已知数列{an},a1=1,an+1=2an+3·2n+1。 (1)证明数列{an/2n}是等差数列 (2)求{an}通项公式 已知数列{an}满足a1=2,an+1=2an+2n+2;(...
\u5df2\u77e5\u6570\u5217{an}\uff0c{cn}\u6ee1\u8db3\u6761\u4ef6\uff1aa1=1\uff0can+1=2an+1\uff0ccn\uff1d1(2n+1)(2n+3)\uff0e\uff081\uff09\u6c42\u8bc1\u6570\u5217{an+1}\u662f\u7b49\u6bd4\u6570\u5217\uff0c\u5e76\uff08\u672c\u5c0f\u9898\u6ee1\u520612\u5206\uff09\u89e3\uff1a\uff08\u2160\uff09\u2235an+1=2an+1\u2234an+1+1=2\uff08an+1\uff09\uff0c\u2235a1=1\uff0ca1+1=2\u22600\u2026\uff082\u5206\uff09\u2234\u6570\u5217{an+1}\u662f\u9996\u9879\u4e3a2\uff0c\u516c\u6bd4\u4e3a2\u7684\u7b49\u6bd4\u6570\u5217\uff0e\u2234an+1\uff1d2\u00d72n?1\uff0c\u2234an\uff1d2n?1\uff0e\u2026\uff084\u5206\uff09\uff08\u2161\uff09\u2235cn\uff1d1(2n+1)(2n+3)\uff1d12(12n+1?12n+3)\uff0c\u2026\uff086\u5206\uff09\u2234Tn\uff1d12(13?15+15?17+\u2026+12n+1?12n+3)=12(13?12n+3)\uff1dn3\u00d7(2n+3)\uff1dn6n+9\uff0e\u2026\uff088\u5206\uff09\u2235Tn+1Tn\uff1dn+16n+15?6n+9n\uff1d6n2+15n+96n2+15n\uff1d1+96n2+15n\uff1e1\uff0c\u53c8Tn\uff1e0\uff0c\u2234Tn\uff1cTn+1\uff0cn\u2208N*\uff0c\u5373\u6570\u5217{Tn}\u662f\u9012\u589e\u6570\u5217\uff0e\u2234\u5f53n=1\u65f6\uff0cTn\u53d6\u5f97\u6700\u5c0f\u503c115\uff0e\u2026\uff0810\u5206\uff09\u8981\u4f7f\u5f97Tn\uff1e1am\u5bf9\u4efb\u610fn\u2208N*\u90fd\u6210\u7acb\uff0c\u7ed3\u5408\uff08\u2160\uff09\u7684\u7ed3\u679c\uff0c\u53ea\u9700115\uff1e12m?1\uff0c\u7531\u6b64\u5f97m\uff1e4\uff0e\u2234\u6b63\u6574\u6570m\u7684\u6700\u5c0f\u503c\u662f5\uff0e\u2026\uff0812\u5206\uff09
\uff081\uff09\u2235a1=2\uff0c\u2234a2=2a1+23=12\uff0c\u540c\u7406\u53ef\u5f97a3=40\uff1b\u7531an+1=2an+2n+2\uff0c\u5f97\uff1aan+12n+1-an2n=2\uff0c\u2234\u6570\u5217{an2n}\u4e3a\u516c\u5dee\u4e3a2\u7684\u7b49\u5dee\u6570\u5217\uff0c\uff082\uff09\u7531\uff081\uff09\u77e5\uff0can2n=1+\uff08n-1\uff09\u00d72=2n-1\uff1b\u2234an=\uff082n-1\uff092n\uff0cbn=\uff08-1\uff09n+1an2n=\uff08-1\uff09n+1\uff082n-1\uff09\uff0c\u2234T51=b1+b2+\u2026+b51=1-3+5-7-\u2026+101=-2\u00d725+101=51\uff0c\u2234Tn=b1+b2+\u2026+bn=1-3+5-7-\u2026+\uff08-1\uff09n+1\uff082n-1\uff09=n\uff0cn\u4e3a\u5947\u6570?n\uff0cn\u4e3a\u5076\u6570\uff0c\uff083\uff09Cn=|1bnbn+1|=1(2n?1)(2n+1)=12\uff0812n?1-12n+1\uff09\uff0cMn=12[\uff081-13\uff09+\uff0813-15\uff09+\u2026+\uff0812n?1-<td style="b
(1)由a1=3,an+1+an=3•2n,n∈N*.得:an+1−2n+1=−(an−2n),
所以数列{an−2n}是以a1-2=1为首项,公比为-1的等比数列,
∴an−2n=(-1)n-1,所以an=2n+(−1)n−1;
(2)假设存在连续三项an-1,an,an+1成等差数列,则由已知得:
2(2n+(-1)n-1)=2n-1+(-1)n-2+2n+1+(-1)n,(n≥2)
化简得2n-1=22×(-1)n-1,显然当n=3上式成立,
所以存在数列{an}中的第二、三、四项构成等差数列;
(3)由1<r<s且r,s∈N*,结合通项可知a1<ar<as,
由a1,ar,as成等差数列,可得2ar=a1+as,
即2•2r+2(-1)r-1=3+2s+(-1)s-1,整理得2r+1-2s=3-2(-1)r-1+(-1)s-1,
因为1<r<s且r,s∈N*,所以2r+1-2s的可能取值为0,8,…,而3-2(-1)r-1+(-1)s-1∈[0,6],
∴2r+1-2s=0,
∴s=r+1(r≥2,r∈N).
