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【高教版】中職數(shù)學(xué)拓展模塊：1.2《正弦型函數(shù)》教學(xué)設(shè)計
教學(xué) 過程教師行為學(xué)生行為教學(xué) 意圖時間 *揭示課題 1.2正弦型函數(shù)． *創(chuàng)設(shè)情境興趣導(dǎo)入與正弦函數(shù)圖像的做法類似，可以用“五點法”作出正弦型函數(shù)的圖像．正弦型函數(shù)的圖像叫做正弦型曲線．介紹播放課件質(zhì)疑了解觀看課件思考學(xué)生自然的走向知識點 0 5*鞏固知識典型例題例3　作出函數(shù)在一個周期內(nèi)的簡圖．分析函數(shù)與函數(shù)的周期都是，最大值都是2，最小值都是－2. 解為求出圖像上五個關(guān)鍵點的橫坐標(biāo)，分別令，，，，，求出對應(yīng)的值與函數(shù)的值，列表1-1如下：表 001000200 以表中每組的值為坐標(biāo)，描出對應(yīng)五個關(guān)鍵點（，0）、（，2）、（，0）、（，?2）、（，0）．用光滑的曲線聯(lián)結(jié)各點，得到函數(shù)在一個周期內(nèi)的圖像（如圖）．圖引領(lǐng) 講解說明引領(lǐng) 觀察思考主動求解觀察通過例題進一步領(lǐng) 會注意觀察學(xué)生是否理解知識點 15
【高教版】中職數(shù)學(xué)拓展模塊：1.3《正弦定理與余弦定理》教學(xué)設(shè)計
教學(xué) 過程教師行為學(xué)生行為教學(xué) 意圖時間 *揭示課題 1.3正弦定理與余弦定理． *創(chuàng)設(shè)情境興趣導(dǎo)入在實際問題中，經(jīng)常需要計算高度、長度、距離和角的大小，這類問題中有許多與三角形有關(guān)，可以歸結(jié)為解三角形問題，經(jīng)常需要應(yīng)用正弦定理或余弦定理．介紹播放課件了解觀看課件學(xué)生自然的走向知識點 0 5*鞏固知識典型例題例6一艘船以每小時36海里的速度向正北方向航行（如圖1－14）.在A處觀察燈塔C在船的北偏東30°，0.5小時后船行駛到B處，再觀察燈塔C在船的北偏東45°，求B處和燈塔C的距離（精確到0.1海里）. 解因為∠NBC=45°，A=30°，所以C=15°， AB = 36×0.5 = 18 (海里). 由正弦定理得答：B處離燈塔約為34.8海里. 例7 修筑道路需挖掘隧道，在山的兩側(cè)是隧道口A和B(圖1－15），在平地上選擇適合測量的點C，如果C=60°，AB = 350m，BC = 450m，試計算隧道AB的長度（精確到1m）．解在△ABC中，由余弦定理知 =167500．所以AB≈409m. 答：隧道AB的長度約為409m. 圖1－15 引領(lǐng) 講解說明引領(lǐng) 觀察思考主動求解觀察通過例題進一步領(lǐng) 會注意觀察學(xué)生是否理解知識點 40
【高教版】中職數(shù)學(xué)拓展模塊：3.2《二項式定理》教學(xué)設(shè)計
一、定義：　，這一公式表示的定理叫做二項式定理，其中公式右邊的多項式叫做的二項展開式；上述二項展開式中各項的系數(shù) 叫做二項式系數(shù)，第項叫做二項展開式的通項，用表示；叫做二項展開式的通項公式．二、二項展開式的特點與功能1. 二項展開式的特點項數(shù)：二項展開式共（二項式的指數(shù)+1）項；指數(shù)：二項展開式各項的第一字母依次降冪（其冪指數(shù)等于相應(yīng)二項式系數(shù)的下標(biāo)與上標(biāo)的差），第二字母依次升冪（其冪指數(shù)等于二項式系數(shù)的上標(biāo)），并且每一項中兩個字母的系數(shù)之和均等于二項式的指數(shù)；系數(shù)：各項的二項式系數(shù)下標(biāo)等于二項式指數(shù)；上標(biāo)等于該項的項數(shù)減去1（或等于第二字母的冪指數(shù)；2. 二項展開式的功能注意到二項展開式的各項均含有不同的組合數(shù)，若賦予a，b不同的取值，則二項式展開式演變成一個組合恒等式．因此，揭示二項式定理的恒等式為組合恒等式的“母函數(shù)”，它是解決組合多項式問題的原始依據(jù)．又注意到在的二項展開式中，若將各項中組合數(shù)以外的因子視為這一組合數(shù)的系數(shù)，則易見展開式中各組合數(shù)的系數(shù)依次成等比數(shù)列．因此，解決組合數(shù)的系數(shù)依次成等比數(shù)列的求值或證明問題，二項式公式也是不可或缺的理論依據(jù)．
【高教版】中職數(shù)學(xué)拓展模塊：3.3《離散型隨機變量及其分布》教學(xué)設(shè)計
重點分析：本節(jié)課的重點是離散型隨機變量的概率分布，難點是理解離散型隨機變量的概念．離散型隨機變量突破難點的方法：函數(shù)的自變量隨機變量連續(xù)型隨機變量函數(shù)可以列表 X123456p 2 4 6 8 10 12
高教版中職數(shù)學(xué)基礎(chǔ)模塊下冊：10.2《概率》教學(xué)設(shè)計
課程課題隨機事件和概率授課教師李丹丹學(xué)時數(shù)2授課班級授課時間教學(xué)地點背景分析正確使用兩個基本原理的前提是要學(xué)生清楚兩個基本原理使用的條件；分類用加法原理，分步用乘法原理，單純這點學(xué)生是容易理解的，問題在于怎樣合理地進行分類和分步教學(xué)中給出的練習(xí)均在課本例題的基礎(chǔ)上稍加改動過的，目的就在于幫助學(xué)生對這一知識的理解與應(yīng)用學(xué)習(xí)目標(biāo) 設(shè) 定知識目標(biāo)能力（技能）目標(biāo)態(tài)度與情感目標(biāo)1、理解隨機試驗、隨機事件、必然事件、不可能事件等概念 2、理解基本事件空間、基本事件的概念,會用集合表示基本事件空間和事件 1 會用隨機試驗、隨機事件、必然事件、不可能事件等概念 2 會用基本事件空間、基本事件的概念,會用集合表示基本事件空間和事件 3、掌握事件的基本關(guān)系與運算了解學(xué)習(xí)本章的意義,激發(fā)學(xué)生的興趣. 學(xué)習(xí)任務(wù) 描述任務(wù)一，隨機試驗、隨機事件、必然事件、不可能事件等概念任務(wù)二，理解基本事件空間、基本事件的概念,會用集合表示基本事件空間和事件
高教版中職數(shù)學(xué)基礎(chǔ)模塊下冊：10.3《總體、樣本與抽樣方法》教學(xué)設(shè)計
教學(xué) 過程教師行為學(xué)生行為教學(xué) 意圖時間 *揭示課題 10.3總體、樣本與抽樣方法（一） *創(chuàng)設(shè)情境興趣導(dǎo)入【實驗】商店進了一批蘋果，小王從中任意選取了10個蘋果，編上號并稱出質(zhì)量．得到下面的數(shù)據(jù)（如表10－6所示）：蘋果編號12345678910質(zhì)量（kg）0.210.170.190.160.200.220.210.180.190.17 利用這些數(shù)據(jù)，就可以估計出這批蘋果的平均質(zhì)量及蘋果的大小是否均勻．介紹質(zhì)疑講解說明了解思考啟發(fā) 學(xué)生思考 0 10*動腦思考探索新知【新知識】在統(tǒng)計中，所研究對象的全體叫做總體，組成總體的每個對象叫做個體．上面的實驗中，這批蘋果的質(zhì)量是研究對象的總體，每個蘋果的質(zhì)量是研究的個體．講解說明引領(lǐng) 分析理解記憶帶領(lǐng) 學(xué)生分析 20*鞏固知識典型例題【知識鞏固】例1 研究某班學(xué)生上學(xué)期數(shù)學(xué)期末考試成績，指出其中的總體與個體. 解該班所有學(xué)生的數(shù)學(xué)期末考試成績是總體，每一個學(xué)生的數(shù)學(xué)期末考試成績是個體．【試一試】我們經(jīng)常用燈泡的使用壽命來衡量燈炮的質(zhì)量．指出在鑒定一批燈泡的質(zhì)量中的總體與個體．說明強調(diào) 引領(lǐng) 觀察思考主動求解通過例題進一步領(lǐng)會 35
