西南大学17秋1153《复变函数与积分变换》在线作业参考
11531、复函数LnZ()
除去原点及负半实轴外处处解析
在复平面上处处解析
在复平面上处处不解析
除去原点外处处解析
参考答案:除去原点及负半实轴外处处解析;
2、复数列<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{z}_{n}={e}^{\frac{nπ}{2}i}"/>的极限为( )
-1
不存在
0
1
参考答案:不存在;
3、洛朗级数的正幂部分叫()
A.解析部分
无限部分
主要部分
都不对
参考答案:A.解析部分;
4、<imgtitle="201609151473904724803061581.png"alt="QNGA45@KHL8MY69A40KNEFS.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473904724803061581.png"/>
一阶极点
本性奇点
一阶零点
可去奇点
5、<imgtitle="201609151473905353173098733.png"alt="]}$@J2RELVZ~0.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905353173098733.png"/>
2πi
0
4πi
以上都不对
6、<imgtitle="201609151473906804876003559.png"alt="AK2HS)7U~QCWRX]G8{H2PYE.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473906804876003559.png"/>
z=1+i点绝对收敛
z=1+2i点一定发散
z=-2点条件收敛
z=2i点绝对收敛
7、若(),则复函数f(z)=u(x,y)+iv(x,y)是区域D内的连续函数。
以上都不对。
u(x,y),v(x,y)至少有一个在区域D内连续;
u(x,y)在区域D内连续;
u(x,y),v(x,y)在区域D内连续;
8、<imgtitle="201609151473905016717017245.png"alt="~HE1HV]X}LMW53V8QMGEEHN.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905016717017245.png"/>
+∞
2
1
0
9、<imgtitle="201609141473821556206066609.png"alt="IN%F00}8XF8LT($@]S3Q0FM.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473821556206066609.png"/>
B.-2i
-1
1
2i
10、下列结论不正确的是().
D.sinz是复平面上的有界函数
lnz是复平面上的多值函数
cosz是无界函数
e^z是周期函数
11、设z=cosi,则
Imz=0
argz=π
Rez=π
|z|=0
12、方程<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{Rez}^{2}=1"/>所表示的平面曲线为( )
椭圆
圆
双曲线
直线
13、<imgtitle="201609151473905843308051905.png"alt="I)RS54BVPEXWURHTBP3AN4D.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905843308051905.png"/>
π+arctan1/2
-arctan1/2
π-arctan1/2
arctan1/2
14、<imgtitle="201609151473905991131049335.png"alt="6_{TUN[FFXVRKOXTW5`8IGA.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905991131049335.png"/>
0
1
πi
2πi
15、<imgtitle="201609151473905650227025201.png"alt="AIM5`%8XV)GD1]4_`J(B99K.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905650227025201.png"/>
2
0
1
无解
16、<imgtitle="201609141473821658475098211.png"alt="DGQGWR4UHC)RG{{0MYNEZYY.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473821658475098211.png"/>
F.z=1+i点绝对收敛;
z=-2i点绝对收敛;
z=-2点条件收敛;
z=1+2i点一定发散
17、<imgtitle="201609151473906559217052445.png"alt="PO%04V](3L0OO8HEMS(VM{S.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473906559217052445.png"/>
2i
-2i
1
-1
18、<imgtitle="201609141473821230671021719.png"alt="Q~CK%{IMWE69BOG3EXC2E20.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473821230671021719.png"/>
本性奇点
一阶零点
可去奇点
一阶极点
19、sin(1/z)在点z=0处的留数为()
E.1
0
-1
2
20、<imgtitle="201609151473906128211005561.png"alt="{KAYEEQDVA{ZDV)43$S(G15.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473906128211005561.png"/>
本性奇点
一阶极点
可去奇点
一阶零点
21、<imgtitle="201609151473904840554029174.png"alt="T1]2HEOQS~NBF0LT63VTF)R.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473904840554029174.png"/>
0<|z|<+∞
0<|z|<-1
|z|<1
|z|<+∞
22、<imgtitle="201609151473905438024081339.png"alt="Z[[%36POO(OB1HVV4KV74AH.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905438024081339.png"/>
极点
可去奇点
本性奇点
连续点
23、洛朗级数的正幂部分叫()
主要部分
都不对
解析部分
无限部分
