determine z\1+i+z\1-i=5,z=a+bi,a,b,E r calcule a,b,c
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![\frac{z}{1+i}+\frac{z}{1-i}=5 \ \ \rightarrow \times (1+i)(1-i)\\ \\ \left( \frac{z}{1+i}+\frac{z}{1-i}\right )(1+i)(1-i)=5(1+i)(1-i)\\ \\ \frac{z(1+i)(1-i)}{1+i}+\frac{z(1+i)(1-i)}{1-i}=5(1+i)(1-i)\\ \\ z(1-i)+z(1+i)=5(1+i)(1-i)\\ \\ z\left[ (1+i)+(1-i)\right ]=5(1-i+i-i^{2})\\ \\z \cdot 2 = 5(1-(-1))\\ \\2z=5 \cdot 2\\ \\z=\frac{5 \cdot \not 2}{\not 2} \Rightarrow z=5](https://tex.z-dn.net/?f=%5Cfrac%7Bz%7D%7B1%2Bi%7D%2B%5Cfrac%7Bz%7D%7B1-i%7D%3D5+%5C+%5C+%5Crightarrow+%5Ctimes+%281%2Bi%29%281-i%29%5C%5C+%5C%5C+%5Cleft%28+%5Cfrac%7Bz%7D%7B1%2Bi%7D%2B%5Cfrac%7Bz%7D%7B1-i%7D%5Cright+%29%281%2Bi%29%281-i%29%3D5%281%2Bi%29%281-i%29%5C%5C+%5C%5C+%5Cfrac%7Bz%281%2Bi%29%281-i%29%7D%7B1%2Bi%7D%2B%5Cfrac%7Bz%281%2Bi%29%281-i%29%7D%7B1-i%7D%3D5%281%2Bi%29%281-i%29%5C%5C+%5C%5C+z%281-i%29%2Bz%281%2Bi%29%3D5%281%2Bi%29%281-i%29%5C%5C+%5C%5C+z%5Cleft%5B+%281%2Bi%29%2B%281-i%29%5Cright+%5D%3D5%281-i%2Bi-i%5E%7B2%7D%29%5C%5C+%5C%5Cz+%5Ccdot+2+%3D+5%281-%28-1%29%29%5C%5C+%5C%5C2z%3D5+%5Ccdot+2%5C%5C+%5C%5Cz%3D%5Cfrac%7B5+%5Ccdot+%5Cnot+2%7D%7B%5Cnot+2%7D+%5CRightarrow+z%3D5 "\frac{z}{1+i}+\frac{z}{1-i}=5 \ \ \rightarrow \times (1+i)(1-i)\\ \\ \left( \frac{z}{1+i}+\frac{z}{1-i}\right )(1+i)(1-i)=5(1+i)(1-i)\\ \\ \frac{z(1+i)(1-i)}{1+i}+\frac{z(1+i)(1-i)}{1-i}=5(1+i)(1-i)\\ \\ z(1-i)+z(1+i)=5(1+i)(1-i)\\ \\ z\left[ (1+i)+(1-i)\right ]=5(1-i+i-i^{2})\\ \\z \cdot 2 = 5(1-(-1))\\ \\2z=5 \cdot 2\\ \\z=\frac{5 \cdot \not 2}{\not 2} \Rightarrow z=5")
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