新人教版高中英語選修2Unit 1 Science and Scientists-Discovering useful structures教學(xué)設(shè)計
The grammatical structure of this unit is predicative clause. Like object clause and subject clause, predicative clause is one of Nominal Clauses. The leading words of predicative clauses are that, what, how, what, where, as if, because, etc.The design of teaching activities aims to guide students to perceive the structural features of predicative clauses and think about their ideographic functions. Beyond that, students should be guided to use this grammar in the context apporpriately and flexibly.1. Enable the Ss to master the usage of the predicative clauses in this unit.2. Enable the Ss to use the predicative patterns flexibly.3. Train the Ss to apply some skills by doing the relevant exercises.1.Guide students to perceive the structural features of predicative clauses and think about their ideographic functions.2.Strengthen students' ability of using predicative clauses in context, but also cultivate their ability of text analysis and logical reasoning competence.Step1: Underline all the examples in the reading passage, where noun clauses are used as the predicative. Then state their meaning and functions.1) One theory was that bad air caused the disease.2) Another theory was that cholera was caused by an infection from germs in food or water.3) The truth was that the water from the Broad Street had been infected by waste.Sum up the rules of grammar:1. 以上黑體部分在句中作表語。2. 句1、2、3中的that在從句中不作成分，只起連接作用。 Step2: Review the basic components of predicative clauses1.Definition
新人教版高中英語選修2Unit 4 Journey Across a Vast Land教學(xué)設(shè)計
當(dāng)孩子們由父母陪同時，他們才被允許進入這個運動場。3．過去分詞(短語)作狀語時的幾種特殊情況(1)過去分詞(短語)在句中作時間、條件、原因、讓步狀語時，相當(dāng)于對應(yīng)的時間、條件、原因及讓步狀語從句。Seen from the top of the mountain (＝When it is seen from the top of the mountain), the whole town looks more beautiful.從山頂上看，整個城市看起來更美了。Given ten more minutes (＝If we are given ten more minutes), we will finish the work perfectly.如果多給十分鐘，我們會完美地完成這項工作。Greatly touched by his words (＝Because she was greatly touched by his words), she was full of tears.由于被他的話深深地感動，她滿眼淚花。Warned of the storm (＝Though they were warned of the storm), the farmers were still working on the farm.盡管被警告了風(fēng)暴的到來，但農(nóng)民們?nèi)栽谵r(nóng)場干活。(2)過去分詞(短語)在句中作伴隨、方式等狀語時，可改為句子的并列謂語或改為并列分句。The teacher came into the room, followed by two students (＝and was followed by two students)．后面跟著兩個學(xué)生，老師走進了房間。He spent the whole afternoon, accompanied by his mom(＝and was accompanied by his mom)．他由母親陪著度過了一整個下午。
新人教版高中英語選修2Unit 1 Science and Scientists-Learning about Language教學(xué)設(shè)計
