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第一章极限和连续第一节极限复习考试要求1.了解极限的概念(对极限定义等形式的描述不作要求)。会求函数在一点处的左极限与右极限,了解函数在一点处极限存在的充分必要条件。2.了解极限的有关性质,掌握极限的四则运算法则。3.理解无穷小量、无穷大量的概念,掌握无穷小量的性质、无穷小量与无穷大量的关系。会进行无穷小量阶的比较(高阶、低阶、同阶和等价)。会运用等价无穷小量代换求极限。4.熟练掌握用两个重要极限求极限的方法。 主要知识内容(一)数列的极限1.数列定义按一定顺序排列的无穷多个数称为无穷数列,简称数列,记作xn,数列中每一个数称为数列的项, 第n项xn为数列的一般项或通项,例如(1)1,3,5,(2n-1),(等差数列)(2)(等比数列)(3)(递增数列)(4)1,0,1,0,(震荡数列)都是数列。它们的一般项分别为(2n-1),。对于每一个正整数n,都有一个xn与之对应,所以说数列xn可看作自变量n的函数xn=f(n),它的定义域是全体正整数,当自变量n依次取1,2,3一切正整数时,对应的函数值就排列成数列。在几何上,数列xn可看作数轴上的一个动点,它依次取数轴上的点x1,x2,x3,.xn,。2.数列的极限定义对于数列xn,如果当n时,xn无限地趋于一个确定的常数A,则称当n趋于无穷大时,数列xn以常数A为极限,或称数列收敛于A,记作 比如:无限的趋向0,无限的趋向1否则,对于数列xn,如果当n时,xn不是无限地趋于一个确定的常数,称数列xn没有极限,如果数列没有极限,就称数列是发散的。比如:1,3,5,(2n-1),1,0,1,0,数列极限的几何意义:将常数A及数列的项依次用数轴上的点表示,若数列xn以A为极限,就表示当n趋于无穷大时,点xn可以无限靠近点A,即点xn与点A之间的距离|xn-A|趋于0。比如:无限的趋向0无限的趋向1(二)数列极限的性质与运算法则1.数列极限的性质定理1.1(惟一性)若数列xn收敛,则其极限值必定惟一。定理1.2(有界性)若数列xn收敛,则它必定有界。注意:这个定理反过来不成立,也就是说,有界数列不一定收敛。比如:1,0,1,0,有界:0,12.数列极限的存在准则定理1.3(两面夹准则)若数列xn,yn,zn满足以下条件:(1),(2), 则定理1.4若数列xn单调有界,则它必有极限。3.数列极限的四则运算定理。定理1.5(1)(2)(3)当时,(三)函数极限的概念1.当xx0时函数f(x)的极限(1)当xx0时f(x)的极限定义对于函数y=f(x),如果当x无限地趋于x0时,函数f(x)无限地趋于一个常数A,则称当xx0时,函数f(x)的极限是A,记作或f(x)A(当xx0时)例y=f(x)=2x+1x1,f(x)?x1x1(2)左极限当xx0时f(x)的左极限定义对于函数y=f(x),如果当x从x0的左边无限地趋于x0时,函数f(x)无限地趋于一个常数A,则称当xx0时,函数f(x)的左极限是A,记作或f(x0-0)=A(3)右极限当xx0时,f(x)的右极限定义对于函数y=f(x),如果当x从x0的右边无限地趋于x0时,函数f(x)无限地趋于一个常数A,则称当xx0时,函数f(x)的右极限是A,记作或f(x0+0)=A例子:分段函数,求,解:当x从0的左边无限地趋于0时f(x)无限地趋于一个常数1。我们称当x0时,f(x)的左极限是1,即有当x从0的右边无限地趋于0时,f(x)无限地趋于一个常数-1。我们称当x0时,f(x)的右极限是-1,即有显然,函数的左极限右极限与函数的极限之间有以下关系:定理1.6当xx0时,函数f(x)的极限等于A的必要充分条件是反之,如果左、右极限都等于A,则必有。x1时f(x)?x1x1f(x)2对于函数,当x1时,f(x)的左极限是2,右极限也是2。2.当x时,函数f(x)的极限(1)当x时,函数f(x)的极限y=f(x)xf(x)?y=f(x)=1+xf(x)=1+1定义对于函数y=f(x),如果当x时,f(x)无限地趋于一个常数A,则称当x时,函数f(x)的极限是A,记作或f(x)A(当x时)(2)当x+时,函数f(x)的极限定义对于函数y=f(x),如果当x+时,f(x)无限地趋于一个常数A,则称当x+时,函数f(x)的极限是A,记作这个定义与数列极限的定义基本上一样,数列极限的定义中n+的n是正整数;而在这个定义中,则要明确写出x+,且其中的x不一定是正整数,而为任意实数。y=f(x)x+f(x)x? x+,f(x)=2+2例:函数f(x)=2+e-x,当x+时,f(x)?解:f(x)=2+e-x=2+,x+,f(x)=2+2所以(3)当x-时,函数f(x)的极限定义对于函数y=f(x),如果当x-时,f(x)无限地趋于一个常数A,则称当x-时,f(x)的极限是A,记作x-f(x)?则f(x)=2+(x0)x-,-x+f(x)=2+2例:函数,当x-时,f(x)?解:当x-时,-x+2,即有由上述x,x+,x-时,函数f(x)极限的定义,不难看出:x时f(x)的极限是A充分必要条件是当x+以及x-时,函数f(x)有相同的极限A。例如函数,当x-时,f(x)无限地趋于常数1,当x+时,f(x)也无限地趋于同一个常数1,因此称当x时的极限是1,记作其几何意义如图3所示。f(x)=1+y=arctanx不存在。