#z# is a complex number, #z=a+ib# and #(2+i)z=1-z#, what is #z# in terms of #i# ? Precalculus Complex Numbers in Trigonometric Form Roots of Complex Numbers 1 Answer sente Mar 9, 2016 #z = 3/10-1/10i# Explanation: #(2+i)z = 1-z# #=> (2+i)z + z = 1# #=> (2+i+1)z = 1# #=> (3+i)z = 1# #=> z = 1/(3+i)# #=(3-i)/((3+i)(3-i))# #=(3-i)/10# #=3/10-1/10i# #:. z = 3/10-1/10i# Answer link Related questions How do I find the cube root of a complex number? How do I find the fourth root of a complex number? How do I find the fifth root of a complex number? How do I find the nth root of a complex number? How do I find the square root of a complex number? What is the square root of #2i#? What is the cube root of #(sqrt3 -i)#? What are roots of unity? How do I find the square roots of #i#? How do you solve #6x^2-5x+3=0#? See all questions in Roots of Complex Numbers Impact of this question 2676 views around the world You can reuse this answer Creative Commons License