Step 7: complete the discourse according to the grammar rules.Cholera used to be one of the most 1.__________ (fear) diseases in the world. In the early 19th century, _2_________ an outbreak of cholera hit Europe, millions of people died. But neither its cause, 3__________ its cure was understood. A British doctor, John Snow, wanted to solve the problem and he knew that cholera would not be controlled _4_________ its cause was found. In general, there were two contradictory theories 5 __________ explained how cholera spread. The first suggested that bad air caused the disease. The second was that cholera was caused by an _6_________(infect) from germs in food or water. John Snow thought that the second theory was correct but he needed proof. So when another outbreak of cholera hit London in 1854, he began to investigate. Later, with all the evidence he _7_________ (gather), John Snow was able to announce that the pump water carried cholera germs. Therefore, he had the handle of the pump _8_________ (remove) so that it couldn't be used. Through his intervention，the disease was stopped in its tracks. What is more, John Snow found that some companies sold water from the River Thames that __9__________________ (pollute) by raw waste. The people who drank this water were much more likely _10_________ (get) cholera than those who drank pure or boiled water. Through John Snow's efforts, the _11_________ (threaten) of cholera around the world saw a substantial increase. Keys： 1.feared 2.when 3. nor 4.unless 5.that/which 6.infection 7.had gathered 8.removed 9.was polluted 10.to get 11. threat
新人教版高中英語選修2Unit 1 Science and Scientists-Reading and thinking教學(xué)設(shè)計
Step 5： After learning the text, discuss with your peers about the following questions:1.John Snow believed Idea 2 was right. How did he finally prove it?2. Do you think John Snow would have solved this problem without the map?3. Cholera is a 19th century disease. What disease do you think is similar to cholera today?SARS and Covid-19 because they are both deadly and fatally infectious, have an unknown cause and need serious public health care to solve them urgently.keys:1. John Snow finally proved his idea because he found an outbreak that was clearly related to cholera, collected information and was able to tie cases outside the area to the polluted water.2. No. The map helped John Snow organize his ideas. He was able to identify those households that had had many deaths and check their water-drinking habits. He identified those houses that had had no deaths and surveyed their drinking habits. The evidence clearly pointed to the polluted water being the cause.3. SARS and Covid-19 because they are both deadly and fatally infectious, have an unknown cause and need serious public health care to solve them urgently.Step 6: Consolidate what you have learned by filling in the blanks:John Snow was a well-known _1___ in London in the _2__ century. He wanted to find the _3_____ of cholera in order to help people ___4_____ it. In 1854 when a cholera __5__ London, he began to gather information. He ___6__ on a map ___7___ all the dead people had lived and he found that many people who had ___8____ (drink) the dirty water from the __9____ died. So he decided that the polluted water ___10____ cholera. He suggested that the ___11__ of all water supplies should be _12______ and new methods of dealing with ____13___ water be found. Finally, “King Cholera” was __14_____.Keys: 1. doctor 2. 19th 3.cause 4.infected with 5.hit 6.marked 7.where 8.drunk 9.pump 10.carried 11.source 12.examined 13.polluted 14.defeatedHomework: Retell the text after class and preview its language points