但是对函数y=arctanx来讲,因为有即虽然当x-时,f(x)的极限存在,当x+时,f(x)的极限也存在,但这两个极限不相同,我们只能说,当x时,y=arctanx的极限不存在。x)=1+y=arctanx不存在。但是对函数y=arctanx来讲,因为有 即虽然当x-时,f(x)的极限存在,当x+时,f(x)的极限也存在,但这两个极限不相同,我们只能说,当x时,y=arctanx的极限不存在。(四)函数极限的定理定理1.7(惟一性定理)如果存在,则极限值必定惟一。定理1.8(两面夹定理)设函数在点的某个邻域内(可除外)满足条件:(1),(2)则有。注意:上述定理1.7及定理1.8对也成立。下面我们给出函数极限的四则运算定理定理1.9如果则(1)(2)(3)当时,时,上述运算法则可推广到有限多个函数的代数和及乘积的情形,有以下推论:(1)(2)(3)用极限的运算法则求极限时,必须注意:这些法则要求每个参与运算的函数的极限存在,且求商的极限时,还要求分母的极限不能为零。另外,上述极限的运算法则对于的情形也都成立。(五)无穷小量和无穷大量1.无穷小量(简称无穷小)定义对于函数,如果自变量x在某个变化过程中,函数的极限为零,则称在该变化过程中,为无穷小量,一般记作常用希腊字母,来表示无穷小量。定理1.10函数以A为极限的必要充分条件是:可表示为A与一个无穷小量之和。注意:(1)无穷小量是变量,它不是表示量的大小,而是表示变量的变化趋势无限趋于为零。(2)要把无穷小量与很小的数严格区分开,一个很小的数,无论它多么小也不是无穷小量。(3)一个变量是否为无穷小量是与自变量的变化趋势紧密相关的。在不同的变化过程中,同一个变量可以有不同的变化趋势,因此结论也不尽相同。例如:振荡型发散 (4)越变越小的变量也不一定是无穷小量,例如当x越变越大时,就越变越小,但它不是无穷小量。(5)无穷小量不是一个常数,但数“0”是无穷小量中惟一的一个数,这是因为。2.无穷大量(简称无穷大)定义;如果当自变量(或)时,的绝对值可以变得充分大(也即无限地增大),则称在该变化过程中,为无穷大量。记作。注意:无穷大()不是一个数值,“”是一个记号,绝不能写成或。3.无穷小量与无穷大量的关系无穷小量与无穷大量之间有一种简单的关系,见以下的定理。定理1.11在同一变化过程中,如果为无穷大量,则为无穷小量;反之,如果为无穷小量,且,则为无穷大量。当无穷大无穷小当为无穷小无穷大4.无穷小量的基本性质性质1有限个无穷小量的代数和仍是无穷小量;性质2有界函数(变量)与无穷小量的乘积是无穷小量;特别地,常量与无穷小量的乘积是无穷小量。性质3有限个无穷小量的乘积是无穷小量。性质4无穷小量除以极限不为零的变量所得的商是无穷小量。5.无穷小量的比较定义设是同一变化过程中的无穷小量,即。(1)如果则称是比较高阶的无穷小量,记作;(2)如果则称与为同阶的无穷小量;(3)如果则称与为等价无穷小量,记为;(4)如果则称是比较低价的无穷小量。当等价无穷小量代换定理:如果当时,均为无穷小量,又有且存在,则。均为无穷小又有这个性质常常使用在极限运算中,它能起到简化运算的作用。但是必须注意:等价无穷小量代换可以在极限的乘除运算中使用。常用的等价无穷小量代换有:当时,sinxx;tanx;arctanxx;arcsinxx;(六)两个重要极限1.重要极限重要极限是指下面的求极限公式令这个公式很重要,应用它可以计算三角函数的型的极限问题。其结构式为:2.重要极限重要极限是指下面的公式: 其中e是个常数(银行家常数),叫自然对数的底,它的值为e=2.718281828495045其结构式为:重要极限是属于型的未定型式,重要极限是属于“”型的未定式时,这两个重要极限在极限计算中起很重要的作用,熟练掌握它们是非常必要的。(七)求极限的方法:1.利用极限的四则运算法则求极限;2.利用两个重要极限求极限;3.利用无穷小量的性质求极限;4.利用函数的连续性求极限;5.利用洛必达法则求未定式的极限;6.利用等价无穷小代换定理求极限。基本极限公式 (2)(3)(4)例1.无穷小量的有关概念(1)9601下列变量在给定变化过程中为无穷小量的是A.B.C.D. 答CA.发散D.(2)0202当时,与x比较是A.高阶的无穷小量B.等价的无穷小量C.非等价的同阶无穷小量D.低阶的无穷小量答B解:当,与x是极限的运算:0611解:答案-1例2.型因式分解约分求极限(1)0208 答解:(2)0621计算答解:例3.型有理化约分求极限(1)0316计算 答解:(2)9516 答解: 例4.当时求型的极限 答 (1)0308一般地,有例5.用重要极限求极限(1)9603下列极限中,成立的是A.B.C.D. 答B(2)0006 答解:例6.用重要极限求极限(1)0416计算 答解析解一:令解二:03060601(2)0118计算 答 解:例7.用函数的连续性求极限0407 答0解:,例8.用等价无穷小代换定理求极限0317 答0解:当例9.求分段函数在分段点处的极限(1)0307设则在的左极限答1解析(2)0406设,则 答1解析例10.求极限的反问题(1)已知则常数解析解法一:,即,得.解法二:令,得,解得.解法三:(洛必达法则)即,得.(2)若求a,b的值.解析型未定式.当时,.令于是,得.即,所以.04020017,则k=_.