已知a1=7,an=-189,q=-3,求项数n和Sn的值
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a(1)=2^1-1=1,2^n-1=a(1)+a(2)+...+a(n),2^(n+1)-1=a(1)+a(2)+...+a(n)+a(n+1)=2^n-1+a(n+1),a(n+1)=2^(n+1
a2-a1=2,a3-a2=4,…an+1-an=2n,这n个式子相加,就有an+1=100+n(n+1),即an=n(n-1)+100=n2-n+100,∴ann=n+100n-1≥2n•100n-
你把这个数列看成俩部分a(n1)=2a(n1-1)a(n2)=2n+2an=(an1)+(an2)算算看
因为a1+a2+a3=15所以3a2=15a2=5a2-3=2因为a1+1,a2-3,a3-7成等比数列所以(a1+1)*(a3-7)=4设公差为x所以(5-d+1)*(5+d-7)=4所以d=4a1
A(n+1)-1/3=2(A(n)-1/3)B(n)=A(n)-1/3B(n)=B(1)*2~(n-1)=(5/3)*2~(n-1)A(n)=(5/3)*2~(n-1)+1/3
因为a1a2a3=8所以a2/q*a2*a2*q=8a2^3=8,a2=2又a1+a2+a3=7即a2/q+a2+a2*q=71/q+q=5/2=2+1/2所以q=2或1/2即a1=1或4.所以an=
an+1=2an+2,an=-1,把an=-1代入bn=2^n/an,得,bn=-2^nb2-b1=-2^*2-(-2)=-6,所以{bn}是等差数列
an-1=2an+3an-1+3=2(an+3)(an+3)/(an-1+3)=1/2所以an+3为等比数列an+3=(a1+3)*q^(n-1)=4*(1/2)^(n-1)
a(n+1)=3an+4.1a(n+2)=3a(n+1)+4.22-1a(n+2)=4a(n+1)-3an由特征方程得x^2=4x-3x=1或3an=A1^n+B3^na1=1,a2=7A=-2,B=
因为a1+a2+a3=7,a1a2a3=8又因为等比数列{an},那么a2*a2=a1a3,那么a1a2a3=a2a2a2=8,所以a2=2,那么a1+a3=5,同时a1a3=4所以a1=1,a3=4
(I)∵a1=20,a2=7,an+2-an=-2∴a3=18,a4=5由题意可得数列{an}奇数项、偶数项分布是以-2为公差的等差数列当n为奇数时,an=a1+(n+12−1)×(−2)=21-n当
∵数列{log2(an+1-an3)}是公差为-1的等差数列,∴log2(an+1-an3)=log2(a2-13a1)+(n-1)(-1)=log2(1936-13×56)-n+1=-(n+1),于
a(n+1)-2an=3.5^n,则a2-2a1=3.5^1a3-2a2=3.5^2.a(n+1)-2an=3.5^n以上式子相加,得a(n+1)-a1-Sn=3.5+3.5^2+...+3.5^n=
an=3n-1由an+1=an+3得知公差d=3所以an=a1+(n-1)d=3n-1
由a1a2a3=8知,a2=2,所以a1+a3=5,a1a3=4所以原式=(a1+a3)/a1a3+1/a2=7/4现在应该学命题了吧,怎么还是提数列问题?
由A1*A2*A3=8,得a2^3=8a2=2所以a1+a3=5a1*a3=4所以解得a3=4,a1=1或a1=4a3=1当a3=4,a1=1此时,q=+-2q=2an=2^n-1q=-2an=(-2
a[n+1]-a[n]=2a[n+1]a[n]1/a[n]-1/a[n+1]=21/a[n+1]=(1/a[n])-21/a[n]为等差数列,公差为-2,首项1/a[1]=1/2所以1/a[n]=1/
(1){an}为等比数列a1=7,a4=a1q^3=-56,∴q=-2∴a5=a1q^4=56,sn=a1(1-q^n)/(1-q)=7[1-(-2)^n]/3∴s5=67(2)an=a1q^(n-1
A2=A1+1A3=A2+2A4=A3+3.An=A(n-1)+(N-1)左式上下相加=右式上下相加An=A1+[1+2+3+...+(N-1)]An=1+[N(N-1)]/2