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The given equation is z^4+z^3+z^2+z+1=0 nbsp; So, the equation is z^5 1z 1 which means that z_1,z_2,z_3,z_4 are four out of five roots of unity except 1 (A) ...

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Byju's Answer

Standard XII

Mathematics

De-Moivre's Theorem

If z 1, z 2, ...

Question

If $z_{1}, z_{2}, z_{3}$ and $z_{4}$ are the roots of the equation $z^{4} + z^{3} + z^{2} + z + 1 = 0$ , then

$\begin{matrix} Column I & Column II (A) & ∣ ∣ ∣ ∣ 4 \sum i = 1 (z_{i})^{4} ∣ ∣ ∣ ∣ is equal to & (p) & 0 (B) & 4 \sum i = 1 (z_{i})^{5} is equal to & (q) & 4 (C) & 4 \prod i = 1 (z_{i} + 2) is equal to & (r) & 1 (D) & Least value of [| z_{1} + z_{2} |] is & (s) & 11 \end{matrix}$

$where []$ represents greatest integer function

Which of the following is the correct combination

(A) \to (p), (B) \to (r), (C) \to (s), (D) \to (q)

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(A) \to (r), (B) \to (q), (C) \to (s), (D) \to (p)

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(A) \to (q), (B) \to (r), (C) \to (s), (D) \to (p)

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(A) \to (p), (B) \to (q), (C) \to (r), (D) \to (s)

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Solution

The correct option is B $(A) \to (r), (B) \to (q), (C) \to (s), (D) \to (p)$
The given equation is $z^{4} + z^{3} + z^{2} + z + 1 = 0$

So, the equation is $\frac{z^{5} - 1}{z - 1}$ which means that $z_{1}, z_{2}, z_{3}, z_{4}$ are four out of five roots of unity except 1

$(A) z_{1}^{4} + z_{2}^{4} + z_{3}^{4} + z_{4}^{4} + 1^{4} = 0$

$\Rightarrow ∣ ∣ ∣ ∣ 4 \sum i = 1 (z_{i})^{4} ∣ ∣ ∣ ∣ = 1$

$(B) z_{1}^{5} + z_{2}^{5} + z_{3}^{5} + z_{4}^{5} + 1 = 5$

$\Rightarrow 4 \sum i = 1 (z_{i})^{5} = 4$

$(C) z^{4} + z^{3} + z^{2} + z + 1 = (z - z_{1}) (z - z_{2}) (z - z_{3}) (z - z_{4})$

Putting $z = - 2$ on both the sides, we get

$\Rightarrow 4 \prod i = 1 (z_{i} + 2) = 11$

$(D) | z_{1} + z_{2} | = \sqrt{| z_{1} |^{2} + | z_{2} |^{2} + 2 | z_{1} | | z_{2} | cos (θ_{1} - θ_{2})} \Rightarrow | z_{1} + z_{2} | = \sqrt{2 + 2 cos (θ_{1} - θ_{2})}$
$\Rightarrow | z_{1} + z_{2} | = 2 ∣ ∣ ∣ cos (\frac{θ_{1} - θ_{2}}{2}) ∣ ∣ ∣ \Rightarrow | z_{1} + z_{2} | = 2 ∣ ∣ ∣ ∣ cos (\frac{2 π (k_{1} - k_{2})}{2 n}) ∣ ∣ ∣ ∣, k_{1}, k_{2} = 1, 2, 3, 4, [k_{1} \neq k_{2}]$
Now $n = 5$ and for least value $k_{1} - k_{2} = 3$
$∴ | z_{1} + z_{2} | = 2 ∣ ∣ ∣ cos \frac{3 π}{5} ∣ ∣ ∣ = 2 cos \frac{2 π}{5} = \frac{\sqrt{5} - 1}{2}$
whose greatest integer is $0$

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Similar questions

Q. If

z_{1}, z_{2}, z_{3}, z_{4}, z_{5}

are roots of the equation

z^{5} + z^{4} + z^{3} + z^{2} + z + 1 = 0

, then the value of

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| z_{1} | = | z_{2} | = | z_{3} | = | z_{4} | = 1

and

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