经济数学基础形成性考核册及参考答案
作业(一)
(一)填空题 1..答案:0 2.答案:1 3.答案:y?4..答案:2x
5.设f(x)?xsinx,则f??()?__________.答案:?(二)单项选择题 1.
2. 下列极限计算正确的是( )答案:B A.lim11x? 22π2π 2xxx?0?1 B.lim?x?0xx?1
C.limxsinx?01sinx?1 D.lim?1
x??xx3. 设y,则dy?( ).答案:B ?lg2xA.
11ln101dx B.dx C.dx D.dx 2xxln10xx4. 若函数f (x)在点x0处可导,则( )是错误的.答案:B
A.函数f (x)在点x0处有定义 B.limf(x)?A,但A?f(x0)
x?x0 C.函数f (x)在点x0处连续 D.函数f (x)在点x0处可微 5.当x?0时,下列变量是无穷小量的是( ). 答案:C A.2 B.
(三)解答题 1.计算极限
xsinx C.ln(1?x) D.cosx x1x2?3x?2(x?2)(x?1)x?2?(1)lim = = lim?lim2x?1x?1x?12(x?1)(x?1)(x?1)x?1
1
(2)limx2?5x?6(x?2)(x?3)x?31x?2x2?6x?8=limx?2(x?2)(x?4) = limx?2(x?4) = 2
(3)lim1?x?1(1?xx?0x=lim?1)(1?x?1)x?0x(1?x?1) =lim?xx?0x(1?x?1)=lim?1x?0(1?x?1)??12
1?3(4)limx2?3x?5x??3x2?2x?4?limx?5x2x???1(5)limsin3x3?243x?0sin5x?lim5xsin3x3x?03xsin5x5=35x?x2limx2?4(x?2)(x?2)x?2sin(x?2)?limx?2sin(x?2)?4
??xsin1?b,x?02.设函数f(x)??x?a,x?0,
??sinx?xx?0问:(1)当a,b为何值时,f(x)在x?0处有极限存在? (2)当a,b为何值时,f(x)在x?0处连续.
答案:(1)当b?1,a任意时,f(x)在x?0处有极限存在; (2)当a?b?1时,f(x)在x?0处连续。 3.计算下列函数的导数或微分:
(1)y?x2?2x?log2x2x?2,求y?答案:y??2x?2ln2?1xln2 (2)y?ax?bcx?d,求y?答案:y?=a(cx?d)?c(ax?b)ad?cb(cx?d)2?(cx?d)2 1(3)y?13x?5,求y?答案:y?13x?5=(3x?5)?2 y???32(3x?5)3
(4)y?x?xex,求y?答案:y??12x?(x?1)ex
(5)y?eaxsinbx,求dy
2
6) (axax答案:y??(e)?sinbx?e(sinbx)??aesinbx?ecosbx?b
axax?eax(asinbx?bcosbx) dy?eax(asinbx?bcosbx)dx
311(6)y?e?xx,求dy答案:dy?(x?2ex)dx
2x1x(7)y?cosx?e?x,求dy答案:dy?(2xe?x?(8)y?sinx?sinnx,求y?答案:y?=nsin9
)
)
)
)
2n22sinx2x)dx
n?1xcosx+cosnxn=n(sinn?1xcosx?cosnx)
)
)
)
)
)
)
)
)
))
1?11x22?y???(1?(1?x)2x)(x?1?x)?(1?)22222x?1?xx?1?xx?1?x1?x11?11?x2
1x(10)y?21cotx?1?3x2?2xxln21?21?6???x?x ,求y答案:y?1262xsinx2cot354.下列各方程中y是x的隐函数,试求y?或dy
(1)x?y?xy?3x?1,求dy答案:解:方程两边关于X求导:2x22?2yy??y?xy??3?0
(2y?x)y??y?2x?3 , dy?(2)sin(x?y)?exyy?3?2xdx
2y?x?4x,求y?
答案:解:方程两边关于X求导cos(x?y)(1?y?)?exy(y?xy?)?4
(cos(x?y)?exyx)y??4?yexy?cos(x?y)
4?yexy?cos(x?y) y??xyxe?cos(x?y)5.求下列函数的二阶导数:
2?2x2(1)y?ln(1?x),求y??答案:y??? 22(1?x)2 3
(2)y?
