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1��、第三章一元函數(shù)的導(dǎo)數(shù)和微分【字體:大 中 小】【打印】 3.1導(dǎo)數(shù)概念 一�、問(wèn)題的提出1.切線問(wèn)題割線的極限位置切線位置如圖��,如果割線MN繞點(diǎn)M旋轉(zhuǎn)而趨向極限位置MT����,直線MT就稱(chēng)為曲線C在點(diǎn)M處的切線.極限位置即切線MT的斜率為2.自由落體運(yùn)動(dòng)的瞬時(shí)速度問(wèn)題二、導(dǎo)數(shù)的定義設(shè)函數(shù)y=f(x)在點(diǎn)的某個(gè)鄰域內(nèi)有定義��,當(dāng)自變量x在處取得增量x(點(diǎn)仍在該鄰域內(nèi))時(shí)�����,相應(yīng)地函數(shù)y取得增量;如果y與x之比當(dāng)x0時(shí)的極限存在���,則稱(chēng)函數(shù)y=f(x)在點(diǎn)處可導(dǎo)�����,并稱(chēng)這個(gè)極限為函數(shù)y=f(x)在點(diǎn)處的導(dǎo)數(shù)��,記為即其它形式關(guān)于導(dǎo)數(shù)的說(shuō)明:在點(diǎn)處的導(dǎo)數(shù)是因變量在點(diǎn)處的變化率�,它反映了因變量隨自變量的變化而變化的快慢
2��、程度�。如果函數(shù)y=f(x)在開(kāi)區(qū)間I內(nèi)的每點(diǎn)處都可導(dǎo),就稱(chēng)函數(shù)f(x)在開(kāi)區(qū)間I內(nèi)可導(dǎo)�����。對(duì)于任一���,都對(duì)應(yīng)著f(x)的一個(gè)確定的導(dǎo)數(shù)值��,這個(gè)函數(shù)叫做原來(lái)函數(shù)f(x)的導(dǎo)函數(shù)���,記作注意:2.導(dǎo)函數(shù)(瞬時(shí)變化率)是函數(shù)平均變化率的逼近函數(shù).導(dǎo)數(shù)定義例題:例1�����、115頁(yè)8設(shè)函數(shù)f(x)在點(diǎn)x=a可導(dǎo)�����,求:(1)【答疑編號(hào)11030101:針對(duì)該題提問(wèn)】(2)【答疑編號(hào)11030102:針對(duì)該題提問(wèn)】三���、單側(cè)導(dǎo)數(shù)1.左導(dǎo)數(shù):2.右導(dǎo)數(shù):函數(shù)f(x)在點(diǎn)處可導(dǎo)左導(dǎo)數(shù)和右導(dǎo)數(shù)都存在且相等.例2��、討論函數(shù)f(x)=|x|在x=0處的可導(dǎo)性��?��!敬鹨删幪?hào)11030103:針對(duì)該題提問(wèn)】解閉區(qū)間上可導(dǎo)的定義:如果f
3����、(x)在開(kāi)區(qū)間(a�����,b)內(nèi)可導(dǎo),且及都存在����,就說(shuō)f(x)在閉區(qū)間a,b上可導(dǎo).由定義求導(dǎo)數(shù)步驟:例3�、求函數(shù)f(x)=C(C為常數(shù))的導(dǎo)數(shù)?����!敬鹨删幪?hào)11030104:針對(duì)該題提問(wèn)】解例4��、設(shè)函數(shù)【答疑編號(hào)11030105:針對(duì)該題提問(wèn)】解同理可以得到例5���、求例6�、求函數(shù)的導(dǎo)數(shù)��?�!敬鹨删幪?hào)11030106:針對(duì)該題提問(wèn)】解例7�、求函數(shù)的導(dǎo)數(shù)?!敬鹨删幪?hào)11030107:針對(duì)該題提問(wèn)】解 四、常數(shù)和基本初等函數(shù)的導(dǎo)數(shù)公式 五、導(dǎo)數(shù)的幾何意義表示曲線y=f(x)在點(diǎn)處的切線的斜率��,即 切線方程為法線方程為例8���、求雙曲線處的切線的斜率�����,并寫(xiě)出在該點(diǎn)處的切線方程和法線方程�?�!敬鹨删幪?hào)11030108:
