已知数列{an}满足:a1=1,a2=2,a3=3,a4=4,a5=5,且当n≥5时,an+1=a1a2…an-1,若数列{bn}满足对任意n
已知数列{an}满足:a1=1,a2=2,a3=3,a4=4,a5=5,且当n≥5时,an+1=a1a2…an-1,若数列{bn}满足对任意n∈N*,有bn=a1a2…a...
已知数列{an}满足:a1=1,a2=2,a3=3,a4=4,a5=5,且当n≥5时,an+1=a1a2…an-1,若数列{bn}满足对任意n∈N*,有bn=a1a2…an-a12-a22-…-an2,则b5=______;当n≥5时,bn=______.
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由已知,b5=a1a2…a5-a12-a22-…-a52
=1×2×3×4×5-(12+22+32+42+52)
=120-55
=65.
当n≥5时,由an+1=a1a2…an-1,移向得出a1a2…an-1=an+1+1 ①
∵bn=a1a2…an-a12-a22-…-an2,②
∴bn+1=a1a2…anan+1-a12-a22-…-an2-an+12 ③
③-②得bn+1-bn=a1a2…anan+1-a1a2…an-an+12
=a1a2…an(an+1-1)-an+12 (将①式代入)
=(an+1+1)(an+1-1)-an+12=an+12-1-an+12
=-1
∴当n≥5时,数列{bn}的各项组成等差数列,
∴bn=b5+(n-5)×(-1)=65-(n-5)=70-n.
故答案为:65 70-n
=1×2×3×4×5-(12+22+32+42+52)
=120-55
=65.
当n≥5时,由an+1=a1a2…an-1,移向得出a1a2…an-1=an+1+1 ①
∵bn=a1a2…an-a12-a22-…-an2,②
∴bn+1=a1a2…anan+1-a12-a22-…-an2-an+12 ③
③-②得bn+1-bn=a1a2…anan+1-a1a2…an-an+12
=a1a2…an(an+1-1)-an+12 (将①式代入)
=(an+1+1)(an+1-1)-an+12=an+12-1-an+12
=-1
∴当n≥5时,数列{bn}的各项组成等差数列,
∴bn=b5+(n-5)×(-1)=65-(n-5)=70-n.
故答案为:65 70-n
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