1 . 我国古代数学家提出的“中国剩余定理”又称“孙子定理”,它是世界数学史上光辉的一页,定理涉及的是整除问题.现有如下一个整除问题:将1至2023这2023个数中,能被3除余1且被5除余2的数按从小到大的顺序排成一列,构成数列
,则此数列的项数为( )
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/83cf38189d5cbf627d2b82ac0eb76006.png)
A.133项 | B.134项 | C.135项 | D.136项 |
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解题方法
2 . 北宋数学家沈括博学多才、善于观察.据说有一天,他走进一家酒馆,看见一层层垒起的酒坛,不禁想到:“怎么求这些酒坛的总数呢?”,沈括“用刍童(长方台)法求之,常失于数少”,他想堆积的酒坛、棋子等虽然看起来像实体,但中间是有空隙的,应该把他们看成离散的量.经过反复尝试,沈括提出对上底有ab个,下底有cd个,共n层的堆积物(如图),可以用公式
求出物体的总数.这就是所谓的“隙积术”,相当于求数列ab,
的和,“隙积术”给出了二阶等差数列的一个求和公式.现已知数列
为二阶等差数列,其通项
,其前n项和为
,数列
的前n和为
,且满足
.
(1)求数列
的前n项和
;
(2)记
,求数列
的前n项和
.
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/9ea2d05ec2ace95c566eacfbc721c647.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3b0ada0c24b4f4a74ba37968a910f02e.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/76aef4cdcb5af742ce28003b7b6c8c20.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e62cd56c9d7b7865d8c145a8e74c7c40.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/08eb71ecf8d733b6932f4680874dbbf3.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/0f329b217e1051b23f0d61023cdc6e69.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/f1ae9a3b0b7aeb1545b65d91aa371b3c.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/05d1b5d9c88470aed5e224b8109a6835.png)
![](https://img.xkw.com/dksih/QBM/editorImg/2024/2/22/81afd846-70ff-4fd5-86cd-b457ff6c93ab.png?resizew=177)
(1)求数列
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/76aef4cdcb5af742ce28003b7b6c8c20.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/08eb71ecf8d733b6932f4680874dbbf3.png)
(2)记
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/229fa99b3fbfcd20137a53f8db5117c3.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/c5ab0309e2cd35585ea9fb2cc3017abf.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/87bd7d18f67e90a7c37fad4252e43c9d.png)
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3 . 如图的形状出现在南宋数学家杨辉所著的《详解九章算法·商功》中,后人称为“三角垛”.“三角垛”最上层有1个球,第二层有3个球,第三层有6个球,…,设第n层有
个球,从上往下n层球的总数为
,则( )
![](https://img.xkw.com/dksih/QBM/editorImg/2022/9/22/d3baa06d-e4f8-44a0-aaf4-82bc62948da3.png?resizew=144)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/96abfe2da27a63e6affb19a0c80236d9.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/08eb71ecf8d733b6932f4680874dbbf3.png)
![](https://img.xkw.com/dksih/QBM/editorImg/2022/9/22/d3baa06d-e4f8-44a0-aaf4-82bc62948da3.png?resizew=144)
A.![]() | B.![]() |
C.![]() | D.![]() |
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2022-03-29更新
|
436次组卷
|
3卷引用: 安徽省安庆市第七中学2021-2022学年高二下学期期中考试数学试题
名校
4 . 历史上数列的发展,折射出许多有价值的数学思想方法,对时代的进步起了重要的作用,比如意大利数学家列昂纳多·斐波那契以兔子繁殖为例,引入“兔子数列”:即1,1,2,3,5,8,13,21,34,55,89,144,233,….即
,
,(
,
).此数列在现代物理及化学等领域有着广泛的应用,若此数列被4整除后的余数构成一个新的数列
,又记数列
满
,
,
,则![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e036008e81bd371695d685068cd348e4.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/12b290971efaf65804cc756c038c43fe.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/bc250368403ec8562cf938ad1a5778cb.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3bcfc48f9bc23cc43085bdb910e7a136.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/cea4ac187cbb465180e89f38250b3970.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/034ba25825c13725931c483aa47c9363.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/57ef6d44448092ebdb9e4a49d866a749.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/d7ea9e0ead7a42e1bcbe7d37d1a60954.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/3df16fe634612dca8c2190784253971e.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/4ffff0a5195ecf28c3faa3344880c911.png)
![](https://staticzujuan.xkw.com/quesimg/Upload/formula/e036008e81bd371695d685068cd348e4.png)
A.1 | B.![]() | C.![]() | D.0 |
您最近一年使用:0次
2020-08-06更新
|
193次组卷
|
2卷引用:安徽省合肥六中2020届高三下学期高考冲刺最后一卷数学(文)试题