SOLUTION: |z-1+i|=1
Algebra.Com
Question 1195362: |z-1+i|=1
Answer by ikleyn(52790) (Show Source): You can put this solution on YOUR website!
.
The solution set to this equation is the circle of the radius of 1 (one) unit on the complex plane,
centered at the point 1-i.
So, the general formula for the solution is
z = 1-i + ( cos(t) + i*sin(t) ) ,
where t is any real number 0 <= t < .
---------------
Solved, answered and explained.
RELATED QUESTIONS
(z+1)^4=1-i (answered by greenestamps)
When z = (1+i)/(1-i), prove that... (answered by Edwin McCravy)
Z + 1/Z = 1
Z ^64 + 1/ Z^64 =... (answered by Fombitz)
1+Z+Z^2+Z^3...=1/Z-1 (answered by richard1234)
Simplify 1/z-1 -... (answered by rfer)
Simplify
z-1 over z + z+1 over... (answered by HasanSahin)
solve... (answered by Alan3354,JBarnum)
6z+6/z/z+1/z^3 (answered by Fombitz)
1/2(6-z)=z (answered by rahman)