(答:ln2)解析前面我们讲的内容: 极限的概念;极限的性质;极限的运算法则;两个重要极限;无穷小量、无穷大量的概念;无穷小量的性质以及无穷小量阶的比较。第二节函数的连续性复习考试要求1.理解函数在一点处连续与间断的概念,理解函数在一点处连续与极限存在之间的关系,掌握判断函数(含分段函数)在一点处连续性的方法。2.会求函数的间断点。3.掌握在闭区间上连续函数的性质会用它们证明一些简单命题。4.理解初等函数在其定义区间上的连续性,会利用函数连续性求极限。主要知识内容(一)函数连续的概念1.函数在点x0处连续定义1设函数y=f(x)在点x0的某个邻域内有定义,如果当自变量的改变量x(初值为x0)趋近于0时,相应的函数的改变量y也趋近于0,即则称函数y=f(x)在点x0处连续。函数y=f(x)在点x0连续也可作如下定义:定义2设函数y=f(x)在点x0的某个邻域内有定义,如果当xx0时,函数y=f(x)的极限值存在,且等于x0处的函数值f(x0),即定义3设函数y=f(x),如果,则称函数f(x)在点x0处左连续;如果,则称函数f(x)在点x0处右连续。由上述定义2可知如果函数y=f(x)在点x0处连续,则f(x)在点x0处左连续也右连续。2.函数在区间a,b上连续定义如果函数f(x)在闭区间a,b上的每一点x处都连续,则称f(x)在闭区间a,b上连续,并称f(x)为a,b上的连续函数。这里,f(x)在左端点a连续,是指满足关系:,在右端点b连续,是指满足关系:,即f(x)在左端点a处是右连续,在右端点b处是左连续。可以证明:初等函数在其定义的区间内都连续。3.函数的间断点定义如果函数f(x)在点x0处不连续则称点x0为f(x)一个间断点。由函数在某点连续的定义可知,若f(x)在点x0处有下列三种情况之一:(1)在点x0处,f(x)没有定义;(2)在点x0处,f(x)的极限不存在;(3)虽然在点x0处f(x)有定义,且存在,但,则点x0是f(x)一个间断点。,则f(x)在A.x=0,x=1处都间断B.x=0,x=1处都连续C.x=0处间断,x=1处连续D.x=0处连续,x=1处间断解:x=0处,f(0)=0f(0-0)f(0+0)x=0为f(x)的间断点x=1处,f(1)=1f(1-0)=f(1+0)=f(1)f(x)在x=1处连续 答案C9703设,在x=0处连续,则k等于A.0 B. C. D.2分析:f(0)=k答案B例30209设在x=0处连续,则a=解:f(0)=e0=1f(0)=f(0-0)=f(0+0)a=1 答案1(二)函数在一点处连续的性质由于函数的连续性是通过极限来定义的,因而由极限的运算法则,可以得到下列连续函数的性质。 定理1.12(四则运算)设函数f(x),g(x)在x0处均连续,则(1)f(x)g(x)在x0处连续(2)f(x)g(x)在x0处连续(3)若g(x0)0,则在x0处连续。定理1.13(复合函数的连续性)设函数u=g(x)在x=x0处连续,y=f(u)在u0=g(x0)处连续,则复合函数y=fg(x)在x=x0处连续。在求复合函数的极限时,如果u=g(x),在x0处极限存在,又y=f(u)在对应的处连续,则极限符号可以与函数符号交换。即定理1.14(反函数的连续性)设函数y=f(x)在某区间上连续,且严格单调增加(或严格单调减少),则它的反函数x=f-1(y)也在对应区间上连续,且严格单调增加(或严格单调减少)。(三)闭区间上连续函数的性质在闭区间a,b上连续的函数f(x),有以下几个基本性质,这些性质以后都要用到。定理1.15(有界性定理)如果函数f(x)在闭区间a,b上连续,则f(x)必在a,b上有界。定理1.16(最大值和最小值定理)如果函数f(x)在闭区间a,b上连续,则在这个区间上一定存在最大值和最小值。定理1.17(介值定理)如果函数f(x)在闭区间a,b上连续,且其最大值和最小值分别为M和m,则对于介于m和M之间的任何实数C,在a,b上至少存在一个,使得推论(零点定理)如果函数f(x)在闭区间a,b上连续,且f(a)与f(b)异号,则在a,b内至少存在一个点,使得f()=0(四)初等函数的连续性由函数在一点处连续的定理知,连续函数经过有限次四则运算或复合运算而得的函数在其定义的区间内是连续函数。又由于基本初等函数在其定义区间内是连续的,可以得到下列重要结论。定理1.18初等函数在其定义的区间内连续。利用初等函数连续性的结论可知:如果f(x)是初等函数,且x0是定义区间内的点,则f(x)在x0处连续也就是说,求初等函数在定义区间内某点处的极限值,只要算出函数在该点的函数值即可。04070611 例1.证明三次代数方程x3-5x+1=0在区间(0,1)内至少有一个实根.证:设f(x)=x3-5x+1f(x)在0,1上连续f(0)=1 f(1)=-3由零点定理可知,至少存在一点(0,1)使得f()=0,3-5+1=0即方程在(0,1)内至少有一个实根。本章小结函数、极限与连续是微积分中最基本、最重要的概念之一,而极限运算又是微积分的三大运算中最基本的运算之一,必须熟练掌握,这会为以后的学习打下良好的基础。这一章的内容在考试中约占15%,约为22分左右。现将本章的主要内容总结归纳如下:一、概念部分重点:极限概念,无穷小量与等价无穷小量的概念,连续的概念。极限概念应该明确极限是描述在给定变化过程中函数变化的性态,极限值是一个确定的常数。函数在一点连续性的三个基本要素:(1)f(x)在点x0有定义。(2)存在。