题目内容
下列关于数列的说法:
①若数列{an}是等差数列,且p+q=r(p,q,r为正整数)则ap+aq=ar;
②若数列{an}前n项和Sn=(n+1)2,则{an}是等差数列;
③若数列{an}满足an+1=2an,则{an}是公比为2的等比数列;
④若数列{an}满足Sn=2an-1,则{an}是首项为1,公比为2等比数列.
其中正确的个数为( )
①若数列{an}是等差数列,且p+q=r(p,q,r为正整数)则ap+aq=ar;
②若数列{an}前n项和Sn=(n+1)2,则{an}是等差数列;
③若数列{an}满足an+1=2an,则{an}是公比为2的等比数列;
④若数列{an}满足Sn=2an-1,则{an}是首项为1,公比为2等比数列.
其中正确的个数为( )
| A.1 | B.2 | C.3 | D.4 |
①若数列{an}是等差数列,且p+q=r(p,q,r为正整数)则ap+aq=ar,不是正确命题,应ap+aq=2ar.故①错误;
②数列{an}前n项和Sn=(n+1)2,∴an=sn-sn-1=(n+1)2-n2=2n+1,当n=1代入Sn=(n+1)2得s1=a1=22=4,
an=2n+1,首先n=1不满足,从n≥2开始是等比数列,故②正确;
③若数列{an}满足an+1=2an,则{an}是公比为2的等比数列,不是真命题,如:0,0,0,…,故③错误;
④数列{an}满足Sn=2an-1,,∴an=sn-sn-1=2an-1-(2an-1-1)=2an-2an-1,∴
=2,当n=1时得a1=1,
∴an=2n-1(n≥1),故④正确;
故选A;
②数列{an}前n项和Sn=(n+1)2,∴an=sn-sn-1=(n+1)2-n2=2n+1,当n=1代入Sn=(n+1)2得s1=a1=22=4,
an=2n+1,首先n=1不满足,从n≥2开始是等比数列,故②正确;
③若数列{an}满足an+1=2an,则{an}是公比为2的等比数列,不是真命题,如:0,0,0,…,故③错误;
④数列{an}满足Sn=2an-1,,∴an=sn-sn-1=2an-1-(2an-1-1)=2an-2an-1,∴
| an |
| an-1 |
∴an=2n-1(n≥1),故④正确;
故选A;
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