新人教版高中英語選修2Unit 1 Science and Scientists-Using langauge教學(xué)設(shè)計
This happens because the dish soap molecules have a strong negative charge, and the milk molecules have a strong positive charge. Like magnets, these molecules are attracted to each other, and so they appear to move around on the plate, taking the food coloring with them, making it look like the colors are quickly moving to escape from the soap.Listening text:? Judy: Oh, I'm so sorry that you were ill and couldn't come with us on our field trip. How are you feeling now? Better?? Bill: Much better, thanks. But how was it?? Judy: Wonderful! I especially liked an area of the museum called Light Games.it was really cool. They had a hall of mirrors where I could see myself reflected thousands of times!? Bill: A hall of mirrors can be a lot of fun. What else did they have?? Judy: Well, they had an experiment where we looked at a blue screen for a while, and then suddenly we could see tiny bright lights moving around on it. You'll never guess what those bright lights were!? Bill: Come on, tell me!? Judy: They were our own blood cells. For some reason, our eyes play tricks on us when we look at a blue screen, and we can see our own blood cells moving around like little lights! But there was another thing I liked better. I stood in front of a white light, and it cast different shadows of me in every color of the rainbow!? Bill: Oh, I wish I had been there. Tell me more!? Judy: Well, they had another area for sound. They had a giant piano keyboard that you could use your feet to play. But then, instead of playing the sounds of a piano, it played the voices of classical singers! Then they had a giant dish, and when you spoke into it, it reflected the sound back and made it louder. You could use it to speak in a whisper to someone 17 meters away.? Bill: It all sounds so cool. I wish I could have gone with you? Judy: I know, but we can go together this weekend. I'd love to go there again!? Bill: That sounds like a great idea!
新人教版高中英語選修2Unit 2 Bridging Cultures-Discovering useful structures教學(xué)設(shè)計
The grammar of this unit is designed to review noun clauses. Sentences that use nouns in a sentence are called noun clauses. Nominal clauses can act as subject, object, predicate, appositive and other components in compound sentences. According to the above-mentioned different grammatical functions, nominal clauses are divided into subject clause, object clause, predicate clause and appositive clause. In this unit, we will review the three kinds of nominal clauses. Appositive clauses are not required to be mastered in the optional compulsory stage, so they are not involved.1. Guide the students to judge the compound sentences and determine the composition of the clauses in the sentence.2. Instruct students to try to learn grammar by generalizing grammar rules, controlling written practice, and semi-open oral output.3. Inspire the students to systematize the function and usage of noun clause1.Instruct students to try to learn grammar by generalizing grammar rules, controlling written practice, and semi-open oral output.2.Inspire the students to systematize the function and usage of noun clauseStep1: The teacher ask studetns to find out more nominal clauses from the reading passage and udnerline the nominal clauses.
