江苏高考农村专项计划,江苏农村专项计划大学名单.doc
2019年江苏高考农村专项计划,江苏农村专
项计划大学名单
江苏高考农村专项计划,江苏农村专项计划大学名单
江苏省教育厅于2月23日上午10:00召开江苏省考试招生制度改革新闻发布会,通报江苏省考试招生制度改革及普通高考工作有关情况。
在高考科目设置方面,和现行高考方案相比,江苏省普通高考统考科目仍为语文、数学、外语3门,保持不变;选考科目由现行的“6选2”调整为“6选3”,即由学生在思想政治、历史、地理、物理、化学、生物等6门科目中自主选择3门选考科目,并计入高校招生录取总成绩。
教育部明确江苏省启动高考综合改革的时间为2018年,并要求于2018年6月底前将高考综合改革方案报教育部备案后向社会公布。根据这一要求,江苏省新一轮高考综合改革方案应该是从2018年秋季入学的高一新生起开始启用,在2021年普通高考中正式实施。
江苏省考试招生制度改革实施方案包括1个整体方案和5个具体方案。
整体方案是《江苏省考试招生制度改革实施方案》,具体方
案包括普通高校考试招生制度改革方案、院校考试招生制度改革方案、普通高中学业水平考试实施方案、普通高中学生综合素质评价实施方案、中职学校学生学业水平测试实施方案等5个方案。
江苏考试招生制度改革整体方案是严格遵照《国务院关于深化考试招生制度改革的实施意见》、在教育部规定的时间节点和制度框架内,结合江苏省省情和教育实际,并在总结以往高考改革经验、广泛征求社会各方面意见的基础上研制完成的,力求体现国家要求,具有江苏特色。
实施“3+3”模式选考科目调整为“6选3”
在高考科目设置方面,和现行高考方案相比,江苏省普通高考统考科目仍为语文、数学、外语3门,保持不变;选考科目由现行的“6选2”调整为“6选3”,即由学生在思想政治、历史、地理、物理、化学、生物等6门科目中自主选择3门选考科目,并计入高校招生录取总成绩。
高考综合改革2018年启动2021年正式实施
教育部明确江苏省启动高考综合改革的时间为2018年,并要求于2018年6月底前将高考综合改革方案报教育部备案后向社会公布。根据这一要求,江苏省新一轮高考综合改革方案应该是从2018年秋季入学的高一新生起开始启用,在2021年普通高考中正式实施。
考生可享受同一必考科目两次考试机会
江苏省考试招生制度改革实施方案包括1个整体方案和5个具体方案。整体方案是《江苏省考试招生制度改革实施方案》,具体方案包括普通高校考试招生制度改革方案、高职院校考试招生制度改革方案、普通高中学业水平考试实施方案、普通高中学
2018年江苏高考英语专题二完形填空:第三步夹叙夹议文2
体裁突破(四)夹叙夹议文2 A (2017·苏北四市摸底考试) I wrote my first novel when I was 22.It was a 1 .I didn’t know how to properly format dialogue or 2 a plot.Those were all 3 I planned to work out later.I gave the book to my father to read,and within a day he left me a voice mail saying that it was 4 and that I was going to sell it for 300,000. 5 ,and rather quickly,the book was 6 by every publisher in New York.If there were a literary prize for Most Rejections,I would have won it.I was 7 ,of course,but I knew better than to 8 —writing wasn’t an easy job,and if this book wasn’t my 9 in,maybe the next one would be.I got back to work. But this scenario(剧情) happened again:I wrote books...and then they wouldn’t 10 .Still,my father’s faith in me never wavered(摇摆),even 11 I worked a host of other jobs.Some of the jobs,like being a bookseller,were great and 12 to my writing life.Some,like selling