24、复数<imgclass="kfformula"src="data:image/png;base64,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"data-latex="z=\frac{16}{25}-\frac{8}{25}i"/>的辐角为( )
π-arctan1/2
arctan1/2
π+arctan1/2
-arctan1/2
25、设z=cosi,则( )
Imz=0
argz=π
|z|=0
Rez=π
26、<imgtitle="201609151473905779162072864.png"alt="TI9V)ZR4AB~$BU8MW{34O[6.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473905779162072864.png"/>
C.0
2
-1
1
27、在下列复数中,使得<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{e}^{z}=2"/>成立的是()
z=ln2+2πi
z=1
z=ln2+πi
z=2
28、<imgclass="kfformula"src="data:image/png;base64,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"data-latex="Ln{z}^{2}=2Lnz"/>
A.√
B.×
29、若f(z)在<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{z}_{0}"/>解析,则<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{f}^{(n)}(z)"/>也在<imgclass="kfformula"src="data:image/png;base64,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"data-latex="{z}_{0}"/>解析。
A.√
B.×
30、平面点集D称为一个区域,如果D中任何两点都可以用完全属于D的一条折线连接起来,这样的集合称为连通集。
A.√
B.×
31、若u(x,y)与v(x,y)都是调和函数,则f(z)=u(x,y)+iv(x,y)是解析函数。
A.√
B.×
32、<imgtitle="201609141473822310510065965.png"alt="S@614YER~WE5GO(ZKR1[PBK.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473822310510065965.png"/>
A.√
B.×
33、单位脉冲函数是偶函数。
A.√
B.×
34、<imgtitle="201609141473822257338054171.png"alt="UK1BVX9%X.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473822257338054171.png"/>
A.√
B.×
35、<imgtitle="201609141473822385548020960.png"alt="3{4P%~W1XEFXTV`BW5X)ZZ6.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609141473822385548020960.png"/>
A.√
B.×
36、实部与虚部满足柯西—黎曼方程的复变函数是解析函数.
A.√
B.×
37、如果平面点集G中的每一点都是它的内点,则称G为开集.
A.√
B.×
38、<imgtitle="201609151473914378929007640.png"alt=")JV7B}61@MD}W7FJ355S32C.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473914378929007640.png"/>
39、<imgtitle="201609151473914264518019228.png"alt="$[AI9I)AOH0Y6UBJ@HJ5`RH.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473914264518019228.png"/>
40、<imgtitle="201609151473914482682000870.png"alt="{0TF6VPKT@A4KJTP0.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473914482682000870.png"/>
41、<imgtitle="201609151473914760335007204.png"alt="SY[YR6C{8[QZOGXAEPG1F1E.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473914760335007204.png"/>
42、复数<imgclass="kfformula"src="data:image/png;base64,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"data-latex="\frac{3}{1-2i}"/>的实部为,虚部为及其共轭复数为.
43、根据洛朗级数展开式中主要部分的系数取零值的不同情况,将函数的孤立奇点分为三类:、、。
44、
45、其中C是z=0到z=3+4i的直线段.
46、<imgtitle="201609151473907386114092067.png"alt="Q7PXA7]B]7W{ZS1X%J5ULQP.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473907386114092067.png"/>
47、题干.docx</a>
48、<imgtitle="201609131473776192513099080.png"alt="题目.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609131473776192513099080.png"/>
49、题干.docx</a>
50、
51、利用留数求积分<imgclass="kfformula"src="data:image/png;base64,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"data-latex="I=\int^{+\infty}_{0}{\frac{cosx}{{x}^{4}+10{x}^{2}+9}}dx"/>的值
52、<imgtitle="201609151473907482753031158.png"alt="PLVPIDS7X`TP`}Z{6WHT.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609151473907482753031158.png"/>