(3)。常用的是f(x0-0)=f(x0+0)=f(x0)。二、运算部分重点:求极限,函数的点连续性的判定。1.求函数极限的常用方法主要有:(1)利用极限的四则运算法则求极限;对于“”型不定式,可考虑用因式分解或有理化消去零因子法。(2)利用两个重要极限求极限;(3)利用无穷小量的性质求极限; (4)利用函数的连续性求极限;若f(x)在x0处连续,则。(5)利用等价无穷小代换定理求极限;(6)会求分段函数在分段点处的极限;(7)利用洛必达法则求未定式的极限。2.判定函数的连续性,利用闭区间上连续函数的零点定理证明方程的根的存在性。ag an employment tribunal clai Emloyment tribunals sort out disagreements between employers and employees. You may need to make a claim to an employment tribunal if: you dont agree with the disciplinary action your employer has taken against you your employer dismisses you and you think that you have been dismissed unfairly. For more informu, take advice from one of the organisations listed underFur ther help. Employment tribunals are less formal than some other courts, but it is still a legal process and you will need to give evidence under an oath or affirmation. Most people find making a claim to an employment tribunal challenging. If you are thinking about making a claim to an employment tribunal, you should get help straight away from one of the organisations listed underFurther help. ation about dismissal and unfair dismissal, seeDismissal. You can make a claim to an employment tribunal, even if you haventappealedagainst the disciplinary action your employer has taken against you. However, if you win your case, the tribunal may reduce any compensation awarded to you as a result of your failure to appeal. Remember that in most cases you must make an application to an employment tribunal within three months of the date when the event you are complaining about happened. If your application is received after this time limit, the tribunal will not usually accept i. If you are worried about how the time limits apply to you If you are being represented by a solicitor at the tribunal, they may ask you to sign an agreement where you pay their fee out of your compensation if you win the case. This is known as adamages-based agreement. In England and Wales, your solicitor cant charge you more than 35% of your compensationif you win the case. You are clear about the terms of the agreement. It might be best to get advice from an experienced adviser, for example, at a Citizens Advice Bureau. To find your nearest CAB, including those that give advice by e-mail, click onnearest CAB. For more