新人教版高中英語選修2Unit 5 First Aid-Discovering useful structures教學(xué)設(shè)計
You have no excuse for not going.你沒有理由不去。He was punished for not having finished his homework.他因未完成作業(yè)而受到懲罰。2．動詞ing形式復(fù)合結(jié)構(gòu)由物主代詞或人稱代詞賓格、名詞所有格或普通格加動詞ing，即“sb./sb.'s＋doing”構(gòu)成。動詞ing形式的復(fù)合結(jié)構(gòu)實際上是給動詞ing形式加了一個邏輯主語。動詞ing形式的復(fù)合結(jié)構(gòu)有四種形式：①形容詞性物主代詞＋動詞ing②名詞所有格＋動詞ing③代詞賓格＋動詞ing④名詞＋動詞ingHer coming to help encouraged all of us.她來幫忙鼓舞了我們所有人。The baby was made awake by the door suddenly shutting.這個嬰兒被突然的關(guān)門聲吵醒了。Can you imagine him/Jack cooking at home?你能想象他/杰克在家做飯的樣子嗎？無生命名詞無論是作主語還是作賓語都不能用第②種形式。Tom's winning first prize last year impressed me a lot.湯姆去年得了一等獎使我印象深刻。Do you mind my/me/Jack's/Jack leaving now?你介意我/杰克現(xiàn)在離開嗎？Excuse me for my not coming on time．很抱歉我沒能按時來。His father's being ill made him worried.他父親病了，他很擔(dān)心。We are looking forward to the singer's/the singer to give us a concert.我們盼望著這位歌手來給我們舉辦一場演唱會。
空間向量基本定理教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
反思感悟用基底表示空間向量的解題策略1.空間中,任一向量都可以用一個基底表示,且只要基底確定,則表示形式是唯一的.2.用基底表示空間向量時,一般要結(jié)合圖形,運用向量加法、減法的平行四邊形法則、三角形法則,以及數(shù)乘向量的運算法則,逐步向基向量過渡,直至全部用基向量表示.3.在空間幾何體中選擇基底時,通常選取公共起點最集中的向量或關(guān)系最明確的向量作為基底,例如,在正方體、長方體、平行六面體、四面體中,一般選用從同一頂點出發(fā)的三條棱所對應(yīng)的向量作為基底.例2.在棱長為2的正方體ABCD-A1B1C1D1中,E,F分別是DD1,BD的中點,點G在棱CD上,且CG=1/3 CD(1)證明:EF⊥B1C;(2)求EF與C1G所成角的余弦值.思路分析選擇一個空間基底,將(EF) ?,(B_1 C) ?,(C_1 G) ?用基向量表示.(1)證明(EF) ?·(B_1 C) ?=0即可;(2)求(EF) ?與(C_1 G) ?夾角的余弦值即可.(1)證明:設(shè)(DA) ?=i,(DC) ?=j,(DD_1 ) ?=k,則{i,j,k}構(gòu)成空間的一個正交基底.
點到直線的距離公式教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
4.已知△ABC三個頂點坐標(biāo)A(－1,3)，B(－3,0)，C(1,2)，求△ABC的面積S.【解析】由直線方程的兩點式得直線BC的方程為＝，即x－2y＋3＝0，由兩點間距離公式得|BC|＝，點A到BC的距離為d，即為BC邊上的高，d＝，所以S＝ |BC|·d＝ ×2 × ＝4，即△ABC的面積為4.5.已知直線l經(jīng)過點P(0,2),且A(1,1),B(-3,1)兩點到直線l的距離相等,求直線l的方程.解:(方法一)∵點A(1,1)與B(-3,1)到y(tǒng)軸的距離不相等,∴直線l的斜率存在,設(shè)為k.又直線l在y軸上的截距為2,則直線l的方程為y=kx+2,即kx-y+2=0.由點A(1,1)與B(-3,1)到直線l的距離相等,∴直線l的方程是y=2或x-y+2=0.得("|" k"-" 1+2"|" )/√(k^2+1)=("|-" 3k"-" 1+2"|" )/√(k^2+1),解得k=0或k=1.(方法二)當(dāng)直線l過線段AB的中點時,A,B兩點到直線l的距離相等.∵AB的中點是(-1,1),又直線l過點P(0,2),∴直線l的方程是x-y+2=0.當(dāng)直線l∥AB時,A,B兩點到直線l的距離相等.∵直線AB的斜率為0,∴直線l的斜率為0,∴直線l的方程為y=2.綜上所述,滿足條件的直線l的方程是x-y+2=0或y=2.
