已知等差数列的公差d=2.且a2,a5,a14成等比

根据等差数列前n项和公式,Sn=n*a1+d*n(n-1)/2=na+n(n-1)S1=a1=a,S2=2a+2,S4=4a+12S1,S2,S4成等比数列,则S2²=S1*S4,即(2a+

s5=405a1+5*4d/2=402a1+4d=16s8=100,8a1+8*7d/2=1002a1+7d=253d=9d=3a1=2(2)S12=12a1+12*11d/2=48-132=-84

1.因为等差数列AN的公差d不等于0,a1=2,s9=36,所以36=9*2+1/2*9*8d所以d=1/2所以a3=3,a9=6,由a3,a9,am成等比数列则a9的平方=a3*am,的am=12又

sn=a1+a2+...+an=a1+(a1+d)+...+(a1+(n-1)d)=na1+(1+2+3+...+(n-1))d=na1+(n-1)nd/2；如果d=2an=11；sn=na1+(n-

∵an为等差数列a1,a3,a9成等比数列∴a1(a1+8d)=(a1+2d)^2a1^2+8d*a1=a1^2+4d*a1+4d^2d≠0∴d=a1a1+a3+a9/a2+a4+a10=(a1+a1

设等差数列的公差为d,a1,a3,a13成等比数列,则(a3)²=a1•a13(1+2d)²=1+12d,4d²=8d.因为公差不为0,所以d=2.从而an=

设公差为e,则a=b-e,d=c+e所以：a+b+c+d=b-e+b+c+c+e=2b+2c=32所以：b+c=16,又因为b:c=1:3,所以：b=4;c=12所以：公差e=8

a1,a3,a9成等比数列a3^2=a1*a9(a1+2d)^2=a1*(a1+8d)解得a1=d(a1+a3+a9)/(a2+a4+a10)=(3a1+10d)/(3a1+13d)=13d/16d=

1.求等差数列2,5,8,...,47中各项的和.你要利用好基本的性质、公式和定理等等差数列：2,5,8,...,47明显看到题目给出的a1=2；公差d=5-2=3那么an=a1+(n-1)*d=3n

a3=a1+2da5=a1+4db3=b1*d^2b5=b1*d^4a1+2d=b1*d^2a1+4d=5b1*d^42d=3a1*d^2-a1(1)4d=a1*d^4-a1(2)(2)/(1)2=(

因为{An}是等差数列,所以A2+A8=A4+A6=10,A4*A6=24,所以可将A4、A6看作方程x^2-24x+10=0的两个根,因为d

由题可得A1*A9等于A3方把分子分母都写为A3和公差d的表达式有上式可得A3和d的关系带入就可的到比值

a1a2a3成等比数列a2^2=a1a3=a3(a1+d)^2=a1+2da1^2+2a1d+d^2=a1+2d1+2d+d^2=1+2dd^2=0d=0公差不为零的等差数列错题

2a2=2(1+d)a10=1+9d5a5=5(1+4d)它们成等比,所以(1+9d)^2=5(1+4d)×2(1+d)解得d=82/81或-2/9(舍去)所以an=a1+(n-1)×d=1-82/8

一元二次不等式解集为一个区间说明二次项系数为正.且ax2-3x+2=0这个一元二次方程的两个根就是这个区间的两端即1和d为上方程的两根,‘解出a和d就得到通项了a=1d=2an=1+2(n-1)=2n

∵方程ax^2-3x+2=0的解为1,d∴1+d=3/a,1*d=2/a解得：a=1,d=2则an=a1+(n-1)d=1+2(n-1)=2n-1∴Tn=3^0*1+3^1*3+3^2*5+……+3^

a1=1.1a3=3b3,a1+2d=3*b1*d^2.2a5=5b5,a1+4d=5*b1*d^4.3由1,2,3,得d^2=1/5或d^2=1,因为d大于0,且不等于1所以d=√5/5a1=b1=

a3=3b3a1+2d=3a1d²(3d²-1)a1=2da1=2d/(3d²-1)a5=5b5a1+4d=5a1d⁴(5d⁴-1)a1=4da1

A2=1+d=B2A5=1+4d=B3A14=1+13d=B4(B3)^2=B2×B4(1+4d)^2=(1+d)(1+13d)d^2=2dd>0d=2An=1+2(n-1)=2n-1B2=3B3=9