已知数列{an}的前n项和为sn,且sn=2n^2+n,n是正整数,又an=4log(2)bn+3
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已知数列{an}的前n项和为sn,且sn=2n^2+n,n是正整数,又an=4log(2)bn+3
(1)求an,bn
(2)数列{an*bn}的前n项和Tn
我第二小题不会做,求思路
(1)求an,bn
(2)数列{an*bn}的前n项和Tn
我第二小题不会做,求思路
(1)
Sn= 2n^2+n (1)
S(n-1) = 2(n-1)^2 + (n-1) (2)
(1) -(2)
an= 2n^2+n - 2(n-1)^2 - (n-1)
= 4n-1
an=4log(2)bn+3
4n-1 = 4log(2)bn+3
log(2)bn = n-1
bn = 2^(n-1)
(2)
anbn = (4n-1)(2^(n-1))
= 4[n2^(n-1)] - 2^(n-1)
consider
[x^(n+1)-1]/(x-1) = 1+x+x^2+...+x^n
[(x^(n+1)-1)/(x-1)]' = 1+2x+..+nx^(n-1)
1+2x+..+nx^(n-1) = [ (x-1)(n+1)x^n) -(x^(n+1)-1) ]/(x-1)^2
= [nx^(n+1)-(n+1)x^n+1]/(x-1)^2
put x=2
1+2(2)+3(2)^2+..+n(2)^(n-1)
=n2^(n+1)- (n+1)2^n +1
summation anbn
=summation {4[n2^(n-1)] - 2^(n-1)}
= 4(n2^(n+1)- (n+1)2^n +1) - (2^n-1)
=(4n).2^(n+1) - (4n+5).2^n +5
Sn= 2n^2+n (1)
S(n-1) = 2(n-1)^2 + (n-1) (2)
(1) -(2)
an= 2n^2+n - 2(n-1)^2 - (n-1)
= 4n-1
an=4log(2)bn+3
4n-1 = 4log(2)bn+3
log(2)bn = n-1
bn = 2^(n-1)
(2)
anbn = (4n-1)(2^(n-1))
= 4[n2^(n-1)] - 2^(n-1)
consider
[x^(n+1)-1]/(x-1) = 1+x+x^2+...+x^n
[(x^(n+1)-1)/(x-1)]' = 1+2x+..+nx^(n-1)
1+2x+..+nx^(n-1) = [ (x-1)(n+1)x^n) -(x^(n+1)-1) ]/(x-1)^2
= [nx^(n+1)-(n+1)x^n+1]/(x-1)^2
put x=2
1+2(2)+3(2)^2+..+n(2)^(n-1)
=n2^(n+1)- (n+1)2^n +1
summation anbn
=summation {4[n2^(n-1)] - 2^(n-1)}
= 4(n2^(n+1)- (n+1)2^n +1) - (2^n-1)
=(4n).2^(n+1) - (4n+5).2^n +5
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