习题解答 5(高阶导数---微分(43~54页))
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C . a =—2 , b =1D . a = 2 , b = —1第二章导数与微分(A)1. 设函数y = f (x ),当自变量x 由x o 改变到Xo +A X 时,相应函数的改变量A. f (x 0+A x )B. )+i xC. f (x 0+A x )—)D. f(x 0 2 .设 f (x 准 X 0 处可,则匹 f (X0-")—f (X0)=()A. — f '(x0)B. f '(—X0)C. f '(x0)D. 2f '(X0) 3.函数f (x 在点x 0连续,是f (x )在点x 0可导的( )5.若函数f(x )在点a 连续,则f(x )在点a ( )A.左导数存在;B.右导数存在; C .左右导数都存在 D .有定义 6.f (x )=x -2|在点x=2处的导数是() A . 1 B . 0 C . -1 D .不存在7.曲线y =2x 3 -5x 2+4x -5在点(2,-1 )处切线斜率等于( )A. 8B. 12C. -6D. 6 &设y=e 逹且f(x 厂阶可导,则/=() B . e f*)f “(X ) C . e f (X f (x )r(x » D . e f (XX f (x 护 +f “(x 9B . a =1, b = 2A .必要不充分条件 B. 充分不必要条件C.充分必要条件4.设函数y = f(u 是可导的,且UA . f '(X 2 )B . xf T x 2 )C . 既不充分也不必要条件 =x 2,则 ¥=()dx2xf T x 2 ) D . X 2 f (X 2 )A . e f(x9.若f (x )才axe ,b +sin2x, X <0X >0在x=0处可导,则a , b 的值应为( )10. 若函数f(x )在点X o 处有导数,而函数 g(x )在点X o 处没有导数,则 F(x )= f (x )+g (x ), G(x )= f (X )—g(x )在 x 处( )11. 函数f (x )与g (x )在x o 处都没有 导数,贝U F (x )= f (x )+g (x ), G(x )= f (X )—g(x 在 X o 处( )12.已知 F (x )=f [g (x )],在 x = x o 处可导,则()113. y = arctg ,则 y'=()Xf (a +hf (a )——h ——=() hA. 乎 B .3 C. 2f® D . —f®15.设f (x )在(a, b 内连续,且X o 巳a, b ),则在点x o 处( )A. f (x )的极限存在,且可导B. f (x )的极限存在,但不一定可导16.设f (x )在点x = a 处可导,则『八3h L设函数y = y (x )由方程xy-eX +e y=0所确定,则y'(0) =A .一定都没有导数 B •—定都有导数 C.恰有一个有导数D.至少一个有导数A .一定都没有导数 B. —定都有导数 C.至少一个有导数D .至多一个有导数A. f(x ), g(x 都必须可导B. f (x )必须可导C. g(x )必须可导D. f (X )和g(x )都不一定可导 B.1 1+x 2C.2X1 +x 22X 1 +14.设f(x )在点x = a 处为二阶可导,则 lh m o C. f(x )的极限不存在D . f(x )的极限不一定存在17. 函数y = X +1导数不存在的点 18.设函数 f (x )=sin 〔2x +巴〕 I 2丿19.若函数 y=eX(cosx+sinx ),贝U dy = 若 f (x )可导,y = f {f 【f (x W ,则―25.讨论下列函数在x=0处的连续性与可导性: -1 Cxsin- , X H 0 x0, X =0设 y = f (g x e f (X )且 f '(X )存在,求 dy 。
第二章 导数与微分练习题及习题详细解答练习题2.11.已知质点作直线运动的方程为23s t =+,求该质点在5t =时的瞬时速度.解 由引例2.1可知,质点在任意时刻的瞬时速度d 2d sv t t==.代入5t =,得10v =. 2.求曲线cos y x =在点π(6处的切线方程和法线方程. 解 由导数的几何意义知,曲线cos y x =在π(6点切线的斜率 ππ661(cos )(sin )2x x k x x =='==-=-,所以,切线方程为1π()226y x -=--,即612π=0x y +-.法线方程为π2()6y x =-,即1262π=0x y -+. 3.讨论函数32,0()31,013,1x f x x x x x ⎧≤⎪=+<≤⎨⎪+>⎩在0x =和1=x 处的连续性与可导性.解 在0x =处,0lim ()lim 22x x f x --→→==,0lim ()lim (31)1x x f x x ++→→=+=, 由于0lim ()lim ()x x f x f x -+→→≠,所以不连续,根据可导与连续的关系知,也不可导. 