information about making a claim to an employment tribunal, seeEmployment tribunals. The (lack of) air up there Watch m Cay man Islands-based Webb, the head of Fifas anti-racism taskforce, is in London for the Football Associations 150th anniversary celebrations and will attend Citys Premier League match at Chelsea on Sunday. I am going to be at the match tomorrow and I have asked to meet Ya ya Toure, he told BBC Sport. For me its about how he felt and I would like to speak to him first to find out what his experience was. Uefa hasopened disciplinary proceedings against CSKAfor the racist behaviour of their fans duringCitys 2-1 win. Michel Platini, president of European footballs governing body, has also ordered an immediate investigation into the referees actions. CSKA said they were surprised and disappointed by Toures complaint. In a statement the Russian side added: We found no racist insults from fans of CSKA. Age has reached the end of the beginning of a word. May be guilty in his seems to passing a lot of different life became the appearance of the same day; May be back in the past, to oneself the paranoid weird belief disillusionment, these days, my mind has been very messy, in my mind constantly. Always feel oneself should go to do something, or write something. Twenty years of life trajectory deeply shallow, suddenly feel something, do it.一字开头的年龄已经到了尾声。或许是愧疚于自己似乎把转瞬即逝的很多个不同的日子过成了同一天的样子;或许是追溯过去,对自己那些近乎偏执的怪异信念的醒悟,这些天以来,思绪一直很凌乱,在脑海中不断纠缠。总觉得自己似乎应该去做点什么,或者写点什么。二十年的人生轨迹深深浅浅,突然就感觉到有些事情,非做不可了。The end of our life, and can meet many things really do?而穷尽我们的一生,又能遇到多少事情是真正地非做不可? During my childhood, think lucky money and new clothes are necessary for New Year, but as the advance of the age, will be more and more found that those things are optional; Junior high school, thought to have a crush on just means that the real growth, but over the past three years later, his writing of alumni in peace, suddenly found that isnt really grow up, it seems is not so important; Then in high school, think dont want to give vent to out your inner voice can be in the high school children of the feelings in a period, but was eventually infarction when graduation party in the throat, later again stood on the pitch he has sweat profusely, looked at his thrown a basketball