兩點間的距離公式教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
一、情境導(dǎo)學(xué)在一條筆直的公路同側(cè)有兩個大型小區(qū),現(xiàn)在計劃在公路上某處建一個公交站點C,以方便居住在兩個小區(qū)住戶的出行.如何選址能使站點到兩個小區(qū)的距離之和最小?二、探究新知問題1.在數(shù)軸上已知兩點A、B，如何求A、B兩點間的距離？提示：|AB|＝|xA－xB|.問題2：在平面直角坐標(biāo)系中能否利用數(shù)軸上兩點間的距離求出任意兩點間距離？探究.當(dāng)x1≠x2，y1≠y2時，|P1P2|＝？請簡單說明理由．提示：可以，構(gòu)造直角三角形利用勾股定理求解．答案：如圖，在Rt △P1QP2中，|P1P2|2＝|P1Q|2＋|QP2|2，所以|P1P2|＝?x2－x1?2＋?y2－y1?2.即兩點P1(x1，y1)，P2(x2，y2)間的距離|P1P2|＝?x2－x1?2＋?y2－y1?2.你還能用其它方法證明這個公式嗎？2．兩點間距離公式的理解(1)此公式與兩點的先后順序無關(guān)，也就是說公式也可寫成|P1P2|＝?x2－x1?2＋?y2－y1?2.(2)當(dāng)直線P1P2平行于x軸時，|P1P2|＝|x2－x1|.當(dāng)直線P1P2平行于y軸時，|P1P2|＝|y2－y1|.
傾斜角與斜率教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
(2)l的傾斜角為90°,即l平行于y軸,所以m+1=2m,得m=1.延伸探究1 本例條件不變,試求直線l的傾斜角為銳角時實數(shù)m的取值范圍.解:由題意知(m"-" 1"-" 1)/(m+1"-" 2m)>0,解得1<m<2.延伸探究2 若將本例中的“N(2m,1)”改為“N(3m,2m)”,其他條件不變,結(jié)果如何?解:(1)由題意知(m"-" 1"-" 2m)/(m+1"-" 3m)=1,解得m=2.(2)由題意知m+1=3m,解得m=1/2.直線斜率的計算方法(1)判斷兩點的橫坐標(biāo)是否相等,若相等,則直線的斜率不存在.(2)若兩點的橫坐標(biāo)不相等,則可以用斜率公式k=(y_2 "-" y_1)/(x_2 "-" x_1 )(其中x1≠x2)進行計算.金題典例光線從點A(2,1)射到y(tǒng)軸上的點Q,經(jīng)y軸反射后過點B(4,3),試求點Q的坐標(biāo)及入射光線的斜率.解:(方法1)設(shè)Q(0,y),則由題意得kQA=-kQB.∵kQA=(1"-" y)/2,kQB=(3"-" y)/4,∴(1"-" y)/2=-(3"-" y)/4.解得y=5/3,即點Q的坐標(biāo)為 0,5/3 ,∴k入=kQA=(1"-" y)/2=-1/3.(方法2)設(shè)Q(0,y),如圖,點B(4,3)關(guān)于y軸的對稱點為B'(-4,3), kAB'=(1"-" 3)/(2+4)=-1/3,由題意得,A、Q、B'三點共線.從而入射光線的斜率為kAQ=kAB'=-1/3.所以,有(1"-" y)/2=(1"-" 3)/(2+4),解得y=5/3,點Q的坐標(biāo)為(0,5/3).