1?x3?21?2??,求y??及y??(1)答案:y?x?x,y??(1)?1
44x53作业(二)
(一)填空题 1.若2.
?f(x)dx?2x?2x?c,则f(x)?___________________.答案:2xln2?2
?(sinx)?dx?________.答案:sinx?c ?f(x)dx?F(x)?c,则?xf(1?x2)dx? .答案:?1F(1?x2)?c 23. 若
deln(1?x2)dx?___________.答案:0 4.设函数?dx15. 若P(x)??0x11?t2dt,则P?(x)?__________.答案:?4
11?x2
(二)单项选择题
2
1. 下列函数中,( )是xsinx的原函数. A.
11cosx2 B.2cosx2 C.-2cosx2 D.-cosx2 22答案:D
2. 下列等式成立的是( ).
A.sinxdx?d(cosx) B.lnxdx?d()
C.2dx?x1x
1d(2x) ln2 D.
1xdx?dx
答案:C
3. 下列不定积分中,常用分部积分法计算的是( ). A.cos(2x?1)dx, B.x1?xdx C.xsin2xdx D.答案:C
4. 下列定积分计算正确的是( ). A.
C.
??2?x?1?x2dx
?1?12xdx?2 B.?2316?1dx?15
?????(x???x)dx?0 D.?sinxdx?0
答案:D
5. 下列无穷积分中收敛的是( ).
A.
???1??1????1xdx B.?dx C. D.?0edx?1sinxdx 1xx2
答案:B
(三)解答题
1.计算下列不定积分
3xx3x3x3xe?c (1)?xdx答案:?xdx=?()dx=3eeelne
5
(2)
?(1?x)2x3113?(1?x)2(1?2x?x2)dx=?dx=?(x2?2x2?x2)dx dx答案:?xx542=2x?x2?x2?c
35x2?4x2?41dx答案:?dx=?(x-2)dx=x2?2x?c (3)?x?2x?22
(4)
11111?d(1-2x)答案:==dxdx?ln1?2x?c ??1?2x ?1?2x221?2x223211222(5)?x2?xdx答案:?x2?xdx=?2?xd(2?x)=(2?x)?c
32(6)
??sinxxdx
答案:
?sinxxdx=2?sinxdx=?2cosx?c
(7)xsinxxxdx答案:?xsindx=?2?xdcosdx 2 22xxxx?2?cosdx=?2xcos?4sin?c
2222=?2xcos(8)ln(x?1)dx 答案:ln(x?1)dx==(x?1)ln(x?1)?2.计算下列定积分 (1)
???ln(x?1)d(x?1)
?(x?1)dln(x?1)=(x?1)ln(x?1)?x?c
答案:
?21
2?11?xdx1
x
?2?11?xdx=??1(1?x)dx+?1(x?1)dx=(x?1x
12121152x)?1?(x2?x)1=
222(2)
?
2e21exdxdx答案:==?ex?ed22??1x1xx e31121=e?e
e31(3)
?1x1?lnx1dx
答案:
?e31x1?lnx1dx=?e3111d(1?lnx)=2(1?lnx)21?lnx=2
???11112??02sin2xdx=? (4)?2xcos2xdx答案:?2xcos2xdx=?2xdsin2x=xsin2x00022220
?? 6
(5)
?e1xlnxdx答案:
?e1e21e1212exlnxdx=?1lnxdx=xlnx1??1xdlnx=(e2?1)
4224?x?x(1?xe?x)dx=x1??xde=3?xe440(6)
?4(1?xe?x)dx答案:?4??e?xdx=5?5e?4
40
作业三
?1设矩阵A???3??2
00004?5??232?,则A的元素a23?__________________.答案:16?1?3 ??7
(一)填空题1.
2.设A,B均为3阶矩阵,且A?B??3,则?2ABT=________. 答案:?72
3. 设A,B均为n阶矩阵,则等式(A?B)?A?2AB?B成立的充分必要条件是 .答案:
222AB?BA
4. 设A,B均为n阶矩阵,(I?B)可逆,则矩阵A?BX?X的解X?______________. 答案:(I?B)?1A
????100?5. 设矩阵A??100??020?,则A?1?__________.答案:A???1?00?3?????020?? ???00?1??3??(二)单项选择题
1. 以下结论或等式正确的是( ).
