14:[["$","script",null,{"type":"application/ld+json","dangerouslySetInnerHTML":{"__html":"$1d"}}],["$","$L1e",null,{}],["$","div",null,{"className":"min-h-screen bg-gray-100 dark:bg-gray-100 flex items-start justify-center px-2 py-4","children":["$","$L1f",null,{"currentQuestion":{"id":"7d7b76fb-3252-4237-b9c9-960ac65ac9c2","slug":"let-za-i-b-b-neq-0-be-complex-numbers-satisfying-z2-barz-21z-then-the-least-value-of-n-n-such","questionNumber":"Let zai b b neq 0 be complex numbers satisfying z2barz 21z T","subject":"Mathematics","topic":"Topic","questionTex":"

Let $\\mathrm{z}=a+i b, b \\neq 0$ be complex numbers satisfying $z^{2}=\\bar{z} \\cdot 2^{1-z}$. Then the least value of $n \\in N$, such that $z^{n}=(z+1)^{n}$, is equal to __________.

","solutionTex":"

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

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