因为1/n(n+2)=1/2*[1/n-1/(n+2)]
所以 1/1×3+1/2×4+1/3×5+……1/n(n+2),
=1/2*[1-1/3+1/2-1/4+1/3-1/5+.+1/(n-1)-1/(n+1)+1/n-1/(n+2)]
=1/2*[1+1/2-1/(n+1)-1/(n+2)]
=3/4-1/2(n+1)-1/2(n+2)
求和:1/1×3+1/2×4+1/3×5+…+1/n(n+2)
2个回答
相关问题
-
1.求和1/(1×3)+1/(3×5)+1/(5×7)…1/(2n-1)(2n-2)
-
求和:(4^n)+3×(4^(n-1))+3(^2)×(4^(n-2))+……+(3^(n-1))×4+3^n,(n属于
-
Sn=1/(1×2×3)+1/(2×3×4)+1/(3×4×5)+…+1/n×(n+1)×(n+2)=___.
-
1×2×3+2×3×4+3×4×5+……n(n+1)(n+2)
-
阶乘问题一个求和:1×1!+2×2!+3×3!+…+n×n!
-
1×n+2×(n-1)+...+n×1求和
-
求和:Sn=[1/1×3+13×5+15×7+…+1(2n−1)(2n+1)]结果为( )
-
求和Sn=1×2+4×2²+7×2³+……+(3n-2)×2n
-
(2010•北海)规定:2!=2×1;3!=3×2×1;4!=4×3×2×1,…,n!=n×(n-1)×(n-2)×…×
-
数学问题怎样证明:1×2+2×3+3×4+……+n×(n+1)=n×(n+1)×(n+2)/3