斐波那契数列前100个数字是什么
斐波那契数列前100个数字如下所示:
0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584, 4181, 6765, 10946, 17711, 28657, 46368, 75025, 121393, 196418, 317811, 514229, 832040, 1346269, 2178309, 3524578, 5702887, 9227465, 14930352, 24157817, 39088169, 63245986, 102334155, 165580141, 267914296, 433494437, 701408733, 1134903170, 1836311903, 2971215073, 4807526976, 7778742049, 12586269025, 20365011074, 32951280099, 53316291173, 86267571272, 139583862445, 225851433717, 365435296162, 591286729879, 956722026041, 1548008755920, 2504730781961, 4052739537881, 6557470319842, 10610209857723, 17167680177565, 27777890035288, 44945570212853, 72723460248141, 117669030460994, 190392490709135, 308061521170129, 498454011879264, 806515533049393, 1304969544928657, 2111485077978050, 3416454622906707, 5527939700884757, 8944394323791464, 14472334024676221, 23416728348467685, 37889062373143906, 61305790721611591, 99194853094755497, 160500643816367088, 259695496911122585, 420196140727489673, 679891637638612258, 1100087778366101931, 1779979416004714189, 2880067194370816120, 4660046610375530309, 7540113804746346429, 12200160415121876738, 19740274219868223167, 31940434634990099905, 51680708854858323072, 83621143489848422977, 135301852344706746049, 218922995834555169026, 354224848179261915075, 573147844013817084101, 927372692193078999176, 1500520536206896083277, 2427893228399975082453, 3928413764606871165730, 6356306993006846248183, 10284720757613717413913, 16641027750620563662096, 26925748508234281076009, 43566776258854844738105, 70492524767089125814114, 114059301025943970552219, 184551825793033096366333, 298611126818977066918552, 483162952612010163284885, 781774079430987230203437, 1264937032042997393488322, 2046711111473984623691759, 3311648143516982017180081
斐波那契数列知识点:
斐波那契数列是一个数学序列,它的定义是每个数字都是前两个数字的和。斐波那契数列的前几个数字是:0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, ...
斐波那契数列可以用递归方法或动态规划方法来计算。
斐波那契数列具有许多应用:
1. 数学领域:斐波那契数列是组合数学和抽象代数的重要问题之一,与黄金分割和自相似性等数学概念密切相关。
2. 计算机算法:斐波那契数列可以用作算法设计的基础,例如在搜索和排序算法中。
3. 自然科学领域:斐波那契数列可以描述一些自然现象的规律,如植物的枝干分支、兔子繁殖等。
相关例题:
题目:求斐波那契数列的第n个数字。
输入:整数n(n大于等于1)。
输出:斐波那契数列的第n个数字。
示例:
输入:6
输出:8
解析:根据斐波那契数列的定义,前6个数字依次是0, 1, 1, 2, 3, 5,所以第6个数字是5。
绛旓細鏂愭尝閭e鏁板垪鍓100椤规槸濡備笅锛氫竴銆乫鈶=C(0,0)=1銆備簩銆乫鈶=C(1,0)=1銆備笁銆乫鈶=C(2,0)+C(1,1)=1+1=2銆傚洓銆乫鈶=C(3,0)+C(2,1)=1+2=3銆備簲銆乫鈶=C(4,0)+C(3,1)+C(2,2)=1+3+1=5銆傚叚銆乫鈶=C(5,0)+C(4,1)+C(3,2)=1+4+3=8銆備竷銆乫鈶=C(6,0)+C...
绛旓細鏂愭尝閭e鏁板垪鏄寚涓涓暟鍒椾腑锛岀涓涓拰绗簩涓暟鍊煎潎涓1锛屾鍚庢瘡涓涓暟鍧囦负鍓嶄袱涓暟涔嬪拰鐨勬暟鍒椼傚洜姝わ紝鏂愭尝閭e鏁板垪鍓100涓暟鏄細1锛1锛2锛3锛5锛8锛13锛21锛34锛55锛89锛144锛233锛377锛610锛987锛1597锛2584锛4181锛6765锛10946锛17711锛28657锛46368锛75025锛121393锛196418锛317811锛514229锛8...
绛旓細鏂愭尝閭e鏁板垪鍓100椤规槸锛0锛1锛1锛2锛3锛5锛8锛13锛21锛34锛55锛89锛144锛屸︹︺傛暟鍒楃殑鍚勯」鏈夊涓嬬壒鐐癸細浠庣涓夐」璧凤紝姣忎竴椤归兘鏄墠涓ら」鐨勫拰銆備篃灏辨槸璇达紝姣忎釜鏁板瓧鏄墠涓や釜鏁板瓧涔嬪拰銆備互涓嬫槸瀵规枑娉㈤偅濂戞暟鍒楃殑 鏂愭尝閭e鏁板垪鏄竴涓潪甯歌憲鍚嶇殑鏁板垪锛屽叾瀹氫箟闈炲父绠鍗曘傚畠浠ラ掑綊鐨勬柟寮忕敓鎴愭暟瀛楋紝鍗虫瘡涓暟瀛...
