百度作业网求救!help!an=2的n次方,bn=1+2(n-1),求数列{an*bn}的前n项和Sn.
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求救!help!
an=2的n次方,bn=1+2(n-1),求数列{an*bn}的前n项和Sn.
an=2的n次方,bn=1+2(n-1),求数列{an*bn}的前n项和Sn.
由于打不出幂次方,用^表示次方 如2^n表示2的n次方,
an=2^n
bn=1+2(n-1)
an×bn=2^n+(2^(n+1))×(n-1)=2^n+(2^(n+1))×n-2^(n+1)
2^n-2^(n+1)=2^n-2×2^n= -2^n
an×bn=(2^(n+1))×n-2^n
(2^(n+1))×n前n项A=(2^2)×1+(2^3)×2+(2^4)×3+(2^5)×4+……+(2^(n+1))×n (1)
A×2= (2^3)×1+(2^4)×2+(2^5)×3+……+(2^(n+1))×(n-1)+(2^(n+2))×n (2)
式(2)-(1)
A=(2^(n+2))×n -(2^2+2^3+2^4+2^5+……+2^(n+1))
2^2+2^3+2^4+2^5+……+2^(n+1)为首项为2^2,公比为2的等比数列前N项和=
(2^2)*(1-2^n)/(1-2)=-4×(1-2^n )
A=(2^(n+2))×n+4×(1-2^n )
2^n前n项为首项为2,公比为2的等比数列,B=2(1-2^n)/(1-2)= -2×(1-2^n )
Sn=A-B=(2^(n+2))×n+4×(1-2^n )+2×(1-2^n )=(2^(n+2))×n+6×(1-2^n )=6+(4n-6)×2^n
an=2^n
bn=1+2(n-1)
an×bn=2^n+(2^(n+1))×(n-1)=2^n+(2^(n+1))×n-2^(n+1)
2^n-2^(n+1)=2^n-2×2^n= -2^n
an×bn=(2^(n+1))×n-2^n
(2^(n+1))×n前n项A=(2^2)×1+(2^3)×2+(2^4)×3+(2^5)×4+……+(2^(n+1))×n (1)
A×2= (2^3)×1+(2^4)×2+(2^5)×3+……+(2^(n+1))×(n-1)+(2^(n+2))×n (2)
式(2)-(1)
A=(2^(n+2))×n -(2^2+2^3+2^4+2^5+……+2^(n+1))
2^2+2^3+2^4+2^5+……+2^(n+1)为首项为2^2,公比为2的等比数列前N项和=
(2^2)*(1-2^n)/(1-2)=-4×(1-2^n )
A=(2^(n+2))×n+4×(1-2^n )
2^n前n项为首项为2,公比为2的等比数列,B=2(1-2^n)/(1-2)= -2×(1-2^n )
Sn=A-B=(2^(n+2))×n+4×(1-2^n )+2×(1-2^n )=(2^(n+2))×n+6×(1-2^n )=6+(4n-6)×2^n
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