overpriced jeans to 12-year-olds,were only good insofar as they were material for future 13 .And they were—because it finally 14 .I sold a book!I was going to make it big! I completely agree with motivational speaker and author John Maxwell’s words:“Successful and unsuccessful people do not 15 greatly in their abilities but in their 16 to reach their potential.” Life’s not 17 .It never was,it isn’t now,it won’t ever be.But do not fall into the entitlement trap of feeling you are a 18 ,you are not.Get over it and 19 with it.And yes,most things are more 20 when you break a sweat to get them. 1.A.mess B.mix C.confusion D.puzzle 答案 A 解析根据后文“I didn’t know how to properly format dialogue or a plot.”可知此处指那时我的写作简直是一团糟,故选A。 2.A.follow B.structure C.discover D.hatch 答案 B
2020届江苏高三高考数学全真模拟试卷09(解析版)
2020届江苏高三高考数学全真模拟试卷09 数学试题I 一、 填空题:本大题共14小题,每小题5分,共70分.不需要写出解答过程,请把答案直接填写在相应位置上. 1. 函数y =x -1的定义域为A ,函数y =lg(2-x)的定义域为B ,则A∩B =____________. 答案:[1,2) 解析:易知A =[1,+∞),B =(-∞,2),A∩B =[1,2). 2. 已知????1+2 i 2 =a +bi(a 、b ∈R ,i 为虚数单位),则a +b =__________. 答案:-7 解析:∵ 2i =-2i ,∴ (1+2 i )2=(1-2i)2=-3-4i ,∴ a =-3,b =-4,a +b =-7. 3. 在平面直角坐标系xOy 中,已知双曲线x 29-y 2 m =1的一个焦点为(5,0),则实数m =________. 答案:16 解析:由题知a 2+b 2=9+m =25,∴ m =16. 4. 样本容量为100的频率分布直方图如图所示,由此估计样本数据落在[6,10]内的频数为________. (第4题) 答案:32 解析:[6,10]内的频数为100×0.08×4=32. 5. “φ=π 2”是“函数y =sin(x +φ)的图象关于y 轴对称”的__________条件. 答案:充分不必要
解析:当φ=π2时,y =sin(x +π2)=cosx 为偶函数,当y =sin(x +φ)为偶函数时,φ=kπ+π 2, 6. 已知S n 为等差数列{a n }的前n 项和,a 1=-1,S 3=6,则S 6=________. 答案:39 解析:由题设知a 1=-1,a 2+a 3=7,从而d =3,从而a 6=-1+5d =14,S 6=(-1+14)×6 2=39. 7. 函数y = 1 lnx (x≥e)的值域是________. 答案:(0,1] 解析:y = 1 lnx 为[e ,+∞)上单调递减函数,从而函数值域为(0,1] 8. 执行下面的程序图,那么输出n 的值为____________. 答案:6 解析:由题知流程图执行如下: 第1次 ?????n =2,S =1,第2次 ?????n =3,S =3,第3次 ?????n =4,S =7,第4次 ?????n =5,S =15, 第5次 ? ????n =6, S =31.停止输出n =6. (第8题) 9. 在1,2,3,4四个数中随机地抽取1个数记为a ,再在剩余的三个数中随机地抽取1个数记为b ,则“a b 是整数”的概率为____________. 答案:13 解析:由题设可求出基本事件如下:(1,2),(1,3),(1,4),(2,1),(2,3),(2,4),(3,1),(3,2),(3,4),(4,1),(4,2),(4,3).
