作业帮设复数z满足1-z/1+z=-1+i/3+i(i为虚数单位),求复数z?(1-z)/(1+z)=(-1+i)/(3+i)设z=a+bi则方程变为:(1-a-bi)/(1+a+bi)=(-1+i)/(3+i)(1-a-bi)(1+a-bi)/(1+a+bi)(1+a-bi)=(-1+i)(3-i)/(3+i)(3-i) //这一步是分母实数化{[(1-a)(1+a)-b^2]+[-(
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![设复数z满足1-z/1+z=-1+i/3+i(i为虚数单位),求复数z?(1-z)/(1+z)=(-1+i)/(3+i)设z=a+bi则方程变为:(1-a-bi)/(1+a+bi)=(-1+i)/(3+i)(1-a-bi)(1+a-bi)/(1+a+bi)(1+a-bi)=(-1+i)(3-i)/(3+i)(3-i) //这一步是分母实数化{[(1-a)(1+a)-b^2]+[-(](/uploads/image/z/3925570-58-0.jpg?t=%E8%AE%BE%E5%A4%8D%E6%95%B0z%E6%BB%A1%E8%B6%B31-z%2F1%2Bz%3D-1%2Bi%2F3%2Bi%28i%E4%B8%BA%E8%99%9A%E6%95%B0%E5%8D%95%E4%BD%8D%29%2C%E6%B1%82%E5%A4%8D%E6%95%B0z%3F%281-z%29%2F%281%2Bz%29%3D%28-1%2Bi%29%2F%283%2Bi%29%E8%AE%BEz%3Da%2Bbi%E5%88%99%E6%96%B9%E7%A8%8B%E5%8F%98%E4%B8%BA%EF%BC%9A%281-a-bi%29%2F%281%2Ba%2Bbi%29%3D%28-1%2Bi%29%2F%283%2Bi%29%281-a-bi%29%281%2Ba-bi%29%2F%281%2Ba%2Bbi%29%281%2Ba-bi%29%3D%28-1%2Bi%29%283-i%29%2F%283%2Bi%29%283-i%29+%2F%2F%E8%BF%99%E4%B8%80%E6%AD%A5%E6%98%AF%E5%88%86%E6%AF%8D%E5%AE%9E%E6%95%B0%E5%8C%96%7B%5B%281-a%29%281%2Ba%29-b%5E2%5D%2B%5B-%28)
设复数z满足1-z/1+z=-1+i/3+i(i为虚数单位),求复数z?(1-z)/(1+z)=(-1+i)/(3+i)设z=a+bi则方程变为:(1-a-bi)/(1+a+bi)=(-1+i)/(3+i)(1-a-bi)(1+a-bi)/(1+a+bi)(1+a-bi)=(-1+i)(3-i)/(3+i)(3-i) //这一步是分母实数化{[(1-a)(1+a)-b^2]+[-(
设复数z满足1-z/1+z=-1+i/3+i(i为虚数单位),求复数z?
(1-z)/(1+z)=(-1+i)/(3+i)
设z=a+bi
则方程变为:
(1-a-bi)/(1+a+bi)=(-1+i)/(3+i)
(1-a-bi)(1+a-bi)/(1+a+bi)(1+a-bi)=(-1+i)(3-i)/(3+i)(3-i) //这一步是分母实数化
{[(1-a)(1+a)-b^2]+[-(1-a)b-(1+a)b]i}/[(1+a)^2+b^2]=[(-3+1)+(1-3)i]/(9+1) //分子表示成a+bi的形式
[(1-a^2-b^2)-2bi]/(1+2a+a^2+b^2)=(-2-2i)/10
后面就去分母,解出来后根据实部相等,虚部相等的原则列出二元二次方程组
有没有简便的方法、如果没有就继续上面的步骤写出答案、谢谢
设复数z满足1-z/1+z=-1+i/3+i(i为虚数单位),求复数z?(1-z)/(1+z)=(-1+i)/(3+i)设z=a+bi则方程变为:(1-a-bi)/(1+a+bi)=(-1+i)/(3+i)(1-a-bi)(1+a-bi)/(1+a+bi)(1+a-bi)=(-1+i)(3-i)/(3+i)(3-i) //这一步是分母实数化{[(1-a)(1+a)-b^2]+[-(
(1-z)/(1+z)=(-1+i)/(3+i)
(1-z)(3+i)=(-1+i)(1+z)
3+i-3z-zi=-1-z+i+zi
2z+2zi=4
2z(1+i)=4
z=2/(1+i)
=2(1-i)/(1+1)
=1-i