兩條平行線間的距離教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
一、情境導(dǎo)學(xué)前面我們已經(jīng)得到了兩點間的距離公式，點到直線的距離公式，關(guān)于平面上的距離問題，兩條直線間的距離也是值得研究的。思考1：立定跳遠(yuǎn)測量的什么距離？A.兩平行線的距離 B.點到直線的距離 C. 點到點的距離二、探究新知思考2：已知兩條平行直線l_1,l_2的方程，如何求l_1 〖與l〗_2間的距離？根據(jù)兩條平行直線間距離的含義，在直線l_1上取任一點P（x_0,y_0 ），,點P（x_0,y_0 ）到直線l_2的距離就是直線l_1與直線l_2間的距離，這樣求兩條平行線間的距離就轉(zhuǎn)化為求點到直線的距離。兩條平行直線間的距離1. 定義：夾在兩平行線間的__________的長.公垂線段2. 圖示： 3. 求法：轉(zhuǎn)化為點到直線的距離.1．原點到直線x＋2y－5＝0的距離是( )A．2 B．3 C．2 D．5D [d＝|－5|12＋22＝5.選D.]
兩直線的交點坐標(biāo)教學(xué)設(shè)計人教A版高中數(shù)學(xué)選擇性必修第一冊
1.直線2x+y+8=0和直線x+y-1=0的交點坐標(biāo)是( )A.(-9,-10) B.(-9,10) C.(9,10) D.(9,-10)解析:解方程組{■(2x+y+8=0"," @x+y"-" 1=0"," )┤得{■(x="-" 9"," @y=10"," )┤即交點坐標(biāo)是(-9,10).答案:B 2.直線2x+3y-k=0和直線x-ky+12=0的交點在x軸上,則k的值為( )A.-24 B.24 C.6 D.± 6解析:∵直線2x+3y-k=0和直線x-ky+12=0的交點在x軸上,可設(shè)交點坐標(biāo)為(a,0),∴{■(2a"-" k=0"," @a+12=0"," )┤解得{■(a="-" 12"," @k="-" 24"," )┤故選A.答案:A 3.已知直線l1:ax+y-6=0與l2:x+(a-2)y+a-1=0相交于點P,若l1⊥l2,則點P的坐標(biāo)為 . 解析:∵直線l1:ax+y-6=0與l2:x+(a-2)y+a-1=0相交于點P,且l1⊥l2,∴a×1+1×(a-2)=0,解得a=1,聯(lián)立方程{■(x+y"-" 6=0"," @x"-" y=0"," )┤易得x=3,y=3,∴點P的坐標(biāo)為(3,3).答案:(3,3) 4.求證:不論m為何值,直線(m-1)x+(2m-1)y=m-5都通過一定點. 證明:將原方程按m的降冪排列,整理得(x+2y-1)m-(x+y-5)=0,此式對于m的任意實數(shù)值都成立,根據(jù)恒等式的要求,m的一次項系數(shù)與常數(shù)項均等于零,故有{■(x+2y"-" 1=0"," @x+y"-" 5=0"," )┤解得{■(x=9"," @y="-" 4"." )┤
人教版高中數(shù)學(xué)選擇性必修二等比數(shù)列的概念 (1) 教學(xué)設(shè)計
新知探究我們知道，等差數(shù)列的特征是“從第2項起，每一項與它的前一項的差都等于同一個常數(shù)” 。類比等差數(shù)列的研究思路和方法，從運算的角度出發(fā)，你覺得還有怎樣的數(shù)列是值得研究的？1.兩河流域發(fā)掘的古巴比倫時期的泥版上記錄了下面的數(shù)列:9,9^2,9^3,…,9^10; ①100,100^2,100^3,…,100^10; ②5,5^2,5^3,…,5^10. ③2.《莊子·天下》中提到：“一尺之錘，日取其半，萬世不竭.”如果把“一尺之錘”的長度看成單位“1”，那么從第1天開始，每天得到的“錘”的長度依次是1/2,1/4,1/8,1/16,1/32,… ④3.在營養(yǎng)和生存空間沒有限制的情況下，某種細(xì)菌每20 min 就通過分裂繁殖一代，那么一個這種細(xì)菌從第1次分裂開始，各次分裂產(chǎn)生的后代個數(shù)依次是2,4,8,16,32,64,… ⑤4.某人存入銀行a元，存期為5年，年利率為 r ，那么按照復(fù)利，他5年內(nèi)每年末得到的本利和分別是a(1+r),a〖(1+r)〗^2,a〖(1+r)〗^3,a〖(1+r)〗^4,a〖(1+r)〗^5 ⑥

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