江苏高考数学模拟试卷
2013年江苏高考数学模拟试卷(六) 第1卷(必做题,共160分) 一、填空题:本大题共14小题,每小题5分,共70分. 1. 若复数z 满足i i z +=-1)1((i 是虚数单位),则其共轭复数z = . 2.“m <1”是“函数f (x )=x 2+2x +m 有零点”的 条件(填“充分不必要”、“必要不充分”、“充要”、“既不充分也不必要”之一). 3.在△ABC 中,AB =2,AC =3,→AB ·→ BC =1,则BC = . 4.一种有奖活动,规则如下:参加者同时掷两个正方体骰子一次, 如果向上的两个面上的数字相同,则可获得奖励,其余情况不奖励.那么,一个参加者获奖的概率为 . 5.为了在下面的程序运行之后得到输出25=y ,则键盘输入x 的值应该为 . 6.如图,直线与圆12 2 =+y x 分别在第一和第二象限内交于21,P P 两点,若点1P 的横坐标为 3 5,∠21OP P =3 π,则点2P 的横坐标为 . 7.已知不等式组???? ? x ≤1,x +y +2≥0,kx -y ≥0.表示的平面区域为Ω,其中k ≥0,则当Ω的面积取得最小 值时的k 的值为 . 8.若关于x 的方程2 -|x | -x 2+a =0有两个不相等的实数解,则实数a 的取值范围是 . 9.用长为18m 的钢条围成一个长方体形状的框架,要求长方体的长与宽之比为:1,该 长方体的最大体积是___ _____. 10.直线)20(<<±=m m x 和kx y =把圆422=+y x 分成四个部分,则22(1)k m +的最小 值为 . 11.已知双曲线122 22=-b y a x ()0,1>>b a 的焦距为c 2,离心率为e ,若点(-1,0)和(1,0)到直 Read x If x <0 Then y =(x +1)(x +1) Else y =(x-1)(x -1) End If Print y End
全国大学生创新创业项目申请答辩稿
尊敬的老师、亲爱的同学们: 大家早上好!我是来自xxxxx学院2010级xxx专业的xx,很荣幸今天代表我们团队为我们的项目进行答辩,我们申请的创新实验项目是“建筑废料在路用混凝土中的再利用”。 首先我将介绍我们的团队,我们的指导老师是xxx老师,他是一名出色的土木工程师,在xxxxx学院主要负责测量和土木建筑材料的指导工作。除我之外,我们的团队成员还有xx,xx,xxxx。 我将从项目背景,立项依据,国内外研究概况,立项研究的目的和意义等方面来阐述我们的实验项目。 随着建筑事业的蓬勃发展,我国建筑材料的需求量急剧增加。但制造建筑材料会使自然环境遭到破坏,严重影响了建筑业的可持续发展。据不完全统计,我国目前每年产生的建筑垃圾达到1 亿吨左右,长期积累的建筑废弃物高达数亿吨。绝大部分未经任何处理,就露天堆放,或者将其运送到郊外填埋于地势低洼之处,这样一来造成了严重的环境污染和资源浪费。建筑垃圾中的许多废弃物经过处理后,大多可作为再生资源重新利用。 因此,我们设计了“建筑废料在路用混凝土中的再利用”方案,将这些废弃混凝土收集加工后再利用,不仅可以节约天然资源,而且还可以减少环境污染,促进社会经济的发展。 那么,是什么让我们选择了研究建筑废料在路用混凝土中的再利用呢?我们的立项依据是什么?建筑废料是由碎混凝土、碎砖瓦及碎砂石土等构成,它的强度高,稳定性好。同时,具有相当好的耐磨性、冲击韧性、抗冻性及耐水性,其性能优于黏土、粉性土,甚至砂土和石灰土。此外,建筑废料透水性好,能够阻断毛细水上升,在潮湿的环境下,建筑废料的基础垫层强度变化不大,是理想的高强度路用材料。而且建筑废料遇水不膨胀、不收缩,拥有良好的水稳定性。 我们知道,粉煤灰作为工业废料在道路建设中的应用已经取得了成功。由石灰和粉煤灰构成的二灰稳定集料作为一种高等级的路面基层材料,以其良好的力学性能、水稳定性和抗冻性等优点,得到了工程技术人员的普遍认可。然而若能在二灰稳定集料的结合料中,用废弃混凝土加工成的再生混凝土集料来代替天然砂石材料,形成石灰、粉煤灰、再生集料——三渣并用,则会对道路建设和环境带来更大的益处。
江苏省高考英语 专题检测卷(十八)完形填空
