题目内容
各项是正数的等比数列{an}中,a2,
a3,a1成等差数列,则数列{an}公比q=______.
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由题意设等比数列{an}的公比为q(q>0),
由a2,
a3,a1成等差数列可得:a3=a2+a1,
即q2-q-1=0,解得q=
或q=
(舍去)
故答案为:
由a2,
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即q2-q-1=0,解得q=
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1-
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故答案为:
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a3,a1成等差数列,则数列{an}公比q=________.
a3,a1成等差数列,则数列{an}公比q= .
a3,a1成等差数列,则数列{an}公比q= .