A.若A,B均为零矩阵,则有A?B
B.若AB?AC,且A?O,则B?C
C.对角矩阵是对称矩阵
D.若A?O,B?O,则AB?O答案C
2. 设A为3?4矩阵,B为5?2矩阵,且乘积矩阵ACBT有意义,则CT为( A.2?4 B.4?2
C.3?5 D.5?3 答案A
3. 设A,B均为n阶可逆矩阵,则下列等式成立的是( ). ` A.(A?B)?1?A?1?B?1, B.(A?B)?1?A?1?B?1
C.AB?BA D.AB?BA 答案C 4. 下列矩阵可逆的是( ).
?123???10?1 A.??023? B.??101? ???? ?003????123?? C.??11??11??00? D.???22?? 答案A
8
)矩阵.?222???5. 矩阵A?333的秩是( ). ????444??A.0 B.1 C.2 D.3 答案B
三、解答题 1.计算
?3??0???21??01??1?2??02??11??00?(1)?=?(2)?(3)??1254???=?0? ????????????1??53??10??35? ?0?3??00??00????2?23???124??245??1??????2.计算?122143?610 ????????1?32????23?1????3?27??2?23???124??245??7197??245??515?1? ??????????610?=?11100解 ?122143?610?712???????????????3?2?14???1?32????23?1????3?27????0?4?7????3?27????23?1??123???,B??112?,求AB。解 因为AB?AB
13.设矩阵A?11???????0?11???011??2A?131?111023122?(?1)2?3(?1)1?122?2 120?10?10213123011B?112?0-1-1?01
所以AB?AB?2?0?0
?124???4.设矩阵A?2?1,确定?的值,使r(A)最小。 ????110??案
:
?124??A??2?1????110??24??1(2)?(1)?(?2)??0??4?7?(3)?(1)?(?1)???0?1?4??24??1?(2)(3)?0?1?4????0??4?7?? 9
?12?7(3)?(2)?(?)?0?14?90????44??9当??时,r(A)?2达到最小值。 ?4?4?0??
?2?532?5?854A???1?742??4?1121?3??0??3?5.求矩阵的秩。
?2?532?5?854A???1?742??4?1121?3??0??3?(1)(3)?1?742?5?854??2?532??4?1120?3??1??3?420??1?7(2)?(1)?(?5)??027?15?63?(3)?(1)?(?2)??09?5?21?(4)?(1)?(?4)??027?15?63??42?1?7?1?027?15?6(3)?(2)?(?)003?00(4)?(2)?(?1)?00?000??1?32?3??r(A)?2。 6.求(1)A???301?
??0??1?1??1??0??1?32100??(AI)???301010???1?1001??1??1?32100?(2)?(3)?2??0?11112????04?3?101???1?30?5?8?18?(2)?(3)?(?1)??0?10?2?3?7?(1)?(3)?(?2)??349??001?A?1答
2100??1?3(2)?(1)?3??0?97310?(3)?(1)?(?1)???04?3?101???1?32100?(3)?(2)?4??0?11112????001349???1?30113?(2)?(?1)??010237?(1)?(2)?(3)???001349??
?113???13?6?3?? (2)A =??4?2?1?.
