作业帮1/3+1/8+1/15+1/24+1/35+.1/9999=
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/04 16:57:11
1/3+1/8+1/15+1/24+1/35+.1/9999=
1/3+1/8+1/15+1/24+1/35+.1/9999=
1/3+1/8+1/15+1/24+1/35+.1/9999=
原式=[1/(1×3)+1/(3×5)+.+1/(98×100)]+[1/(2×4)+1/(4×6)+.+1/(99×101)]
=(1-1/3+1/3-1/5+1/5-1/7+.+1/98-1/100)+(1/2-1/4+1/4-1/6+.+1/99-1/101)
=1-1/100+1/2-1/101
=3/2-1/100-1/101
1/(n^2-1)=1/2[(1/n-1)-(1/n+1)]
将n=2至n=100带入
分解因式
原理是 1/[n*(n+2)]=1/2 *[1/n-1/(n+2)]
原式=1/(1*3)+1/(2*4)+1/(3*5)+……1/(99*101)
=1/2 *[1-1/3+1/2-1/4+1/3-1/5+1/4-1/6……1/98-1/100+1/99-/101]
=0.5*[(1+1/2+1/3+1/4……+1/99)-(1/3+1/4+1/5……+1/100+1/101)]
=0.5*[1+1/2-1/100-1/101]
剩下的自己算吧
1/(n^2-1)=1/2[(1/n-1)-(1/n+1)]
将n=2至n=100带入
1/3+1/8+1/15+1/24+1/35+……1/9999
=1/(2的平方-1)+1/(3的平方-1)+1/(4的平方-1)+……+1/(100的平方-1)
=1/[(2-1)(2+1)]+1/[(3-1)(3+1)]+1/[(4-1)(4+1)]+……+1/[(100-1)(100+1)]
=1/(1*3)+1/(2*4)+1/(3*5)+……+1/(99*100)...
全部展开
1/3+1/8+1/15+1/24+1/35+……1/9999
=1/(2的平方-1)+1/(3的平方-1)+1/(4的平方-1)+……+1/(100的平方-1)
=1/[(2-1)(2+1)]+1/[(3-1)(3+1)]+1/[(4-1)(4+1)]+……+1/[(100-1)(100+1)]
=1/(1*3)+1/(2*4)+1/(3*5)+……+1/(99*100)
=1/2(1-1/3+1/2-1/4+……+1/99-1/100)
=1/2
收起
通项公式很简单an=1/(n^2-1)=1/2[(1/n-1)-(1/n+1)]
求和:
1/2[(1-1/3)+(1/2-1/4)+(1/3-1/5)+(1/4-1/6)+……+(1/98-1/100)+(1/99-1/101)]
可以很清楚得看出每隔一项就可以相消。所以最后
原式=1/2[1+1/2-1/100-1/101]=14949/20200
1/1*3+1/2*4+1/3*5+1/4*6+。。。。+1/99*101
=1/2(2/1*3+2/2*4+2/3*5+2/4*6+。。。。+2/99*101)
=1/2((1/1-1/3)+(1/2-1/4)+(1/3-1/5)+(1/4-1/6)。。。。+(1/99-1/101))
削去共同的得:
1/2(1+1/2-1/100-1/101)
=1/2...
全部展开
1/1*3+1/2*4+1/3*5+1/4*6+。。。。+1/99*101
=1/2(2/1*3+2/2*4+2/3*5+2/4*6+。。。。+2/99*101)
=1/2((1/1-1/3)+(1/2-1/4)+(1/3-1/5)+(1/4-1/6)。。。。+(1/99-1/101))
削去共同的得:
1/2(1+1/2-1/100-1/101)
=1/2(1+1/2-201/10100)
=1/2 * 14949/10100
=14949/20200
收起