完形填空 (建议用时: 40分钟) A The “Doorman” On a trip to California, my family stopped for lunch. As we walked toward the entrance to the restaurant, a man, with a 1 beard and dirty hair, jumped up from a bench and opened the door for us. Regardless of his 2 , he greeted us in a friendly way. Once inside, my daughters whispered, “Mom, he 3 . ”After we ordered our lunch, I explained, telling the kids to look 4 the dirt. We then watched other customers approach the restaurant but many 5 him. Seeing this rudeness truly upset me. The day I became a mother, I had resolved to set a good 6 to my children. Yet sometimes when things didn’t go right, being a good example was 7 . When our meal arrived, I realized I had left the car-sick pills in the truck. With the windiest trip ahead, the kids needed them, so I 8 myself from the meal and went to get them. Just then, the “doorman” was opening the door for a couple. They rushed past him without even acknowledging his 9 . Letting them in first, I said a loud “thank you” to him as I 10 . When I returned, we talked a bit. He said he was not allowed inside 11 he purchased food. I went back and told my family his 12 . Then I asked our waitress to add one soup and sandwich. The kids looked 13 as we had already eaten, but when I said the order was for the “doorman”, they smiled. When it was time to 14 our trip, I noticed the “doorman” enjoying his meal. Upon seeing me, he stood up and thanked me heartily. He then 15 his hand for a handshake and I gratefully accepted. I suddenly noticed the tears in his eyes—tears of 16 . What happened next drew great astonishment: I gave the “doorman” a 17 . He pulled away, with tears 18 down his face. Back in truck, I fell into deep thought. While we can’t choose many things in life, we can choose when to show gratitude(感恩). I said thanks to a man who had 19 help open a door for me, and also said thanks for that 20 to teach my children by example. 1. A. heavy B. long C. messy D. grey
2020年江苏省高考数学模拟试卷及答案