??237??????11??349???2?案
??13?6?3100??(AI)???4?2?1010???11001??2???101)?(2)?(?3)?(???????4?2?1?201?30??1010??1001?? 10
??1001?30????????001012????0112?61??(2)?(3)?2)3)?(1)?2??1001?30??2)(3)?(????0112?61????001012???10???????01??00(2)?(3)(?1)(1)?(?1)0?130?0???13??- A1 =2?7?1 02?7?1?????12?0012??0??7.设矩阵A???12??12?,求解矩阵方程XA?B. ,B?????35??23?案
:
答
210??1210??1?10?52??10?52?AI)??(2)?(1)?(?3)?(1)?(2)?2?(2)?(?1)?????35010?1?310?1?31013?1?????????52? X=BA?1 X =
3?1?? A?1?????10???11? ??四、证明题
1.试证:若B1,B2都与A可交换,则B1?B2,B1B2也与A可交换。 证明:(B1?B2)A?B1A?B2A?AB1?AB2?A(B1?B2),
B1B2A?B1AB2?AB1B2
T2.试证:对于任意方阵A,A?A,AA,AA是对称矩阵。
TT提示:证明
(A?AT)T?AT?(AT)T?AT?A?A?AT,
(AAT)T?(AT)TAT?AAT,(ATA)T?AT(AT)T?ATA
3.设A,B均为n阶对称矩阵,则AB对称的充分必要条件是:AB?BA。 提示:充分性:证明:因为AB?BA?(AB) 必要性:证明:因为AB对称,?ABT?BTAT?BA?AB
?(AB)T?BTAT?BA,所以AB?BA
?14.设A为n阶对称矩阵,B为n阶可逆矩阵,且B证明:(B?1?BT,证明B?1AB是对称矩阵。
AB)T?BTAT(B?1)T?B-1A(BT)T=B?1AB
作业(四) (一)填空题
11
1.函数f(x)?x?1在区间___________________内是单调减少的.答案:(?1,0)?(0,1) x22. 函数y?3(x?1)的驻点是________,极值点是 ,它是极 值点.答案:x?1,x?1,小 3.设某商品的需求函数为q(p)?10e?p2,则需求弹性Ep? .答案:?2p
14.行列式D??11111?____________.答案:4
?1?1116??11??,
325. 设线性方程组AX?b,且A?0?1方程组有唯一解.答案:??1
??则t__________时,??00t?10??(二)单项选择题
1. 下列函数在指定区间(??,??)上单调增加的是(
).
A.sinx B.e x C.x 2 D.3 – x
答案:B
2. 已知需求函数q(p)?100?2?0.4p,当p?10时,需求弹性为( ).
A.4?2?4pln2 B.4ln2 C.-4ln2 D.-4?2?4pln2 答案:C
3. 下列积分计算正确的是( ).
x?x1e?eex?e?xdx?0 B.?dx?0 A.??1?1221C.
?1-1xsinxdx?0 D.?(x2?x3)dx?0
-11答案:A
4. 设线性方程组Am?nX?b有无穷多解的充分必要条件是( ).
A.r(A)?r(A)?m B.r(A)?n C.m?n D.r(A)?r(A)?n 答案:D
?x1?x2?a1?5. 设线性方程组?x2?x3?a2,则方程组有解的充分必要条件是( ).
?x?2x?x?a233?1A.a1?a2?a3?0 B.a1?a2?a3?0
C.a1?a2?a3?0 D.?a1?a2?a3?0 答案:C
12
三、解答题
1.求解下列可分离变量的微分方程: (1) y??ex?y
答案:
dy?exey dx?e?ydy??exdx ?e?y?ex?c
dyxex(2)?2
dx3y答案:
2x3xxy?xe?e?c 3ydy?xedx??2. 求解下列一阶线性微分方程: (1)y??2y?(x?1)3 x?1:
答案
p(x)??3?2,q(x)?(x?1)3x?1=
,代入公式锝
y?e?x?1dx?2??(x?1)e??x?1dx2?dx?c??e2ln(x?1)12??(x?1)3e?2ln(x?1)dx?c?==
e2ln(x?1)??(x?1)3(x?1)?2dx?c y?(x?1)2(x2?x?c)
y?2xsin2x x?(2)y??11??dx?1?xdx?xdx?c? 答案:p(x)??,q(x)?2xsin2x ,代入公式锝y?e??2xsin2xex??
?elnx??2xsin2xe?dx?c
lnx?
1???x??2xsin2xdx?c??x?sin2xd2x?c
x????y?x(?cos2x?c)
3.求解下列微分方程的初值问题: (1) y??e2x?y,y(0)?0
答案:
dy?e2xe?y dx?111eydy??e2xdx,ey?e2x?c,把y(0)?0代入e0?e0?c,C=,
222ey?1x1e? 22x(2)xy??y?e?0,y(1)?0
13
答案
1:
1exy??y?Xx1,
1exP(X)?,Q(X)?Xx,代入公式锝
y?e?x?xdx?e?xdx??e?x?dx?c???e?lnx?exlnx?1?ex?edx?c?xdx?c??x?x??x?,把y(1)?0代入????y?1x1(e?c),C= -e , y?(ex?e)
xx4.求解下列线性方程组的一般解:
?2x3?x4?0?x1?(1)??x1?x2?3x3?2x4?0
?2x?x?5x?3x?0234?1答案:??x1??2x3?x4(其中x1,x2是自由未知量)
?x2?x3?x402?1?2?1??1?10?102?1????01?11???01?11?