4�、針對(duì)該題提問(wèn)】解由導(dǎo)數(shù)的幾何意義, 得切線斜率為所求切線方程為法線方程為六、可導(dǎo)與連續(xù)的關(guān)系1.定理 凡可導(dǎo)函數(shù)都是連續(xù)函數(shù).注意:該定理的逆定理不成立�����,即:連續(xù)函數(shù)不一定可導(dǎo)���。我們有:不連續(xù)一定不可導(dǎo)極限存在、連續(xù)����、可導(dǎo)之間的關(guān)系。2.連續(xù)函數(shù)不存在導(dǎo)數(shù)舉例例9、討論函數(shù)在x=0處的連續(xù)性與可導(dǎo)性�����?��!敬鹨删幪?hào)11030109:針對(duì)該題提問(wèn)】解:例10�、 P115第10題設(shè)��,在什么條件下可使f(x)在點(diǎn)x=0處����。(1)連續(xù);(2)可導(dǎo)��?�!敬鹨删幪?hào)11030110:針對(duì)該題提問(wèn)】解:(1)(2)七��、小結(jié)1.導(dǎo)數(shù)的實(shí)質(zhì):增量比的極限�;2.導(dǎo)數(shù)的幾何意義:切線的斜率;3.函數(shù)可導(dǎo)一定連續(xù)���,但連續(xù)不一
5�����、定可導(dǎo)�;4.5.求導(dǎo)數(shù)最基本的方法:由定義求導(dǎo)數(shù).6.判斷可導(dǎo)性3.2求導(dǎo)法則 3.3基本求導(dǎo)公式 一、和���、差�、積�、商的求導(dǎo)法則1.定理:如果函數(shù)在點(diǎn)x處可導(dǎo),則它們的和����、差、積�、商(分母不為零)在點(diǎn)x處也可導(dǎo),并且推論2.例題分析例1���、求的導(dǎo)數(shù)�?!敬鹨删幪?hào)11030201:針對(duì)該題提問(wèn)】解例2���、求的導(dǎo)數(shù)�����?!敬鹨删幪?hào)11030202:針對(duì)該題提問(wèn)】解例3、求y=tanx的導(dǎo)數(shù)����。【答疑編號(hào)11030203:針對(duì)該題提問(wèn)】解同理可得例4��、求y=secx的導(dǎo)數(shù)�。【答疑編號(hào)11030204:針對(duì)該題提問(wèn)】解同理可得例5��、131頁(yè)例2設(shè)���,求.【答疑編號(hào)11030205:針對(duì)該題提問(wèn)】二���、反函數(shù)的導(dǎo)數(shù)1.
6、定理:如果函數(shù)在某區(qū)間內(nèi)單調(diào)���、可導(dǎo)且��,那么它的反函數(shù)在對(duì)應(yīng)區(qū)間內(nèi)也可導(dǎo)�����,且有即反函數(shù)的導(dǎo)數(shù)等于直接函數(shù)導(dǎo)數(shù)的倒數(shù).2.例題分析例6����、求函數(shù)y=arcsinx的導(dǎo)數(shù)【答疑編號(hào)11030206:針對(duì)該題提問(wèn)】解同理可得例7、求函數(shù)的導(dǎo)數(shù)�。【答疑編號(hào)11030207:針對(duì)該題提問(wèn)】解特別地三���、小結(jié):初等函數(shù)的求導(dǎo)問(wèn)題1.常數(shù)和基本初等函數(shù)的導(dǎo)數(shù)公式2.函數(shù)的和�����、差�、積�����、商的求導(dǎo)法則設(shè)u=u(x)����,v=v(x)可導(dǎo),則例8��、127頁(yè)1題(6)(14)(15)(1)1題(6)小題【答疑編號(hào)11030208:針對(duì)該題提問(wèn)】解:(2)1題(14)小題【答疑編號(hào)11030209:針對(duì)該題提問(wèn)】解:(3)1題(