2020年江苏省高考数学模拟试卷 一、填空题:本大题共14小题,每小题5分,共70分.请把答案填写在答题卡相应位置上. 1. 集合20|{<<=x x A ,}R x ∈,集合1|{x B =≤x ≤3,}R x ∈,则A ∩=B . 2. 设i 是虚数单位,若复数i i z 23-= ,则z 的虚部为 . 3. 执行所示伪代码,若输出的y 的值为17,则输入的x 的值是 . 4. 在平面直角坐标系xoy 中,点P 在角23 π 的终边上,且2OP =,则 点P 的坐标为 . 5. 某学校要从A ,B ,C ,D 这四名老师中选择两名去新疆支教 (每位老师被安排是等可能的),则A ,B 两名老师都被选中 的概率是 . 6. 函数128 1 --= x y 的定义域为 . 7. 在等差数列}{n a 中,94=a ,178=a ,则数列}{n a 的前n 项和=n S . 8. 已知53sin - =θ,2 3πθπ<<,则=θ2tan . 9. 已知实数2,,8m 构成一个等比数列,则椭圆2 21x y m +=的离心率是 . 10.若曲线1 2 +-= x x y 在1=x 处的切线与直线01=++y ax 垂直,则实数a 等于 . 11.在△ABC 中,已知A B 2=,则B A tan 3 tan 2- 的最小值为 . 12.已知圆C :1)2()2(2 2 =-++y x ,直线l :)5(-=x k y ,若在圆C 上存在一点P , 在直线l 上存在一点Q ,使得PQ 的中点是坐标原点O ,则实数k 的取值范围是 . 13.在直角梯形ABCD 中,CD AB //,2=AB ,?=∠90DAB ,1==DC AD , AC 与BD 相交于点Q ,P 是线段BC 上一动点,则·的取值范围是 . 14.已知函数2 ()(,)f x x ax b a b R =++∈,若存在非零实数t ,使得1 ()()2f t f t +=-, 则2 2 4a b +的最小值为 . (第3题)
(完整版)江苏省2019年高考数学模拟试题及答案
江苏省2019年高考数学模拟试题及答案 一、填空题:本大题共14小题,每小题5分,共70分. 1.若全集}3,2,1{=U ,}2,1{=A ,则=A C U . 【答案】}3{ 2.函数x y ln =的定义域为 . 【答案】),1[+∞ 3.若钝角α的始边与x 轴的正半轴重合,终边与单位圆交于点)2 3 ,(m P ,则αtan . 【答案】3- 4.在ABC ?中,角C B A ,,的对边为c b a ,,,若7,5,3===c b a ,则角=C . 【答案】 3 2π 5.已知向量)1,1(-=m ,)sin ,(cos αα=n ,其中],0[πα∈,若n m //,则=α . 【答案】 4 3π 6.设等差数列}{n a 的前n 项和为n S ,若63=a ,497=S ,则公差=d . 【答案】1 7.在平面直角坐标系中,曲线12++=x e y x 在0=x 处的切线方程为 . 【答案】23+=x y 8.实数1-=k 是函数x x k k x f 212)(?+-=为奇函数的 条件(选填“充分不必要”,“必要不充分”, “充要”,“既不充分也不必要”之一) 【答案】充分不必要 9.在ABC ?中,0 60,1,2===A AC AB ,点D 为BC 上一点,若?=?2,则 AD . 【答案】 3 3 2 10.若函数)10(|3sin |)(<<-=m m x x f 的所有正零点构成公差为)0(>d d 的等差数列,则
=d . 【答案】 6 π 11.如图,在四边形ABCD 中,0 60,3,2===A AD AB ,分别CD CB ,延长至点F E ,使得CB CE λ=, CD CF λ=其中0>λ,若15=?AD EF ,则λ的值为 . 【答案】 2 5 12.已知函数x m x e m x x f x )1(2 1)()(2 +--+=在R 上单调递增,则实数m 的取值集合为 . 【答案】}1{- 13.已知数列}{n a 满足023211=+++++n n n n a a a a ,其中2 1 1-=a ,设1+-=n n a n b λ,若3b 为数列} {n b 中的唯一最小项,则实数λ的取值范围是 . 【答案】)7,5( 14.在ABC ?中,3tan -=A ,ABC ?的面积为1,0P 为线段BC 上的一个定点,P 为线段BC 上的任意一点,满足BC CP =03,且恒有C P A P PC PA 00?≥?,则线段BC 的长为 . 【答案】6 二、解答题:本大题共6小题,共90分.解答应写出文字说明,证明过程或演算步骤. 15.(本小题满分14分) 若函数)0,0()3 sin()(>>++=b a b ax x f π 的图像与x 轴相切,且图像上相邻两个最高点之间的距离 为π. (1)求b a ,的值; (2)求函数)(x f 在?? ? ???4, 0π上的最大值和最小值.
