Let z=a+i b, b 0 be complex numbers satisfying z^2=z 2^1-z. Then the least value of n N, such that z^n=(z+1)^n, is equal to __________.

z^2 = z \,.\,2^1 - |z| ...... (1) \\ |z|^2 = | z |\,.\,2^1 - |z| \\ |z| = 2^1 - |z|, b 0 |z| 0 |z| = 1 ...... (2) z =&nbsp

Let zai b b neq 0 be complex numbers satisfying z2barz 21z T: (Mathematics)

$\because$ ${z^2} = \overline z \,.\,{2^{1 - |z|}}$ ...... (1)

$\\ \Rightarrow |z{|^2} = |\overline z |\,.\,{2^{1 - |z|}}$

$\\ \Rightarrow |z| = {2^{1 - |z|}}$ ,

$\because$ $b \ne 0 \Rightarrow |z| \ne 0$

$\therefore$ $|z| = 1$ ...... (2)

$\because$ $z = a + ib$ then $\sqrt {{a^2} + {b^2}} = 1$ ...... (3)

Now again from equation (1), equation (2), equation (3) $\\$ we get : ${a^2} - {b^2} + i2ab = (a - ib){2^0}$

$\\ \therefore$ ${a^2} - {b^2} = a$ and $2ab = - b$

$\\ \therefore$ $a = - {1 \over 2}$ and $b = \, \pm \,{{\sqrt 3 } \over 2}$

$\\ z = - {1 \over 2} + {{\sqrt 3 } \over 2}i$ or $z = - {1 \over 2} - {{\sqrt 3 } \over 2}i$

${z^n} = {(z + 1)^n} \Rightarrow {\left( {{{z + 1} \over z}} \right)^n} = 1$

${\left( {1 + {1 \over z}} \right)^n} = 1$

$\left( {{{1 + \sqrt 3 i} \over 2}} \right) = 1$ , then minimum value of n is 6.