7�����、15)小題【答疑編號(hào)11030210:針對(duì)該題提問(wèn)】解:例9�����、115頁(yè)3若一直線運(yùn)動(dòng)的運(yùn)動(dòng)方程為�����,求在t=3時(shí)運(yùn)動(dòng)的瞬時(shí)速度�����?�!敬鹨删幪?hào)11030211:針對(duì)該題提問(wèn)】解:例10���、115頁(yè)5求曲線的與直線y=5x的平行的切線���。【答疑編號(hào)11030212:針對(duì)該題提問(wèn)】另一條求出來(lái)是四���、分段函數(shù)的求導(dǎo)問(wèn)題1.114頁(yè)定理:設(shè)(1)如果函數(shù)在上連續(xù)����,在上可導(dǎo),且當(dāng)時(shí)����,則(2)如果函數(shù)在上連續(xù),在上可導(dǎo)�����,且當(dāng)時(shí)�,則2.分段函數(shù)的求導(dǎo)問(wèn)題舉例例11、 116頁(yè)11 求下列分段函數(shù)f(x)的:(1)【答疑編號(hào)11030213:針對(duì)該題提問(wèn)】解:五��、復(fù)合函數(shù)的求導(dǎo)法則1.復(fù)合函數(shù)的求導(dǎo)法則定理如果函數(shù)在點(diǎn)
8�����、x0可導(dǎo)�����,而y=f(u)在點(diǎn)可導(dǎo),則復(fù)合函數(shù)在點(diǎn)x0可導(dǎo)�,且其導(dǎo)數(shù)為即 因變量對(duì)自變量求導(dǎo),等于因變量對(duì)中間變量求導(dǎo)��,乘以中間變量對(duì)自變量求導(dǎo)�。(鏈?zhǔn)椒▌t)推廣設(shè)�����,則復(fù)合函數(shù)的導(dǎo)數(shù)為2.例題分析例1.求函數(shù)y=lnsinx的導(dǎo)數(shù)���?!敬鹨删幪?hào)11030301:針對(duì)該題提問(wèn)】解y=lnu����,u=sinx.例2.已知y=(2x2-3x+5)100,求��?���!敬鹨删幪?hào)11030302:針對(duì)該題提問(wèn)】例3.求y=sin5x的導(dǎo)數(shù)【答疑編號(hào)11030303:針對(duì)該題提問(wèn)】例4.求函數(shù)的導(dǎo)數(shù)【答疑編號(hào)11030304:針對(duì)該題提問(wèn)】解 例5.(教材133頁(yè)習(xí)題3.3,1題(2)小題)求的導(dǎo)數(shù)【答疑編號(hào)110303
9�、05:針對(duì)該題提問(wèn)】例6.求的導(dǎo)數(shù)【答疑編號(hào)11030306:針對(duì)該題提問(wèn)】例7.求的導(dǎo)數(shù)(a0)【答疑編號(hào)11030307:針對(duì)該題提問(wèn)】例8.求函數(shù)的導(dǎo)數(shù)【答疑編號(hào)11030308:針對(duì)該題提問(wèn)】解例9.(教材128頁(yè)習(xí)題3.2,3題(5)小題)求的導(dǎo)數(shù)【答疑編號(hào)11030309:針對(duì)該題提問(wèn)】例10.(教材128頁(yè)習(xí)題3.2,3題(7)小題)求y=(sinnx)(cosnx)的導(dǎo)數(shù)【答疑編號(hào)11030310:針對(duì)該題提問(wèn)】例11.求的導(dǎo)數(shù)【答疑編號(hào)11030311:針對(duì)該題提問(wèn)】例12.求的導(dǎo)數(shù)【答疑編號(hào)11030312:針對(duì)該題提問(wèn)】例13.求的導(dǎo)數(shù)【答疑編號(hào)11030313:針對(duì)該題