江苏高考英语完形填空
I was required to read one of Bernie Siegel’s books in college and was hooked on his positivity from that moment on. The stories of his unconventional 36 and the exceptional patients he wrote about were so 37 to me and had such a big 38 on how I saw life from then on. Who knew that so many years later I would look to Dr. Bernie and his CDs again to 39 my own cancer experience? I’m an ambitious 40 , and when I started going through chemo(化疗), even though I’m a very 41 person, I lost my drive to write. I was just too tired and not in the 42 . One day, while waiting to go in for 43 , I had one of Dr. Bernie’s books in my hand. Another patient 44 what I was reading and struck up a conversation with me 45 he had one of his books with his as well. It 46 that among other things, he was an eight-year-old writer. He was 47 a published author, and he was currently 48 on a new book. We would see each other at various times and 49 friends. Sometimes he wore a duck hat, and I would tell myself, he was definitely a(n) 50 of Dr. Bernie. He really put a 51 on my face. He unfortunately 52 last year due to his cancer, 53 he left a deep impression on and gave me the 54 to pick up my pen again. I 55 to myself, “ If he can do it, then so can I.” 36. A. tastes B. ideas C. notes D. memories 37. A. amazing B. shocking C. amusing D. strange 38. A. strike B. push C. challenge D. impact 39. A. learn from B. go over C. get through D. refer to 40. A. reader B. writer C. editor D. doctor 41. A. positive B. agreeable C. humorous D. honest 42. A. mood B. position C. state D. way 43. A. advice B. reference C. protection D. treatment 44. A. viewed B. knew C. noticed D. wondered 45. A. while B. because C. although D. providing 46. A. came out B. worked out C. proved out D. turned out 47. A. naturally B. merely C. hopefully D. actually 48. A. deciding B. investing C. working D. relying 49. A. became B. helped C. missed D. visited 50. A. patient B. operator C. fan D. publisher
2020江苏高考数学模拟考试
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2021届高三江苏新高考英语分项汇编(2)之完形填空(原卷word版)
2021届高三江苏好题速递分项汇编(2) 完形填空 完形填空【江苏省苏州市2021届八校联盟高三第一次适应性检测】 Danielle was living in a new city with no local bank of her own. She desperately needed to 21 a bank to cash her paycheck. For more than two weeks, she made 22 one after another but in vain. Danielle decided to attend a meeting at the local women’s resource center. The women there had been a strong source of encouragement since she came here. Sitting next to Danielle, Amy began to share the details of her 23 situation. She was just days away from 24 her home and her car. Her phone and electric services were both scheduled to be cancelled. Her husband had gambled away their money. She had nothing left. As Amy described the situation, Danielle 25 God’s soft whisper in her heart: “After the meeting, give Amy twenty dollars.” Danielle immediately thought, “But I can’t. I only have forty dollars.” She heard the 26 again. Danielle knew she needed to follow. 27 the meeting concluded, she 28 her purse and quietly handed twenty dollars to Amy. Knowing Danielle’s situation, Amy was 29 to accept it at first. But as a crowd of women 30 to give Amy hugs of support, Danielle told her that God wanted her to have it. Then Danielle left. With just twenty dollars left in her wallet, Danielle decided to try cashing her paycheck at just one more bank before 31 home. She was 32 filled with renewed confidence and optimism. She walked into the bank next to the women’s center. Moments later, the bank 33 her paycheck with no questions asked. Wearing a big smile, Danielle returned home. Realizing true hope has no 34 , she continues to be 35 for the lifetime supply that she received for just twenty dollars. 21.A.select B.find C.consult D.search 22.A.decisions B.choices C.appointments D.attempts 23.A.similar B.unique C.desperate D.social 24.A.ruining B.leaving C.missing D.losing 25.A.received B.found C.heard D.felt 26.A.story B.advice C.order D.voice 27.A.Before B.While C.When D.Though
江苏省2020届高考数学模拟试题(一)(原卷版)
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7.在平面直角坐标系xOy 中,双曲线2 213 x y -=的右准线与渐近线的交点在抛物线22y px =上,则实数p 的值为________. 8.等比数列{}n a 中,若11a =,24a ,32a ,4a 成等差数列,则17a a =______. 9.已知正方体1111ABCD A B C D -,棱长为1.点E 是棱AD 上的任意一点,点F 是棱11B C 上的任意一点,则三棱锥B ECF -的体积为______. 10.已知3cos 24sin()4παα=-,α∈(4 π,π),则sin 2α=_______. 11.已知点M 是曲线y =2lnx +x 2﹣3x 上一动点,当曲线在M 处的切线斜率取得最小值时,该切线的方程为_______. 12.如图,在ABC ?中,D 、E 是BC 上的两个三等分点,2AB AD AC AE ?=?,则cos ADE ∠的最小值为________. 13.在平面直角坐标系xOy 中,圆C :22222210x ax y ay a -+-+-=上存在点P 到点0,1的距离为2, 则实数a 的取值范围是______.
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江苏省2021届高三数学第二次模拟考试试题
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