在1x =处,11lim ()lim(31)4x x f x x --→→=+=,311lim ()lim(3)4x x f x x ++→→=+=,(1)4f =, 所以连续.又00(1)(1)3(1)lim lim 3x x f x f xf x x---∆→∆→+∆-∆'===∆∆, 2300(1)(1)33()()(1)lim lim 3x x f x f x x x f x x+++∆→∆→+∆-∆+∆+∆'===∆∆,所以可导.4.已知函数()f x 在点0x 处可导,且0()f x A '=,求下列极限:000(5)()(1)limx f x x f x x ∆→-∆-∆; 000(2)()(2)lim h f x h f x h →+-解 (1)000000(5)()(5)()55()55limlim x x f x x f x f x x f x f x A x x ∆→∆→-∆--∆-'=-=-=-∆-∆;(2)000000(2)()(2)()22()22limlim h h f x h f x f x h f x f x A h h →→+-+-'===.5.求抛物线2y x =上平行于直线43y x =-+的切线方程.解 由于切线平行于43y x =-+,所以斜率为4k =-.又2k y x '==,所以2x =-.对应于抛物线上的点为(2,4)-,所以切线方程为44(2)y x -=-+,即440x y ++=.练习题2.21.求下列函数的导数:(1)100(21)y x =-; (2)22e xxy +=;(3)sin(3π)y x =+; (4)2cos y x =; (5)2e sin x y x =; (6)2ln(1)y x =+; (7)tan 2y x =; (8)cot 3y x =; (9)arctan(31)y x =+; (10)arcsin(41)y x =+. 解 (1)9999100(21)(21)200(21)y x x x ''=--=-; (2)22222e (2)e (41)xxxxy x x x ++''=+=+;(3)cos(3π)(3π)3cos(3π)y x x x ''=+⋅+=+; (4)2cos (cos )2sin cos sin 2y x x x x x ''=⋅=-=-;(5)22222(e )sin e (sin )2e sin e cos e (2sin cos )xxxxxy x x x x x x '''=+=+=+; (6)22212(1)11x y x x x''=⋅+=++; (7)22sec 2(2)2sec 2y x x x ''=⋅=; (8)22csc 3(3)3csc 3y x x x ''=-⋅=-;(9)2213(31)1(31)1(31)y x x x ''=⋅+=++++;(10)(41)y x ''=+=2.设y =d d y x .解对于y =[]1ln ln(1)ln(2)ln(3)ln(4)3y x x x x =+++-+-+ 两边对x 求导,得111111()31234y y x x x x '=+--++++ 所以1111()1234y x x x x '=+--++++ 3.求曲线31x ty t =+⎧⎨=⎩上,点(1,0)处的切线方程. 解 点(1,0)对应参数t 的值为0. 设k 为曲线上对应(1,0)点的切线斜率,则32000d ()30d (1)1t t t y t t k x t ==='===='+,于是,所求切线方程为0y =,即x 轴.4.求由方程3330y x xy --=所确定的隐函数的导数d d y x. 解 方程两边对x 求导,可得22333()0y y x y xy ''--+=由上式解出y ',便得隐函数的导数为22x yy y x+'=-(20y x -≠). 练习题2.31.求下列函数的微分:(1)22sin 34y x x x =+-+; (2)2ln y x x x =-; (3)2(arccos )1y x =-; (4)arctan y x x =; (5)ln tan 2x y =; (6)sin ln 57xy x x x x=++-; (7)1cos 2xy -=; (8)3(e e )x x y -=+.解 (1)22d (sin 34)d (2sin 23)d y x x x x x x x '=+-+=+-; (2)2d (ln )d (ln 12)d y x x x x x x x '=-=+-; (3)2d ((arccos )1)d y x x x '=-=;(4)2d (arctan )d (arctan )d 1xy x x x x x x '==++; (5)2111d (ln tan )d sec d d csc d 222sin tan 2x x y x x x x x x x '==⋅⋅==;(6)2sin cos sin d (ln 57)d (ln 6)d x x x xy x x x x x x x x-'=++-=++; (7)11cos cos d (2)d 2ln 2sec tan d xxy x x x x --'==-⋅;(8)32d (e e )d 3(e e )(e e )d x x x x x xy x x ---'⎡⎤=+=+-⎣⎦. 