题目内容
已知复数z1满足:|z1|=1+3i-z1.复数z2满足:z2•(1-i)+(3-2i)=4+i.
(1)求复数z1,z2;
(2)在复平面内,O为坐标原点,记复数z1,z2对应的点分别为A,B.求△OAB的面积.
(1)求复数z1,z2;
(2)在复平面内,O为坐标原点,记复数z1,z2对应的点分别为A,B.求△OAB的面积.
(1)设z1=x+yi(x,y∈R),
由|z1|=1+3i-z1,得
=1+3i-(x+yi)=1-x+(3-y)i,
∴
,解得
.
∴z1=-4+3i.
而z2•(1-i)=1+3i,
∴z2=
=
=
=-1+2i,
(2)由(1)知,
=(-4,3),
=(-1,2),∴|
=
=5,|
|=
=
.
由
•
=|
| |
|cos∠AOB,得(-4)×(-1)+3×2=5
cos∠AOB,
解得cos∠AOB=
,∴sin∠AOB=
.
∴△OAB的面积S=
×5×
×
=
.
由|z1|=1+3i-z1,得
| x2+y2 |
∴
|
|
∴z1=-4+3i.
而z2•(1-i)=1+3i,
∴z2=
| 1+3i |
| 1-i |
| (1+3i)(1+i) |
| (1-i)(1+i) |
| -2+4i |
| 2 |
(2)由(1)知,
| OA |
| OB |
| OA| |
| (-4)2+32 |
| OB |
| (-1)2+22 |
| 5 |
由
| OA |
| OB |
| OA |
| OB |
| 5 |
解得cos∠AOB=
| 2 | ||
|
| 1 | ||
|
∴△OAB的面积S=
| 1 |
| 2 |
| 5 |
| 1 | ||
|
| 5 |
| 2 |
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