10�����、提問(wèn)】例14.求的導(dǎo)數(shù)【答疑編號(hào)11030314:針對(duì)該題提問(wèn)】例15.(教材習(xí)題3.2�,8題)已知在點(diǎn)x1可導(dǎo),求a���,b���。【答疑編號(hào)11030315:針對(duì)該題提問(wèn)】?jī)缰负瘮?shù)�、抽象的復(fù)合函數(shù)的求導(dǎo)例題一、冪指函數(shù)求導(dǎo)例1: xx【答疑編號(hào)11030401:針對(duì)該題提問(wèn)】例2: y=(sinx)cosx求y【答疑編號(hào)11030402:針對(duì)該題提問(wèn)】二���、抽象的復(fù)合函數(shù)求導(dǎo)例3:設(shè)f(u)可導(dǎo)����,求下列函數(shù)的導(dǎo)數(shù)(1)f(lnx)+lnf(x)【答疑編號(hào)11030403:針對(duì)該題提問(wèn)】解:(2)y=f(e-x) 【答疑編號(hào)11030404:針對(duì)該題提問(wèn)】解:(3)y= ef(x)【答疑編號(hào)110304
11����、05:針對(duì)該題提問(wèn)】(4)【答疑編號(hào)11030406:針對(duì)該題提問(wèn)】(5)【答疑編號(hào)11030407:針對(duì)該題提問(wèn)】3.4高階導(dǎo)數(shù) 一、高階導(dǎo)數(shù)的定義問(wèn)題:變速直線運(yùn)動(dòng)的加速度����。設(shè)s=f(t)�,則瞬時(shí)速度為v(t)=f(t)加速度是速度v對(duì)時(shí)間t的變化率a(t)=v(t)=f(t)定義如果函數(shù)f(x)的導(dǎo)數(shù)f(x)在點(diǎn)x處可導(dǎo)��,即存在�,則稱(chēng)(f(x)為在點(diǎn)x處的二階導(dǎo)數(shù)。記作�����。二階導(dǎo)數(shù)的導(dǎo)數(shù)稱(chēng)為三階導(dǎo)數(shù),�。三階導(dǎo)數(shù)的導(dǎo)數(shù)稱(chēng)為四階導(dǎo)數(shù),�。例4:y=3x2+sinx【答疑編號(hào)11030408:針對(duì)該題提問(wèn)】一般地,函數(shù)f(x)的n-1階導(dǎo)數(shù)的導(dǎo)數(shù)稱(chēng)為函數(shù)f(x)的n階導(dǎo)數(shù)�,記作相應(yīng)地,f(x)稱(chēng)為
12���、零階導(dǎo)數(shù)�����;f(x)稱(chēng)為一階導(dǎo)數(shù)�。例5:求下列函數(shù)的二階導(dǎo)數(shù):(1)y=ax+b【答疑編號(hào)11030409:針對(duì)該題提問(wèn)】(2)y=cos nx�;【答疑編號(hào)11030410:針對(duì)該題提問(wèn)】(3)y=esinx【答疑編號(hào)11030411:針對(duì)該題提問(wèn)】二��、對(duì)于某些特殊的導(dǎo)數(shù)的高階導(dǎo)數(shù)是有規(guī)律的����。例6:求下列函數(shù)的n階導(dǎo)數(shù)(1)y=ex【答疑編號(hào)11030412:針對(duì)該題提問(wèn)】(2)y=x5【答疑編號(hào)11030413:針對(duì)該題提問(wèn)】例7:設(shè)y=x求y(n)解:用數(shù)學(xué)歸納法可以證明:特別��,當(dāng)=n時(shí)���,即y=xn��,其n階導(dǎo)數(shù)y(n)= (x n)(n)=n!【答疑編號(hào)11030414:針對(duì)該題提問(wèn)】例8:
13�����、【答疑編號(hào)11030415:針對(duì)該題提問(wèn)】例9:設(shè)y=(x2+1)10(x9+x3+1)���,求y(30)【答疑編號(hào)11030416:針對(duì)該題提問(wèn)】例10:設(shè)y=sinx,求y(n)��?!敬鹨删幪?hào)11030417:針對(duì)該題提問(wèn)】解同理可得注意:求n階導(dǎo)數(shù)時(shí),求出13或4階后,不要急于合并,分析結(jié)果的規(guī)律性,寫(xiě)出n階導(dǎo)數(shù).(數(shù)學(xué)歸納法證明)例11:設(shè)f(x)的n-2階導(dǎo)數(shù),求f(n)(x)�。【答疑編號(hào)11030418:針對(duì)該題提問(wèn)】3.5函數(shù)的微分 問(wèn)題的提出實(shí)例:正方形金屬薄片受熱后面積的改變量.設(shè)邊長(zhǎng)由x0變到x0+x����,正方形面積是x的線性函數(shù)且為A的主要部分����,是x的高階無(wú)窮小��,當(dāng)|x|很小時(shí)可忽