2.填空. (1)23d d()x x =(2)21d d()1x x =+ (3)2cos2d d()x x = (4)21d d()x x= 解 (1)3x C +; (2)arctan x C +; (3)sin 2x C +; (4)1C x-+. 3解=()f x =064x =,1x ∆=.因为000()()()f x x f x f x x '+∆≈+∆,()f x ''==所以1188.062516=≈=+=.4.半径为10m 的圆盘,当半径改变1cm 时,其面积大约改变多少?解 圆盘面积函数为2S πR =,并取0R 10m =,R 1cm 0.01m ∆==.因为 S 2πR '= 所以面积改变量2S dS 2πR R 2π100.010.2π0.628m ∆≈=⋅∆=⨯⨯=≈.习题二1.如果函数()f x 在点0x 可导,求:(1)000()()limh f x h f x h →--; (2)000()()lim h f x h f x h hαβ→+--.解 (1)0000000()()()()limlim ()h h f x h f x f x h f x f x h h →-→----'=-=--; (2)00000000()()()()()()lim lim h h f x h f x h f x h f x f x f x h h hαβαβ→→+--+-+--=0000000()()()()limlim ()()h h f x h f x f x h f x f x h hαβαβαβαβ→→+---'=+=+-2.求函数3y x =在点(2,8)处的切线方程和法线方程. 解 由导数的几何意义,得3222()312x x k x x =='===切,112k =-法. 所以,切线方程为812(2)y x -=-即12160x y --=.法线方程为18(2)12y x -=--即12980x y +-=.3.设2, 1(), 1x x f x ax b x ⎧≤=⎨+>⎩,试确定,a b 的值,使()f x 在1x =处可导.解 若()f x 在1x =处可导,则必在1x =处连续.1lim ()1x f x -→=,1lim ()x f x a b +→=+, 11lim ()lim ()x x f x f x -+→→=,即1a b +=. 又2111()(1)1(1)limlim lim(1)211x x x f x f x f x x x ----→→→--'===+=--, 111()(1)1(1)(1)lim lim lim 111x x x f x f ax b a x f a x x x ++-+→→→-+--'====--- 所以 2a =,1b =-. 4.求下列各函数的导数:(1)231251y x x x =-++; (2)2sin y x x =; (3)1cos y x x =+; (4)1ln 1ln xy x-=+.解 (1)23413(251)45y x x x x x''=-++=++;(2)22(sin )2sin cos y x x x x x x ''==+; (3)221(cos )sin 1()cos (cos )(cos )x x x y x x x x x x '+-''==-=+++;(4)21ln (1ln )(1ln )(1ln )(1ln )()1ln (1ln )x x x x x y x x ''--+--+''==++ 2211(1ln )(1ln )2(1ln )(1ln )x x x x x x x -+--==-++ . 5.求下列函数的导数:(1)36()y x x =-; (2)y =;(3)2sin (21)y x =-; (4)21sin y x x=; (5)ln1xy x=-; (6)[]ln ln(ln )y x =; (7)ln(y x =; (8)arcsin 2x y x =+解 (1)3533526()()6()(31)y x x x x x x x ''=--=--;(2)322(1)y x -'==-; (3)2sin(21)cos(21)(21)2sin(42)y x x x x ''=-⋅-⋅-=-; (4)22221111111()sin(sin )2sin cos ()2sin cos y x x x x x x x x x x x x'''=+=+⋅-=-; (5)lnln ln(1)1x y x x x ==---,∴1111(1)y x x x x -'=-=--; (6)[]{}[]1ln ln(ln )ln(ln )(ln )ln ln(ln )y x x x x x x ''''=⋅⋅=;(7)((1y x ''==+=;(8)1arcsin22x y '=++arcsin arcsin 22x x=+=.6.若以310cm /s 的速率给一个球形气球充气,那么当气球半径为2cm 时,它的表面积增加的有多快?