绛旓細鏂愭尝閭e鏁板垪鏄竴涓互閫掑綊鏂瑰紡瀹氫箟鐨勬暟鍒楋紝鍏朵腑姣忎釜鏁板瓧鏄墠涓や釜鏁板瓧鐨勫拰銆浠ヤ笅鏄枑娉㈤偅濂戞暟鍒楃殑鍓50涓暟瀛楋細0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584, 4181, 6765, 10946, 17711, 28657, 46368, 75025, 121393, 196418, 317811, 514229,...
绛旓細鏂愭尝閭e鏁板垪锛團ibonacci sequence锛夛紝鍙堢О榛勯噾鍒嗗壊鏁板垪锛屽洜鏁板瀹惰幈鏄傜撼澶毬锋枑娉㈤偅濂戯紙Leonardo Fibonacci锛変互鍏斿瓙绻佹畺涓轰緥瀛愯屽紩鍏ワ紝鏁呭張绉扳鍏斿瓙鏁板垪鈥濓紝鍏鏁板涓猴細1銆12銆3銆5銆8銆13銆21銆34銆1202骞达紝鏂愭尝閭e鍦ㄣ婅绠椾箣涔︼紙Liber Abaci锛夈嬩腑鎻愬嚭浜嗘枑娉㈤偅濂戞暟鍒椼傛牴鎹鏁板垪鍙姌鍙犲嚭鏂愭尝閭e铚楃墰锛涚粯鍒...
绛旓細鏂愭尝閭e鏁板垪 锛1銆1銆 2銆3銆5銆8銆13銆21銆34銆55...杩欎釜鏁板垪鐨勮寰嬫槸浠庣3椤瑰紑濮嬶紝姣忎竴椤归兘鏄墠涓ら」鐨勫拰銆備緥濡 2=1+1锛3=2+1锛5=3+2锛8=5+3绛夈傛垜浠張鐭ラ亾濂囨暟+濂囨暟=鍋舵暟锛屽鏁+鍋舵暟=濂囨暟锛屾牴鎹笂闈㈢殑鍒嗘瀽鎴戜滑鍙互寰楀埌鏂愭尝閭e鏁板垪涓嬮潰鐨勫鍋跺彉鍖栬寰嬶細鎬荤粨寰楀嚭鏂愭尝閭e鏁板垪鐨勭3鐨勫...
绛旓細鏂愭尝閭e鏁板垪鎸囩殑鏄繖鏍蜂竴涓暟鍒 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233锛377锛610锛987锛1597锛2584锛4181锛6765锛10946锛17711锛28657锛46368...杩欎釜鏁板垪浠庣3椤瑰紑濮嬶紝姣忎竴椤归兘绛変簬鍓嶄袱椤逛箣鍜屻傞氶」鍏紡锛氭枑娉㈤偅濂戞暟鍒楋紙Fibonacci sequence锛夛紝鍙堢О榛勯噾鍒嗗壊鏁板垪銆佸洜鏁板瀹跺垪鏄...
绛旓細1+1=2 1+2=3 2+3=5 3+5=8 5+8=13 8+13=21 13+21=34 21+34=55 34+55=89 55+89=144 89+144=233 144+233=377 233+377=610 377+610=987 610+987=1597 987+1597=2584 1597+2584=4181 2584+4181=6765 4181+6765=10946 6765+10946=17711 10946+17711=28657 17711+28657=46368 ...
绛旓細鏂愭尝閭e鏁板垪鏁板垪浠庣3椤瑰紑濮嬶紝姣忎竴椤归兘绛変簬鍓嶄袱椤逛箣鍜屻備緥瀛愶細鏁板垪 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233锛377锛610锛987锛1597锛2584锛4181锛6765锛10946锛17711锛28657锛46368...搴旂敤锛氱敓娲绘枑娉㈤偅濂 鏂愭尝閭e鏁板垪涓殑鏂愭尝閭e鏁颁細缁忓父鍑虹幇鍦ㄦ垜浠殑鐪煎墠鈥斺旀瘮濡傛澗鏋溿佸嚖姊ㄣ佹爲...
绛旓細鍏斿瓙鏁板垪鏄枑娉㈤偅濂戞暟鍒鐨勪竴绉嶅彉褰紝鍏朵腑绗0椤逛负0锛岀1椤逛负1锛屼粠绗2椤瑰紑濮嬶紝姣忎竴椤归兘鏄墠涓ら」鐨勫拰锛屽嵆f(n)=f(n-1)+f(n-2)锛坣>=2锛夈傚洜姝わ紝鍏斿瓙鏁板垪鐨鍓100椤瑰涓嬫墍绀猴細0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584, 4181, ...
