复变函数的题 如图方程怎么解
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答案:
z = [ (π/2) + i*ln(√(1/3)) ] + kπ ..............(k为整数)
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解析:
z = x+iy (x, y为实数)
sin(z) + 2icos(z) = 0
sin(x+iy) + 2icos(x+iy) = 0
运用 sin 和 cos 的和角公式:
[ sin(x)cos(iy) + cos(x)sin(iy) ] + 2i*[ cos(x)cos(iy) - sin(x)sin(iy) ] = 0
因为
sin(iy) = i*sinh(y); cos(iy) = cosh(y)
所以
sin(x)cosh(y) + i*cos(x)sinh(y) + 2i*cos(x)cosh(y) + 2sin(x)sinh(y) = 0
实部虚部分开得:
sin(x)cosh(y) + 2sin(x)sinh(y) = 0 ...............(1)
cos(x)sinh(y) + 2cos(x)cosh(y) = 0 .............(2)
化简得:
-sin(x) = 2sin(x)tanh(y) .................(1)
cos(x)tanh(y) = -2cos(x) ..............(2)
式(1): sin(x) = 0 或 tanh(y) = -1/2
解得: x=kπ (k为整数) 或 y=ln[ √(1/3) ]
式(2): cos(x) = 0 或 tanh(y) = -2
解得: x=(π/2)+kπ (k为整数) 或 y=ln[√(-1/3)] ......(此时y为虚数,与初设条件不符,排除)
因此,解集只能为:
x=(π/2)+kπ (k为整数)
y=ln[ √(1/3) ]
z = [ (π/2) + i*ln(√(1/3)) ] + kπ ..............(k为整数)
-------------------
解析:
z = x+iy (x, y为实数)
sin(z) + 2icos(z) = 0
sin(x+iy) + 2icos(x+iy) = 0
运用 sin 和 cos 的和角公式:
[ sin(x)cos(iy) + cos(x)sin(iy) ] + 2i*[ cos(x)cos(iy) - sin(x)sin(iy) ] = 0
因为
sin(iy) = i*sinh(y); cos(iy) = cosh(y)
所以
sin(x)cosh(y) + i*cos(x)sinh(y) + 2i*cos(x)cosh(y) + 2sin(x)sinh(y) = 0
实部虚部分开得:
sin(x)cosh(y) + 2sin(x)sinh(y) = 0 ...............(1)
cos(x)sinh(y) + 2cos(x)cosh(y) = 0 .............(2)
化简得:
-sin(x) = 2sin(x)tanh(y) .................(1)
cos(x)tanh(y) = -2cos(x) ..............(2)
式(1): sin(x) = 0 或 tanh(y) = -1/2
解得: x=kπ (k为整数) 或 y=ln[ √(1/3) ]
式(2): cos(x) = 0 或 tanh(y) = -2
解得: x=(π/2)+kπ (k为整数) 或 y=ln[√(-1/3)] ......(此时y为虚数,与初设条件不符,排除)
因此,解集只能为:
x=(π/2)+kπ (k为整数)
y=ln[ √(1/3) ]
追问
哥们 cos(x+iy)不是cosxchy-isinxshy吗 怎么你写的+
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