解 设气球的体积为V ,半径为R ,表面积为S ,则34π3V R =,24πS R =. d d d d d d V V R t R t =⋅,d d d d d d S S Rt R t =⋅, 2d d d d dV 12d 8πd d d d dt 4πd S S V R V R t R t V R R t ∴=⋅⋅=⋅⋅=, 将3d 10cm /s d V t =,2cm R =代入得,2d 10cm /s d St=.7.求下列函数的高阶导数:(1)2sin 2y x x =,求y '''; (2)y =5x y =''. 解 (1)Q 22sin 22cos2y x x x x '=+,22sin 24cos24cos24sin 2y x x x x x x x ''=++-22sin 28cos 24sin 2x x x x x =+-,∴24cos28cos216sin 28sin 28cos2y x x x x x x x x '''=+---212cos 224sin 28cos 2x x x x x =--.(2)Q 2y '==y ''==23222(24)(16)x x x -=-,∴5x y =''1027=. 8.求由下列方程所确定的隐函数的导数: (1)3330y x xy +-=; (2)arctan ln yx=. 解 (1)方程两边对x 求导,得22333()0y y x y xy ''+-+=,从中解出y ',得22y x y y x-'=-. (2)方程两边对x 求导,得2222112221()xy y x yy y x x y x''-+⋅=⋅++, 从中解出y ',得x yy x y+'=-. 9.用对数求导法求下列各函数的导数:(1)y =; (2)cos (sin )x y x = (s i n 0)x >.解 (1)方程两边取对数,得11ln ln(23)ln(6)ln(1)43y x x x =++--+,两边对x 求导,得1211234(6)3(1)y y x x x '=+-+-+, 即211[234(6)3(1)y x x x '=+-+-+ (2)方程两边取对数,得cos ln ln(sin )cos lnsin x y x x x ==⋅两边对x 求导,得11sin ln sin cos cos sin y x x x x y x'=-⋅+⋅⋅ sin lnsin cos cot x x x x =-⋅+⋅,即cos (sin )(sin lnsin cos cot )x y x x x x x '=-⋅+⋅.10.求由下列各参数方程所确定的函数()y y x =的导数:(1)33cos sin x a t y b t ⎧=⎪⎨=⎪⎩; (2)e cos e sin tt x t y t ⎧=⎪⎨=⎪⎩,求π2d d t y x =. 解 (1)22d d 3sin cos d tan d d 3cos sin d yy b t t bt t x x a t t a t===--;(2)Q d d e (sin cos )sin cos d d d e (cos sin )cos sin d t t yy t t t tt x x t t t t t++===--, ∴π2d d t y x =π2sin cos 101cos sin 01t t tt t=++===---. 11.求下列函数的微分: (1)ln sin2x y =; (2)1arctan 1x y x+=-; (3)e 0x yxy -=; (4)24ln y y x +=.解 (1)111d (lnsin )d (cos )d cot d 22222sin 2x x xy x x x x '==⋅⋅=; (2)2221(1)(1)1d d d 1(1)11()1x x y x x x x x x-++=⋅=+-++- (3)方程两边同时取微分,得d(e )d()0x yxy -=,2d de (d d )0x yy x x yy x x y y-⋅-+=, 整理得22d d xy y y x x xy-=+.(4)方程两边同时取微分,得312d d 4d y y y x x y+=, 整理得324d d 21x yy x y =+.12.利用微分求近似值:(1)sin3030︒'; (2解 (1)设()sin f x x =,则0π306x ︒==,π30360x '∆==,()cos f x x '=.11 / 11 000sin3030()()()f x x f x f x x ︒''=+∆≈+∆πππsincos 0.507666360=+⋅≈ (2)设()f x =064x =,1x ∆=,561()6f x x -'=.000()()()f x x f x f x x '=+∆≈+∆5611(64)12 2.00526192-⋅=+≈ 13.已知单摆的振动周期2T =2980cm/s g =,l 为摆长(单位为cm ),设原摆长为20cm ,为使周期T 增大0.05s ,摆长约需加长多少?解由2T =224πgT l =,02T =0.05s T ∆=,22πgT l '=. 所以027d 0.050.050.05 2.23cm 2ππgT l l l T '∆≈=⋅∆=⋅===≈, 即摆长约需加长2.23cm .。