14�����、略���。微分的定義定義:設(shè)函數(shù)y=f(x)在某區(qū)間內(nèi)有定義���,x0及x0+x在這區(qū)間內(nèi)�����,如果成立(其中A是與x無(wú)關(guān)的常數(shù))�����,則稱(chēng)函數(shù)y=f(x)在點(diǎn)x0可微�����,并且稱(chēng)Ax為函數(shù)y=f(x)在點(diǎn)x0相應(yīng)于自變量增量x的微分,記作微分dy叫做函數(shù)增量y的線性主部�����。(微分的實(shí)質(zhì))可微的條件定理:函數(shù)f(x)在點(diǎn)x0可微的充要條件是函數(shù)f(x)在點(diǎn)x0處可導(dǎo)�����,且通常把自變量x的增量x稱(chēng)為自變量的微分���,記作dx����,即dx=x即函數(shù)的微分dy與自變量的微分dx之商等于該函數(shù)的導(dǎo)數(shù)����,導(dǎo)數(shù)也叫“微商”。微分的幾何意義幾何意義:(如圖)當(dāng)y是曲線的縱坐標(biāo)增量時(shí)����,dy就是切線縱坐標(biāo)對(duì)應(yīng)的增量,當(dāng)|x |很小時(shí)���,在點(diǎn)M的附近
15�����、�,切線段MP可近似代替曲線段MN。微分的求法求法: 計(jì)算函數(shù)的導(dǎo)數(shù), 乘以自變量的微分�。1.基本初等函數(shù)的微分公式 2.函數(shù)和、差���、積��、商的微分法則例1:設(shè)��,求dy����?����!敬鹨删幪?hào)11030501:針對(duì)該題提問(wèn)】例2:���,求dy����?��!敬鹨删幪?hào)11030502:針對(duì)該題提問(wèn)】例3:��,求dy��?�!敬鹨删幪?hào)11030503:針對(duì)該題提問(wèn)】微分形式的不變性設(shè)函數(shù)y=f(x)有導(dǎo)數(shù)f(x)(1)若x是自變量時(shí)�,dy= f(x)dx(2)若x是中間變量時(shí)���,同樣有結(jié)論:無(wú)論x是自變量還是中間變量�����,函數(shù)y=f(x)的微分形式總是��,這就是微分形式的不變性例4:設(shè)y=sin(2x+1)���,求dy。【答疑編號(hào)11030504:
16��、針對(duì)該題提問(wèn)】解法一:解法二:y=sinu,u=2x+1dy=cosudu=cos(2x+1)d(2x+1)=cos(2x+1)2dx=2cos(2x+1)dx例5(P144�����、例6(1):設(shè)函數(shù)f(u)可微�����,求函數(shù)y=f(lnx)的微分:【答疑編號(hào)11030505:針對(duì)該題提問(wèn)】解:例6:求【答疑編號(hào)11030506:針對(duì)該題提問(wèn)】例7(P144����、例7):求【答疑編號(hào)11030507:針對(duì)該題提問(wèn)】利用微分計(jì)算函數(shù)的近似值求f(x)在點(diǎn)x=x0附近的近似值;例8:計(jì)算的近似值�����?!敬鹨删幪?hào)11030508:針對(duì)該題提問(wèn)】解:3.6導(dǎo)數(shù)和微分在經(jīng)濟(jì)學(xué)中的簡(jiǎn)單應(yīng)用,由于知識(shí)體系的關(guān)聯(lián)性����,我們把本節(jié)放到第四章后面講。
高數(shù)第三章一元函數(shù)的導(dǎo)數(shù)和微分
