数列Cn=(n+2)/[n(n+1)]2^n的Sn

来源:学生作业帮助网 编辑:六六作业网 时间:2024/12/18 19:47:56
数列Cn=(n+2)/[n(n+1)]2^n的Sn数列Cn=(n+2)/[n(n+1)]2^n的Sn数列Cn=(n+2)/[n(n+1)]2^n的Sn裂项相消:Cn=[(n+2)/n-(n+2)/(n

数列Cn=(n+2)/[n(n+1)]2^n的Sn
数列Cn=(n+2)/[n(n+1)]2^n的Sn

数列Cn=(n+2)/[n(n+1)]2^n的Sn
裂项相消:Cn=[(n+2)/n-(n+2)/(n+1)]2^n=2/(n2^n)-1/((n+1)2^n)=1/(n2^(n-1)-1/((n+1)2^n),因此Sn=1-1/(2*2)+1/(2*2)-1/(3*2^2)+1/(3*2^2)-1/(4*2^3)+...+1/(n2^(n-1)-1/((n+1)2^n)=1-1/((n+1)2^n)

Cn=(n+2)/[n(n+1)]2^n
=(n+2)*1/[n(n+1)]2^n
=(n+2)*【1/n-1/(n+1)】/2^n
=[1+2/n-1-1/(n+1)/2^n
=[1/n+1/n-1/(n+1)]/2^n