hoops, suddenly found himself has already cant remember his appearance. Baumgartner the disappointing news: Mission aborted. r plays an important role in this mission. Starting at the ground, conditions have to be very calm - winds less than 2 mph, with no precipitation or humidity and limited cloud cover. The balloon, with capsule attached, will move through the lower level of the atmosphere (the troposphere) where our day-to-day weather lives. It will climb higher than the tip of Mount Everest (5.5 miles/8.85 kilometers), drifting even higher than the cruising altitude of commercial airliners (5.6 miles/9.17 kilometers) and into the stratosphere. As he crosses the boundary layer (called the tropopause),e can expect a lot of turbulence. We often close ourselves off when traumatic events happen in our lives; instead of letting the world soften us, we let it drive us deeper into ourselves. We try to deflect the hurt and pain by pretending it doesnt exist, but although we can try this all we want, in the end, we cant hide from ourselves. We need to learn to open our hearts to the potentials of life and let the world soften us.生活发生不幸时,我们常常会关上心门;世界不仅没能慰藉我们,反倒使我们更加消沉。我们假装一切仿佛都不曾发生,以此试图忘却伤痛,可就算隐藏得再好,最终也还是骗不了自己。既然如此,何不尝试打开心门,拥抱生活中的各种可能,让世界感化我们呢? Whenever we start to let our fears and seriousness get the best of us, we should take a step back and re-evaluate our behavior. The items listed below are six ways you can open your heart more fully and completely.当恐惧与焦虑来袭时,我们应该退后一步,重新反思自己的言行。下面六个方法有助于你更完满透彻地敞开心扉。Whenever a painful situation arises in your life, try to embrace it instead of running away or trying to mask the hurt. When the sadness strikes, take a deep breath and lean into it. When we run away from sadness thats unfolding in our lives, it gets stronger and more real. We take an emotion thats fleeting and make it a solid event, instead of something that passes through us.当生活中出现痛苦的事情时,别再逃跑或隐藏痛苦,试着拥抱它吧;当悲伤来袭时,试着深呼吸,然后直面它。如果我们一味逃避生活中的悲伤,悲伤只会变得更强烈更真实悲伤原本只是稍纵即逝的情绪,我们却固执地耿耿于怀By utilizing our breath we soften our experiences. If we dam them up, our lives will stagnate, but when we keep them flowing, we allow more newness and greater experiences to blossom.深呼吸能减缓我们的感受。屏住呼吸,生活停滞;呼出呼吸,更多新奇与经历又将拉开序幕。
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