53、求<imgclass="kfformula"src="data:image/png;base64,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"data-latex="F(s)=\frac{s+9}{{s}^{2}+5s+6}"/>的拉普拉斯逆变换;
54、<imgtitle="201609131473776708792043378.png"alt="题干.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609131473776708792043378.png"/>
55、将<imgclass="kfformula"src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMMAAAA4CAYAAABAKkxwAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAY9SURBVHhe7Ztb6G5DGMY3uUBobzmVKGdS5EI5RdwoilxJKYRyIe1d3IkbXCCn4sKhEDnd7J0ctsJODsmFKIcLCqUkaTtcuOP9aaZWq1mzZv2/Oaz1/56pt/V9a81655ln3ndm3plZW7YoiQExIAbEgBgQA2JADIgBMSAGxIAYEANiQAyIATEgBsSAGBADYkAMiAExIAbEgBgQA2JADIgBMSAGxIAYyM/ACabyw/xql6dxn+VBFuKMDHSd4IKMeqVKDCyWAY0M1nT7Lqz5zjK8966A+WR791GT/VbQoVfFQHMGMOS3Mxjyxabj4ea1mRcAjQwzao/jDMvzrte/KoCLnvw7k+MzYb7f9FydSddmUCNnmEkrnmE4/jHhioHy++wettvtP5IrHWqK9ppwVdJq0mxs4E1D8q1DgyMg3RHgEHfv6MyI7zF9t2XWuVR1Ghlm0HJHGoZ/TZgikQ520oXGaOGf54TM6PNLToUL1iVnsMZrvZp0ijOgj931L7si3XSN/XmjgKF95nT2p2QFipLKJTDQ2hlYISJ9P0AWgfOVJt8UIvMd03tmId1LUMuqGiPz+e661iNEa2c43VnMjwOW42OHHxIsiz2IT012mxzTyX9HxOC/tGe8t65ph1WcUwhetAtd2RIOtPJ2OfEBs/9/XQ8LewLkGUtMdejhWH4l/08mjCqsUO2MvHyDPVvr3nCM2HV63vJsEqtEf5i8b3LJAOkY640mYz0WK1L3OcM+3K53mxzm9NLz/zygH2d7yeSo3nOcK7TfkWIbX1imV1IyKo8Y8Az43vyuCCU3Jfbc5/V0MCqwsYaxxxLPGVH6aX/nIDjJVNmqJl4mAy1HBpZMXza5wuT1AfpwhutNxkaG7us4wmMmr5kw6ow5w3uWoSQPB5l+Riml1Rj4217/bTUV8bdLGsEYbnpuH9wSyIZS6jTJv4sjPGfyoMnnYwDsOSPDWyaMBKXSiaa478wX2j02Gn8tVWhE7xH27FSTDwbytMTmIbGczvS1m4gHN218R8WYosROkGKsqRtjGPSLJn65NsXOWgTQfEzDiNcyUT44+mkO2MBEu49NcVvyl7VsHABHYIoSSxj2mMPwPmeMcITukqq/f1KkgFvs2eOB55fbva83KA+N1Kn2iVnKCxlWCEdNbD5eo31bY8lq3FOVseQJCUyVYsk7DfmHEo6wJ+AI5IfkcyPvcswDh6iVavZ49P7e0ELO0MdSE5tvG887WPsOMZdRqrhtEDzTUCnHqHdG8uEs7zoin7YrpF7qhKCce7HEFKzmcYyaPW/X0IamHF08NbGFpomhVb2amJqdTfJnklKCXAIppi2h9IDd5PTpDhN6eAIvPgBC/nT3hpzBjzYpGHL1Dl/lUpRJTxdPTWycPOgb+kd2rx/H1MSUidLpaogVUgPj2BHu0JIl+wJbEyC1OMIdC5z9ggLQMYpcASRlDunq4mmBrdtMoZEB3KFAP6F5p2dpcTYJ4/Y7vymI6eHvdL1+P39o3Rkn2zuimDjjVpMXUgBkyhNrVPjgKMrNJt54x/ZIMsH639haY6PO1D2Ujs1V0TE9tZyBIJbVGebnfor06hi4zvMn7TfToFwf+OAI201+n4ChZFaMkZO7xDhPud8ly5uiuzQ29DNtGovvpmDeUN5azsDc/jSTA0wuMtll8skExIwOl5k8YxLbl0hRSS+8zeTZlMyV8mAIzKGZKrARykHDbvIrQzyPSYkpRUls4GWTlJhvbdK1VlOOXpxjssdko98eM8KMLcfGSGXf4okMDrXRhhtaHcHAu/P6nJtysZghZTWpJLb+jnLfmYc2BzfK/2zeY4c4FPDOBmAFICFn8IbvA8jcBrCKM5TEFtpX6DvDpl1a5TuDogetKhjzqkWwVNht8O7vR9wUiDKGvvybUr7f4SUGYfUOZ+uX3V9arYUNI9/uMPlpH2ePctR7CkfK25iBnFOgVaoSwjEXbNSr6rIqBdYKoFdptM34bolAdwpPsfJbY/P14Gi/RooprbrQvP3AsXY1YuW3xgYXc8BQu03WurxWPXBKuSl5SjZe6/JL1k26xYAYEANiQAyIATEgBsSAGBADYkAMiAExIAbEgBgQA2JADIgBMSAGxIAYEANiQAyIATGwLgz8B/reE1vPrSNNAAAAAElFTkSuQmCC"data-latex="f(z)=\frac{1}{(z-1)(z-2)}"/>在以点z=1,z=2的去心领域内展开成洛朗级数;
56、
57、<imgtitle="201609131473775541036065030.png"alt="题干.png"src="http://zuoye.eduwest.com/resourcefile/uploadFiles/file/questionImgs/201609131473775541036065030.png"/>
58、
59、求<imgclass="kfformula"src="data:image/png;base64,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"data-latex="\frac{1}{{(1+z)}^{2}}"/>在z=0的领域内的泰勒展式,并确定收敛半径.
60、题干.docx答案.docx
页:
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