对于数列问题,如果不加几个括号,还真的看不明白到底是什么意思。
首先,说明一下,芊芊理解的递推式是这样的。
a(n+1)=2a(n)+3×2n+1。(这是芊芊接下来做题的基础。)
由上式可得
a(n+1)+6(n+1)+7=2[a(n)+6n+7]
令b(n)=a(n)+6n+7,可得
b(1)=14,b(n+1)=2(n)。
那么,可得b(n)=7×(2^n)
即有a(n)+6n+7=7×(2^n)
稍作整理,可得
a(n)=7×(2^n)-6n-7。
码字不易,敬请采纳。
你是想写2ⁿ⁺¹是吧,如果是,那么:
(1)
a(n+1)=2an+3·2ⁿ⁺¹
等式两边同除以2ⁿ⁺¹
a(n+1)/2ⁿ⁺¹=an/2ⁿ +3
a(n+1)/2ⁿ⁺¹ -an/2ⁿ=3,为定值
a1/2=½
数列{an/2ⁿ}是以½为首项,3为公差的等差数列
(2)
an/2ⁿ=½+3·(n-1)=3n - 5/2
an=(6n-5)·2ⁿ⁻¹
n=1时,a1=(6·1-5)·2⁰=1,同样满足表达式
数列{an}的通项公式为an=(6n-5)·2ⁿ⁻¹
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绛旓細an+1=3an+4^n锛屾亽绛夊彉鎹㈠緱锛歛(n+1)-4^(n+1)=3(an-4^n)锛涜bn=an-4^n锛屽垯涓婂紡鍙樹负bn+1=3bn锛宐1=a1+4^1=5銆俠n=5*3^(n-1)锛屽垯an=5*3^(n-1)+4^n
绛旓細[a(n+i)+3^n]/(a(n)+3^n]=2 鍙緱鍑猴經a(n)+3^n锝濇槸棣栭」涓4锛屽叕姣斾负2鐨勭瓑姣鏁板垪銆戞槸閿欑殑 姝hВ锛氣埖a(n+1)=2an+3^n,鈭碼(n+1)- 3^(n+1)=2(an-3^n)鈭碵a(n+1)-3^(n+1)]/(an-3^n)=2 鈭锝沘(n)-3^n锝濇槸棣栭」涓-2锛屽叕姣斾负2鐨勭瓑姣旀暟鍒 鈭碼n-3^n=-2*2...
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绛旓細閭e氨鍦ㄨ繖鍎胯鍚 瑙g瓟锛a1=1 浠e叆a(n+1)*a(n)=2^n 鈭 a2*a1=2 鈭 a2=2 鈭 a(n+1)*a(n)=2^n 鈭 a(n)*a(n-1)=2^(n-1)鈭 a(n+1)/a(n-1)=2 鍗 a(n)闅旈」鎴愮瓑姣鏁板垪 锛1锛塶鏄鏁, n=2k-1 鍒 an=a(2k-1)=1*2^(k-1)=2^(k-1)=2^[(n+1)/2-1...
绛旓細(杈呭姪鎬濊冿細鐢ㄧ壒寰佹柟绋嬫硶锛岃閫掓帹鍏崇郴寮忕殑鐗瑰緛鏂圭▼涓篨^2-3X+2=0,瑙e緱X绛変簬1鎴2^ 鏁板垪锝沘n-an-1锝濇槸浠2涓哄叕姣旓紝2涓洪椤圭殑绛夋瘮鏂圭▼锛屽垯an-an-1=2*2^n-1=2^n锛坣鈮2锛夊彔鍔犳硶锛屼互涓婂悇寮忓彔鍔犲彲寰梐n-a1=(2^n+2^n-1鈥︹+2^2锛=2^n-2 鍗砤n=2^n-1,灏唍=1甯﹀叆寰锛宎1=1,鎴愮珛...
绛旓細S1 + A1 = 2 * A1 = 3 A1 = 3/2 N> = 2鏃讹紝SN +涓= 2N +1 S锛坣-1涓級+绗紙n-1锛= 2n-1涓 2AN =锛堟 - 1锛2 2锛-2锛=锛-1锛-2 伪1-2 = -1 / 2 -2 = -1 / 2鐨刵娆℃柟 = 2-1/2 ^ n
绛旓細鍥犱负a(n+2)+a(n)=2路a(n+1)鎵浠(n+2)-a(n+1)=a(n+1)-a(n)鎵浠鏁板垪{an}鏄瓑宸暟鍒 鍥犱负a1=1锛a2=3 鎵浠ョ瓑宸暟鍒梴an}鐨勫叕宸甦=2 鎵浠ユ暟鍒梴an}鐨勫墠n椤瑰拰鍏紡Sn=(1/2)路[1+(2n-1)]路n=n²
