已知数列{an}中的前n项和为Sn=-3n^2+6n,数列{bn}满足bn=(1/2)^n-1,数列满足Cn=1/6an
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已知数列{an}中的前n项和为Sn=-3n^2+6n,数列{bn}满足bn=(1/2)^n-1,数列满足Cn=1/6an*bn,求{an}
已知数列{an}中的前n项和为Sn=-3n^2+6n,数列{bn}满足bn=(1/2)^n-1,数列{cn}满足Cn=1/6an*bn,求{an}的通项公式,求{cn}的前几项和Tn
已知数列{an}中的前n项和为Sn=-3n^2+6n,数列{bn}满足bn=(1/2)^n-1,数列{cn}满足Cn=1/6an*bn,求{an}的通项公式,求{cn}的前几项和Tn
当n=1时,a1=S1=-3×1²+6×1=3,
当n≥2时,
an=Sn-S
=(-3n²+6n)-[-3(n-1)²+6(n-1)]
=-3n²+6n+3n²-6n+9-6n+6
=9-6n,
an=9-6n满足a1=3,
则{an}的通项公式:an=9-6n.
cn=1/6×(1/2)^(n-1)×(9-6n)=(3-2n)/2^n.
Tn=1/2^1+(-1)/2^2+(-3)/2^3+...+(5-2n)/2^(n-1)+(3-2n)/2^n,
有2Tn=1+(-1)/2^1+(-3)/2^2+(-5)/2^3+...+(3-2n)/2^(n-1).
两式相减【2Tn-Tn】可得:
Tn=1+1/2^1×(-1-1)+1/2^2×[-3-(-1)]+1/2^3×[-5-(-3)]+...+1/2^(n-1)×[(3-2n)-(5-2n)]-(3-2n)/2^n
=1-2×[1/2^1+1/2^2+1/2^3+,..+1/2^(n-1)]-(3-2n)/2^n
=1-2×1/2[1-(1/2)^(n-1)]/(1-1/2)-(3-2n)/2^n
=1-2×[1-(1/2)^(n-1)]-(3-2n)/2^n
=[(2n+1)/2^n]-1,
即Tn=[(2n+1)/2^n]-1.
当n≥2时,
an=Sn-S
=(-3n²+6n)-[-3(n-1)²+6(n-1)]
=-3n²+6n+3n²-6n+9-6n+6
=9-6n,
an=9-6n满足a1=3,
则{an}的通项公式:an=9-6n.
cn=1/6×(1/2)^(n-1)×(9-6n)=(3-2n)/2^n.
Tn=1/2^1+(-1)/2^2+(-3)/2^3+...+(5-2n)/2^(n-1)+(3-2n)/2^n,
有2Tn=1+(-1)/2^1+(-3)/2^2+(-5)/2^3+...+(3-2n)/2^(n-1).
两式相减【2Tn-Tn】可得:
Tn=1+1/2^1×(-1-1)+1/2^2×[-3-(-1)]+1/2^3×[-5-(-3)]+...+1/2^(n-1)×[(3-2n)-(5-2n)]-(3-2n)/2^n
=1-2×[1/2^1+1/2^2+1/2^3+,..+1/2^(n-1)]-(3-2n)/2^n
=1-2×1/2[1-(1/2)^(n-1)]/(1-1/2)-(3-2n)/2^n
=1-2×[1-(1/2)^(n-1)]-(3-2n)/2^n
=[(2n+1)/2^n]-1,
即Tn=[(2n+1)/2^n]-1.
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