cn=anbn=(2n+1)×2ⁿ=n×2^(n+1)+2ⁿ
Sn=c1+c2+...+cn=[1×2²+2×2³+...+n×2^(n+1)] +(2+2²+...+2ⁿ)
令Cn=1×2²+2×2³+...+n×2^(n+1)
则2Cn=1×2³+2×2⁴+...+(n-1)×2^(n+1)+n×2^(n+2)
Cn-2Cn=-Cn=2²+2³+...+2^(n+1)-n×2^(n+2)
Cn=n×2^(n+2)-[2²+2³+...+2^(n+1)]
Sn=Cn+(2+2²+...+2ⁿ)
=n×2^(n+2)-[2²+2³+...+2^(n+1)]+(2+2²+...+2ⁿ)
=n×2^(n+2)+2 -2^(n+1)
=(2n-1)×2^(n+1) +2
Cn=anbn,求数列{an}的前n项和,bn=2n+1,an=2^n
Cn=anbn,求数列{an}的前n项和,bn=2n+1,an=2^n
数学人气:201 ℃时间:2019-10-08 10:40:52
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