5乘6乘7分=（5*6*7+6*7+2*7+2*3）/（2*3*4*5*6*7）=272/（2*3*4*5*6*7）=17/315

思路如下：考虑通用性,研究一下1/[n(n+1)(n+2)]与1/n,1/(n+1),1/(n+2)的关系,可以知道下式成立：1/[n(n+1)(n+2)]=1/2*[1/n+1/(n+2)]-1/(

1/(1*2*3)+1/(2*3*4)an=1/[n(n+1)(n+2)]=[(n+2)-(n+1)]/[n(n+1)(n+2)]=1/n(n+1)-1/n(n+2)=[1/n-1/(n+1)]-(1

1乘3乘5分之4加3乘5乘7分之4+...+95乘97乘99分之4=1/(1×3)-1/(3×5)+1/(3×5)-1/(5×7)+...+1/(95×97)-1/(97×99)=1/(1×3)-1/

-1乘二分之一加2乘三分之一加3乘四分之一一直加到49乘50分之一/=1-1/2+1/2-1/3+1/3-1/4+……+1/50=1-1/50=49/50

1乘2分之1加2乘3分之1加3乘4分之1加.加49乘50分之1=(1-2分之1）+（2分之1-3分之1）+（3分之1-4分之1）+（4分之1-5分之1）+.+(49分之1-50分之1)=1-50分之1

1/2+1/6+1/12.+1/(49*50)=1-1/2+1/2-1/3+1/3-1/4+.-1/49+1/49-1/50=1-1/50=49/50

5/1×2+5/2×3+5/3×4+……+5/48×49+5/49×50=5(1/1×2+1/2×3+1/3×4+……+1/48×49+1/49×50)=5(1/1-1/2+1/2-1/3+1/3-1

1/(2*3)+1/(3*4)+...+1/(49*50)=1/2-1/3+1/3-1/4+...+1/49-1/50=1/2-1/50=12/25

=50-(1/2+1/3+.1/50)=51-(1+1/2+1/3+.1/50)会了不,希望一点就通哈因为Euler(欧拉)在1734年,利用Newton的成果,首先获得了调和级数有限多项和的值.结果

1/2*3+1/3*4+1/4*5+……+1/49*50=(1/2-1/3)+(1/3-1/4)+(1/4-1/5)+……+(1/49-1/50)=1/2-1/3+1/3-1/4+1/4-1/5+……

=(1/2)×(1/1×2+1/2×3)+(1/2)×(1/2×3-1/3×4)+……+(1/2)×(1/48×49-1/49×50)=(1/2)×(1/1×2+1/2×3+1/2×3-1/3×4+…

2/(1×2×3)+2/(2×3×4)+...+2/(28×29×30)=2*1/2*[1/(1×2)-1/(2×3)+1/(2×3)-1/(3×4)+...+1/(28×29)-1/(29×30)]

看到你问过一个类似的题目,三个连续自然数相乘的倒数,此题类似,考虑通式：（2n+3)/[n(n+1)(n+2)(n+3)]=(n+n+3)/[n(n+1)(n+2)(n+3)]=1/[(n+1)(n+

=1*2*3(1+2*2*2+7*7*7)/[1*3*5(1+2*2*2+7*7*7)]=1*2*3/(1*3*5)=2/5

=1-1/2+1/2-1/3+1/3-1/4+……+1/2008-1/2009=1-(1/2-1/2)-(1/3-1/3)……-1/2009=1-1/2009=2008/2009

1×1/2=1-1/21/2×1/3=1/2-1/31/3×1/4=1/3-1/4..1/6×1/7=1/6-1/7原式=1-1/2+1/2-1/3+1/3-1/4+1/4-1/5+1/5-1/6+1

1/(2*3)+1/(3*4)+1/(4*5)+……+1/（50*51)=(1/2-1/3)+(1/3-1/4)+(1/4-1/5)……+(1/50-1/51)=1-1/51=50/511/(2*3)

1-1×1/2-1/2×1/3-……-1/50×1/51=1-(1-1/2)-(1/2-1/3)-……-(1/50-1/51)=1-1+1/2-1/2+1/3-……-1/50+1/51=1/51