1.
∵ lgx+lgy=2
∴ lg(xy) = 2
x, y >0
∴ xy = 10^2 =100
∴ x + y ≥ 2√xy =20
∴ 1/x+1/y = (x+y)/xy ≥2√xy/xy =20/100 =1/5
2.
△ABC中,
由余弦定理可以得到,
b^2 = a^2 + c^2 - 2ac*cosB
c^2 = a^2 + b^2 - 2ab*cosC
∵cosC/cosB=(2a-c)/b
∴ cosC/cosB = [(a^2+b^2-c^2)/2ab]/[(a^2+c^2-b^2)/2ac]
= [c(a^2+b^2-c^2)]/[b(a^2+c^2-b^2)]
= (2a-c)/b
整理得: a^2+c^2-b^2 = ac
∴ cosB = (a^2+c^2-b^2)/(2ac) =1/2
∵在△ABC中,B∈(0,π)
∴ B = π/3
3.
(1)
∵an是一个公差为d(d≠0)的等差数列,且a1、a2、a4成等比数列
∴ (a2)^2 = a1 * a4
∴ (a1 + d)^2 = a1*(a1+3d)
∴ (a1)^2 + d^2 +2d*a1 = (a1)^2 +3d*a1
∵ d≠0
∴ a1 = d
(2)
∵ a1 = d,
∴ an =a1 + (n-1)d = nd
∵ S10 =110,
∴ (a1 + a10)*10/2 = (d+10d)*5=110
∴ d=2
∴ an = nd =2n
4.
证明:
首先说明下符号的意思
第n-1项写成a(n-1)
那个方程的根是第n项-1,即 an-1
∵ X^2+4X-4Sn=0有一根为an-1
∴ (an-1)^2 + 4(an-1) - 4Sn=0
∴ Sn = [(an-1)^2+4(an-1)]/4
∴ n≥2时,前n-1项和为
S(n-1) = {[a(n-1)-1]^2 + 4[a(n-1)-1]}/4
∴ n≥2时,数列的通项为
an = [(an-1)^2+4(an-1)]/4 - {[a(n-1)-1]^2 + 4[a(n-1)-1]}/4
= [an^2 - a(n-1)^2 + 2an - 2a(n-1)]/4
∴ an^2 - a(n-1)^2 + 2an - 2a(n-1) = 4an
∴ an^2 - a(n-1)^2 - 2an - 2a(n-1) = 0
即 [an + a(n-1)] * [an - a(n-1) -2] = 0
∵an为正数项数列
∴ an + a(n-1) >0
∴ an - a(n-1) =2
∵ Sn = [(an-1)^2+4(an-1)]/4
∴ n=1时,
a1 = S1 = [(a1-1)^2 + 4(a1-1)]/4
∴ a1 = 3
∴ 数列 an是以3为首项,公差为2的等差数列, 得证
∴ an = 3 + (n-1)*2 = 2n + 1
Sn = (3 +2n +1)*n/2 =n(n+2)=n^2 + 2n
(2)
证明:
1/Sn = 1/[n*(n+2)]
= 1/2 * [1/n - 1/(n+2)]
∴ Tn = 1/S1+1/S2+…+1/S(n-1)+1/Sn
=1/2* [1-1/3 + 1/2-1/4 + …… + 1/(n-1)-1/(n+1) + 1/n-1/(n+2)]
=1/2* [1+1/2-1/(n+1)-1/(n+2)]
=3/4 - 1/2* [1/(n+1)+1/(n+2)] < 3/4 (∵后面两项都大于0)
得证
终于做完了,希望对你有用~~~
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