A???11?32??????????2?15?3???0?11?1???0000??所以,方程的一般解为
?x1??2x3?x4(其中x1,x2是自由未知量) ??x2?x3?x4
?2x1?x2?x3?x4?1?(2)?x1?2x2?x3?4x4?2
?x?7x?4x?11x?5234?1答
案
:
11?4?2?11?12?142??12?1(2)?(1)?(?2)?????(Ab)??12?142?(1),(2)?2?1111?0?53?7(3)?(1)?(?1)????7?17?4115???17?4115???05?316?10??12?142?5542??12?1??373?37?0?53?7?3??01?01???(2)?(?1)?(3)?(2)?(1)?(2)?(?2)?55555???000?5?00000?0?00??000??2??3??3??4?5?3??5?0??? 14
??x1??1?5x3?645x4?5(其中??x?3x1,x2是自由未知量)
5x7323?5x4?55.当?为何值时,线性方程组
??x1?x2?5x3?4x4?2??2x1?x2?3x3?x4?1?3x1?2x2?2x3?3x 4?3??7x1?5x2?9x3?10x4??有解,并求一般解。
?1?1?542???1?542?(Ab)??2?13?11?(2)?(1)?(?2)?1113?9?3???3?2?233???(3)?(1)?(?3)?0113?9?3???7?5?910???(4)?(1)?(?7)??0?0226?18??14???1?1?542??108?5?1?答案:(3)?(2)?(?1)?0113?9?3?(1)?(2?0113?9?3?(4)?(2)?(?2)???00000?)??0000?? ?0000??8??0???0000??8??.当?=8有解,??x1??8x3?5x4?1(其中?xxx1,x2是自由未知量)
2??133?9x4?35.a,b为何值时,方程组
??x1?x2?x3?1?x1?x2?2x3?2 ??x1?3x2?ax3?b答
案
?1?1?11??1?1?A??(2)?(1)?(?1)1?1?1?1?11?22????02???02?13ab??(3)?(1)?(?1)?11???04a?1b?1??(3)?(2)?(?2)???00当a??3且b?3时,方程组无解; 当a??3时,方程组有唯一解;
当a??3且b?3时,方程组无穷多解。 6.求解下列经济应用问题:
(1)设生产某种产品q个单位时的成本函数为:C(q)?100?0.25q2?6q(万元), 求:①当q?10时的总成本、平均成本和边际成本;
15
:
?11??11?a?3b?3???②当产量q为多少时,平均成本最小?
答案:①C(10)?185(万元)
c(q)??c(q)100??0.25q?6q, C(10)?18.5(万元/单位) qqc?(q)?0.5q?6,C?(10)?11(万元/单位)
??100c(q)100②c(q)???0.25q?6,c(q)??2?0.25?0,当产量为20个单位时可使平均成本达
qqq?到最低。
(2).某厂生产某种产品q件时的总成本函数为C(q)?20?4q?0.01q(元),单位销售价格为,问产量为多少时可使利润达到最大?最大利润是多少. p?14?0.01q(元/件)答案: R(q)= 14q?0.01q,
22L(q)?R(q)?c(q)?10q?0.02q2?20,
L?(q)?10?0.04q?0当产量为250个单位时可使利润达到最大,且最大利润为L(250)?1230(元)。
(3)投产某产品的固定成本为36(万元),且边际成本为C?(q)?2q?40(万元/百台).试求产量由4百台增至6百台时总成本的增量,及产量为多少时,可使平均成本达到最低.
解:当产量由4百台增至6百台时,总成本的增量为 答案:
?C?C(6)?C(4)??4(2q?40)dq?(q2?40q)64=100(万元)
q6c(q)??0(2q?40)dq?36?q?40q?36,c(q)?2___c(q)36?q?40?, qq361??c(q)?q?0, 当x?6(百台)时可使平均成本达到最低.
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(4)已知某产品的边际成本C?(q)=2(元/件),固定成本为0,边际收益
R?(q)?12?0.02q,求:
①产量为多少时利润最大?
②在最大利润产量的基础上再生产50件,利润将会发生什么变化? 答案:①L?(q)?R?(q)?c?(q)?10?0.02q?0, 当产量为500件时,利润最大.
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②
?L??500(10?0.02q)dq?(10q?0.01q2)550500??25(元)
550即利润将减少25元.
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